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 
 / / N o t i c e :   A p p l i c a b l e   f o r   P r o g r a m   m e n u ,   W i n d o w   c a p t i o n   a n d   s y s t e m   t o o l   d i a l o g   b o x   ( s u c h   a s   f i l e   s e l e c t , 
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 / / 3 .   A l l   l i n e - b r e a k s   a t   t h e   e n d   o f   t h e   s t r i n g s   s h o u l d   b e   k e p t ;   w h i l e   l i n e - b r e a k s   w i t h i n   s t r i n g s   c a n   b e 
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 / / 4 .   " % s " 0" % d " 0" % x "   a r e   p l a c e h o l d e r s ,   w h i c h   w i l l   b e   r e p l a c e d   w i t h   r e l a t e d   c o n t e n t s   b y   t h e   s y s t e m . 
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 / / 5 .   S t r i n g s   r i g h t   a f t e r   " & "   w i l l   b e   u n d e r l i n e d ,   w i t h   " & "   n o t   d i s p l a y e d .   " & & "   s h o u l d   b e   u s e d   i f   " & "   i s 
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 
 2 = W a r n i n g :   T h i s   c o m p u t e r   p r o g r a m   i s   p r o t e c t e d   b y   c o p y r i g h t   l a w   a n d   i n t e r n a t i o n a l   t r e a t i e s .   U n a u t h o r i z e d   r e p r o d u c t i o n   o r   d i s t r i b u t i o n   o f   t h i s   p r o g r a m ,   o r   a n y   p o r t i o n   o f   i t ,   m a y   r e s u l t   i n   s e v e r e   c i v i l   a n d   c r i m i n a l   p e n a l t i e s ,   a n d   w i l l   b e   p r o s e c u t e d   t o   t h e   m a x i m u m   e x t e n t   p o s s i b l e   u n d e r   t h e   l a w . 
 
 3 = 1 9 2 . 1 6 8 . 0 . 1 
 
 4 = &T
 
 4 = N o 
 
 5 = /f
 
 5 = Y e s 
 
 6 = Y*N<Pel>f:y
 
 6 = M u l t i   v a l u e ,   c a n   n o t   d i s p l a y 
 
 7 = R^~z1Y%el/TRd\O0\ n 
 
 7 = T h r e a d   C r e a t i n g   f a i l s ,   T h e   o p e r a t i o n   a b o r t e d . \ n 
 
 8 = ۏ
 
 8 = E n t e r 
 
 9 = Q
 
 9 = E x i t 
 
 1 0 = 2NLS
 
 1 0 = S e r i a l   P o r t 
 
 1 1 = *gO(u
 
 1 1 = U n u s e d 
 
 1 2 = 8^
 
 1 2 = N o r m a l - C l o s e 
 
 1 3 = 8^ _
 
 1 3 = N o r m a l - O p e n 
 
 1 4 = 7u
 
 1 4 = M a l e 
 
 1 5 = sY
 
 1 5 = F e m a l e 
 
 1 6 = ^S
 
 1 6 = N o . 
 
 1 7 = e
 
 1 7 = T i m e 
 
 1 8 = Ɖ% d 
 
 1 8 = V i d e o   % d 
 
 2 0 = ybk
 
 2 0 = D i s a b l e d 
 
 2 1 = AQ
 
 2 1 = E n a b l e d 
 
 2 2 = (u7b
T
 
 2 2 = U s e r n a m e 
 
 2 3 = [    x
 
 2 3 = P a s s w o r d 
 
 2 4 = N[!j_
 
 2 4 = E x p e r t   M o d e 
 
 2 5 = (u7b
T
N:Nzz0\ n 
 
 2 5 = U s e r n a m e   c a n   n o t   b e   e m p t y .   \ n 
 
 2 6 = (u7b
NX[(W0\ n 
 
 2 6 = T h i s   u s e r n a m e   d o e s   n o t   e x i s t .   \ n 
 
 2 7 = (u7b[x
Ncknx[xvW[k_{O(ucknxv'Y\Q0\ n lahgC a p s   L o c k .r`0\ n 
 
 2 7 = U s e r   p a s s w o r d   i s   i n c o r r e c t ,   P a s s w o r d   i s   c a s e   s e n s i t i v e . \ n   N o t e   C a p s   L o c k   k e y . \ n 
 
 2 8 = S_MR(u7b% s 
 
 2 8 = C u r r e n t   U s e r :   % s 
 
 2 9 = `voN]~ǏgN`vNTO^FUT|0\ n 
 
 2 9 = Y o u r   s o f t w a r e   i s   o v e r d u e ,   p l e a s e   c o n t a c t   w i t h   y o u r   s u p p l i e r . \ n 
 
 3 0 = *ghKm0RR[rb
Ncknxhg`vR[r0\ n 
 
 3 0 = C a n   n o t   d e t e c t   s o f t d o g ,   o r   c a n   n o t   b e   a u t h e n t i c a t e d   c o r r e c t l y ,   p l e a s e   c h e c k   y o u r   s o f t d o g . \ n 
 
 1 0 0 = sQN
 
 1 0 0 = A b o u t 
 
 1 0 1 = ][ňv~N
 
 1 0 1 = C o m p o n e n t s   I n s t a l l e d : 
 
 1 0 2 = h t t p s : / / w w w . v i s i o n i s t e c h . c o m / 
 
 1 0 3 = ck(W/TRzfN}
zI{. . . \ n 
 
 1 0 3 = S t a r t i n g   S m a r t   U p l o a d ,   p l e a s e   w a i t . . . \ n 
 
 1 0 4 = zfN}]~cknx[b0\ n 
 
 1 0 4 = S m a r t   U p l o a d   h a v e   c o m p l e t e d . \ n 
 
 1 0 5 = zfN}VYNel[b\ n 
 
 1 0 5 = S m a r t   U p l o a d   c a n   n o t   b e   c o m p l e t e d   d u e   t o   t h e   f o l l o w i n g   e r r o r s : \ n 
 
 1 0 6 = zfN}]~(u7bSm0\ n 
 
 1 0 6 = S m a r t   U p l o a d   o p e r a t i o n   i s   c a n c e l l e d   b y   u s e r . \ n 
 
 1 0 7 = zfN}]~[bFOgNnN}eQsNQ!k/TRzf\ n N}N~ckُN&TRُNQNvn
NO^(u0Rc6RhV0\ n 
 
 1 0 7 = S m a r t   U p l o a d   i s   c o m p l e t e d ,   b u t   s o m e   e r r o r   h a p p e n   w h e n   u p l o a d i n g .   P l e a s e   r e s t a r t   S m a r t   U p l o a d   \ n   t o   c o r r e c t   t h e s e   e r r o r s ,   o t h e r w i s e   t h e   e r r o n e o u s   s e t u p   c a n   n o t   b e   u s e d   i n   c o n t r o l l e r . \ n 
 
 1 0 8 = ck(W/TRhQbN}
zI{. . . \ n 
 
 1 0 8 = S t a r t i n g   U p l o a d   A l l ,   p l e a s e   w a i t . . . \ n 
 
 1 0 9 = hQbN}]~cknx[b0\ n 
 
 1 0 9 = U p l o a d   A l l   a r e   c o m p l e t e d   s u c c e s s f u l l y . \ n 
 
 1 1 0 = hQbN}VYNel[b\ n 
 
 1 1 0 = U p l o a d   A l l   c a n   n o t   b e   c o m p l e t e d   d u e   t o   t h e   f o l l o w i n g   e r r o r s : \ n 
 
 1 1 1 = hQbN}]~(u7bSm0\ n 
 
 1 1 1 = U p l o a d   A l l   o p e r a t i o n   i s   c a n c e l l e d   b y   t h e   u s e r . \ n 
 
 1 1 2 = hQbN}]~[bFOǏz-NQsNQ!k/TRhQb\ n N}N~ckُN0\ n 
 
 1 1 2 = U p l o a d   A l l   i s   c o m p l e t e d ,   b u t   s o m e   e r r o r s   h a p p e n .   \ n P l e a s e   r e s t a r t   U p l o a d   A l l   t o   c o r r e c t   t h e   e r r o r s . \ n 
 
 2 0 0 = `
N!kO(uvhQ@\2\oVQ~cSy(uydbf9e0͑eO9e\ n 	ynN/T(uevQ~cS&TRelۏLhQ@\2\oV0\ n 
 
 2 0 0 = Y o u   n e t w o r k   i n t e r f a c e   h a s   b e e n   d i s a b l e d ,   r e m o v e d   o r   m o d i f i e d .   \ n P l e a s e   c h a n g e   t h e   n e t w o r k   i n t e r f a c e   f o r   g l o b a l   a n t i - p a s s b a c k   i n   \ n O p t i o n s   o t h e r w i s e   t h e   g l o b a l   a n t i - p a s s b a c k   d i d   n o t   w o r k . \ n 
 
 5 0 0 0 = fge
 
 5 0 0 0 = S u n d a y 
 
 5 0 0 1 = fg N
 
 5 0 0 1 = M o n d a y 
 
 5 0 0 2 = fgN
 
 5 0 0 2 = T u e s d a y 
 
 5 0 0 3 = fg	N
 
 5 0 0 3 = W e d n e s d a y 
 
 5 0 0 4 = fgV
 
 5 0 0 4 = T h u r s d a y 
 
 5 0 0 5 = fgN
 
 5 0 0 5 = F r i d a y 
 
 5 0 0 6 = fgmQ
 
 5 0 0 6 = S a t u r d a y 
 
 5 0 0 7 = fg
 
 5 0 0 7 = W e e k 
 
 / / 1 0 0 0 1 = A S C - M S 1 2 
 
 / / 1 0 0 0 2 = A S C - M S 2 4 
 
 / / 1 0 0 0 3 = A S C - M E 1 2 
 
 / / 1 0 0 0 4 = A S C - M E 2 4 
 
 / / 1 0 0 0 5 = A S I - M E 2 0 ( I D ) 
 
 / / 1 0 0 0 6 = A S I - M E 3 0 ( I D ) 
 
 / / 1 0 0 0 7 = A S I - M E 2 0 ( I C ) 
 
 / / 1 0 0 0 8 = A S I - M E 3 0 ( I C ) 
 
 1 0 0 0 9 = V S - A X E S S - 2 E T L 
 
 1 0 0 1 0 = V S - A X E S S - 4 E T L 
 
 / / 1 0 0 1 1 = A S I - D E 2 0 M T ( I D ) 
 
 / / 1 0 0 1 2 = A S I - D E 2 0 M T ( I C ) 
 
 / / 1 0 0 1 3 = A S C - D L 2 4 
 
 / / 1 0 0 1 4 = A S C - D S 1 2 
 
 / / 1 0 0 1 5 = A S B _ D L 0 4 
 
 / / 1 0 0 1 6 = A S B _ D L 1 6 
 
 
 
 / / 1 0 0 2 0 = A S I - D E 2 0 T 
 
 / / 1 0 0 2 1 = A S I - D E 3 0 
 
 1 0 0 3 0 = V I S - 3 0 3 1 
 
 / / 1 0 0 3 1 = A S F - D F 3 0 
 
 / / 1 0 0 3 2 = A S F - D F 4 0 
 
 
 
 1 0 0 4 3 = V S - A X E S S - 2 D L X 
 
 1 0 0 4 4 = V S - A X E S S - 4 D L X 
 
 1 0 0 4 5 = V S - A X E S S - 2 E T L - 2 
 
 1 0 0 4 6 = V S - A X E S S - 4 E T L - 2 
 
 1 0 0 4 7 = V S - A X E S S - 2 D L X - 2 
 
 1 0 0 4 8 = V S - A X E S S - 4 D L X - 2 
 
 1 0 0 4 9 = V I S - 3 0 3 1 - 2 
 
 
 
 / / x[^c
 
 / / E r r o r   c o d e   d e s c r i p t i o n 
 
 [ M a i n I D = 1   T y p e = 0 ] 
 
 0 = SuS:N % d  0\ n 
 
 0 = E r r o r ,   e r r o r   c o d e   i s   " % d " . \ n 
 
 1 = QX[
N QvQ[z^Nʑ>eQX[b͑/Td\O|~TQՋ0\ n 
 
 1 = I n s u f f i c i e n t   m e m o r y ,   p l e a s e   e x i t   o t h e r   p r o g r a m s   t o   r e l e a s e   m e m o r y   o r   r e s t a r t   t h e   s y s t e m .   \ n 
 
 2 = d\OLubCQ }e1Y%SQX[
Nb]~ݏSLubCQ }vP6R0\ n 
 
 2 = F a i l   t o   o p e r a t e   i n t e r f a c e   e l e m e n t ,   i n s u f f i c i e n t   m e m o r y   o r   i n t e r f a c e   e l e m e n t   l i m i t   e x c e e d e d . \ n 
 
 3 = d\O(u7b:_6RSm0\ n 
 
 3 = O p e r a t i o n   i s   c a n c e l l e d   b y   u s e r . \ n 
 
 4 = 募R*g[s0\ n 
 
 4 = T h i s   f u n c t i o n   i s   n o t   i m p l e m e n t e d . \ n 
 
 
 
 2 0 0 1 = 
N/ecdk{|dk{|hVv]S*g~b0R0\ n 
 
 2 0 0 1 = C a n   n o t   s u p p o r t   t h e   t y p e   o f   c o m m u n i c a t i o n . \ n 
 
 2 0 0 3 = ,g{:gedk2NSb2NS]~`S(ub_cOWSb _2NS1Y%0\ n 
 
 2 0 0 3 = P C   d o e s   n o t   h a v e   t h i s   s e r i a l   p o r t ,   o r   t h e   s e r i a l   p o r t   i s   u s e d   o r   d a m a g e d . \ n 
 
 2 0 0 4 = nSpe1Y%0\ n 
 
 2 0 0 4 = F a i l   t o   s e t u p   c o m m u n i c a t i o n   p a r a m e t e r . \ n 
 
 2 0 0 5 = ne1Y%0\ n 
 
 2 0 0 5 = F a i l   t o   s e t u p   c o m m u n i c a t i o n   t i m e o u t . \ n 
 
 2 0 0 6 = 9eSs1Y%0\ n 
 
 2 0 0 6 = F a i l   t o   c h a n g e   c o m m u n i c a t i o n   s p e e d . \ n 
 
 2 0 1 0 = NYe}TNQeQ0\ n 
 
 2 0 1 0 = F a i l   t o   w r i t e   w h e n   c o m m u n i c a t e   w i t h   d e v i c e . \ n 
 
 2 0 1 1 = NYe}TNQeQe0\ n 
 
 2 0 1 1 = W a i t i n g   f o r   r e a d   t i m e o u t ,   w h e n   c o m m u n i c a t e   w i t h   d e v i c e . \ n   
 
 2 0 2 0 = NYeS^T{0\ n 
 
 2 0 2 0 = R e s p o n s e   a c q u i r e m e n t   e r r o r   w h e n   c o m m u n i c a t e   w i t h   d e v i c e . \ n 
 
 2 0 2 1 = NYeS^T{e0\ n 
 
 2 0 2 1 = R e s p o n s e   a c q u i r e m e n t   t i m e o u t   w h e n   c o m m u n i c a t e   w i t h   d e v i c e . \ n 
 
 2 0 3 0 = el㉐g0W@WS/fv0W@WbD N S Q0\ n 
 
 2 0 3 0 = C a n   n o t   d e c o d e   a d d r e s s ,   w r o n g   a d d r e s s   o r   D N S . \ n 
 
 2 0 3 1 = R^NN[a1Y%0\ n 
 
 2 0 3 1 = F a i l   t o   c r e a t e   e v e n t   o b j e c t . \ n   
 
 2 0 3 2 = R^WYcW[1Y%0\ n 
 
 2 0 3 2 = F a i l   t o   c r e a t e   s o c k e t . \ n 
 
 2 0 3 3 = eln:N_ek!j_0\ n 
 
 2 0 3 3 = C a n   n o t   s e t u p   a s y n c h r o n o u s   m o d e . \ n 
 
 2 0 3 4 = ޏcQ~Y1Y%0\ n 
 
 2 0 3 4 = F a i l   t o   c o n n e c t   w i t h   n e t w o r k   d e v i c e . \ n 
 
 2 0 3 5 = QebQ~ޏce _0\ n 
 
 2 0 3 5 = R e a d - w r i t e   t i m e o u t ,   o r   n e t w o r k   d i s c o n n e c t e d . \ n 
 
 2 0 3 6 = ޏceS/f~_bY*gck8^]\O0\ n 
 
 2 0 3 6 = C o n n e c t i o n   t i m e o u t   m a y   b e   d u e   t o   c o m m u n i c a t i o n   c i r c u i t   b u s y   o r   d y s f u n c t i o n   o f   d e v i c e . \ n 
 
 2 0 3 7 = Nc6RhVSvpenc<h_
Ncknx0\ n 
 
 2 0 3 7 = D a t a   f o r m a t   r e c e i v e d   f r o m   c o n t r o l l e r   i s   i n c o r r e c t . \ n   
 
 
 
 2 5 0 3 = *ghKm0Rc6RhVb勧c6RhV
N/ec0\ n 
 
 2 5 0 3 = C a n   n o t   d e t e c t   c o n t r o l l e r   o r   t h e   c o n t r o l l e r   c a n   n o t   b e   s u p p o r t e d . \ n 
 
 2 5 0 4 = hKm0R N*Nc6RhVFOWS/f*gwv0\ n 
 
 2 5 0 4 = C o n t r o l l e r   d e t e c t e d ,   b u t   M o d e l   i s   u n k n o w n . \ n 
 
 2 5 0 5 = Nc6RhVŏeS^T{
N[teT~pencl6e0R0\ n 
 
 2 5 0 5 = D e f e c t i v e   c o m m u n i c a t i o n   w i t h   c o n t r o l l e r ,   d a t a   r e c e i v e d   a r e   p a r t i a l . \ n   
 
 2 5 0 6 = c6RhVԏVvpencS~b
N0RS4Y0\ n 
 
 2 5 0 6 = D a t a   p a c k e t   f r o m   c o n t r o l l e r ,   d a t a   h e a d   l o s t . \ n   
 
 2 5 0 7 = c6RhVԏVvpencS~b
N0RS>\0\ n 
 
 2 5 0 7 = D a t a   p a c k e t   f r o m   c o n t r o l l e r ,   d a t a   e n d   l o s t . \ n 
 
 2 5 0 8 = c6RhVԏVvpencS!hT
Ncknx0\ n 
 
 2 5 0 8 = D a t a   p a c k e t   f r o m   c o n t r o l l e r ,   d a t a   h e a d   l o s t ,   d a t a   c h e c k s u m   e r r o r . \ n 
 
 2 5 0 9 = c6RhVԏVvY0W@WbQ!j_
Ncknx0\ n 
 
 2 5 0 9 = D e v i c e   a d d r e s s   o r   r e a d / w r i t e   m o d e   f r o m   c o n t r o l l e r   i s   i n c o r r e c t . \ n 
 
 2 5 1 0 = c6RhVԏVvpencSpenc<h_0\ n 
 
 2 5 1 0 = D a t a   p a c k e t   f r o m   c o n t r o l l e r ,   d a t a   f o r m a t   e r r o r . \ n 
 
 2 5 1 1 = c6RhVvhTRpev]
NP0\ n 
 
 2 5 1 1 = C o n t r o l l e r   w e e k   s c h e d u l e   u p p e r   l i m i t   r e a c h e d . \ n 
 
 2 5 1 2 = c6RhVvGPeRpev]
NP0\ n 
 
 2 5 1 2 = C o n t r o l l e r   h o l i d a y   s c h e d u l e   u p p e r   l i m i t   r e a c h e d . \ n 
 
 2 5 1 3 = c6RhVvLCgP~pev]
NP0\ n 
 
 2 5 1 3 = C o n t r o l l e r   a c c e s s   g r o u p   u p p e r   l i m i t   r e a c h e d . \ n 
 
 2 5 1 4 = c6RhVvNXTpev]
NP0\ n 
 
 2 5 1 4 = C o n t r o l l e r   e m p l o y e e   n u m b e r   u p p e r   l i m i t   r e a c h e d . \ n 
 
 2 5 1 5 = LCgP~c[vhTR(Wc6RhV-N
NX[(W0\ n 
 
 2 5 1 5 = T h e   w e e k   s c h e d u l e   o f   a c c e s s   c o n t r o l   g r o u p   d o e s   n o t   e x i s t   i n   c o n t r o l l e r .   \ n   
 
 2 5 1 6 = LCgP~c[vGPeR(Wc6RhV-N
NX[(W0\ n 
 
 2 5 1 6 = T h e   h o l i d a y   s c h e d u l e   o f   a c c e s s   c o n t r o l   g r o u p   d o e s   n o t   e x i s t   i n   c o n t r o l l e r .   \ n 
 
 2 5 1 7 = NXTc[vLCgP~(Wc6RhV-N
NX[(W0\ n 
 
 2 5 1 7 = T h e   a c c e s s   c o n t r o l   g r o u p   d o e s   n o t   e x i s t   i n   c o n t r o l l e r .   \ n 
 
 2 5 1 8 = Spen
Ncknx0\ n 
 
 2 5 1 8 = P a r a m e t e r   s e t t i n g   e r r o r . \ n 
 
 2 5 1 9 = Y*g[s募R0\ n 
 
 2 5 1 9 = T h i s   f u n c t i o n   i s   n o t   i m p l e m e n t e d   b y   t h e   d e v i c e . \ n 
 
 2 5 2 1 = c6RhVQS:N1 0\ n 
 
 2 5 2 1 = C o n t r o l l e r   i n t e r n a l   e r r o r ,   e r r o r   c o d e   i s   1 . \ n 
 
 2 5 2 2 = c6RhVQS:N2 0\ n 
 
 2 5 2 2 = C o n t r o l l e r   i n t e r n a l   e r r o r ,   e r r o r   c o d e   i s   2 . \ n 
 
 2 5 2 3 = c6RhVQS:N3 0\ n 
 
 2 5 2 3 = C o n t r o l l e r   i n t e r n a l   e r r o r ,   e r r o r   c o d e   i s   3 . \ n 
 
 2 5 2 4 = c6RhVQS:N4 0\ n 
 
 2 5 2 4 = C o n t r o l l e r   i n t e r n a l   e r r o r ,   e r r o r   c o d e   i s   4 . \ n 
 
 2 5 2 5 = c6RhVQS:N5 0\ n 
 
 2 5 2 5 = C o n t r o l l e r   i n t e r n a l   e r r o r ,   e r r o r   c o d e   i s   5 . \ n 
 
 2 5 2 6 = c6RhVQS:N6 0\ n 
 
 2 5 2 6 = C o n t r o l l e r   i n t e r n a l   e r r o r ,   e r r o r   c o d e   i s   6 . \ n 
 
 2 5 2 7 = c6RhVQS:N7 0\ n 
 
 2 5 2 7 = C o n t r o l l e r   i n t e r n a l   e r r o r ,   e r r o r   c o d e   i s   7 . \ n 
 
 2 5 2 8 = c6RhVQS:N8 0\ n 
 
 2 5 2 8 = C o n t r o l l e r   i n t e r n a l   e r r o r ,   e r r o r   c o d e   i s   8 . \ n 
 
 2 5 2 9 = c6RhVQS:N9 0\ n 
 
 2 5 2 9 = C o n t r o l l e r   i n t e r n a l   e r r o r ,   e r r o r   c o d e   i s   9 . \ n 
 
 2 5 3 0 = c6RhVQS:N1 0 0\ n 
 
 2 5 3 0 = C o n t r o l l e r   i n t e r n a l   e r r o r ,   e r r o r   c o d e   i s   1 0 . \ n 
 
 2 5 3 1 = c6RhVQS:N1 1 0\ n 
 
 2 5 3 1 = C o n t r o l l e r   i n t e r n a l   e r r o r ,   e r r o r   c o d e   i s   1 1 . \ n 
 
 2 5 3 2 = c6RhVQS:N1 2 0\ n 
 
 2 5 3 2 = C o n t r o l l e r   i n t e r n a l   e r r o r ,   e r r o r   c o d e   i s   1 2 . \ n 
 
 2 5 3 3 = c6RhVQS:N1 3 0\ n 
 
 2 5 3 3 = C o n t r o l l e r   i n t e r n a l   e r r o r ,   e r r o r   c o d e   i s   1 3 . \ n 
 
 2 5 3 4 = c6RhVQS:N1 4 0\ n 
 
 2 5 3 4 = C o n t r o l l e r   i n t e r n a l   e r r o r ,   e r r o r   c o d e   i s   1 4 . \ n 
 
 2 5 3 5 = c6RhVQS:N1 5 0\ n 
 
 2 5 3 5 = C o n t r o l l e r   i n t e r n a l   e r r o r ,   e r r o r   c o d e   i s   1 5 . \ n 
 
 2 5 3 6 = c6RhVQS:N1 6 0\ n 
 
 2 5 3 6 = C o n t r o l l e r   i n t e r n a l   e r r o r ,   e r r o r   c o d e   i s   1 6 . \ n 
 
 2 5 3 7 = c6RhVQS:N1 7 0\ n 
 
 2 5 3 7 = C o n t r o l l e r   i n t e r n a l   e r r o r ,   e r r o r   c o d e   i s   1 7 . \ n 
 
 2 5 3 8 = c6RhVQS:N1 8 0\ n 
 
 2 5 3 8 = C o n t r o l l e r   i n t e r n a l   e r r o r ,   e r r o r   c o d e   i s   1 8 . \ n 
 
 2 5 3 9 = c6RhVQS:N1 9 0\ n 
 
 2 5 3 9 = C o n t r o l l e r   i n t e r n a l   e r r o r ,   e r r o r   c o d e   i s   1 9 . \ n 
 
 2 5 4 0 = c6RhVQS:N2 0 0\ n 
 
 2 5 4 0 = C o n t r o l l e r   i n t e r n a l   e r r o r ,   e r r o r   c o d e   i s   2 0 . \ n 
 
 2 5 4 1 = c6RhVQS:N2 1 0\ n 
 
 2 5 4 1 = C o n t r o l l e r   i n t e r n a l   e r r o r ,   e r r o r   c o d e   i s   2 1 . \ n 
 
 2 5 4 2 = c6RhVQS:N2 2 0\ n 
 
 2 5 4 2 = C o n t r o l l e r   i n t e r n a l   e r r o r ,   e r r o r   c o d e   i s   2 2 . \ n 
 
 2 5 4 3 = c6RhVQS:N2 3 0\ n 
 
 2 5 4 3 = C o n t r o l l e r   i n t e r n a l   e r r o r ,   e r r o r   c o d e   i s   2 3 . \ n 
 
 2 5 4 4 = c6RhVQS:N2 4 0\ n 
 
 2 5 4 4 = C o n t r o l l e r   i n t e r n a l   e r r o r ,   e r r o r   c o d e   i s   2 4 . \ n 
 
 2 5 4 5 = c6RhV[x0\ n 
 
 2 5 4 5 = C o n t r o l l e r   C o m m u n i c a t i o n   P a s s w o r d   E r r o r .   \ n 
 
 
 
 3 0 0 1 = penc^eQSpenc^
gR]\Pbk0vQ[z^b(u7br`SO(uhbvQ[*gw0\ n 
 
 3 0 0 1 = E r r o r   w h e n   v i s i t   d a t a b a s e .   D a t a b a s e   s e r v i c e   s t o p p e d ,   o t h e r   p r o g r a m / u s e r   o c c u p i e s   v i s i t   l i s t   o r   o t h e r   u n k n o w n   e r r o r . \ n 
 
 3 0 0 2 = penc^~N*g[ňb[ňvHr,g
Ncknx\ n 
 
 3 0 0 2 = D a t a b a s e   a c c e s s   c o m p o n e n t   i s   n o t   i n s t a l l e d   o r   w r o n g   v e r s i o n . \ n 
 
 3 0 0 4 = elNpenc^^zޏcSpenc^
NX[(Wbb~0\ n 
 
 3 0 0 4 = C a n   n o t   c o n n e c t   w i t h   d a t a b a s e ,   d a t a b a s e   m a y   n o t   e x i s t   o r   v i s i t   i s   r e j e c t e d . \ n 
 
 3 0 0 5 =  _/Tpenc^NR1Y%0\ n 
 
 3 0 0 5 = F a i l   t o   s t a r t   d a t a b a s e . \ n 
 
 3 0 0 6 = vQ[{tXT]~{vU_v^(WۏLN,gd\O	gQzvd\O
zT͑Ջ0\ n 
 
 3 0 0 6 = O t h e r   a d m i n i s t r a t o r   l o g e d   o n   a n d   i s   o p e r a t i n g   a   p r o g r a m   w h i c h   c o n f l i c t s   w i t h   t h i s   o p e r a t i o n ,   p l e a s e   t r y   i t   l a t t e r . \ n 
 
 3 0 2 1 = E x c e l eNeQ g	gSv/f勇eN
NX[(W`c[vhUS0\ n 
 
 3 0 2 1 = T h e r e   i s   a n   e r r o r   w h e n   v i s i t   E x c e l   f i l e ,   m a y b e   t h e   E x c e l   f i l e   i s   n o t   i n   a p p o i n t e d   s h e e t . \ n 
 
 3 0 2 2 = E x c e l ~N*g[ňb[ňvHr,g
Ncknx\ n 
 
 3 0 2 2 = T h e   E x c e l   c o m p o n e n t   i s   n o t   i n s t a l l e d ,   o r   i n s t a l l a t i o n   v e r s i o n   i s   i n c o r r e c t . \ n 
 
 3 0 2 4 = elSb _E x c e l eNSeN
NX[(Wbb~0\ n 
 
 3 0 2 4 = C a n   n o t   o p e n   E x c e l   f i l e ,   m a y b e   f i l e   d o e s   n o t   e x i s t   o r   v i s i t   r e j e c t e d . \ n 
 
 3 5 0 1 = ]pev
NP
NۏLXR0\ n 
 
 3 5 0 1 = U p p e r   l i m i t   r e a c h e d ,   a d d   u p   f a i l s . \ n 
 
 3 5 0 2 = hKm0RYNd\Oel[b\ n 
 
 3 5 0 2 = E r r o r   d e t e c t e d ,   o p e r a t i o n   c a n   n o t   b e   c o m p l e t e d . \ n 
 
 3 5 1 5 = R;`ĉRh[bepenc, R!jWWelck8^ЏL0\ n 
 
 3 5 1 5 = A t t e n d a n c e   r u l e   f o r m   i s   l o c k e d   o r   n o   d a t a ,   a t t e n d a n c e   m o d u l e   c a n   n o t   w o r k   n o r m a l l y . \ n   
 
 
 
 3 5 1 6 = 勺NXT*gNlxN-Nl el Rd0ۏLzfN}bhQbN}T͑Ջ0\ n 
 
 3 5 1 6 = T h e   p e r s o n   c o u l d   n o t   b e   r e m o v e d   f r o m   t h e   h a r d w a r e   a n d   c a n n o t   b e   d e l e t e d .   P l e a s e   t r y   a g a i n   a f t e r   S m a r t   U p l o a d   o r   U p l o a d   A l l . \ n 
 
 3 5 1 7 = 勺NXT*gyLMR
N Rd0\ n 
 
 3 5 1 7 = T h e   e m p l o y e e   c a n   n o t   b e   r e m o v e d   b e f o r e   E m p l o y e e   L e f t . \ n 
 
 
 
 4 0 0 1 = \eQ N*NgagN0\ n 
 
 4 0 0 1 = P l e a s e   e n t e r   o n e   o f   t h e   c o n d i t i o n s   a t   l e a s t . \ n 
 
 4 0 0 2 = _{	b N*NS0\ n 
 
 4 0 0 2 = P l e a s e   s e l e c t   a   d o o r . \ n 
 
 
 
 5 0 0 0 = Ƌ+RNYޏc1Y%ޏce0\ n 
 
 5 0 0 0 = R e c o g n i t i o n   d e v i c e   c o n n e c t i o n   f a i l e d ,   c o n n e c t i o n   t i m e   o u t . \ n 
 
 5 0 0 1 = YԏV1Y%0nx[xcknx0\ n 
 
 5 0 0 1 = D e v i c e   r e t u r n e d   f a i l e d .   P l e a s e   c o n f i r m   t h a t   t h e   a c c e s s   p a s s w o r d   i s   c o r r e c t . \ n   
 
 5 0 0 2 = Spe_8^0  \ n 
 
 5 0 0 2 = A b n o r m a l   p a r a m e t e r . \ n 
 
 5 0 0 3 = Yck_0\ n 
 
 5 0 0 3 = D e v i c e   i s   b u s y . \ n 
 
 5 0 0 4 = Ƌ+RN[x0\ n 
 
 5 0 0 4 = R e c o g n i t i o n   d e v i c e   l o g i n   p a s s w o r d   e r r o r . \ n 
 
 5 0 0 5 = I d 
NX[(W0\ n 
 
 5 0 0 5 = I D   i s   n o t   e x i s t . \ n 
 
 5 0 0 6 = N8gqGr
N&{Tck8^ĉ<h0nxOgqGr'Y\(W3 0 - 5 1 2 K b KN0\ n 
 
 5 0 0 6 = F a c e   p h o t o s   d o   n o t   m e e t   n o r m a l   s p e c i f i c a t i o n s ,   p l e a s e   m a k e   s u r e   t h e   p h o t o   s i z e   i s   3 0 - 5 1 2 K b . \ n 
 
 
 
 / / ĉRݏScx
 
 / / V i o l a t e   d e s c r i p t i o n   c o d e 
 
 [ M a i n I D = 2   T y p e = 0 ] 
 
 0 = 
Ty*gkXQ0\ n 
 
 0 = N a m e   i s   n o t   f i l l e d . \ n 
 
 1 = 
Ty]~O(u0\ n 
 
 1 = T h e   n a m e   i s   u s e d . \ n 
 
 2 = nTvQ[vc6RhV[hQvT0\ n 
 
 2 = C o m m u n i c a t i o n   s e t u p   s h o u l d   t h e   s a m e   a s   o t h e r   c o n t r o l l e r s . \ n 
 
 3 = W
T*gkXQ0\ n 
 
 3 = D o m a i n   n a m e   i s   n o t   f i l l e d . \ n 
 
 4 = S
Ty]~T Nc6RhV
NvvQ[SO(u0\ n 
 
 4 = D o o r   n a m e   i s   u s e d   b y   o t h e r   d o o r   i n   t h e   s a m e   c o n t r o l l e r . \ n 
 
 5 = x]~kXQFO
N/f6 MOpeW[0\ n 
 
 5 = T h r e a t e n   c o d e   f i l l e d   i s   n o t   6 - d i g i t   n u m b e r . \ n 
 
 6 = aS]~ReQ0\ n 
 
 6 = T h e   c a r d   h a s   b e e n   a d d e d . \ n 
 
 7 = Y
T*gkXQ0\ n 
 
 7 = N a m e   i s   n o t   f i l l e d . \ n 
 
 8 = [x]~kXQFO
N/f6 MOpeW[0\ n 
 
 8 = P a s s w o r d   f i l l e d   i s   n o t   6 - d i g i t   n u m b e r . \ n 
 
 9 = Y
TNSv~T]~O(u0\ n 
 
 9 = C o m b i n a t i o n   o f   n a m e   a n d   c o d e   i s   u s e d . \ n 
 
 1 0 = 	[aS]~vQ[NXTO(u0\ n 
 
 1 0 = S e l e c t e d   i s   u s e d   b y   o t h e r s . \ n 
 
 1 1 = (u7b
T*gkXQ0\ n 
 
 1 1 = U s e r n a m e   i s   n o t   f i l l e d .   \ n 
 
 1 2 = $N!keQv[x
N N0\ n 
 
 1 2 = T w o   p a s s w o r d s   a r e   i n c o n s i s t e n t .   \ n 
 
 1 3 = (u7b
T]~O(u0\ n 
 
 1 3 = U s e r n a m e   e x i s t e d .   \ n 
 
 1 4 = s!kv
Nse'YNI{NNsebN NsvekS+Tb\N
N Nsek0\ n 
 
 1 4 = T h e   t i m e   o f   s h i f t   d u t y   o n   l a t e   t h a n   o r   t h e   s a m e   w i t h   d u t y   o f f ,   o r   t h e   t i m e   o f   n e x   s h i f t   i s   i n c l u d e d   o r   e a r i e r   t h a n   l a s t   s h i f . \ n 
 
 1 5 = nvGPeNvQ[GPe͑
Y0\ n 
 
 1 5 = T h e   s e t   h o l i d a y   a n d   o t h e r   h o l i d a y s   r e p e a t . \ n 
 
 1 6 = 7RaS	gHewYe'YN,{ Nsv
Nseb7RaS	gHe~bke\N gT NsvNse0\ n 
 
 1 6 = T h e   v a l i d   s t a r t   t i m e   o f   p r e s e n t i n g   c a r d   i s   l a t e   t h a n   t h e   d u t y   o n   t i m e   o f   f i r s t   s h i f t   o r   t h e   v a l i d   e n d   t i m e   o f   p r e s e n t i n g   c a r d   e a r i e r   t h a n   t h e   d u t y   o f f   t i m e   o f   t h e   l a s t   s h i f t . \ n   
 
 
 
 
 
 
 
 
 
 / / e_=\ϑO(u{w Ve_W[&{
NǏ2 5 5 *NW[&TRO*be
 
 / / P l e a s e   u s e   s i m p l e   w o r d s   f o r   l o g   s i n c e   m a x .   C h a r a c t e r   i s   2 2 5   b y t e s ;   o t h e r w i s e ,   t h e   l o g   w i l l   b e   t r u n c a t e d . 
 
 [ M a i n I D = 3   T y p e = 0 ] 
 
 0 = {vU_|~
 
 0 = L o g o n   s y s t e m 
 
 1 =  Q|~
 
 1 = E x i t   s y s t e m 
 
 2 = f9e[xbR
 
 2 = C h a n g e   p a s s w o r d   s u c c e s s f u l l y 
 
 3 =  Rd(u7b % s  
 
 3 = D e l e t e   u s e r   " % s " 
 
 4 = XR(u7b % s  
 
 4 = A d d   u s e r   " % s " 
 
 5 = O9e(u7b % s  S
T % s  
 
 5 = R e n a m e   u s e r   " % s " ,   o l d   n a m e   " % s " 
 
 6 = O9e % s  vs
 
 6 = C h a n g e   " % s "   c o m m u n i c a t i o n   r a t e 
 
 7 = O9elbchV % s  vI P 0W@WI{Spe
 
 7 = C h a n g e   c o n v e r t e r   " % s "   I P   a d d r e s s   p a r a m e t e r .   
 
 8 = O9eQ~c6RhV % s  vI P 0W@WI{Spe
 
 8 = C h a n g e   n e t w o r k   c o n t r o l l e r   " % s "   I P   a d d r e s s   p a r a m e t e r . 
 
 9 = XRhTR % s  
 
 9 = A d d   w e e k   s c h e d u l e   " % s " 
 
 1 0 = O9ehTR % s  
 
 1 0 = C h a n g e   w e e k   s c h e d u l e   " % s " 
 
 1 1 =  RdhTR % s  
 
 1 1 = D e l e t e   w e e k   s c h e d u l e   " % s " 
 
 1 4 = XRGPeR % s  
 
 1 4 = A d d   h o l i d a y   s c h e d u l e   " % s " 
 
 1 5 = O9eGPeR % s  
 
 1 5 = M o d i f y   h o l i d a y   s c h e d u l e   " % s " 
 
 1 6 =  RdGPeR % s  
 
 1 6 = D e l e t e   h o l i d a y   s c h e d u l e   " % s " 
 
 1 9 = RYSc6RhV % s  
 
 1 9 = I n i t i a l i z e   C o n t r o l l e r   " % s " 
 
 2 0 = !hQc6RhV % s  ve
 
 2 0 = A d j u s t   c o n t r o l l e r   " % s "   t i m e 
 
 2 1 = XRc6RhV % s  
 
 2 1 = A d d   c o n t r o l l e r   " % s " 
 
 2 2 = O9ec6RhV % s  
 
 2 2 = M o d i f y   c o n t r o l l e r   " % s " 
 
 2 3 =  Rdc6RhV % s  
 
 2 3 = D e l e t e   c o n t r o l l e r   " % s " 
 
 2 5 = dc6RhV % s  vbf
 
 2 5 = R e l i e v e   c o n t r o l l e r   " % s "   a l a r m 
 
 2 6 = [c6RhV % s  d2
 
 2 6 = D i s m i s s   s e c u r i t y   f o r   c o n t r o l l e r   " % s " 
 
 2 7 = [c6RhV % s  ^2
 
 2 7 = A c t i v a t e   s e c u r i t y   f o r   c o n t r o l l e r   " % s " 
 
 2 9 = O9ec6RhVvbfn
 
 2 9 = M o d i f y   c o n t r o l l e r   a l a r m   s e t u p 
 
 3 0 = O9eS % s  
 
 3 0 = M o d i f y   d o o r   " % s " 
 
 3 2 = :_6RSb _S % s  
 
 3 2 = F o r c e   o p e n   d o o r   " % s " 
 
 3 3 = :_6RsQS % s  
 
 3 3 = F o r c e   c l o s e   d o o r   " % s " 
 
 3 4 = SmS % s  v:_6Rr`
 
 3 4 = C a n c e l   d o o r   " % s "   f o r c e   s t a t e 
 
 3 5 = XRLCgP~ % s  
 
 3 5 = A d d   a c c e s s   g r o u p   " % s " 
 
 3 6 = O9eLCgP~ % s  
 
 3 6 = M o d i f y   a c c e s s   g r o u p   " % s " 
 
 3 7 =  RdLCgP~ % s  
 
 3 7 = D e l e t e   a c c e s s   g r o u p   " % s " 
 
 4 0 = XRaS % s  SvQcaSN % s  
 
 4 0 = A d d   c a r d   " % s "   a n d   h o l d e r   " % s " 
 
 4 1 =  RdaS % s  
 
 4 1 = D e l e t e   c a r d   " % s " 
 
 4 2 = c1YaS % s  
 
 4 2 = R e p o r t   l o s s   c a r d   " % s " 
 
 4 3 = caS % s  
 
 4 3 = R e l i e v e   r e p o r t   c a r d   " % s " 
 
 4 4 = XR % s  
 
 4 4 = A d d   d e p a r t m e n t   " % s " 
 
 4 5 = O9e % s  
 
 4 5 = M o d i f y   d e p a r t m e n t   " % s " 
 
 4 6 =  Rd % s  
 
 4 6 = D e l e t e   d e p a r t m e n t   " % s " 
 
 4 7 = XRNXT % s  
 
 4 7 = A d d   e m p l o y e e   " % s " 
 
 4 8 = O9eNXT % s  
 
 4 8 = M o d i f y   e m p l o y e e   " % s " 
 
 4 9 =  RdNXT % s  
 
 4 9 = D e l e t e   e m p l o y e e   " % s " 
 
 5 0 = USekN}NXT % s  
 
 5 0 = O n e - s t e p   u p l o a d   e m p l o y e e   " % s " 
 
 5 1 = Nc6RhV RdNXT % s  
 
 5 1 = D e l e t e   e m p l o y e e   " % s "   f r o m   c o n t r o l l e r 
 
 5 2 = [eQNXT % s  
 
 5 2 = I m p o r t   e m p l o y e e   " % s " 
 
 5 3 =  _YN}c6RhV % s  @b	gn
 
 5 3 = S t a r t   t o   u p l o a d     a l l   s e t u p   f r o m   c o n t r o l l e r   " % s " 
 
 5 4 = N}c6RhV % s  @b	gn1Y%
 
 5 4 = F a i l   t o   u p l o a d   a l l   s e t u p   f o r   c o n t r o l l e r   " % s "   
 
 5 5 = N}c6RhV % s  @b	gnbR
 
 5 5 = U p l o a d   a l l   s e t u p   f o r   c o n t r o l l e r   " % s "   s u c c e s s f u l l y 
 
 5 6 =  _Y
N Oc6RhV % s  NNU_
 
 5 6 = S t a r t   t o   d o w n l o a d   e v e n t   r e c o r d   f o r   c o n t r o l l e r   " % s " 
 
 5 7 = 
N Oc6RhV % s  NNU_1Y%
 
 5 7 = F a i l   t o   d o w n l o a d   e v e n t   r e c o r d   f o r   c o n t r o l l e r   " % s " 
 
 5 8 = 
N Oc6RhV % s  NNU_bR
 
 5 8 = D o w n l o a d   e v e n t   r e c o r d   f o r   c o n t r o l l e r   " % s "   s u c c e s s f u l l y 
 
 5 9 =  _Y
N Oc6RhV % s  bfU_
 
 5 9 = S t a r t   t o   d o w n l o a d   a l a r m   r e c o r d   f o r   c o n t r o l l e r   " % s " 
 
 6 0 = 
N Oc6RhV % s  bfU_1Y%
 
 6 0 = F a i l   t o   d o w n l o a d   a l a r m   r e c o r d   f o r   c o n t r o l l e r   " % s " 
 
 6 1 = 
N Oc6RhV % s  bfU_bR
 
 6 1 = D o w n l o a d   a l a r m   r e c o r d   f o r   c o n t r o l l e r   " % s "   s u c c e s s f u l l y 
 
 6 2 = XR5uP[0WV % s  
 
 6 2 = A d d   E - m a p   " % s " 
 
 6 3 = O9e5uP[0WV % s  
 
 6 3 = M o d i f y   E - m a p   " % s " 
 
 6 4 =  Rd5uP[0WV % s  
 
 6 4 = D e l e t e   E - m a p   " % s " 
 
 6 5 = [evc _/T
 
 6 5 = R e a l - t i m e   m o n i t o r   s t a r t e d 
 
 6 6 = [evcsQ
 
 6 6 = R e a l - t i m e   m o n i t o r   s t o p p e d 
 
 6 7 = ܏z _/TS % s  
 
 6 7 = R e m o t e   o p e n   d o o r   " % s " 
 
 6 8 = YNpenc^
 
 6 8 = B a c k u p   d a t a b a s e 
 
 6 9 = ndpenc^
 
 6 9 = C l e a r   d a t a b a s e 
 
 7 0 = nd % s  @b	gU_
 
 7 0 = C l e a r   " % s "   a l l   r e c o r d 
 
 7 1 = nd % s  N % s   % s  vU_
 
 7 1 = C l e a r   " % s "     r e c o r d   f r o m   " % s "   t o   " % s "   
 
 7 5 = [eQpenc^
 
 7 5 = I m p o r t   d a t a b a s e 
 
 1 0 1 = O9eR;`ĉR
 
 1 0 1 = C h a n g e   A t t e n d a n c e   R u l e 
 
 1 0 2 = XReĉR % s  
 
 1 0 2 = A d d   D a y   S c h e d u l e   " % s " 
 
 1 0 3 = O9eeĉR % s  
 
 1 0 3 = C h a n g e   D a y   S c h e d u l e   " % s " 
 
 1 0 4 =  RdeĉR % s  
 
 1 0 4 = D e l e t e   D a y   S c h e d u l e   " % s " 
 
 1 0 5 = 9eSN % s  vcs
 
 1 0 5 = C h a n g e d   " % s "   s h i f t 
 
 1 0 6 = XRN % s  v:_6RRscs
 
 1 0 6 = A d d e d   " % s "   e n f o r c e   o v e r t i m e   s h i f t 
 
 1 0 7 = O9eN % s  v:_6RRscs
 
 1 0 7 = C h a n g e d   " % s "   e n f o r c e   o v e r t i m e   s h i f t 
 
 1 0 8 =  RdN % s  v:_6RRscs
 
 1 0 8 = D e l e t e d   " % s "   e n f o r c e   o v e r t i m e   s h i f t 
 
 1 0 9 = XRl[GPe % s  
 
 1 0 9 = A d d e d   o f f i c i a l   h o l i d a y   " % s " 
 
 1 1 0 = O9el[GPe % s  
 
 1 1 0 = C h a n g e   o f f i c i a l   h o l i d a y   " % s " 
 
 1 1 1 =  Rdl[GPe % s  
 
 1 1 1 = D e l e t e   o f f i c i a l   h o l i d a y   " % s " 
 
 1 1 2 = :NNXT % s  XRGP
 
 1 1 2 = A d d   l e a v e   f o r   e m p l o y e e   " % s " 
 
 1 1 3 = :NNXT % s  O9eGP
 
 1 1 3 = C h a n g e   l e a v e   f o r   e m p l o y e e   " % s " 
 
 1 1 4 = :NNXT % s   RdGP
 
 1 1 4 = D e l e t e   l e a v e   f o r   e m p l o y e e   " % s " 
 
 1 1 5 = :NNXT % s  XRRs
 
 1 1 5 = A d d   o v e r t i m e   f o r   e m p l o y e e   " % s " 
 
 1 1 6 = :NNXT % s  O9eRs
 
 1 1 6 = C h a n g e   o v e r t i m e   f o r   e m p l o y e e   " % s " 
 
 1 1 7 = :NNXT % s   RdRs
 
 1 1 7 = D e l e t e   o v e r t i m e   f o r   e m p l o y e e   " % s " 
 
 1 1 8 = :NNXT % s  XRe{v7RaSU_
 
 1 1 8 = A d d   m i s s e d   c a r d   r e c o r d   f o r   e m p l o y e e   " % s "   
 
 1 1 9 = :NNXT % s  O9ee{v7RaSU_
 
 1 1 9 = C h a n g e   m i s s e d   c a r d   r e c o r d   f o r   e m p l o y e e   " % s " 
 
 1 2 0 = :NNXT % s   Rde{v7RaSU_
 
 1 2 0 = D e l e t e   m i s s e d   c a r d   r e c o r d   f o r   e m p l o y e e   " % s " 
 
 1 2 1 = ۏLNR{
 
 1 2 1 = A t t e n d a n c e   C o u n t 
 
 1 2 2 = bRۏLzfN}
 
 1 2 2 = S m a r t   U p l o a d   s u c c e s s f u l l y 
 
 1 2 3 = ۏLzfN}1Y%
 
 1 2 3 = S m a r t   U p l o a d   f a i l e d 
 
 1 2 4 = bRۏLhQbN}
 
 1 2 4 = U p l o a d   A l l   i s   s u c c e s s f u l l y 
 
 1 2 5 = hQbN}1Y%
 
 1 2 5 = U p l o a d   A l l   f a i l e d 
 
 1 2 6 = nd@b	gc6RhV[x1Y%
 
 1 2 6 = F a i l   t o   c l e a r   a l l   c o n t r o l l e r   p a s s w o r d s 
 
 1 2 7 = nd@b	gc6RhV[xbR
 
 1 2 7 = C l e a r   a l l   c o n t r o l l e r   p a s s w o r d s   s u c c e s s f u l l y 
 
 1 2 8 = f9e@b	gc6RhV[x1Y%
 
 1 2 8 = F a i l   t o   c h a n g e   a l l   c o n t r o l l e r   p a s s w o r d s 
 
 1 2 9 = f9e@b	gc6RhV[xbR
 
 1 2 9 = C h a n g e   a l l   c o n t r o l l e r   p a s s w o r d s   s u c c e s s f u l l y 
 
 1 3 0 = !hQ@b	gc6RhVv[x1Y%
 
 1 3 0 = F a i l   t o   a d j u s t   a l l   c o n t r o l l e r   p a s s w o r d s   
 
 1 3 1 = !hQ@b	gc6RhVv[xbR
 
 1 3 1 = A d j u s t   a l l   c o n t r o l l e r   p a s s w o r d s   s u c c e s s f u l l y 
 
 1 3 2 = !hQc6RhV % s  v[xbR
 
 1 3 2 = A d j u s t   c o n t r o l l e r   " % s "   s u c c e s s f u l l y 
 
 1 3 3 = Sb _S % s  
 
 1 3 3 = O p e n   d o o r   " % s " 
 
 1 3 4 = sQS % s  
 
 1 3 4 = C l o s e   d o o r   " % s " 
 
 1 3 5 = XRhQ@\2\o~ % s  
 
 1 3 5 = A d d   g l o b a l   a n t i - p a s s b a c k   g r o u p   " % s " 
 
 1 3 6 = O9ehQ@\2\o~ % s  
 
 1 3 6 = C h a n g e   g l o b a l   a n t i - p a s s b a c k   g r o u p   " % s " 
 
 1 3 7 =  RdhQ@\2\o~ % s  
 
 1 3 7 = D e l e t e   g l o b a l   a n t i - p a s s b a c k   g r o u p   " % s " 
 
 1 3 8 = O9eNXT % s  v5uhCgP
 
 1 3 8 = M o d i f y   e l e v a t o r   a c c e s s   o f   e m p l o y e e   " % s " 
 
 1 3 9 = Sb _@b	gS
 
 1 3 9 = O p e n   a l l   d o o r s 
 
 1 4 0 = :_6RSb _@b	gS
 
 1 4 0 = F o r c e   o p e n   a l l   d o o r s 
 
 1 4 1 = :_6RsQ@b	gS
 
 1 4 1 = F o r c e   c l o s e   a l l   d o o r s 
 
 1 4 2 = Sm@b	gSv:_6Rr`
 
 1 4 2 = C a n c e l   f o r c e   s t a t e   f o r   a l l   d o o r s 
 
 
 
 1 4 3 = ONXT % s  yL
 
 1 4 3 = L e t   E m p l o y e e   % s   l e f t 
 
 1 4 4 = ONXT % s  
YL
 
 1 4 4 = L e t   e m p l o y e e   % s   r e i n s t a t e d 
 
 1 4 5 = bRۏLhQbU_
N O
 
 1 4 5 = F u l l y   U p l o a d   F a c e   D a t a   s u c c e s s f u l l y 
 
 1 4 6 = hQbU_
N O1Y%
 
 1 4 6 = F u l l y   U p l o a d   F a c e   D a t a   f a i l e d 
 
 1 4 7 = ǑƖNXT % s  vN8penc
 
 1 4 7 = C o l l e c t   f a c e   d a t a   f o r   e m p l o y e e   " % s " 
 
 1 4 8 = ǑƖNXT % s  vc~penc
 
 1 4 8 = C o l l e c t   f i n g e r p r i n t   f o r   e m p l o y e e   " % s " 
 
 1 4 9 =  RdNXT % s  vc~penc
 
 1 4 9 = d e l e t e   f i n g e r p r i n t   d a t a   o f   e m p l o e e   " % s " 
 
 
 
 / / ܃US
 
 / / M e n u 
 
 / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / 
 
 / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / 
 
 / / ;N܃USI D R _ M A I N F R A M E 
 
 / / M a i n   M e n u   I D R _ M A I N F R A M E 
 
 [ M a i n I D = 1 2 8   T y p e = 2 ] 
 
 0 x 8 0 0 0 0 0 0 1 = s^S( & P ) 
 
 0 x 8 0 0 0 0 0 0 1 = & P l a t f o r m 
 
 3 2 7 9 3 = (u7b{t( & U ) . . . 
 
 3 2 7 9 3 = & U s e r   M a n a g e m e n t . . . 
 
 3 2 7 9 4 = fbcN{vU_( & L ) . . . 
 
 3 2 7 9 4 = R e & l o g o n . . . 
 
 3 2 7 9 5 = f9e[x( & C ) . . . 
 
 3 2 7 9 5 = & C h a n g e   P a s s w o r d . . . 
 
 0 x E 1 0 7 = SbpS( & P ) . . . \ t C t r l + P 
 
 0 x E 1 0 7 = & P r i n t . . . \ t C t r l + P 
 
 0 x E 1 0 9 = SbpSȉ( & V ) 
 
 0 x E 1 0 9 = P r i n t   P r e & v i e w 
 
 0 x E 1 0 6 = ubn( & G ) . . . 
 
 0 x E 1 0 6 = P a g e   & S e t u p . . . 
 
 3 2 7 9 6 = 	y( & O ) . . . 
 
 3 2 7 9 6 = & O p t i o n s 
 
 3 2 7 9 7 = penc^{t( & D ) . . . 
 
 3 2 7 9 7 = & D a t a b a s e   M a n a g e m e n t . . . 
 
 3 2 7 9 8 = N[!j_( & E ) 
 
 3 2 7 9 8 = & E x p e r t   M o d e 
 
 0 x E 1 4 1 =  Q( & X ) 
 
 0 x E 1 4 1 = E & x i t 
 
 
 
 0 x 8 0 0 0 0 0 0 2 = ƉV( & V ) 
 
 0 x 8 0 0 0 0 0 0 2 = & V i e w 
 
 0 x E 8 0 0 = ]wQh( & T ) 
 
 0 x E 8 0 0 = & T o o l 
 
 0 x E 8 0 1 = r`h( & S ) 
 
 0 x E 8 0 1 = & S t a t u s   B a r 
 
 3 2 7 9 9 = ؏SƉV^@\( & R ) 
 
 3 2 7 9 9 = & R e s t o r e   V i e w   L a y o u t 
 
 3 2 7 9 1 = MR NƉV( & P ) 
 
 3 2 7 9 1 = & P r e v i o u s   V i e w 
 
 3 2 7 9 2 = T NƉV( & N ) 
 
 3 2 7 9 2 = & N e x t   V i e w 
 
 
 
 0 x 8 0 0 0 0 0 0 3 =  ( & L ) 
 
 0 x 8 0 0 0 0 0 0 3 = & L a n g u a g e 
 
 0 x 8 0 0 0 0 0 0 4 = |~( & S ) 
 
 0 x 8 0 0 0 0 0 0 4 = & S y s t e m 
 
 
 
 0 x 8 0 0 0 0 0 0 5 = .^R( & H ) 
 
 0 x 8 0 0 0 0 0 0 5 = & H e l p 
 
 3 2 7 8 1 = _eQ( & Q ) . . . \ t F 3 
 
 3 2 7 8 1 = & Q u i c k   S t a r t . . . \ t F 3 
 
 3 2 7 8 2 = 8^T{( & F ) . . . \ t F 2 
 
 3 2 7 8 2 = & F A Q . . . \ t F 2 
 
 3 2 7 8 3 = vU_N"}_( & C ) . . . \ t F 1 
 
 3 2 7 8 3 = & C o n t e n t s . . . \ t F 1 
 
 3 2 7 8 0 = T|bN( & U ) . . . 
 
 3 2 7 8 0 = C o n t a c t   & U s . . . 
 
 0 x E 1 4 0 = sQN( & A ) . . . 
 
 0 x E 1 4 0 = & A b o u t . . . 
 
 
 
 [ M a i n I D = 0 x 1 7 7 1   T y p e = 2 ] 
 
 3 2 7 8 5 = 	b@b	g( & S ) 
 
 3 2 7 8 5 = & S e l e c t   a l l 
 
 3 2 7 8 6 = Sl	b( & V ) 
 
 3 2 7 8 6 = R e & v e r s e d   S e l e c t   
 
 3 2 7 8 7 = XR(u7b( & A ) 
 
 3 2 7 8 7 = & A d d   U s e r 
 
 3 2 7 8 8 =  Rd(u7b( & D ) 
 
 3 2 7 8 8 = & D e l e t e   U s e r   
 
 
 
 [ M a i n I D = 0 x 1 7 7 2   T y p e = 2 ] 
 
 3 2 7 8 5 = 	b@b	g( & S ) 
 
 3 2 7 8 5 = & S e l e c t   a l l 
 
 3 2 7 8 6 = Sl	b( & V ) 
 
 3 2 7 8 6 = & R e v e r s e d   S e l e c t   
 
 3 2 7 7 1 = ~n( US	eS(u) ( & D ) . . . 
 
 3 2 7 7 1 = S e t u p   & d e t a i l   ( b e   u s e d   f o r   s i g n a l   s e l e c t ) 
 
 
 
 / / zS
 
 / / W i n d o w 
 
 / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / 
 
 / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / 
 
 / / (u7b{t
 
 / / U s e r   M a n a g e m e n t 
 
 [ M a i n I D = 0   T y p e = 1 ] 
 
 0 = (u7b{t
 
 0 = U s e r   M a n a g e m e n t 
 
 1 = (u7b
 
 1 = U s e r 
 
 2 = W,gSpe
 
 2 = B a s i c   P a r a m e t e r 
 
 3 = (u7b
T
 
 3 = U s e r n a m e 
 
 4 = [x
 
 4 = P a s s w o r d   
 
 5 = nx[x
 
 5 = C o n f i r m   P a s s w o r d 
 
 6 = CgP
 
 6 = A c c e s s   P e r m i s s i o n s 
 
 7 = e(u7b
 
 7 = N e w   U s e r 
 
 8 =  Rd(u7b\[􁫈 Rd(u7bve_elnx(u7b
T`nx[ Rd	bv(u7bT
 
 8 = I f   t h e   u s e r   i s   d e l e t e d ,   r e l a t e d   l o g   c a n   n o t   i d e n t i f y   w i t h   a n y   u s e r .   A r e   y o u   s u r e   t o   d e l e t e   t h e   u s e r ? 
 
 
 
 / / f9e[x
 
 / / C h a n g e   P a s s w o r d 
 
 [ M a i n I D = 1   T y p e = 1 ] 
 
 0 = f9eS_MR(u7b[x
 
 0 = C h a n g e   P a s s w o r d   
 
 1 = S  [  x
 
 1 = O l d   P a s s w o r d 
 
 2 = e  [  x
 
 2 = N e w   P a s s w o r d 
 
 3 = Q N!k
 
 3 = C o n f i r m e d 
 
 4 = e[xNQ N!kv[x
N N0\ n 
 
 4 = T w o   p a s s w o r d   a r e   i n c o n s i s t e n t .   \ n 
 
 5 = e[x:Nzz\&^egg'Yv[hQ``nx[~~T\ n 
 
 5 = I t   i s   r i s k y   t o   r e m a i n   n e w   p a s s w o r d   e m p t y .   A r e   y o u   s u r e   t o   p r o c e e d ? \ n 
 
 
 
 / / mo`Fh
 
 / / M e s s a g e   B o x   
 
 [ M a i n I D = 2   T y p e = 1 ] 
 
 1 = nx[( & O ) 
 
 1 = & O K 
 
 2 = Sm( & C ) 
 
 2 = & C a n c e l   
 
 3 = OX[( & S ) 
 
 3 = & S a v e 
 
 4 = >e_( & A ) 
 
 4 = & G i v e   U p 
 
 5 = /f( & Y ) 
 
 5 = & Y e s 
 
 6 = &T( & N ) 
 
 6 = & N o 
 
 7 = ͑Ջ( & R ) 
 
 7 = & R e t r y 
 
 2 0 = `@bۏLvO9e\*gOX[\ n \ n 	b OX[ SN\@bZPvO9eۏLOX[0\ n 	b >e_ "N_@bZPvO9ev^~~d\O0\ n 	b Sm \Pbkd\O0
 
 2 0 = M o d i f i c a t i o n   i s   n o t   s a v e d ! \ n \ n S e l e c t   " S a v e "   c a n   s a v e   a l l   t h e   m o d i f i c a t i o n . \ n S e l e c t   " G i v e   u p "   t o   g i v e   u p   a l l   m o d i f i c a t i o n   a n d   c o n t i n u e . \ n S e l e c t   " C a n c e l "   t o   s t o p . 
 
 2 1 = OX[Q/f&T~~d\O\ n \ n 	b nx[ "N_@bZPvO9ev^~~d\O0\ n 	b Sm \Pbkd\O0
 
 2 1 = S a v e   e r r o r ,   g o   o n   o r   s t o p ? \ n \ n S e l e c t   " O K "   t o   g i v e   u p   a l l   m o d i f i c a t i o n   a n d   c o n t i n u e . \ n S e l e c t   " C a n c e l "   t o   s t o p . 
 
 2 2 = OX[ecseSsdkek]X[(Wcs\ n /f&T v NMRvcs\ n \ n 	b /f vNMRvcs0\ n 	b &T 
Nv\ n 	b Sm \Pbkd\O0
 
 2 2 = T h e   t i m e   o f   n e w   s h i f t   e x i t e d !   \ n   w h e t h e r   c o v e r s   t h e   o l d   s h i f t ?   \ n \ n T o   s e l e c t   " Y e s "   w i l l   c o v e r   t h e   o l d   o n e .   \ n T o   s e l e c t   " N o "   w i l l   n o t   c o v e r   o l d   o n e .   \ n T o   s e l e c t   " C a n c e l "   w i l l   s t o p   o p e r a t i n g . 
 
 5 0 = d\O(u7bSmel~~0\ n 
 
 5 0 = O p e r a t i o n   i s   c a n c e l l e d   b y   u s e r ,   c a n   n o t   g o   o n . \ n   
 
 5 1 = d\O\*g[b`nx[Smd\OT\ n \ n 	c nx[ Sm*g[bvd\O0\ n 	c Sm 
NSm*g[bvd\O0\ n 
 
 5 1 = O p e r a t i o n   i s   n o t   c o m p l e t e d ,   a r e   y o u   s u r e   t o   c a n c e l   i t ?   \ n \ n P r e s s   " O K "   t o   c a n c e l . \ n P r e s s   " C a n c e l "   t o   s t o p   c a n c e l . \ n 
 
 5 2 = d\O\*g[bI{_d\O[bbSmd\OT͑Ջ0\ n 
 
 5 2 = O p e r a t i o n   i s   n o t   c o m p l e t e d ,   p l e a s e   w a i t   u n t i l   o p e r a t i o n   c o m p l e t e s   o r   c a n c e l   t h e   o p e r a t i o n   a n d   r e t r y . \ n 
 
 
 
 / / NRbJT
 
 / / T a s k   R e p o r t 
 
 [ M a i n I D = 3   T y p e = 1 ] 
 
 0 x 0 = NRbJT
 
 0 x 0 = T a s k   R e p o r t 
 
 
 
 / / ^\'`]wQag
 
 / / P r o p e r t i e s   T o o l b a r 
 
 [ M a i n I D = 4   T y p e = 1 ] 
 
 2 0 0 7 = 	cR{|z^
 
 2 0 0 7 = O r d e r   b y   C l a s s i f i c a t i o n 
 
 2 0 0 8 = W[kz^!j_
 
 2 0 0 8 = O r d e r   b y   A l p h a b e t 
 
 2 0 0 9 = OX[
 
 2 0 0 9 = S a v e 
 
 2 0 1 0 = sQ@b	gCgP
 
 2 0 1 0 = D i s a b l e   A l l   P e r m i s s i o n s 
 
 2 0 1 1 =  _>e@b	gCgP
 
 2 0 1 1 = E n a b l e   A l l   P e r m i s s i o n s 
 
 
 
 / / R`.^R
 
 / / D y n a m i c   H e l p 
 
 [ M a i n I D = 5   T y p e = 1 ] 
 
 0 x 0 = R`.^R
 
 0 x 0 = D y n a m i c   H e l p 
 
 2 0 0 1 = 
N Nu
 
 2 0 0 1 = U p p e r 
 
 2 0 0 2 = N Nu
 
 2 0 0 2 = U n d e r 
 
 2 0 0 3 = 7Re
 
 2 0 0 3 = R e f r e s h 
 
 
 
 / / 2NLS
 
 / / S e r i a l   P o r t 
 
 [ M a i n I D = 6   T y p e = 1 ] 
 
 0 = 2NLS
 
 0 = S e r i a l   P o r t 
 
 1 = 2NLSRh
 
 1 = S e r i a l   P o r t   L i s t 
 
 1 0 = ck(WOX[O9e
zI{. . . \ n 
 
 1 0 = S a v i n g ,   p l e a s e   w a i t . . . \ n 
 
 1 1 = OX[[k0\ n 
 
 1 1 = S a v e   c o m p l e t e d . \ n 
 
 1 2 =  % s  sOX[bR0\ n 
 
 1 2 = " % s "   r a t e   s a v e d   s u c c e s s f u l l y . \ n 
 
 1 3 = *ghKm0R % s  sO9ee OX[0\ n 
 
 1 3 = " % s "   r a t e   i s   n o t   c h a n g e d ,   n o   n e e d   t o   s a v e . \ n 
 
 1 4 = OX[ % s  seQsYN\ n 
 
 1 4 = W h e n   S a v e   " % s "   r a t e ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 1 5 = OX[[kFOQsN0\ n 
 
 1 5 = S a v e   c o m p l e t e d ,   b u t   i n   e r r o r . \ n 
 
 
 
 2 0 0 4 = Smd\O
 
 2 0 0 4 = C a n c e l   O p e r a t i o n 
 
 
 
 / / 2NLS^\'`
 
 / / S e r i a l   p o r t   e d i t   p r o p e r t i e s 
 
 [ M a i n I D = 7   T y p e = 1 ] 
 
 0 x 0 = ^\'`
 
 0 x 0 = P r o p e r t y 
 
 1 = W,gn
 
 1 = B a s i c   P a r a m e t e r 
 
 2 = s
 
 2 = C o m m u n i c a t i o n   R a t e 
 
 
 
 
 
 / / Q~lbchVn
 
 / / N e t w o r k   C o n v e r t e r   S e t u p 
 
 [ M a i n I D = 8   T y p e = 1 ] 
 
 0 = Q~lbchV
 
 0 = N e t w o r k   C o n v e r t e r 
 
 1 = lbchVRh
 
 1 = C o n v e r t e r   L i s t 
 
 2 = ck(W,g0Wirt@\WQQd"}lbchV
zI{. . . \ n 
 
 2 = S e a r c h i n g   c o n v e r t e r   i n   l o c a l   L A N ,   p l e a s e   w a i t . . . \ n   
 
 3 = d"}[b0\ n 
 
 3 = S e a r c h   c o m p l e t e d . \ n 
 
 4 = d"}ǏzQsN͑ed"}0\ n 
 
 4 = S e a r c h i n g   e r r o r ,   p l e a s e   r e t r y . \ n 
 
 1 0 = ck(WOX[O9e
zI{. . . \ n 
 
 1 0 = S a v i n g   m o d i f i c a t i o n ,   p l e a s e   w a i t . . . \ n 
 
 1 1 = OX[ % s  bR0\ n 
 
 1 1 = S a v e   " % s "   s u c c e s s f u l l y . \ n 
 
 1 2 = OX[ % s  eQsYN\ n 
 
 1 2 = E r r o r   h a p p e n s   w h e n   s a v i n g   " % s " : \ n 
 
 1 3 = OX[[kFOQsN0I{_2 yTMbSNQ!knُNlbchV0\ n 
 
 1 3 = S a v e   c o m p l e t e d ,   b u t   i n   e r r o r .   W a i t   f o r   2 s ,   a n d   r e - s e t u p   t h e s e   c o n v e r t e r s . \ n 
 
 1 4 = *ghKm0R % s  O9ee OX[0\ n 
 
 1 4 = "   % s   "   i s   n o t   m o d i f i e d ,   n o   n e e d   t o   s a v e . \ n 
 
 1 5 = OX[[kI{_2 yTMbSNQ!knُNlbchV0\ n 
 
 1 5 = S a v e   c o m p l e t e d ,   w a i t   f o r   2 s   a n d   r e - s e t u p   t h e s e   c o n v e r t e r s . \ n 
 
 
 
 2 0 0 1 = d"}lbchV
 
 2 0 0 1 = S e a r c h   c o n v e r t e r 
 
 2 0 0 4 = Smd\O
 
 2 0 0 4 = C a n c e l   o p e r a t i o n 
 
 
 
 / / Q~lbchV^\'`
 
 / / N e t w o r k   c o n v e r t e r   e d i t   p r o p e r t i e s 
 
 [ M a i n I D = 9   T y p e = 1 ] 
 
 0 x 0 = ^\'`
 
 0 x 0 = P r o p e r t y 
 
 1 = W,gOo`
 
 1 = B a s i c   P a r a m e t e r 
 
 2 = Y
T
 
 2 = D e v i c e   N a m e 
 
 3 = MOn
 
 3 = P o s i t i o n 
 
 4 = Y{|W
 
 4 = D e v i c e   T y p e 
 
 5 = M A C 0W@W
 
 5 = M A C   A d d r e s s 
 
 6 = Spe
 
 6 = C o m m u n i c a t i o n   P a r a m e t e r 
 
 7 = I P 0W@W
 
 7 = I P   A d d r e s s 
 
 8 = P[Qcx
 
 8 = S u b n e t   M a s k 
 
 9 = ؞QsQ
 
 9 = D e f a u l t   G a t e w a y 
 
 1 0 = Hr,gS
 
 1 0 = V e r s i o n   N o . 
 
 
 
 / / ubLpen
 
 / / P a g e   l i n a g e   s e t u p 
 
 [ M a i n I D = 1 0   T y p e = 1 ] 
 
 0 x 0 = nku>f:yvLpe
 
 0 x 0 = S e t u p   t h e   l i n a g e   f o r   e a c h   p a g e 
 
 1 = S_MRkuLpe
 
 1 = C u r r e n t   l i n a g e   f o r   e a c h   p a g e 
 
 2 = eQeLpe
 
 2 = P l e a s e   i n p u t   n e w   l i n a g e 
 
 3 = c:yYg` (W NuQ>f:y@b	gLpeeQpeW[0 
 
 3 = N o t i c e :   I f   y o u   n e e d   t o   d i s p l a y   a l l   i n f o r m a t i o n   o n   o n e   p a g e ,   p l e a s e   i n p u t   0 . 
 
 1 0 = ,{% d u/ qQ% d u
 
 1 0 = P a g e   % d / % d   P a g e ( s ) 
 
 2 0 1 1 = 7Re,gu
 
 2 0 1 1 = R e f r e s h   T h i s   P a g e 
 
 2 0 1 4 = Smd\O
 
 2 0 1 4 = C a n c e l   O p e r a t i o n 
 
 2 0 1 5 = u
 
 2 0 1 5 = H o m e   P a g e 
 
 2 0 1 6 = 
N Nu
 
 2 0 1 6 = P a g e   U p 
 
 2 0 1 7 = N Nu
 
 2 0 1 7 = P a g e   D o w n 
 
 2 0 1 8 = >\u
 
 2 0 1 8 = E n d   P a g e 
 
 2 0 1 9 = eQc[vux
 
 2 0 1 9 = I n p u t   P a g e   N u m b e r 
 
 2 0 2 0 = l0Rc[u
 
 2 0 2 0 = G o   T o   P a g e 
 
 2 0 2 1 = nkuLpe
 
 2 0 2 1 = S e t u p   n u m b e r   o f   r o w s   f o r   e a c h   p a g e 
 
 2 0 2 2 = [Q:N5uP[h<h
 
 2 0 2 2 = E x p o r t   a s   E x c e l 
 
 2 0 2 3 = RhǏn
 
 2 0 2 3 = L i s t   F i l t e r i n g 
 
 
 
 / / Q~c6RhVI P n
 
 / / N e t w o r k   c o n t r o l l e r   I P   s e t u p 
 
 [ M a i n I D = 1 1   T y p e = 1 ] 
 
 0 = Q~c6RhV
 
 0 = N e t w o r k   c o n t r o l l e r 
 
 1 = Q~c6RhVRh
 
 1 = N e t w o r k   c o n t r o l l e r   l i s t 
 
 2 = ck(W,g0Wirt@\WQQd"}Q~c6RhV
zI{. . . \ n 
 
 2 = S e a r c h i n g   n e t w o r k   c o n t r o l l e r   i n   L A N ,   p l e a s e   w a i t . . . \ n 
 
 3 = d"}[b0\ n 
 
 3 = S e a r c h   c o m p l e t e d . \ n 
 
 4 = d"}ǏzQsN͑ed"}0\ n 
 
 4 = S e a r c h i n g   e r r o r ,   p l e a s e   r e t r y . \ n 
 
 1 0 = ck(WOX[O9e
zI{. . . \ n 
 
 1 0 = S a v i n g   m o d i f i c a t i o n ,   p l e a s e   w a i t . . . \ n 
 
 1 1 = OX[ % s  bR0\ n 
 
 1 1 = S a v e   " % s "   s u c c e s s f u l l y . \ n 
 
 1 2 = OX[ % s  eQsYN\ n 
 
 1 2 = E r r o r   h a p p e n s   w h e n   s a v i n g   " % s " : \ n 
 
 1 3 = OX[[kFOQsN0I{_2 yTMbSNQ!knُNQ~c6RhV0\ n 
 
 1 3 = S a v e   c o m p l e t e d ,   b u t   i n   e r r o r .   W a i t   f o r   2 s ,   a n d   r e - s e t u p   t h e   c o n t r o l l e r s . \ n 
 
 1 4 = *ghKm0R % s  O9ee OX[0\ n 
 
 1 4 = " % s "   i s   n o t   m o d i f i e d ,   n o   n e e d   t o   s a v e . \ n 
 
 1 5 = OX[[kI{_2 yTMbSNQ!knُNQ~c6RhV0\ n 
 
 1 5 = S a v e   c o m p l e t e d ,   w a i t   f o r   2 s   a n d   r e - s e t u p   t h e   c o n t r o l l e r s . \ n 
 
 
 
 2 0 0 1 = d"}Q~c6RhV
 
 2 0 0 1 = S e a r c h   n e t w o r k   c o n t r o l l e r 
 
 2 0 0 4 = Smd\O
 
 2 0 0 4 = C a n c e l   o p e r a t i o n 
 
 
 
 / / SbpSvsQ
 
 / P r i n t 
 
 [ M a i n I D = 1 2   T y p e = 1 ] 
 
 1 = uؚ^*Y\elSbpS0
 
 1 = P a g e   h e i g h t   i n s u f f i c i e n t ,   c a n   n o t   b e   p r i n t e d . 
 
 2 1 = SbpS( & P ) . . . 
 
 2 1 = & P r i n t 
 
 2 2 = N Nu( & N ) 
 
 2 2 = P a g e   & D o w n 
 
 2 3 = MR Nu( & V ) 
 
 2 3 = P a g e   & U p 
 
 2 4 = $Nu( & T ) 
 
 2 4 = & T w o   p a g e s 
 
 2 5 = >e'Y( & I ) 
 
 2 5 = Z o o m   & I n 
 
 2 6 = )\( & O ) 
 
 2 6 = Z o o m   & O u t 
 
 2 7 = sQ( & C ) 
 
 2 7 = & C l o s e 
 
 2 8 =  Nu( & O ) 
 
 2 8 = & O n e   p a g e 
 
 2 9 = ,{% d u\ n ,{% d u- ,{% d u\ n 
 
 2 9 = P a g e   % d \ n P a g e   % d   -   P a g e   % d \ n 
 
 
 
 / / SbpSubn
 
 / / P r i n t   P a g e   S e t u p 
 
 [ M a i n I D = 1 3   T y p e = 1 ] 
 
 0 = ubn
 
 0 = P a g e   S e t u p 
 
 1 = Bgy
 
 1 = M i s c e l l a n e o u s 
 
 2 = SbpSh
 
 2 = P r i n t   T i t l e 
 
 3 = h<he_SbpS
 
 3 = T a b l e   M o d e 
 
 4 = ꁨRR[^
 
 4 = A u t o m a t i c   C o l u m n   W i d t h 
 
 5 = SbpSFh
 
 5 = P r i n t   B o r d e r 
 
 6 = SbpSυR
 
 6 = P r i n t   H i d d e n   C o l u m n 
 
 7 = ݍ
 
 7 = M a r g i n s 
 
 8 = 
Nݍ( m m ) 
 
 8 = T o p   M a r g i n ( m m ) 
 
 9 = Nݍ( m m ) 
 
 9 = B o t t o m   M a r g i n ( m m ) 
 
 1 0 = ]ݍ( m m ) 
 
 1 0 = L e f t   M a r g i n ( m m ) 
 
 1 1 = Sݍ( m m ) 
 
 1 1 = R i g h t   M a r g i n ( m m ) 
 
 1 2 = Q[
 
 1 2 = C o n t e n t 
 
 1 3 = W[SO
 
 1 3 = F o n t 
 
 1 4 = u	w
 
 1 4 = P a g e   H e a d e r 
 
 1 5 = W[SO
 
 1 5 = F o n t 
 
 1 6 = ]h
 
 1 6 = L e f t   H e a d e r 
 
 1 7 = Sh
 
 1 7 = R i g h t   H e a d e r 
 
 1 8 = u
 
 1 8 = P a g e   F o o t e r 
 
 1 9 = W[SO
 
 1 9 = F o n t 
 
 2 0 = SbpSux
 
 2 0 = P r i n t   P a g e   N u m b e r 
 
 2 1 = SbpSeg
 
 2 1 = P r i n t   D a t e 
 
 2 2 = SbpSe
 
 2 2 = P r i n t   T i m e 
 
 2 6 = SbpS:g. . . 
 
 2 6 = P r i n t e r . . . 
 
 
 
 / / [Q5uP[h<h
 
 / / E x p o r t   E x c e l   F i l e 
 
 [ M a i n I D = 1 4   T y p e = 1 ] 
 
 0 = [Q:NE x c e l eN
 
 0 = E x p o r t   a s   E x c e l 
 
 1 = _o5uP[h<heN
 
 1 = M i c r o s o f t   E x c e l 
 
 2 = penc[QbR! 
 
 2 = E x p o r t   d a t a   s u c c e s s f u l l y ! 
 
 3 = 	bE x c e l eN
 
 3 = S e l e c t   E x c e l   F i l e 
 
 4 = penc[Q1Y%
 
 4 = E x p o r t   d a t a   f a i l e d ! 
 
 
 
 / / gagN
 
 / / Q u e r y   C o n d i t i o n 
 
 [ M a i n I D = 1 5   T y p e = 1 ] 
 
 2 0 0 7 = 	cR{|z^
 
 2 0 0 7 = O r d e r   b y   C l a s s i f i c a t i o n 
 
 2 0 0 8 = W[kz^
 
 2 0 0 8 = O r d e r   b y   A l p h a b e t 
 
 2 0 0 3 = Smd\O
 
 2 0 0 3 = C a n c e l   O p e r a t i o n 
 
 2 0 0 4 = g
 
 2 0 0 4 = Q u e r y 
 
 2 0 0 5 = !j|g
 
 2 0 0 5 = F u z z y   Q u e r y 
 
 
 
 / / penc^{t
 
 / / D a t a b a s e   M a n a g e m e n t 
 
 [ M a i n I D = 1 5   T y p e = 1 ] 
 
 0 = penc^{t
 
 0 = D a t a b a s e   M a n a g e m e n t 
 
 1 = YN. . . 
 
 1 = B a c k u p . . . 
 
 2 = [eQ. . . 
 
 2 = I m p o r t . . . 
 
 3 = nd
 
 3 = C l e a r 
 
 4 = tetpenc^
 
 4 = T r i m   D a t a b a s e 
 
 5 = teSOpenc^d\O
 
 5 = D a t a b a s e   O p e r a t i o n 
 
 6 = U_d\O
 
 6 = R e c o r d   O p e r a t i o n 
 
 7 = 	bYNvU_
 
 7 = P l e a s e   s e l e c t   a   b a c k u p   d i r e c t o r y 
 
 8 = YNvU_ % s  ]~X[(W/f&Tv\ n 
 
 8 = B a c k u p   d i r e c t o r y   " % s "   w a s   e x i s t e d ,   d o   y o u   w a n t   t o   c o v e r   i t ? \ n 
 
 9 = R^vU_1Y%elYNpenc^0\ n 
 
 9 = F a i l   t o   s e t   u p   d i r e c t o r y ,   c a n   n o t   b a c k u p   d a t a b a s e . \ n 
 
 1 0 = YNpenc^1Y%0\ n 
 
 1 0 = F a i l   t o   b a c k u p   d a t a b a s e . \ n 
 
 1 1 = penc^YNbR0\ n 
 
 1 1 = D a t a b a s e   b a c k u p   s u c c e s s f u l l y . \ n 
 
 1 2 = ndpenc^\ RdoN(u7bKNYv@b	gpencv^N
NSb`
Y^ۏL,gd\OKNMRYNpenc^0`nx[~~T\ n 
 
 1 2 = C l e a r   d a t a b a s e   w i l l   d e l e t e   a l l   d a t a   a n d   c a n   n o t   r e c o v e r .   I t   i s   a d v i c e d   t o   y o u   b a c k u p   d a t a b a s e   b e f o r e   t h i s   o p e r a t i o n .   A r e   y o u   s u r e   t o   c o n t i n u e ? \ n 
 
 1 3 = ndpenc^1Y%0\ n 
 
 1 3 = F a i l   t o   c l e a r   d a t a b a s e .   \ n 
 
 1 4 = ndpenc^bR0\ n 
 
 1 4 = C l e a r   d a t a b a s e   s u c c e s s f u l l y .   \ n 
 
 1 5 = [eQepenc^\[s	g@b	gpenc"N1Yv^N
NSb`
Y^ۏL,gd\OKNMRYNpenc^0`nx[~~T\ n 
 
 1 5 = A f t e r   i m p o r t   d a t a b a s e ,   e x i s t e d   d a t a b a s e   w i l l   b e   l o s t   a n d   c a n   n o t   r e c o v e r .   I t   i s   a d v i c e d   t o   b a c k u p   e x i s t e d   d a t a b a s e   b e f o r e   t h i s   o p e r a t i o n .   A r e   y o u   s u r e   t o   c o n t i n u e ? \ n 
 
 1 6 = epenc^[eQbRoN\͑e/TR0\ n 
 
 1 6 = N e w   d a t a b a s e   i s   i m p o r t e d   s u c c e s s f u l l y ,   s o f t w a r e   w i l l   r e s t a r t .   \ n 
 
 1 7 = [eQpenc^1Y%0\ n 
 
 1 7 = F a i l   t o   i m p o r t   d a t a b a s e .   \ n 
 
 1 8 = (Wc[vU_~b
N0Rpenc^eN0\ n 
 
 1 8 = C a n   n o t   f i n d   d a t a b a s e   f i l e   i n   a p p o i n t e d   d i r e c t o r y .   \ n 
 
 1 9 = 	b[eQpenc^@b(WvvU_
 
 1 9 = S e l e c t   d i r e c t o r y   i n c l u d e d   b a c k u p 
 
 2 0 = U_ndT\elb`
Y^ۏL,gd\OKNMRYNpenc^0`nx[~~T\ n 
 
 2 0 = A f t e r   r e c o r d     c l e a r e d ,   i t   c a n   n o t   r e c o v e r .   I t   i s   a d v i c e d   t o   b a c k u p   d a t a b a s e   b e f o r e   t h i s   o p e r a t i o n .   A r e   y o u   s u r e   t o   c o n t i n u e ? \ n 
 
 2 1 = 	b\ N*NNN{|W0\ n 
 
 2 1 = P l e a s e   s e l e c t   a n   e v e n t   t y p e   a t   l e a s t .   \ n 
 
 2 2 = ndU_1Y%0\ n 
 
 2 2 = F a i l   t o   c l e a r   r e c o r d . \ n 
 
 2 3 = ndU_bR0\ n 
 
 2 3 = T o   c l e a r   r e c o r d   s u c c e s s f u l l y .   \ n 
 
 3 0 = eV
 
 3 0 = T i m e   R a n g e 
 
 3 1 = @b	ge
 
 3 1 = A l l   T i m e 
 
 3 2 = wYe
 
 3 2 = S t a r t i n g   T i m e 
 
 3 3 = ~bke
 
 3 3 = E n d   T i m e 
 
 4 0 = U_{|W
 
 4 0 = R e c o r d   T y p e 
 
 4 1 = e_
 
 4 1 = L o g 
 
 4 2 = NNU_
 
 4 2 = E v e n t   R e c o r d 
 
 4 3 = bfU_
 
 4 3 = A l a r m   R e c o r d 
 
 4 4 = [evcU_
 
 4 4 = R e a l - t i m e   M o n i t o r   R e c o r d 
 
 4 5 = [ebfU_
 
 4 5 = R e a l - t i m e   A l a r m   R e c o r d 
 
 4 6 = 7RaSU_
 
 4 6 = C a r d   P r e s e n t   R e c o r d 
 
 4 7 = R{U_
 
 4 7 = A t t e n d a n c e   C o u n t   R e c o r d 
 
 5 0 = penc^YN
 
 5 0 = D a t a b a s e   B a c k u p 
 
 5 1 = `/f&T YNpenc^
 
 5 1 = D o   y o u   n e e d   t o   b a c k u p   t h e   d a t a b a s e ?   
 
 5 2 = S_MRYNvU_\ n 
 
 5 2 = D i r e c t o r y   f o r   b a c k u p : \ n 
 
 5 3 = 	bYNvU_. . . 
 
 5 3 = S e l e c t   D i r e c t o r y . . . 
 
 5 4 = `؏*gn؞vYNvU_HQ	b N*NvU_TQۏLYN0
 
 5 4 = Y o u   d o   n o t   s e t   t h e   d i r e c t o r y   f o r   b a c k u p .   P l e a s e   s e l e c t   a   d i r e c t o r y . 
 
 
 
 / / 	y
 
 [ M a i n I D = 1 6   T y p e = 1 ] 
 
 0 = 	y
 
 0 = O p t i o n s 
 
 1 = ꁨR
N O
 
 1 = R e c o r d   D o w n l o a d 
 
 2 = NNU_
 
 2 = E v e n t   R e c o r d 
 
 3 = bfU_
 
 3 = A l a r m   R e c o r d 
 
 4 = 
NꁨR
N O
 
 4 = D i s a b l e   D o w n l o a d   A u t o m a t i c a l l y 
 
 5 = /TRoNꁨR
N O
 
 5 = S t a r t   S o f t w a r e   D o w n l o a d   A u t o m a t i c a l l y 
 
 6 = DRNXTOo`
 
 6 = A d d i t i o n a l   E m p l o y e e   I n f o r m a t i o n 
 
 7 = DROo`% d 
Ty
 
 7 = A d d i t i o n a l   I n f o r m a t i o n   % d   n a m e 
 
 8 = DROo`% d 
 
 8 = A d d i t i o n a l   i n f o r m a t i o n   % d 
 
 9 = Sb _	y[݋FheQsYN\ n 
 
 9 = W h e n   o p e n   o p t i o n s   d i a l o g   w i n d o w ,   f o l l o i n g   e r r o r   h a p p e n s :   \ n 
 
 1 0 = OX[	yeQsYNR	y*gbROX[0\ n 
 
 1 0 = W h e n   s a v e   o p t i o n s ,   f o l l o w i n g   e r r o r   h a p p e n s ,   p a r t s   o f   o p t i o n s   a r e   s a v e d   u n s u c c e s s f u l l y . \ n 
 
 1 1 = hQ@\2\on
 
 1 1 = G l o b a l   A n t i - p a s s b a c k 
 
 1 2 = 2\oQ~cS
 
 1 2 = N e t w o r k   I n t e r f a c e 
 
 1 3 = 2\ozS
 
 1 3 = S e r v i c e   P o r t 
 
 1 4 = vQ[
 
 1 4 = O t h e r s 
 
 1 5 = aSSQ<h_
 
 1 5 = F o r m a t   o f   C a r d   N o . 
 
 1 6 = tepe
 
 1 6 = I n t e g e r 
 
 1 7 = SS  aSS
 
 1 7 = F a c t o r y I D   C a r d I D 
 
 
 
 2 0 = ꁨR
N O{|+R
 
 2 0 = A u t o   D o w n l o a d   I n t e r v a l   T y p e 
 
 2 1 = k N[e
N O
 
 2 1 = D o w n l o a d   E v e r y   S o m e   T i m e 
 
 2 2 = k)Y
N O N!k
 
 2 2 = D o w n l o a d   E v e r y   D a y   A u t o 
 
 2 3 = khT
N O N!k
 
 2 3 = D o w n l o a d   E v e r y   W e e k   A u t o 
 
 2 4 = kg
N O N!k
 
 2 4 = D o w n l o a d   E v e r y   M o n t h   A u t o 
 
 2 5 = 
N O( R) 
 
 2 5 = D o w n l o a d   I n t e r v a l ( m i n u t e s ) 
 
 2 6 = 
N Oe
 
 2 6 = D o w n l o a d   D a y   o f   M o n t h 
 
 2 7 = 
N Ofg
 
 2 7 = D o w n l o a d   D a y   o f   W e e k 
 
 2 8 = 
N Oe
 
 2 8 = D o w n l o a d   T i m e 
 
 
 
 3 0 = ck(WꁨR
N OU_. . . 
 
 3 0 = D o w n l o a d i n g   r e c o r d s . . . 
 
 3 1 = U_ꁨR
N O~_g
 
 3 2 = D o w n l o a d i n g   r e c o r d s   i s   c o m p l e t e d 
 
 
 
 / / penc^GS~
 
 [ M a i n I D = 1 7   T y p e = 1 ] 
 
 0 = elƋ+Rvpenc^Hr,gz^elck8^ЏL0,goN % s Hr,gvpenc^0N`voNO^FUT|0
 
 0 = T h e   v e r s i o n   o f   d a t a b a s e   c a n   n o t   b e   r e c o g n i z e d .   T h e   s o f t w a r e   c a n   n o t   r u n .   T h i s   s o f t w a r e   n e e d   d a t a b a s e   o f   v e r s i o n   % s .   P l e a s e   c o n t a c t   w i t h   y o u r   s o f t w a r e   s u p p l i e r . 
 
 1 = ,goN % s Hr,gvpenc^0`vpenc^N,goN
N9SM`/f&T[vQۏLGS~Yg
NۏLGS~oN\elЏL0
 
 1 = T h i s   s o f t w a r e   n e e d   d a t a b a s e   o f   v e r s i o n   % s .   Y o u r   d a t a b a s e   n e e d   t o   u p d a t e ,   d o   y o u   w a n t   t o   u p d a t e ?   T h e   s o f t w a r e   c a n   n o t   r u n   i f   y o u   d o   n o t   u p d a t e . 
 
 2 = ck(Wg~b9SMvpenc^GS~z^. . . 
 
 2 = L o o k i n g   f o r   s u i t a b l e   u p d a t e   p r o g r a m   f o r   d a t a b a s e . . . 
 
 3 = ck(W\penc^N% s Hr,gGS~% s Hr,g
zI{. . . 
 
 3 = U p d a t i n g   t h e   d a t a b a s e   f r o m   v e r s i o n   % s   t o   v e r s i o n   % s ,   p l e a s e   w a i t . . . 
 
 4 = \penc^N% s Hr,gGS~% s Hr,gQsN0z^elck8^ЏL0N`voNO^FUT|0
 
 4 = F a i l e d   i n   u p d a t i n g   d a t a b s e   f r o m   v e r s i o n   % s   t o   v e r s i o n   % s .   T h e   s o f t w a r e   c a n   n o t   r u n .   P l e a s e   c o n t a c t   w i t h   y o u r   s o f t w a r e   s u p p l i e r . 
 
 5 = ,goN
N/ec% s Hr,gvpenc^0z^elck8^ЏL0N`voNO^FUT|0
 
 5 = T h i s   s o f t w a r e   c a n   n o t   s u p p o r t   d a t a b a s e   o f   v e r s i o n   % s .   T h e   s o f t w a r e   c a n   n o t   r u n .   P l e a s e   c o n t a c t   w i t h   y o u r   s o f t w a r e   s u p p l i e r . 
 
 
 
 
 
 / / * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * 
 
 / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / 
 
 / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / 
 
 / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / 
 
 / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / 
 
 / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / 
 
 / / * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * 
 
 / / 蕁yP[|~W[&{2N
 
 / / * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * 
 
 / / * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * 
 
 / / ܃US
 
 / / M e n u 
 
 / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / 
 
 / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / 
 
 / / ;N܃USI D R _ M A I N 
 
 / / M a i n   M e n u   I D R _ M A I N 
 
 / / M a i n   M e n u ;N܃USI D R _ M A I N 
 
 [ M a i n I D = 0 x D 0 0 0 1 7 7 0   T y p e = 2 ] 
 
 0 x 8 0 0 0 0 0 0 1 = n( & E ) 
 
 0 x 8 0 0 0 0 0 0 1 = S & e t u p 
 
 0 x d e 0 0 = ŏn
 
 0 x d e 0 0 = C o m m u n i c a t i o n   S e t u p 
 
 0 x d e 0 1 = 2NLS( & S ) 
 
 0 x d e 0 1 = & S e r i a l   P o r t 
 
 0 x d e 0 2 = lbchV( & R ) 
 
 0 x d e 0 2 = & C o n v e r t e r 
 
 0 x d e 0 3 = Q~c6RhV( & N ) 
 
 0 x d e 0 3 = & N e t w o r k   C o n t r o l l e r 
 
 0 x d e 0 5 = hTR( & W ) 
 
 0 x d e 0 5 = & W e e k   S c h e d u l e 
 
 0 x d e 0 6 = GPeR( & H ) 
 
 0 x d e 0 6 = & H o l i d a y   S c h e d u l e 
 
 0 x d e 0 7 = lxNn
 
 0 x d e 0 7 = H a r d w a r e   S e t u p 
 
 0 x d e 0 8 = c6RhV( & C ) 
 
 0 x d e 0 8 = & C o n t r o l l e r 
 
 0 x d e 0 9 = bf( & A ) 
 
 0 x d e 0 9 = & A l a r m 
 
 0 x d e 0 a = S( & G ) 
 
 0 x d e 0 a = & D o o r 
 
 0 x d e 0 b = NXTn
 
 0 x d e 0 b = E m p l o y e e   S e t u p 
 
 0 x d e 0 c = LCgP~( & P ) 
 
 0 x d e 0 c = A c c e s s   G r o u & p 
 
 0 x d e 0 d = aS( & D ) 
 
 0 x d e 0 d = C a r & d 
 
 0 x d e 0 e = ( & T ) 
 
 0 x d e 0 e = D e p a r & t m e n t 
 
 0 x d e 0 f = NXT( & E ) 
 
 0 x d e 0 f = & E m p l o y e e 
 
 0 x d e 1 0 = vQ[
 
 0 x d e 1 0 = O t h e r s 
 
 0 x d e 1 1 = nN}( & L ) 
 
 0 x d e 1 1 = S e t u p   & U p l o a d 
 
 0 x d e 1 2 = NNU_
N O( & U ) 
 
 0 x d e 1 2 = E v e n t   R e c o r d   D & o w n l o a d 
 
 0 x d e 1 3 = bfU_
N O( & O ) 
 
 0 x d e 1 3 = A l a r & m   R e c o r d   D o w n l o a d 
 
 0 x d e 1 4 = hQ@\2\o( & B ) 
 
 0 x d e 1 4 = G l o b a l   A n t i - p a s s & b a c k 
 
 0 x d e 1 5 = 5uh( & I ) 
 
 0 x d e 1 5 = E l e & v a t o r 
 
 0 x d e 1 6 = N8Ƌ+RN( & F ) 
 
 0 x d e 1 6 = & F a c e   R e c o g n i t i o n   D e v i c e 
 
 0 x d e 1 7 = N8ǑƖ( & I ) 
 
 0 x d e 1 7 = F a c e   C o l l e c t & i o n 
 
 0 x d e 1 8 = c~ NSO:g( & R ) 
 
 0 x d e 1 8 = F i n g e r p & r i n t   d e v i c e 
 
 0 x d e 1 9 = c~ǑƖ( & N ) 
 
 0 x d e 1 9 = F i n g e r p r i n t   C o l l e c t i o & n 
 
 
 
 0 x 8 0 0 0 0 0 0 2 = vc( & M ) 
 
 0 x 8 0 0 0 0 0 0 2 = & M o n i t o r 
 
 0 x d e 1 e = !j_( & E ) 
 
 0 x d e 1 e = E d & i t   M o d e 
 
 0 x d e 1 f = 0WVvc( & M ) 
 
 0 x d e 1 f = & M a p   M o n i t o r i n g 
 
 0 x d e 2 0 = ~Tvc( & V ) 
 
 0 x d e 2 0 = & V i d e o   M o n i t o r i n g 
 
 0 x d e 2 1 = Rhvc( & L ) 
 
 0 x d e 2 1 = & L i s t   M o n i t o r i n g 
 
 
 
 0 x 8 0 0 0 0 0 0 3 = g( & Q ) 
 
 0 x 8 0 0 0 0 0 0 3 = & Q u e r y 
 
 0 x d e 2 9 = c6RhVOo`( & C ) 
 
 0 x d e 2 9 = & C o n t r o l l e r   I n f o r m a t i o n 
 
 0 x d e 2 a = SOo`( & D ) 
 
 0 x d e 2 a = & D o o r   I n f o r m a t i o n 
 
 0 x d e 2 b = NXTOo`( & E ) 
 
 0 x d e 2 b = & E m p l o y e e   I n f o r m a t i o n 
 
 0 x d e 2 c = aSOo`( & A ) 
 
 0 x d e 2 c = C & a r d   I n f o r m a t i o n 
 
 0 x d e 2 d = NNU_( & V ) 
 
 0 x d e 2 d = E & v e n t   R e c o r d 
 
 0 x d e 2 e = bfU_( & L ) 
 
 0 x d e 2 e = A & l a r m   R e c o r d 
 
 0 x d e 2 f = [evcNN( & R ) 
 
 0 x d e 2 f = & R e a l - t i m e   M o n i t o r   E v e n t 
 
 0 x d e 3 0 = [evcbf( & T ) 
 
 0 x d e 3 0 = R e a l - & t i m e   M o n i t o r   A l a r m 
 
 0 x d e 3 1 = |~e_( & G ) 
 
 0 x d e 3 1 = S y s t e m   L o & g 
 
 0 x d e 3 2 = SLSOo`( & O ) 
 
 0 x d e 3 2 = D & o o r   o f   E m p l o y e e   I n f o r m a t i o n 
 
 0 x d e 3 3 = SLNXTOo`( & M ) 
 
 0 x d e 3 3 = E & m p l o y e e   o f   D o o r   I n f o r m a t i o n 
 
 
 
 / / c6RhVn܃US
 
 / / C o n t r o l l e r   S e t u p   M e n u 
 
 [ M a i n I D = 0 x D 0 0 0 1 7 7 1   T y p e = 2 ] 
 
 3 2 7 8 5 = 	b@b	g( & S ) 
 
 3 2 7 8 5 = & S e l e c t   a l l 
 
 3 2 7 8 6 = Sl	b( & V ) 
 
 3 2 7 8 6 = R e & v e r s e d   S e l e c t 
 
 3 2 7 8 7 = XRc6RhV( & A ) 
 
 3 2 7 8 7 = & A d d   C o n t r o l l e r 
 
 3 2 7 8 8 =  Rdc6RhV( & D ) 
 
 3 2 7 8 8 = & D e l e t e   C o n t r o l l e r 
 
 3 2 7 8 9 = g~bc6RhV( & F ) 
 
 3 2 7 8 9 = S & e a r c h   C o n t r o l l e r 
 
 3 2 7 9 5 = hKmc6RhV( & E ) 
 
 3 2 7 9 5 = D e & t e c t   C o n t r o l l e r 
 
 3 2 7 9 0 = /TRzfN}( & L ) 
 
 3 2 7 9 0 = S t a r t   S m a r t   D o w n l & o a d 
 
 3 2 7 9 1 = RYSc6RhV( & I ) 
 
 3 2 7 9 1 = & I n i t i a l i z e   C o n t r o l l e r 
 
 3 2 7 9 2 = !hQe( & M ) 
 
 3 2 7 9 2 = A d j u s t   T i & m e 
 
 3 2 7 9 3 = SS_MRe( & T ) 
 
 3 2 7 9 3 = A c q u i r e   & C u r r e n t   T i m e 
 
 3 2 8 6 2 = f9ec6RhV[x( & C ) 
 
 3 2 8 6 2 = & C h a n g e   C o n t r o l l e r   P a s s w o r d   
 
 3 2 8 6 3 = !hQ[x( & J ) 
 
 3 2 8 6 3 = A d & j u s t   C o m m u n i c a t i o n   P a s s w o r d 
 
 3 2 8 6 4 = !hQ@b	gc6RhV[x( & P ) 
 
 3 2 8 6 4 = A d j u s t   A l l   C o n t r o l l e r   C o m m u n i c a t i o n   & P a s s w o r d s 
 
 3 2 8 8 4 = ꁨRmRc6RhV( & O ) 
 
 3 2 8 8 4 = A d d   C o n t r o l l e r   A u t o m a t i c a l l y 
 
 
 
 / / hTRn܃US
 
 / / W e e k   S c h e d u l e   S e t u p   M e n u 
 
 [ M a i n I D = 0 x D 0 0 0 1 7 7 2   T y p e = 2 ] 
 
 3 2 7 8 5 = 	b@b	g( & S ) 
 
 3 2 7 8 5 = & S e l e c t   A l l   
 
 3 2 7 8 6 = Sl	b( & V ) 
 
 3 2 7 8 6 = & R e v e r s e d   S e l e c t   
 
 3 2 7 8 7 = XR(uhTR( & A ) 
 
 3 2 7 8 7 = & A d d   C o m m o n   W e e k   S c h e d u l e 
 
 3 2 8 5 8 = XRN(uhTR( & P ) 
 
 3 2 8 5 8 = A d d   S & p e c i a l   W e e k   S c h e d u l e 
 
 3 2 7 8 8 =  RdhTR( & D ) 
 
 3 2 7 8 8 = & D e l e t e   W e e k   S c h e d u l e 
 
 3 2 7 9 0 = /TRzfN}( & L ) 
 
 3 2 7 9 0 = S t a r t   S m a r t   D o w n & l o a d 
 
 
 
 / / GPeRn܃US
 
 / / H o l i d a y   S c h e d u l e   S e t u p   M e n u   
 
 [ M a i n I D = 0 x D 0 0 0 1 7 7 3   T y p e = 2 ] 
 
 3 2 7 8 5 = 	b@b	g( & S ) 
 
 3 2 7 8 5 = & S e l e c t   A l l 
 
 3 2 7 8 6 = Sl	b( & V ) 
 
 3 2 7 8 6 = & R e v e r s e d   S e l e c t 
 
 3 2 7 8 7 = XR(uGPeR( & A ) 
 
 3 2 7 8 7 = & A d d   C o m m o n   H o l i d a y   S c h e d u l e 
 
 3 2 8 5 8 = XRN(uGPeR( & P ) 
 
 3 2 8 5 8 = A d d   S & p e c i a l   H o l i d a y   S c h e d u l e 
 
 3 2 7 8 8 =  RdGPeR( & D ) 
 
 3 2 7 8 8 = & D e l e t e   H o l i d a y   S c h e d u l e 
 
 3 2 7 9 0 = /TRzfN}( & L ) 
 
 3 2 7 9 0 = S t a r t   S m a r t   D o w n & l o a d 
 
 
 
 / / GPeRfgnb܃US
 
 / / H o l i d a y   S c h e d u l e   w e e k   s e t u p   c o p y   m e n u 
 
 [ M a i n I D = 0 x D 0 0 0 1 7 7 4   T y p e = 2 ] 
 
 3 2 7 9 6 = 
Y6R0RMR N)Y( & P ) 
 
 3 2 7 9 6 = C o p y   t o   & L a s t   d a y 
 
 3 2 7 9 7 = 
Y6R0RT N)Y( & N ) 
 
 3 2 7 9 7 = C o p y   t o   & n e x t   D a y 
 
 3 2 7 9 8 = 
Y6R0R@b	g)Y( & A ) 
 
 3 2 7 9 8 = C o p y   t o   & A l l   D a y s 
 
 
 
 / / bfn܃US
 
 / / A l a r m   S e t u p   M e n u 
 
 [ M a i n I D = 0 x D 0 0 0 1 7 7 5   T y p e = 2 ] 
 
 3 2 7 8 5 = 	b@b	g( & S ) 
 
 3 2 7 8 5 = & S e l e c t   A l l 
 
 3 2 7 8 6 = Sl	b( & V ) 
 
 3 2 7 8 6 = & R e v e r s e d   S e l e c t 
 
 3 2 7 9 9 = dbf( & R ) 
 
 3 2 7 9 9 = R e l i e v e   & A l a r m 
 
 3 2 7 9 0 = /TRzfN}( & L ) 
 
 3 2 7 9 0 = S t a r t   S m a r t   D o w n & l o a d 
 
 3 2 8 4 1 = ^2( & G ) 
 
 3 2 8 4 1 = A & c t i v a t e   S e c u r i t y 
 
 3 2 8 4 2 = d2( & U ) 
 
 3 2 8 4 2 = & D i s m i s s   S e c u r i t y 
 
 
 
 / / Sn܃US
 
 / / D o o r   S e t u p   M e n u 
 
 [ M a i n I D = 0 x D 0 0 0 1 7 7 6   T y p e = 2 ] 
 
 3 2 7 8 5 = 	b@b	g( & S ) 
 
 3 2 7 8 5 = & S e l e c t   A l l 
 
 3 2 7 8 6 = Sl	b( & V ) 
 
 3 2 7 8 6 = & R e v e r s e d   S e l e c t 
 
 3 2 7 9 0 = /TRzfN}( & L ) 
 
 3 2 7 9 0 = S t a r t   S m a r t   D o w n & l o a d 
 
 3 2 8 2 6 = :_6RSb _( & O ) 
 
 3 2 8 2 6 = & F o r c e   O p e n 
 
 3 2 8 2 7 = :_6RsQ( & C ) 
 
 3 2 8 2 7 = F o r c e   C l & o s e 
 
 3 2 8 2 8 = Sm:_6Rr`( & A ) 
 
 3 2 8 2 8 = & C a n c e l   F o r c e   S t a t e 
 
 3 2 8 7 2 =  _( & P ) 
 
 3 2 8 7 2 = O & p e n   D o o r 
 
 3 2 8 7 3 = sQ( & E ) 
 
 3 2 8 7 3 = C l o s & e   D o o r 
 
 3 2 8 7 4 = sQ핥bfc6RhVQ( & T ) 
 
 3 2 8 7 4 = C l o s e   O u & t p u t   o f   A l a r m   C o n t r o l l e r 
 
 3 2 8 7 9 = Sm@b	g蕄v:_6Rr`
 
 3 2 8 7 9 = C a n c e l   A l l   D o o r s   F o r c e   S t a t e 
 
 3 2 8 8 0 = Sb _@b	g
 
 3 2 8 8 0 = O p e n   A l l   D o o r s 
 
 3 2 8 8 1 = :_6RSb _@b	g
 
 3 2 8 8 1 = F o r c e   O p e n   A l l   D o o r s 
 
 3 2 8 8 2 = :_6RsQ@b	g
 
 3 2 8 8 2 = F o r c e   C l o s e   A l l   D o o r s 
 
 3 2 8 8 9 = cMR5 yV>e
 
 3 2 8 8 9 = 5   S e c o n d s   a h e a d   t o   P l a y b a c k 
 
 3 2 8 9 1 = c[eV>e
 
 3 2 8 9 1 = S p e c i f i e d   T i m e   t o   P l a y b a c k 
 
 3 2 8 9 3 = S gяLU_
 
 3 2 8 9 3 = G e t   L a t e s t   A c c e s s   R e c o r d s 
 
 3 2 8 9 5 = >f:yƉ
 
 3 2 8 9 5 = P o p u p   V i d e o 
 
 
 
 / / LCgP~
 
 / / A c c e s s   G r o u p 
 
 [ M a i n I D = 0 x D 0 0 0 1 7 7 7   T y p e = 2 ] 
 
 3 2 7 8 5 = 	b@b	g( & S ) 
 
 3 2 7 8 5 = & S e l e c t   A L L 
 
 3 2 7 8 6 = Sl	b( & V ) 
 
 3 2 7 8 6 = & R e v e r s e d   S e l e c t 
 
 3 2 7 8 7 = XRLCgP~( & A ) 
 
 3 2 7 8 7 = & A d d   A c c e s s   G r o u p 
 
 3 2 7 8 8 =  RdLCgP~( & D ) 
 
 3 2 7 8 8 = & D e l e t e   A c c e s s   G r o u p 
 
 3 2 7 9 0 = /TRzfN}( & L ) 
 
 3 2 7 9 0 = S t a r t   S m a r t   D o w n & l o a d 
 
 
 
 3 2 9 0 0 = 
Y6R^\'`( & C ) 
 
 3 2 9 0 0 = & C o p y   P r o p e r t i e s 
 
 3 2 9 0 1 = |4^\'`( & P ) 
 
 3 2 9 0 1 = & P a s t e   P r o p e r t i e s 
 
 
 
 / / LCgP~Lnb܃US
 
 / / A c c e s s   g r o u p   a c c e s s   s e t u p   c o p y   m e n u 
 
 [ M a i n I D = 0 x D 0 0 0 1 7 7 8   T y p e = 2 ] 
 
 3 2 7 9 6 = 
Y6R0RMR N4Y( & P ) 
 
 3 2 7 9 6 = C o p y   t o   & l a s t   r e a d e r 
 
 3 2 7 9 7 = 
Y6R0RT N4Y( & N ) 
 
 3 2 7 9 7 = C o p y   t o   & n e x t   r e a d e r 
 
 3 2 7 9 8 = 
Y6R0R@b	g4Y( & A ) 
 
 3 2 7 9 8 = C o p y   t o   & a l l   r e a d e r s 
 
 3 2 8 3 1 = 
Y6R0R@b	gAQ4Y( & C ) 
 
 3 2 8 3 1 = & C o p y   t o   a l l   p e r m i t   a c c e s s   r e a d e r s     
 
 
 
 
 
 / / 蕾n܃US
 
 / / D e p a r t m e n t   S e t u p   M e n u 
 
 [ M a i n I D = 0 x D 0 0 0 1 7 7 9   T y p e = 2 ] 
 
 3 2 7 8 5 = 	b@b	g( & S ) 
 
 3 2 7 8 5 = & S e l e c t   A L L 
 
 3 2 7 8 6 = Sl	b( & V ) 
 
 3 2 7 8 6 = & R e v e r s e d   S e l e c t 
 
 3 2 7 8 7 = XR( & A ) 
 
 3 2 7 8 7 = & A d d   D e p a r t m e n t 
 
 3 2 7 8 8 =  Rd( & D ) 
 
 3 2 7 8 8 = & D e l e t e   D e p a r t m e n t 
 
 
 
 / / aSn܃US
 
 / / C a r d   S e t u p   M e n u 
 
 [ M a i n I D = 0 x D 0 0 0 1 7 7 A   T y p e = 2 ] 
 
 3 2 7 8 5 = 	b@b	g( & S ) 
 
 3 2 7 8 5 = & S e l e c t   A L L 
 
 3 2 7 8 6 = Sl	b( & V ) 
 
 3 2 7 8 6 = & R e v e r s e d   S e l e c t 
 
 3 2 7 8 7 = c6RhVRaS( & C ) 
 
 3 2 7 8 7 = C o n & t r o l l e r   A d d   C a r d 
 
 3 2 7 8 8 = SaShVRaS( & D ) 
 
 3 2 7 8 8 = & C a r d   D i s t r i b u t o r   A d d   C a r d 
 
 3 2 7 8 9 = KbRRaS( & F ) 
 
 3 2 7 8 9 = & A d d   C a r d   M a n u a l l y 
 
 3 2 7 9 5 =  RdaS( & E ) 
 
 3 2 7 9 5 = & D e l e t e   C a r d 
 
 3 2 7 9 0 = c1YaS( & L ) 
 
 3 2 7 9 0 = R e p o r t   & L o s s   c a r d 
 
 3 2 7 9 1 = c]c1YaS( & U ) 
 
 3 2 7 9 1 = R e l i e & v e   t h e   R e p o r t e d   L o s t   C a r d 
 
 
 
 / / NXTn܃US
 
 / / E m p l o y e e   S e t u p   M e n u 
 
 [ M a i n I D = 0 x D 0 0 0 1 7 7 B   T y p e = 2 ] 
 
 3 2 7 8 5 = 	b@b	g( & S ) 
 
 3 2 7 8 5 = & S e l e c t   A L L 
 
 3 2 7 8 6 = Sl	b( & V ) 
 
 3 2 7 8 6 = & R e v e r s e d   S e l e c t 
 
 3 2 7 8 7 = XRNXT( & A ) 
 
 3 2 7 8 7 = & A d d   E m p l o y e e 
 
 3 2 7 8 8 =  RdNXT( & D ) 
 
 3 2 7 8 8 = & D e l e t e   E m p l o y e e 
 
 3 2 7 8 9 = [eQNXT( & I ) . . . 
 
 3 2 7 8 9 = & I m p o r t   E m p l o y e e . . . 
 
 3 2 7 9 0 = /TRzfN}( & L ) 
 
 3 2 7 9 0 = S t a r t   t o   S m a r t   D o w n & l o a d 
 
 3 2 8 8 5 = yL( & L ) 
 
 3 2 8 8 5 = & E m p l o y e e   L e f t 
 
 3 2 8 8 7 = 
YL( & R ) 
 
 3 2 8 8 7 = E & m p l o y e e   R e i n s t a t e d 
 
 
 
 / / NXTgqGr܃US
 
 / / E m p l o y e e   P h o t o   M e n u 
 
 [ M a i n I D = 0 x D 0 0 0 1 7 7 C   T y p e = 2 ] 
 
 3 2 8 3 7 = [eQgqGreN( & I ) 
 
 3 2 8 3 7 = & I m p o r t   P h o t o   F i l e 
 
 3 2 8 3 8 = ndgqGr( & C ) 
 
 3 2 8 3 8 = & C l e a r   P h o t o 
 
 
 
 / / nN}n܃US
 
 / / S e t u p   U p l o a d   S e t u p   M e n u 
 
 [ M a i n I D = 0 x D 0 0 0 1 7 7 D   T y p e = 2 ] 
 
 3 2 7 8 5 = 	b@b	g( & S ) 
 
 3 2 7 8 5 = & S e l e c t   A l l 
 
 3 2 7 8 6 = Sl	b( & V ) 
 
 3 2 7 8 6 = & R e v e r s e d   S e l e c t 
 
 3 2 7 9 0 = N}n( & C ) 
 
 3 2 7 9 0 = & U p l o a d   S e t u p 
 
 3 2 8 6 0 = /TRzfN}( & L ) 
 
 3 2 8 6 0 = S t a r t   & S m a r t   U p l o a d 
 
 3 2 8 4 5 = /TRhQbN}( & D ) 
 
 3 2 8 4 5 = S t a r t   U p l o a d   & A l l 
 
 
 
 / / U_
N On܃US
 
 / / R e c o r d   D o w n l o a d   S e t u p   M e n u 
 
 [ M a i n I D = 0 x D 0 0 0 1 7 7 E   T y p e = 2 ] 
 
 3 2 7 8 5 = 	b@b	g( & S ) 
 
 3 2 7 8 5 = & S e l e c t   A l l 
 
 3 2 7 8 6 = Sl	b( & V ) 
 
 3 2 7 8 6 = & R e v e r s e d   S e l e c t 
 
 3 2 8 4 5 = hQb
N OU_( & A ) 
 
 3 2 8 4 5 = & F u l l y   D o w n l o a d   R e c o r d 
 
 3 2 7 9 0 = 
N OU_( & D ) 
 
 3 2 7 9 0 = & D o w n l o a d   R e c o r d 
 
 
 
 / / c6RhVn܃US
 
 / / C o n t r o l l e r   S e t u p   M e n u 
 
 [ M a i n I D = 0 x D 0 0 0 1 7 7 F   T y p e = 2 ] 
 
 3 2 8 4 6 = e0WV( & N ) 
 
 3 2 8 4 6 = & N e w   M a p   
 
 3 2 8 4 7 = Sb _0WV( & O ) . . . 
 
 3 2 8 4 7 = & O p e n   M a p 
 
 3 2 8 4 8 = OX[( & S ) . . . 
 
 3 2 8 4 8 = & S a v e 
 
 3 2 8 4 9 = SX[:N( & A ) . . . 
 
 3 2 8 4 9 = S & a v e   a s 
 
 3 2 8 5 0 =  RdS_MR0WV( & D ) 
 
 3 2 8 5 0 = & D e l e t e   c u r r e n t   m a p 
 
 
 
 / / ƉRh܃US
 
 / / V i d e o   L i s t   M e n u 
 
 [ M a i n I D = 0 x D 0 0 0 1 7 8 0   T y p e = 2 ] 
 
 3 2 8 5 1 =  Rd@b	gsQT
 
 3 2 8 5 1 = D e l e t e   a l l   l i n k s 
 
 3 2 8 5 2 =  Rd
 
 3 2 8 5 2 = D e l e t e 
 
 3 2 8 5 9 = /T(uwm^D V R / N V R !j_
 
 3 2 8 5 9 = S t a r t   H I K V I S I O N   D V R / N V R   M o d e 
 
 3 2 8 6 0 = nD V R / N V R Spe
 
 3 2 8 6 0 = S e t u p   D V R / N V R   P a r a m e t e r 
 
 3 2 8 6 1 = /T(uS)aS!j_
 
 3 2 8 6 1 = S t a r t   C o m p r e s s i o n   C a r d   M o d e 
 
 3 2 8 6 7 = /T(u'YNSD V R / N V R !j_
 
 3 2 8 6 7 = S t a r t   D A H U A   D V R / N V R   M o d e 
 
 3 2 8 6 9 = /T(uT~D V R !j_
 
 3 2 8 6 9 = S t a r t   T V T   D V R   M o d e 
 
 
 
 / / hQ@\2\o~
 
 [ M a i n I D = 0 x D 0 0 0 1 7 8 1   T y p e = 2 ] 
 
 3 2 7 8 5 = 	b@b	g( & S ) 
 
 3 2 7 8 5 = & S e l e c t   A l l 
 
 3 2 7 8 6 = Sl	b( & V ) 
 
 3 2 7 8 6 = & R e v e r s e d   S e l e c t 
 
 3 2 7 8 7 = XRhQ@\2\o~( & A ) 
 
 3 2 7 8 7 = & A d d   A n t i - p a s s b a c k   G r o u p 
 
 3 2 7 8 8 =  RdhQ@\2\o~( & D ) 
 
 3 2 7 8 8 = & D e l e t e   A n t i - p a s s b a c k   G r o u p 
 
 3 2 7 9 0 = /TRzfN}( & L ) 
 
 3 2 7 9 0 = S t a r t   S m a r t   & U p l o a d 
 
 
 
 / / 5uhLCgPnb܃US
 
 [ M a i n I D = 0 x D 0 0 0 1 7 8 3   T y p e = 2 ] 
 
 3 2 7 9 6 = 
Y6R0RMR N5uh( & P ) 
 
 3 2 7 9 6 = C o p y   t o   & P r e v i o u s   E l e v a t o r 
 
 3 2 7 9 7 = 
Y6R0RT N5uh( & N ) 
 
 3 2 7 9 7 = C o p y   t o   & N e x t   E l e v a t o r 
 
 3 2 7 9 8 = 
Y6R0R@b	g5uh( & A ) 
 
 3 2 7 9 8 = C o p y   t o   & A l l   E l e v a t o r 
 
 3 2 8 3 1 = @b	g|iB\AQL( & E ) 
 
 3 2 8 3 1 = & E n a b l e   A c c e s s   f o r   A l l   F l o o r s 
 
 3 2 8 7 6 = @b	g|iB\ybkL( & D ) 
 
 3 2 8 7 6 = & D i s a b l e   A c c e s s   f o r   A l l   F l o o r s 
 
 
 
 / / 5uhNXTn܃US
 
 [ M a i n I D = 0 x D 0 0 0 1 7 8 2   T y p e = 2 ] 
 
 3 2 7 8 5 = 	b@b	g( & S ) 
 
 3 2 7 8 5 = & S e l e c t   A l l 
 
 3 2 7 8 6 = Sl	b( & V ) 
 
 3 2 7 8 6 = R e & v e r s e d   S e l e c t 
 
 3 2 7 8 7 = 
Y6R^\'`( & C ) 
 
 3 2 7 8 7 = & C o p y   P r o p e r t i e s 
 
 3 2 7 8 8 = |4^\'`( & P ) 
 
 3 2 7 8 8 = & P a s t e   P r o p e r t i e s 
 
 3 2 7 9 0 = /TRzfN}( & L ) 
 
 3 2 7 9 0 = S t a r t   S m a r t   D o w n & l o a d 
 
 
 
 / / N8Ƌ+RN
 
 [ M a i n I D = 0 x D 0 0 0 1 7 8 4   T y p e = 2 ] 
 
 3 2 7 8 5 = 	b@b	g( & S ) 
 
 3 2 7 8 5 = & S e l e c t   A l l 
 
 3 2 7 8 6 = Sl	b( & V ) 
 
 3 2 7 8 6 = R e & v e r s e d   S e l e c t 
 
 3 2 7 8 7 = XRƋ+RN( & A ) 
 
 3 2 7 8 7 = & A d d   R e c o g n i t i o n   D e v i c e 
 
 3 2 7 8 8 =  RdƋ+RN( & D ) 
 
 3 2 7 8 8 = & D e l e t e   R e c o g n i t i o n   D e v i c e 
 
 3 2 7 9 0 = /TRzfN}( & L ) 
 
 3 2 7 9 0 = S t a r t   S m a r t   D o w n l & o a d 
 
 3 2 7 9 2 = !hQe( & M ) 
 
 3 2 7 9 2 = A d j u s t   T i & m e 
 
 3 2 7 9 5 = hKmƋ+RN( & E ) 
 
 3 2 7 9 5 = D e & t e c t   R e c o g n i t i o n   D e v i c e 
 
 3 2 9 0 6 = nI P 0W@W( & I ) 
 
 3 2 9 0 6 = S e t u p   & I P   A d d r e s s 
 
 3 2 9 0 7 = f9e[x( & P ) 
 
 3 2 9 0 7 = C h a n g e   & P a s s w o r d 
 
 3 2 9 0 2 = NSN8{v( & B ) 
 
 3 2 9 0 2 = D & o w n l o a d   F a c e   D a t a 
 
 3 2 9 0 3 = hQbNSN8{v( & O ) 
 
 3 2 9 0 3 = & F u l l y   U p l o a d   F a c e   D a t a 
 
 
 
 / / N8ǑƖ
 
 [ M a i n I D = 0 x D 0 0 0 1 7 8 5   T y p e = 2 ] 
 
 3 2 7 8 5 = 	b@b	g( & S ) 
 
 3 2 7 8 5 = & S e l e c t   A l l 
 
 3 2 7 8 6 = Sl	b( & V ) 
 
 3 2 7 8 6 = R e & v e r s e d   S e l e c t 
 
 3 2 9 0 4 = O(uYǑƖN8penc( & C ) 
 
 3 2 9 0 4 = & C o l l e c t   F a c e   D a t a   b y   D e v i c e 
 
 3 2 9 0 5 = c[gqGrubN8penc( & P ) 
 
 3 2 9 0 5 = G e n e r a t e   F a c e   D a t a   b y   & P h o t o 
 
 3 2 7 9 5 =  RdN8penc( & D ) 
 
 3 2 7 9 5 = & D e l e t e   F a c e   D a t a 
 
 
 
 3 2 7 9 0 = /TRzfN}( & L ) 
 
 3 2 7 9 0 = S t a r t   S m a r t   D o w n l & o a d 
 
 
 
 3 2 9 0 3 = hQbNSN8{v( & O ) 
 
 3 2 9 0 3 = & F u l l y   U p l o a d   F a c e   D a t a 
 
 
 
 / / c~ǑƖ
 
 [ M a i n I D = 0 x D 0 0 0 1 7 8 6   T y p e = 2 ] 
 
 3 2 7 8 5 = 	b@b	g( & S ) 
 
 3 2 7 8 5 = & S e l e c t   A l l 
 
 3 2 7 8 6 = Sl	b( & V ) 
 
 3 2 7 8 6 = R e & v e r s e d   S e l e c t 
 
 3 2 9 0 4 = LhbǑƖhVǑƖc~( & C ) 
 
 3 2 9 0 4 = & C o l l e c t   F i n g e r p r i n t   b y   D e s k t o p   C o l l e c t o r   
 
 3 2 9 0 5 = c~ NSO:gǑƖc~( & P ) 
 
 3 2 9 0 5 = C o l l e c t   F i n g e r & p r i n t   b y   F i n g e r p r i n t   D e v i c e 
 
 3 2 7 9 5 =  Rdc~penc( & D ) 
 
 3 2 7 9 5 = & D e l e t e   F i n g e r p r i n t   D a t a 
 
 3 2 7 9 0 = /TRzfN}( & L ) 
 
 3 2 7 9 0 = S t a r t   S m a r t   D o w n l & o a d 
 
 3 2 9 0 3 = hQbNSc~penc( & F ) 
 
 3 2 9 0 3 = & F u l l y   U p l o a d   F i n g e r p r i n t   D a t a 
 
 
 
 
 
 / / c~ NSO:g
 
 [ M a i n I D = 0 x D 0 0 0 1 7 8 7   T y p e = 2 ] 
 
 3 2 7 8 5 = 	b@b	g( & S ) 
 
 3 2 7 8 5 = & S e l e c t   A l l 
 
 3 2 7 8 6 = Sl	b( & V ) 
 
 3 2 7 8 6 = R e & v e r s e d   S e l e c t 
 
 3 2 7 9 0 = /TRzfN}( & L ) 
 
 3 2 7 9 0 = S t a r t   S m a r t   D o w n l & o a d 
 
 3 2 9 0 2 = NSc~penc( & D ) 
 
 3 2 9 0 2 = & U p l o a d   F i n g e r p r i n t   D a t a 
 
 3 2 9 0 3 = hQbNSc~penc( & F ) 
 
 3 2 9 0 3 = & F u l l y   U p l o a d   F i n g e r p r i n t   D a t a 
 
 
 
 / / zS
 
 / / W i n d o w 
 
 / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / 
 
 / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / 
 
 / / nRbczS
 
 / / S e t u p   C u t   O v e r   W i n d o w 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 0 0   T y p e = 1 ] 
 
 0 x 0 = n
 
 0 x 0 = S e t u p 
 
 1 = ŏn
 
 1 = C o m m u n i c a t i o n   S e t u p 
 
 2 = 2NLS
 
 2 = S e r i a l   P o r t 
 
 3 = lbchV
 
 3 = C o n v e r t e r 
 
 4 = Q~c6RhV
 
 4 = N e t w o r k   C o n t r o l l e r 
 
 5 = R
 
 5 = S c h e d u l e 
 
 6 = hTR
 
 6 = W e e k   S c h e d u l e 
 
 7 = GPeR
 
 7 = H o l i d a y   S c h e d u l e 
 
 8 = lxNn
 
 8 = H a r d w a r e   S e t u p 
 
 9 = c6RhV
 
 9 = C o n t r o l l e r 
 
 1 0 = bf
 
 1 0 = A l a r m 
 
 1 1 = S
 
 1 1 = D o o r 
 
 1 2 = NXTn
 
 1 2 = E m p l o y e e   S e t u p 
 
 1 3 = LCgP~
 
 1 3 = A c c e s s   G r o u p 
 
 1 4 = aS
 
 1 4 = C a r d 
 
 1 5 = 
 
 1 5 = D e p a r t m e n t 
 
 1 6 = NXT
 
 1 6 = E m p l o y e e 
 
 1 7 = vQ[
 
 1 7 = O t h e r 
 
 1 8 = nN}
 
 1 8 = S e t u p   U p l o a d 
 
 1 9 = NNU_
N O
 
 1 9 = E v e n t   R e c o r d   D o w n l o a d 
 
 2 0 = bfU_
N O
 
 2 0 = A l a r m   R e c o r d   D o w n l o a d 
 
 2 1 = hQ@\2\o
 
 2 1 = G l o b a l   A n t i - p a s s b a c k 
 
 2 2 = 5uh
 
 2 2 = E l e v a t o r 
 
 2 3 = N8Ƌ+RN
 
 2 3 = F a c e   R e c o g n i t i o n   D e v i c e 
 
 2 4 = N8ǑƖ
 
 2 4 = F a c e   D a t a   C o l l e c t i o n 
 
 2 5 = c~:g]\O!j_
 
 2 5 = F i n g e r p r i n t   D e v i c e   W o r k i n g   M o d e 
 
 2 6 = c~ǑƖ
 
 2 6 = F i n g e r p r i n t   D a t a   C o l l e c t i o n 
 
 2 7 = vcNw
 
 2 7 = E m a i l   N o t i f i c a t i o n 
 
 0 x d e 0 8 = c6RhVn
 
 0 x d e 0 8 = C o n t r o l l e r   S e t u p 
 
 0 x d e 0 a = Sn
 
 0 x d e 0 a = D o o r   S e t u p 
 
 0 x d e 0 d = aSn
 
 0 x d e 0 d = C a r d   S e t u p 
 
 0 x d e 0 f = NXTn
 
 0 x d e 0 f = E m p l o y e e   S e t u p 
 
 0 x d e 1 1 = nN}
 
 0 x d e 1 1 = S e t u p   U p l o a d 
 
 0 x d e 1 2 = NNU_
N O
 
 0 x d e 1 2 = E v e n t   R e c o r d   D o w n l o a d 
 
 0 x d e 1 3 = bfU_
N O
 
 0 x d e 1 3 = A l a r m   R e c o r d   D o w n l o a d 
 
 0 x d e 1 e = vc- !j_
 
 0 x d e 1 e = M o n i t o r - E d i t   M o d e 
 
 0 x d e 1 f = vc- vc!j_
 
 0 x d e 1 f = M o n i t o r - M o n i t o r   M o d e 
 
 0 x d e 2 d = NNU_g
 
 0 x d e 2 d = Q u e r y   E v e n t   R e c o r d 
 
 0 x d e 3 1 = |~e_g
 
 0 x d e 3 1 = Q u e r y   S y s t e m   L o g 
 
 3 2 7 9 1 = MR NƉV
 
 3 2 7 9 1 = P a g e   U p 
 
 3 2 7 9 2 = T NƉV
 
 3 2 7 9 2 = P a g e   D o w n 
 
 
 
 / / 蕁y|~T a b 
 
 / / A c c e s s   c o n t r o l   s y s t e m 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 0 1   T y p e = 1 ] 
 
 0 x 0 = n
 
 0 x 0 = S e t u p 
 
 0 x 1 = [evc
 
 0 x 1 = R e a l - t i m e   M o n i t o r 
 
 0 x 2 = Oo`g
 
 0 x 2 = I n f o r m a t i o n   Q u e r y 
 
 0 x 3 = KmՋ
 
 0 x 3 = T e s t 
 
 
 
 / / c6RhV
 
 / / C o n t r o l l e r 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 0 2   T y p e = 1 ] 
 
 0 = c6RhV
 
 0 = C o n t r o l l e r 
 
 1 = c6RhVRh
 
 1 = C o n t r o l l e r   L i s t 
 
 2 = ec6RhV
 
 2 = N e w   C o n t r o l l e r 
 
 3 = f9ec6RhVvWSbpe\[Nc6RhVsQTvbfn0Sn؏S:N:w<Pv^vLCgP~[,gc6RhV4YvsQTNS5uP[0WV
N>envN,gc6RhVvsQvQ[\ Rd`nx[~~T\ n 
 
 3 = C h a n g e   c o n t r o l l e r   m o d e l   o r   d o o r   q u a n t i t y   w i l l   l e a d   a l l   a l a r m   s e t u p ,   c h a n n e l   s e t u p   r e t u r n   t o   d e f a u l t   a n d   t h e   a c c e s s   g r o u p   d e s i g n a t e d   t o   t h e   r e a d e r   o n   t h e   c o n t r o l l e r   a n d   a l l   i n f o r m a t i o n   o n   e l e c t r o n i c   m a p   r e l a t e d   t o   t h e   c o n t r o l l e r   w i l l   b e   d e l e t e d ,   a r e   y o u   s u r e   t o   c o n t i n e ?   \ n 
 
 7 = ck(W7Rec6RhVRh
zI{. . . \ n 
 
 7 = R e f r e s h i n g   c o n t r o l l e r   l i s t ,   p l e a s e   w a i t . . . \ n 
 
 8 = 7Rec6RhVRh]~[k0\ n 
 
 8 = R e f r e s h i n g   c o n t r o l l e r   l i s t   c o m p l e t e d . \ n 
 
 9 = 7Rec6RhVRheNuNS	gc6RhV*gRQ0`SNpQ 7Rec6RhVRh 	c͑Ջ0\ n 
 
 9 = E r r o r   w h e n   r e f r e s h i n g   c o n t r o l l e r   l i s t .   C o n t r o l l e r   m a y   n o t   b e   l i s t e d .   C l i c k   " R e f r e s h   C o n t r o l l e r   L i s t "   a n d   r e t r y . \ n   
 
 1 0 = ck(WOX[O9e
zI{. . . \ n 
 
 1 0 = S a v i n g   m o d i f i c a t i o n ,   p l e a s e   w a i t . . . \ n 
 
 1 1 = OX[[k0\ n 
 
 1 1 = S a v e   c o m p l e t e d . \ n 
 
 1 2 = c6RhV % s  OX[bR0\ n 
 
 1 2 = S a v e   C o n t r o l l e r   " % s "   s u c c e s s f u l l y . \ n 
 
 1 3 = *ghKm0Rc6RhV % s  O9ee OX[0\ n 
 
 1 3 = C o n t r o l l e r   " % s "   i s   n o t   m o d i f i e d ,   n o   n e e d   t o   s a v e . \ n 
 
 1 4 = OX[c6RhV % s  eQsYN\ n 
 
 1 4 = W h e n   s a v e   C o n t r o l l e r   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 1 5 = OX[[kFOQsN0\ n 
 
 1 5 = S a v e   c o m p l e t e d ,   b u t   i s   i n   e r r o r . \ n 
 
 1 6 =  Rdc6RhV\O Rdv^vbfn0Sn0LCgP~[,gc6RhV4YvsQTNS5uP[0WV
N>envN,gc6RhVvsQvQ[`nx[~~T\ n 
 
 1 6 = C h a n g e   c o n t r o l l e r   t y p e   o r   d o o r   q u a n t i t y   w i l l   l e a d   a l l   a l a r m   s e t u p ,   c h a n n e l   s e t u p   r e t u r n   t o   d e f a u l t   a n d   t h e   a c c e s s   g r o u p   d e s i g n a t e d   t o   t h e   r e a d e r   o n   t h e   c o n t r o l l e r   a n d   a l l   i n f o r m a t i o n   o n   e l e c t r o n i c   m a p   r e l a t e d   t o   t h e   c o n t r o l l e r   w i l l   b e   d e l e t e d ,   a r e   y o u   s u r e   t o   c o n t i n e ?   \ n 
 
 1 7 = ck(W Rdc6RhV
zI{. . . \ n 
 
 1 7 = D e l e t i n g   c o n t r o l l e r ,   p l e a s e   w a i t . . . \ n 
 
 1 8 =  Rd[k0\ n 
 
 1 8 = D e l e t e   c o m p l e t e d . \ n 
 
 1 9 =  Rd[kFOQsN0\ n 
 
 1 9 = D e l e t i n g   c o m p l e t e d ,   b u t   i s   i n   e r r o r . \ n 
 
 2 0 =  Rdc6RhV % s  eQsNYN\ n 
 
 2 0 = W h e n   d e l e t e   c o n t r o l l e r   " % s " ,   f o l l o w i n g   e r r o r   i s   h a p p e n : \ n 
 
 2 1 =  Rdc6RhV % s  bR0\ n 
 
 2 1 = D e l e t e   c o n t r o l l e r   " % s "   s u c c e s s f u l l y . \ n 
 
 2 2 = ck(WRYSc6RhV
zI{. . . \ n 
 
 2 2 = I n i t i a l i z i n g   C o n t r o l l e r ,   p l e a s e   w a i t . . . \ n 
 
 2 3 = RYS[k0\ n 
 
 2 3 = I n i t i a l i z a t i o n   c o m p l e t e d . \ n 
 
 2 4 = RYSc6RhV % s  eQsNYN: \ n 
 
 2 4 = W h e n   i n i t i a l i z e   c o n t r o l l e r   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 2 5 = RYSc6RhV % s  bR0\ n 
 
 2 5 = I n i t i a l i z e   c o n t r o l l e r   " % s "   s u c c e s s f u l l y . \ n 
 
 2 6 = ck(WSc6RhVe
zI{. . . \ n 
 
 2 6 = A c q u i r i n g   c o n t r o l l e r   t i m e ,   p l e a s e   w a i t . . . \ n 
 
 2 7 = Se[k0\ n 
 
 2 7 = T i m e   a c q u i r e d . \ n 
 
 2 8 = Sc6RhV % s  veQsNYN\ n 
 
 2 8 = W h e n   a c q u i r e   t h e   t i m e   o f   c o n t r o l l e r   " % s " ,   f o l l o w i n g   e r r o r   i s   h a p p e n : \ n   
 
 2 9 = c6RhV % s  vS_MRe:N % s  0\ n 
 
 2 9 = T h e   c u r r e n t   t i m e   o f   C o n t r o l l e r   " % s "   i s   " % s " . \ n 
 
 3 0 = ck(W!hQc6RhVe
zI{. . . \ n 
 
 3 0 = A d j u s t i n g   c o n t r o l l e r   t i m e ,   p l e a s e   w a i t . . . \ n 
 
 3 1 = !hQe[k0\ n 
 
 3 1 = T i m e   a d j u s t m e n t   i s   c o m p l e t e d . \ n 
 
 3 2 = !hQc6RhV % s  veQsNYN\ n 
 
 3 2 = W h e n   a d j u s t   t h e   t i m e   o f   c o n t r o l l e r   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 3 3 = c6RhV % s  ve]!hQ0\ n 
 
 3 3 = T h e   t i m e   o f   C o n t r o l l e r   " % s "   h a v e   b e e n   a d j u s t e d . \ n 
 
 3 4 = ck(WQYN}c6RhVvn
zI{. . . \ n 
 
 3 4 = P r e p a r i n g   u p l o a d   t h e   s e t u p   o f   c o n t r o l l e r ,   p l e a s e   w a i t . . . \ n 
 
 3 5 = N}c6RhVvn[k0\ n 
 
 3 5 = C o n t r o l l e r   s e t u p   u p l o a d   c o m p l e t e d . \ n 
 
 3 6 = N}c6RhVvn[kFOQsN0\ n 
 
 3 6 = C o n t r o l l e r   s e t u p   u p l o a d   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 3 7 =  _Y:Nc6RhV % s  N}n0\ n 
 
 3 7 = S t a r t   t o   u p l o a d   s e t u p   f o r   c o n t r o l l e r   " % s " . \ n 
 
 3 8 = c6RhV % s  vnN}[k0\ n 
 
 3 8 = C o n t r o l l e r   " % s "   s e t u p   u p l o a d   c o m p l e t e d . \ n 
 
 3 9 = ck(WhKmc6RhV
zI{. . . \ n 
 
 3 9 = D e t e c t i n g   c o n t r o l l e r ,   p l e a s e . . . \ n 
 
 4 0 = hKm[k0\ n 
 
 4 0 = D e t e c t i n g   c o m p l e t e d . \ n 
 
 4 1 = hKmMON % s  0W@W:N % d  vc6RhV % s  eQsNYN\ n 
 
 4 1 = W h e n   d e t e c t   c o n t r o l l e r   l o c a t e d   i n   " % s "   a d d r e s s e d   a s   " % d "   n a m e d   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 4 2 = MON % s  0W@W:N % d  vc6RhV % s  ]ޏc0\ n - - - - WS % s  \ n - - - - lxNHr,g% s \ n - - - - B I O S Hr,g% s \ n - - - -  g'YNXTpe% d \ n - - - -  g'YU_pe% d \ n - - - - S_MRpe% d \ n 
 
 4 2 = C o n t r o l l e r   l o c a t e d   i n   " % s "   a d d r e s s e d   a s   " % d "   n a m e d   " % s "   i s   c o n n e c t e d . \ n - - - - T y p e :   " % s " \ n - - - - H a r d w a r e   V e r s i o n :   % s \ n - - - - B I O S   V e r s i o n :   % s \ n - - - - M a x i m u m   e m p l o y e e s :   % d \ n - - - - M a x i m u m   r e c o r d s :   % d \ n - - - - T h e   n u m b e r   o f   c u r r e n t   d o o r s :   % d \ n   
 
 4 3 = MON % s  0W@W:N % d  vc6RhV % s  *gޏcbs
Ncknx0\ n 
 
 4 3 = C o n t r o l l e r   l o c a t e d   i n   " % s "   a d d r e s s e d   a s   " % d "   n a m e d   " % s "   i s   u n c o n n e c t e d   o r   c o m m u n i c a t i o n   s p e e d   i s   i n c o r r e c t . \ n 
 
 4 4 = ck(Wg~b % s  
Nvc6RhV
zI{. . . \ n 
 
 4 4 = S e a r c h i n g   c o n t r o l l e r   l o c a t e d   i n   " % s " ,   p l e a s e   w a i t . . . \ n 
 
 4 5 = 0W@W:N% d vc6RhV]ޏc0WS % s  lxNHr,g% s B I O S Hr,g% s  g'YNXTpe% d  g'YU_pe% d S_MRpe% d \ n 
 
 4 5 = C o n t r o l l e r   a d d r e s s e d   % d   i s   c o n n e c t e d .   M o d e l :   " % s " ,   H a r d w a r e   V e r s i o n :   % s " ,   B I O S   v e r s t i o n :   % s ,     M a x i m u m   E m p l o y e e s :   % d ,   M a x i m u m   R e c o r d s :   % d \ n ,   T h e   n u m b e r   o f   c u r r e n t   d o o r s :   % d \ n 
 
 4 6 = 0W@W:N% d vc6RhV*gޏcbs
Ncknx0\ n 
 
 4 6 = C o n t r o l l e r   a d d r e s s e d   % d   i s   n o t   c o n n e c t e d   o r   c o m m u n i c a t i o n   s p e e d   i s   i n c o r r e c t . \ n 
 
 4 7 = g~b0W@W:N % d  vc6RhVeQsNYN\ n 
 
 4 7 = W h e n   s e a r c h   t h e   c o n t r o l l e r   a d d r e s s e d   " % d " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 4 8 = g~b[k0\ n 
 
 4 8 = S e a r c h i n g   c o m p l e t e d . \ n 
 
 4 9 = g~b[kFOQsN0\ n 
 
 4 9 = S e a r c h i n g   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 5 3 = Se[kFOQsN0\ n 
 
 5 3 = A c q u i r e d   t i m e ,   b u t   e r r o r   h a p p e n s . \ n 
 
 5 4 = !hQe[kFOQsN0\ n 
 
 5 4 = T i m e   a d j u s t m e n t   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 5 5 = :Nc6RhV % s  N}neQsNYN\ n 
 
 5 5 = W h e n   u p l o a d   C o n t r o l l e r   " % s "   s e t u p ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 5 6 = RYS[kFOQsN0\ n 
 
 5 6 = I n i t i a l i z a t i o n   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 5 7 = hKm[kFOQsN0\ n 
 
 5 7 = D e t e c t   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 5 8 = %N͑fJT\ n RYSc6RhV\[c6RhVv@b	gn0NNU_0bfU_hQ"N1YYg`]~O(uN勧c6RhVRHQN}NNU_NbfU_TQRYSc6RhV`nx[~~T\ n 
 
 5 8 = S e r i o u s   W a r n i n g : \ n   I n i t i a l i z e   c o n t r o l l e r   w i l l   l o s e   a l l   c o n t r o l l e r   s e t u p ,   e v e n t   r e c o r d s ,   a l a r m   r e c o r d s .   I f   y o u   h a v e   u s e d   t h e   c o n t r o l l e r ,   p l e a s e   u p l o a d   t h e   e v e n t   r e c o r d   a n d   a l a r m   r e c o r d   b e f o r e   i n i t i a l i z e   c o n t r o l l e r .   A r e   y o u   s u r e   t o   c o n t i n u e ? \ n 
 
 6 3 = ck(Wnpe
zI{. . . \ n 
 
 6 3 = S e t t i n g   u p   d o o r ,   p l e a s e   w a i t . . . \ n 
 
 6 4 = ck(WnN
zI{. . . \ n 
 
 6 4 = S e t t i n g   u p   i n t e r l o c k ,   p l e a s e   w a i t . . . \ n   
 
 6 5 = ck(Wn2\oV
zI{. . . \ n 
 
 6 5 = S e t t i n g   u p   a n t i - p a s s b a c k ,   p l e a s e   w a i t . . . \ n   
 
 
 
 6 6 = MON % s  0W@W:N % d  vc6RhV % s  ]ޏc0\ n - - - - WS % s  \ n - - - - lxNHr,g% s \ n - - - - B I O S Hr,g% s \ n - - - -  g'YNXTpe% d \ n - - - -  g'YU_pe% d \ n - - - - S_MRpe% d \ n - - - - S_MR5uhibU\gpe% d \ n - - - - 5uhibU\g{|W % s  \ n - - - - 5uhibU\g0W@W% s \ n 
 
 6 6 = C o n t r o l l e r   l o c a t e d   i n   " % s "   a d d r e s s e d   a s   " % d "   n a m e d   " % s "   i s   c o n n e c t e d . \ n - - - - T y p e :   " % s " \ n - - - - H a r d w a r e   V e r s i o n :   % s \ n - - - - B I O S   V e r s i o n :   % s \ n - - - - M a x i m u m   e m p l o y e e s :   % d \ n - - - - M a x i m u m   r e c o r d s :   % d \ n - - - - T h e   n u m b e r   o f   c u r r e n t   d o o r s :   % d \ n - - - T h e   n u m b e r   o f   c u r r e n t   e l e v a t o r   e x p a n s i o n   b o a r d % d \ n - - - - T h e   t y p e   o f   e l e v a t o r   e x p a n s i o n   b o a r d  % s  \ n - - - - T h e   a d d r e s s   o f   e l e v a t o r   e x p a n s i o n   b o a r d % s \ n 
 
 6 7 = - - - -  g'Yc~pe% d \ n 
 
 6 7 = - - - - M a x i m u m   f i n g e r p r i n t s : % d \ n 
 
 
 
 1 0 1 = *g	bNXTOX[1Y%0\ n 
 
 1 0 1 = T h e   e m p l o y e e   i s   n o t   s e l e c t e d ,   f a i l   t o   s a v e . \ n 
 
 
 
 2 0 0 1 = 7Rec6RhVRh
 
 2 0 0 1 = R e f r e s h   c o n t r o l l e r   l i s t 
 
 2 0 0 4 = Smd\O
 
 2 0 0 4 = C a n c e l   t h e   o p e r a t i o n 
 
 
 
 / / c6RhV^\'`
 
 / / C o n t r o l l e r   E d i t   P r o p e r t i e s 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 0 3   T y p e = 1 ] 
 
 0 x 0 = ^\'`
 
 0 x 0 = P r o p e r t y 
 
 1 = W,gSpe
 
 1 = B a s i c   P a r a m e t e r 
 
 2 = 
Ty
 
 2 = N a m e 
 
 3 = WS
 
 3 = M o d e l 
 
 4 = pe
 
 4 = D o o r   Q u a n t i t y 
 
 5 = n
 
 5 = C o m m u n i c a t i o n   P a r a m e t e r 
 
 6 = e_
 
 6 = C o m m u n i c a t i o n   M o d e 
 
 7 = 2NLS
 
 7 = S e r i a l   P o r t 
 
 8 = T C P / I P Q~
 
 8 = T C P / I P   N e t w o r k 
 
 9 = ޏc2NS
 
 9 = C o n n e c t   w i t h   S e r i a l   P o r t 
 
 1 0 = I P 0W@WbW
T
 
 1 0 = I P   A d d r e s s   o r   D o m a i n   N a m e 
 
 1 1 = I P zS
 
 1 1 = I P   P o r t 
 
 1 2 = c6RhV0W@W
 
 1 2 = C o n t r o l l e r   A d d r e s s 
 
 1 3 = W,gSpe
 
 1 3 = B a s i c   P a r a m e t e r 
 
 1 4 = N~1 
 
 1 4 = I n t e r l o c k   G r o u p   1 
 
 1 5 = N~2 
 
 1 5 = I n t e r l o c k   G r o u p   2 
 
 1 6 = 2\oV~1 
 
 1 6 = A n t i - p a s s b a c k   G r o u p   1 
 
 1 7 = 2\oV~2 
 
 1 7 = A n t i - p a s s b a c k   G r o u p   2 
 
 1 8 = ~1 ReQS1 
 
 1 8 = D o o r   1   a d d   i n   G r o u p   1 
 
 1 9 = ~1 ReQS2 
 
 1 9 = D o o r   2   a d d   i n   G r o u p   1 
 
 2 0 = ~1 ReQS3 
 
 2 0 = D o o r   3   a d d   i n   G r o u p   1 
 
 2 1 = ~1 ReQS4 
 
 2 1 = D o o r   4   a d d   i n   G r o u p   1 
 
 2 2 = ~1 ReQ4Y1 
 
 2 2 = R e a d e r   1   a d d   i n   G r o u p   1 
 
 2 3 = ~1 ReQ4Y2 
 
 2 3 = R e a d e r   2   a d d   i n   G r o u p   1 
 
 2 4 = ~1 ReQ4Y3 
 
 2 4 = R e a d e r   3   a d d   i n   G r o u p   1 
 
 2 5 = ~1 ReQ4Y4 
 
 2 5 = R e a d e r   4   a d d   i n   G r o u p   1 
 
 2 6 = ~2 ReQS1 
 
 2 6 = D o o r   1   a d d   i n   G r o u p   2 
 
 2 7 = ~2 ReQS2 
 
 2 7 = D o o r   2   a d d   i n   G r o u p   2 
 
 2 8 = ~2 ReQS3 
 
 2 8 = D o o r   3   a d d   i n   G r o u p   2 
 
 2 9 = ~2 ReQS4 
 
 2 9 = D o o r   4   a d d   i n   G r o u p   2 
 
 3 0 = ~2 ReQ4Y1 
 
 3 0 = R e a d e r   1   a d d   i n   G r o u p   2 
 
 3 1 = ~2 ReQ4Y2 
 
 3 1 = R e a d e r   2   a d d   i n   G r o u p   2 
 
 3 2 = ~2 ReQ4Y3 
 
 3 2 = R e a d e r   3   a d d   i n   G r o u p   2 
 
 3 3 = ~2 ReQ4Y4 
 
 3 3 = R e a d e r   4   a d d   i n   G r o u p   2 
 
 3 4 = 4YOS
 
 3 4 = R e a d e r   C o m m u n i c a t i o n   P r o t o c o l 
 
 3 5 = ~9h2 6 
 
 3 5 = W i e g a n d   2 6 
 
 3 6 = ~9h3 4 
 
 3 6 = W i e g a n d   3 4 
 
 3 7 = ꁚ[IN
 
 3 7 = C u s t o m 
 
 3 8 = ~9h6 6 
 
 3 8 = W i e g a n d   6 6 
 
 3 9 = ꁚ[IN- ~9h6 4 
 
 3 9 = C u s t o m   W i e g a n d   6 4 
 
 4 0 = 4Yn
 
 4 0 = R e a d e r   S e t u p 
 
 4 1 = 4Y1 (uNR
 
 4 1 = R e a d e r   1   f o r   A t t e n d a n c e 
 
 4 2 = 4Y2 (uNR
 
 4 2 = R e a d e r   2   f o r   A t t e n d a n c e 
 
 4 3 = 4Y3 (uNR
 
 4 3 = R e a d e r   3   f o r   A t t e n d a n c e 
 
 4 4 = 4Y4 (uNR
 
 4 4 = R e a d e r   4   f o r   A t t e n d a n c e 
 
 4 5 = 
N(uNR
 
 4 5 = N o t   f o r   A t t e n d a n c e 
 
 4 6 = mvf>f:y
 
 4 6 = L E D   D i s p l a y 
 
 4 7 = /T(uzaSR
 
 4 7 = E n a b l e   P r o g r a m   C a r d   F u n c t i o n 
 
 4 8 = d2hTR
 
 4 8 = D i s m i s s   S e c u r i t y   W e e k   S c h e d u l e 
 
 4 9 = ^2GPeR
 
 4 9 = A c t i v a t e   S e c u r i t y   H o l i d a y   S c h e d u l e 
 
 5 0 = bf(uc6RhV
 
 5 0 = A l a r m   C o n t r o l l e r 
 
 6 0 = c6RhVnShTReQsNYN\ n 
 
 6 0 = W h e n   c o n t r o l l e r   s e t u p   a c q u i r e s   w e e k   s c h e d u l e ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 6 1 = PՋ	SS N*Nc6RhVNO͑eShTR0\ n 
 
 6 1 = T o   r e - a c q u i r e   w e e k   s c h e d u l e ,   p l e a s e   t r y   a n o t h e r   c o n t r o l l e r . \ n 
 
 6 3 = c6RhVnSGPeReQsNYN\ n 
 
 6 3 = W h e n   c o n t r o l l e r   s e t u p   a c q u i r e s   h o l i d a y   s c h e d u l e ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 6 4 = PՋ	SS N*Nc6RhVNO͑eSGPeR0\ n 
 
 6 4 = T o   r e - a c q u i r e   h o l i d a y   s c h e d u l e ,   p l e a s e   t r y   a n o t h e r   c o n t r o l l e r . \ n 
 
 
 
 / / g~bc6RhV
 
 / / C h e c k   C o n t r o l l e r 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 0 4   T y p e = 1 ] 
 
 0 = g~bc6RhV  -   	bg~bMOn
 
 0 = S e a r c h   C o n t r o l l e r   -   S e l e c t   t h e   s e a r c h   p o s i t i o n 
 
 1 = wY0W@W
 
 1 = S t a r t i n g   A d d r e s s 
 
 2 = ~_g0W@W
 
 2 = E n d   A d d r e s s 
 
 
 
 / / hTR
 
 / / W e e k   S c h e d u l e 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 0 5   T y p e = 1 ] 
 
 0 = hTR
 
 0 = W e e k   S c h e d u l e 
 
 1 = hTRRh
 
 1 = W e e k   S c h e d u l e   L i s t 
 
 2 = e(uhTR
 
 2 = N e w   c o m m o n   W e e k   S c h e d u l e 
 
 3 = hQhThQ)YAQ
 
 3 = A l w a y s   a l l o w e d 
 
 4 = hQhThQ)Yybk
 
 4 = N e v e r   a l l o w e d 
 
 7 = ck(W7RehTRRh
zI{. . . \ n 
 
 7 = R e f r e s h i n g   w e e k   s c h e d u l e   l i s t ,   p l e a s e   w a i t . . . \ n 
 
 8 = 7RehTRRh]~[k0\ n 
 
 8 = W e e k   s c h e d u l e   l i s t   r e f r e s h e d . \ n 
 
 9 = 7RehTRRheNuNS	ghTR*gRQ0`SNpQ 7RehTRRh 	c͑Ջ0\ n 
 
 9 = E r r o r   h a p p e n s   w h e n   r e f r e s h i n g   w e e k   p l a n   l i s t ,   s o m e   w e e k   p l a n s   m a y   n o t   l i s t e d .   C l i c k   " R e f r e s h   W e e k   S c h e d u l e   l i s t "   t o   t r y   a g a i n . \ n 
 
 1 0 = ck(WOX[O9e
zI{. . . \ n 
 
 1 0 = S a v i n g   m o d i f i c a t i o n ,   p l e a s e   w a i t . . . \ n 
 
 1 1 = OX[[k0\ n 
 
 1 1 = S a v e   c o m p l e t e d . \ n 
 
 1 2 = hTR % s  OX[bR0\ n 
 
 1 2 = S a v e   W e e k   S c h e d u l e   " % s "   s u c c e s s f u l l y . \ n   
 
 1 3 = *ghKm0RhTR % s  O9ee OX[0\ n 
 
 1 3 = W e e k   s c h e d u l e   " % s "   i s   n o t   m o d i f i e d ,   n o   n e e d   t o   s a v e . \ n 
 
 1 4 = OX[hTR % s  eQsYN\ n 
 
 1 4 = W h e n   s a v e   w e e k   s c h e d u l e   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 1 5 = OX[[kFOQsN0\ n 
 
 1 5 = S a v e   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 1 7 = ck(W RdhTR
zI{. . . \ n 
 
 1 7 = D e l e t i n g   w e e k   s c h e d u l e ,   p l e a s e   w a i t . . . \ n 
 
 1 8 =  Rd[k0\ n 
 
 1 8 = D e l e t e   c o m p l e t e d . \ n 
 
 1 9 =  Rd[kFOQsN0\ n 
 
 1 9 = D e l e t e   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 2 0 =  RdhTR % s  eQsNYN\ n 
 
 2 0 = W h e n   d e l e t e   w e e k   s c h e d u l e   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 2 1 =  RdhTR % s  bR0\ n 
 
 2 1 = D e l e t e   w e e k   s c h e d u l e   " % s "   s u c c e s s f u l l y . \ n 
 
 2 2 = ck(WNc6RhV RdhTR
zI{. . . \ n 
 
 2 2 = D e l e t i n g   w e e k   s c h e d u l e   f r o m   c o n t r o l l e r ,   p l e a s e   w a i t . . . \ n 
 
 2 3 = Nc6RhV RdhTR % s  bR0\ n 
 
 2 3 = D e l e t e   w e e k   s c h e d u l e   " % s "   f r o m   c o n t r o l l e r   s u c c e s s f u l l y . \ n 
 
 2 4 = Nc6RhV RdhTR % s  eQsNYN\ n 
 
 2 4 = W h e n   d e l e t e   w e e k   s c h e d u l e   " % s "   f r o m   c o n t r o l l e r ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 2 5 = Nc6RhV RdhTR[k0\ n 
 
 2 5 = D e l e t e   w e e k   s c h e d u l e   f r o m   c o n t r o l l e r   c o m p l e t e d . \ n 
 
 2 6 = Nc6RhV RdhTR[kFOQsN0\ n 
 
 2 6 = D e l e t e   w e e k   s c h e d u l e   f r o m   c o n t r o l l e r   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 2 7 = l	gc6RhVe  Rd0\ n 
 
 2 7 = N o   c o n t r o l l e r ,   d o   n o t   n e e d   t o   d e l e t e . \ n 
 
 2 8 = Sc6RhVOo`QsNYN\ n 
 
 2 8 = W h e n   a c q u i r e s   c o n t r o l l e r   i n f o r m a t i o n ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 2 9 = ck(WN}hTR0Rc6RhV
zI{. . . \ n 
 
 2 9 = U p l o a d i n g   w e e k   s c h e d u l e   t o   c o n t r o l l e r ,   p l e a s e   w a i t . . . \ n 
 
 3 0 = N}hTR % s  bR0\ n 
 
 3 0 = U p l o a d   w e e k   s c h e d u l e   s u c c e s s f u l l y . \ n 
 
 3 1 = N}hTR % s  eQsNYN\ n 
 
 3 1 = W h e n   u p l o a d   w e e k   s c h e d u l e   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 3 2 = N}hTR0Rc6RhV[k0\ n 
 
 3 2 = U p l o a d   w e e k   s c h e d u l e   t o   c o n t r o l l e r   c o m p l e t e d . \ n 
 
 3 3 = N}hTR0Rc6RhV[kFOQsN0\ n 
 
 3 3 = U p l o a d   w e e k   s c h e d u l e   t o   c o n t r o l l e r   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 3 4 = l	gc6RhVe N}0\ n 
 
 3 4 = N o   c o n t r o l l e r ,   d o   n o t   n e e d   t o   d e l e t e . \ n 
 
 3 5 = Sc6RhVOo`QsNYN\ n 
 
 3 5 = W h e n   a c q u i r e s   c o n t r o l l e r   i n f o r m a t i o n ,   f o l l o w i n g   e r r o r   h a p p e n s :   \ n 
 
 3 6 = eN(uhTR
 
 3 6 = N e w   S p e c i a l   W e e k   S c h e d u l e 
 
 
 
 2 0 0 1 = 7RehTRRh
 
 2 0 0 1 = R e f r e s h   w e e k   s c h e d u l e   l i s t 
 
 2 0 0 4 = Smd\O
 
 2 0 0 4 = C a n c e l   o p e r a t i o n 
 
 
 
 / / hTR^\'`
 
 / / W e e k   S c h e d u l e   E d i t   P r o p e r t i e s 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 0 6   T y p e = 1 ] 
 
 0 x 0 = ^\'`
 
 0 x 0 = P r o p e r t y 
 
 1 = W,gSpe
 
 1 = B a s i c   P a r a m e t e r 
 
 2 = 
Ty
 
 2 = N a m e 
 
 3 = eSpe
 
 3 = T i m e   P a r a m e t e r 
 
 5 = wYe1 
 
 5 = S t a r t i n g   T i m e   1 
 
 6 = ~_ge1 
 
 6 = E n d   T i m e   1 
 
 7 = wYe2 
 
 7 = S t a r t i n g   T i m e   2 
 
 8 = ~_ge2 
 
 8 = E n d   T i m e   2 
 
 9 = wYe3 
 
 9 = S t a r t i n g   T i m e   3 
 
 1 0 = ~_ge3 
 
 1 0 = E n d   T i m e   3 
 
 1 1 = wYe4 
 
 1 1 = S t a r t i n g   T i m e   4 
 
 1 2 = ~_ge4 
 
 1 2 = E n d   T i m e   4 
 
 1 3 = wYe5 
 
 1 3 = S t a r t i n g   T i m e   5 
 
 1 4 = ~_ge5 
 
 1 4 = E n d   T i m e   5 
 
 1 5 = wYe6 
 
 1 5 = S t a r t i n g   T i m e   6 
 
 1 6 = ~_ge6 
 
 1 6 = E n d   T i m e   6 
 
 
 
 
 
 / / GPeR
 
 [ M a i n I D = 0 x D 0 0 0 0 0 0 7   T y p e = 1 ] 
 
 0 = GPeR
 
 0 = H o l i d a y   S c h e d u l e 
 
 1 = GPeRRh
 
 1 = H o l i d a y   S c h e d u l e   L i s t 
 
 2 = e(uGPeR
 
 2 = N e w   C o m m o n   H o l i d a y   S c h e d u l e 
 
 3 = eGPe
 
 3 = N o   H o l i d a y 
 
 7 = ck(W7ReGPeRRh
zI{. . . \ n 
 
 7 = R e f r e s h i n g   h o l i d a y   s c h e d u l e   l i s t ,   p l e a s e   w a i t . . . \ n 
 
 8 = 7ReGPeRRh]~[k0\ n 
 
 8 = R e f r e s h i n g   h o l i d a y   s c h e d u l e   l i s t   c o m p l e t e d . \ n 
 
 9 = 7ReGPeRRheNuNS	gGPeR*gRQ0`SNpQ 7ReGPeRRh 	c͑Ջ0\ n 
 
 9 = W h e n   r e f r e s h   h o l i d a y   s c h e d u l e   l i s t ,   e r r o r   h a p p e n s .   M a y b e   s o m e   h o l i d a y   s c h e d u l e   l i s t s   a r e   n o t   i n c l u d e d .   C l i c k   " R e f r e s h   H o l i d a y   S c h e d u l e   L i s t "   t o   t r y   a g a i n . \ n 
 
 1 0 = ck(WOX[O9e
zI{. . . \ n 
 
 1 0 = S a v i n g   m o d i f i c a t i o n ,   p l e a s e   w a i t . . . \ n 
 
 1 1 = OX[[k0\ n 
 
 1 1 = S a v e   c o m p l e t e d . \ n 
 
 1 2 = GPeR % s  OX[bR0\ n 
 
 1 2 = S a v e   h o l i d a y   s c h e d u l e   " % s "   s u c c e s s f u l l y . \ n 
 
 1 3 = *ghKm0RGPeR % s  O9ee OX[0\ n 
 
 1 3 = H o l i d a y   s c h e d u l e   " % s "   i s   n o t   m o d i f i e d ,   n o   n e e d   t o   s a v e . \ n 
 
 1 4 = OX[GPeR % s  eQsYN\ n 
 
 1 4 = W h e n   s a v e   h o l i d a y   s c h e d u l e   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 1 5 = OX[[kFOQsN0\ n 
 
 1 5 = S a v e   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 1 7 = ck(W RdGPeR
zI{. . . \ n 
 
 1 7 = D e l e t i n g   h o l i d a y   s c h e d u l e ,   p l e a s e   w a i t . . . \ n 
 
 1 8 =  Rd[k0\ n 
 
 1 8 = D e l e t e   c o m p l e t e d . \ n 
 
 1 9 =  Rd[kFOQsN0\ n 
 
 1 9 = D e l e t e   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 2 0 =  RdGPeR % s  eQsNYN\ n 
 
 2 0 = W h e n   d e l e t e   h o l i d a y   s c h e d u l e   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 2 1 =  RdGPeR % s  bR0\ n 
 
 2 1 = D e l e t e   h o l i d a y   s c h e d u l e   " % s "   s u c c e s s f u l l y . \ n 
 
 2 2 = ck(WNc6RhV RdGPeR
zI{. . . \ n 
 
 2 2 = D e l e t i n g   h o l i d a y   s c h e d u l e   f r o m   c o n t r o l l e r ,   p l e a s e   w a i t . . . \ n 
 
 2 3 = Nc6RhV RdGPeR % s  bR0\ n 
 
 2 3 = D e l e t e   h o l i d a y   s c h e d u l e   " % s "   f r o m   c o n t r o l l e r   s u c c e s s f u l l y . \ n 
 
 2 4 = Nc6RhV RdGPeR % s  eQsNYN\ n 
 
 2 4 = W h e n   d e l e t e   h o l i d a y   s c h e d u l e   " % s "   f r o m   c o n t r o l l e r ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 2 5 = Nc6RhV RdGPeR[k0\ n 
 
 2 5 = D e l e t e   h o l i d a y   s c h e d u l e   f r o m   c o n t r o l l e r   c o m p l e t e d . \ n 
 
 2 6 = Nc6RhV RdGPeR[kFOQsN0\ n 
 
 2 6 = D e l e t e   h o l i d a y   s c h e d u l e   f r o m   c o n t r o l l e r   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 2 7 = l	gc6RhVe  Rd0\ n 
 
 2 7 = N o   c o n t r o l l e r ,   d o   n o t   n e e d   t o   d e l e t e . \ n 
 
 2 8 = Sc6RhVOo`QsNYN\ n 
 
 2 8 = W h e n   a c q u i r e s   c o n t r o l l e r   i n f o r m a t i o n ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 2 9 = ck(WN}GPeR0Rc6RhV
zI{. . . \ n 
 
 2 9 = U p l o a d i n g   h o l i d a y   s c h e d u l e   t o   c o n t r o l l e r ,   p l e a s e   w a i t . . . \ n 
 
 3 0 = N}GPeR % s  bR0\ n 
 
 3 0 = U p l o a d   h o l i d a y   s c h e d u l e   s u c c e s s f u l l y . \ n 
 
 3 1 = N}GPeR % s  eQsNYN\ n 
 
 3 1 = W h e n   u p l o a d   h o l i d a y   s c h e d u l e   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 3 2 = N}GPeR0Rc6RhV[k0\ n 
 
 3 2 = U p l o a d   h o l i d a y   s c h e d u l e   t o   c o n t r o l l e r   c o m p l e t e d . \ n 
 
 3 3 = N}GPeR0Rc6RhV[kFOQsN0\ n 
 
 3 3 = U p l o a d   h o l i d a y   s c h e d u l e   t o   c o n t r o l l e r   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 3 4 = l	gc6RhVe N}0\ n 
 
 3 4 = N o   c o n t r o l l e r ,   d o   n o t   n e e d   t o   d e l e t e . \ n 
 
 3 5 = Sc6RhVOo`QsNYN\ n 
 
 3 5 = W h e n   a c q u i r e s   c o n t r o l l e r   i n f o r m a t i o n ,   f o l l o w i n g   e r r o r   h a p p e n s :   \ n 
 
 3 6 = eN(uGPeR
 
 3 6 = N e w   S p e c i a l   H o l i d a y   S c h e d u l e 
 
 
 
 2 0 0 1 = 7ReGPeRRh
 
 2 0 0 1 = R e f r e s h   h o l i d a y   s c h e d u l e   l i s t 
 
 2 0 0 4 = Smd\O
 
 2 0 0 4 = C a n c e l   O p e r a t i o n 
 
 
 
 / / GPeR^\'`
 
 / / H o l i d a y   S c h e d u l e   E d i t   P r o p e r t i e s 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 0 8   T y p e = 1 ] 
 
 0 x 0 = ^\'`
 
 0 x 0 = P r o p e r t y 
 
 1 = W,gSpe
 
 1 = B a s i c   P a r a m e t e r 
 
 2 = 
Ty
 
 2 = N a m e 
 
 3 = GPeSpe
 
 3 = H o l i d a y   P a r a m e t e r 
 
 5 = GPe% d 
 
 5 = H o l i d a y   % d 
 
 6 = ec[vGPeN]c[vGPevTyv؏S:N*gO(u0\ n 
 
 6 = N e w   h o l i d a y   i s   t h e   s a m e   a s   t h e   d e s i g n a t e d   h o l i d a y ,   t h e   i t e m   k e e p s   u n u s e d . \ n 
 
 
 
 / / bfn
 
 / / A l a r m   S e t u p 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 0 9   T y p e = 1 ] 
 
 0 = bf
 
 0 = A l a r m 
 
 1 0 = ck(WOX[O9e
zI{. . . \ n 
 
 1 0 = S a v i n g   t h e   m o d i f i c a t i o n ,   p l e a s e   w a i t . . . \ n 
 
 1 1 = OX[[k0\ n 
 
 1 1 = S a v e   c o m p l e t e d . \ n 
 
 1 2 = c6RhV % s  bfnOX[bR0\ n 
 
 1 2 = S a v e   c o n t r o l l e r   " % s "   a l a r m   s e t u p   s u c c e s s f u l l y . \ n 
 
 1 3 = *ghKm0Rc6RhV % s  bfnO9ee OX[0\ n 
 
 1 3 = C o n t r o l l e r   " % s "   a l a r m   s e t u p   i s   n o t   m o d i f i e d ,   n o   n e e d   t o   s a v e . \ n 
 
 1 4 = OX[c6RhV % s  bfneQsYN\ n 
 
 1 4 = W h e n   s a v e   c o n t r o l l e r   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 1 5 = OX[[kFOQsN0\ n 
 
 1 5 = S a v e   c o m p l e t e d ,   b u t   i s   i n   e r r o r . \ n 
 
 1 6 = ck(Wdc6RhVvbf
zI{. . . \ n 
 
 1 6 = R e l i e v i n g   c o n t r o l l e r   a l a r m ,   p l e a s e   w a i t . . . \ n   
 
 1 7 = dbf[k0\ n 
 
 1 7 = R e l i e v e   a l a r m   c o m p l e t e d . \ n 
 
 1 8 = dc6RhV % s  vbfeQsNYN: \ n 
 
 1 8 = W h e n   r e l i e v e   c o n t r o l l e r   " % s "   a l a r m ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 1 9 = dc6RhV % s  vbfbR0\ n 
 
 1 9 = C o n t r o l l e r   " % s "   a l a r m   r e l i e v e d   s u c c e s s f u l l y . \ n 
 
 2 0 = dbf[kFOQsN0\ n 
 
 2 0 = R e l i e v e   a l a r m   c o m p l e t e d ,   b u t   i n   e r r o r . \ n 
 
 2 1 = ck(WQYN}c6RhVvbfn
zI{. . . \ n 
 
 2 1 = P r e p a r i n g   u p l o a d   c o n t r o l l e r   a l a r m   s e t u p ,   p l e a s e   w a i t . . . \ n 
 
 2 2 = N}c6RhVvbfn[k0\ n 
 
 2 2 = U p l o a d   c o n t r o l l e r   a l a r m   s e t u p   c o m p l e t e d . \ n 
 
 2 3 = N}c6RhVvbfn[kFOQsN0\ n 
 
 2 3 = U p l o a d   c o n t r o l l e r   a l a r m   s e t u p   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 2 4 =  _Y:Nc6RhV % s  N}bfn0\ n 
 
 2 4 = S t a r t   t o   u p l o a d   c o n t r o l l e r   " % s "   a l a r m   s e t u p . \ n 
 
 2 5 = c6RhV % s  vbfnN}[k0\ n 
 
 2 5 = U p l o a d   c o n t r o l l e r   " % s "   a l a r m   s e t u p   c o m p l e t e d . \ n 
 
 2 6 = :Nc6RhV % s  N}bfneQsNYN\ n 
 
 2 6 = W h e n   u p l o a d   c o n t r o l l e r   " % s "   a l a r m   s e t u p ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 2 7 = ck(W:Nc6RhV^2
zI{. . . \ n 
 
 2 7 = A c t i v a t i n g   s e c u r i t y   f o r   c o n t r o l l e r ,   p l e a s e   w a i t . . . \ n 
 
 2 8 = ^2[k0\ n 
 
 2 8 = A c t i v a t e   s e c u r i t y   c o m p l e t e d . \ n 
 
 2 9 = :Nc6RhV % s  ^2eQsNYN: \ n 
 
 2 9 = W h e n   a c t i v a t e   s e c u r i t y   f o r   c o n t r o l l e r   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 3 0 = :Nc6RhV % s  ^2bR0\ n 
 
 3 0 = A c t i v a t e   s e c u r i t y   f o r   c o n t r o l l e r   " % s "   s u c c e s s f u l l y . \ n 
 
 3 1 = ^2[kFOQsN0\ n 
 
 3 1 = A c t i v a t e   s e c u r i t y   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 3 2 = ck(W:Nc6RhVd2
zI{. . . \ n 
 
 3 2 = D i s m i s s i n g   s e c u r i t y   f o r   c o n t r o l l e r ,   p l e a s e   w a i t . . . \ n 
 
 3 3 = d2[k0\ n 
 
 3 3 = D i s m i s s   s e c u r i t y   c o m p l e t e d . \ n 
 
 3 4 = :Nc6RhV % s  d2eQsNYN: \ n 
 
 3 4 = W h e n   d i s m i s s   s e c u r i t y   f o r   c o n t r o l l e r   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 3 5 = :Nc6RhV % s  d2bR0\ n 
 
 3 5 = D i s m i s s   s e c u r i t y   f o r   c o n t r o l l e r   " % s "   s u c c e s s f u l l y . \ n 
 
 3 6 = d2[kFOQsN0\ n 
 
 3 6 = D i s m i s s   s e c u r i t y   c o m p l e t e d ,   b u t   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 
 
 / / bfn^\'`
 
 / / A l a r m   S e t u p   E d i t   P r o p e r t i e s 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 0 A   T y p e = 1 ] 
 
 0 x 0 = ^\'`
 
 0 x 0 = P r o p e r t y 
 
 1 = Q% d 
 
 1 = O u t p u t   % d 
 
 2 = ibU\Q% d 
 
 2 = E x t e n s i o n   O u t p u t   % d 
 
 3 = Q
Ty
 
 3 = O u t p u t   N a m e 
 
 4 = eQ
Ty
 
 4 = I n p u t   N a m e 
 
 5 = TR!j_
 
 5 = I n t e r w o r k   M o d e 
 
 6 = NeQTek
 
 6 = S y n c h r o n o u s   w i t h   I n p u t 
 
 7 = bf^e
 
 7 = A l a r m   D e l a y 
 
 8 = ^e( y) 
 
 8 = D e l a y   ( s ) 
 
 9 = 
NS
 
 9 = N o n - t r i g g e r 
 
 1 0 = S
 
 1 0 = T r i g g e r 
 
 1 1 = bfeQ% d 
 
 1 1 = A l a r m   I n p u t % d 
 
 1 2 = xeQ% d 
 
 1 2 = D o o r - m a g n e t   I n p u t   % d 
 
 1 3 = Q	c% d 
 
 1 3 = E x i t   B u t t o n   % d 
 
 1 4 = 4Y% d 	gHe
 
 1 4 = R e a d e r   % d   v a l i d 
 
 1 5 = 4Y% d eHe
 
 1 5 = R e a d e r   % d   I n v a l i d 
 
 1 6 = 4Y% d x
 
 1 6 = R e a d e r   % d   T h r e a t e n   C o d e   
 
 1 7 = {|W
 
 1 7 = T y p e 
 
 1 8 = ibU\bfeQ% d 
 
 1 8 = E x t e n s i o n   A l a r m   I n p u t   % d 
 
 1 9 = KbRd
 
 1 9 = M a n u a l   R e l i e v e 
 
 
 
 / / Sn
 
 / / D o o r   S e t u p 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 0 B   T y p e = 1 ] 
 
 0 = S
 
 0 = D o o r 
 
 1 = SRh
 
 1 = D o o r   L i s t 
 
 7 = ck(W7ReSRh
zI{. . . \ n 
 
 7 = R e f r e s h i n g   d o o r   l i s t ,   p l e a s e   w a i t . . . \ n 
 
 8 = 7ReSRh]~[k0\ n 
 
 8 = R e f r e s h i n g   d o o r   l i s t   c o m p l e t e d . \ n 
 
 9 = 7ReSRheNuNS	gS*gRQ0`SNpQ 7ReSRh 	c͑Ջ0\ n 
 
 9 = W h e n   r e f r e s h   d o o r   l i s t ,   e r r o r   h a p p e n s .   S o m e   d o o r s   m a y   n o t   l i s t e d .   C l i c k   " R e f r e s h   D o o r   L i s t "   t o   t r y   a g a i n . \ n 
 
 1 0 = ck(WOX[O9e
zI{. . . \ n 
 
 1 0 = S a v i n g   M o d i f i c a t i o n ,   p l e a s e   w a i t . . . \ n 
 
 1 1 = OX[[k0\ n 
 
 1 1 = S a v e   c o m p l e t e d . \ n 
 
 1 2 = S % s  OX[bR0\ n 
 
 1 2 = S a v e   d o o r   " % s "   c o m p l e t e d . \ n 
 
 1 3 = *ghKm0RS % s  O9ee OX[0\ n 
 
 1 3 = D o o r   " % s "   i s   n o t   m o d i f i e d ,   n o   n e e d   t o   s a v e . \ n 
 
 1 4 = OX[S % s  eQsYN\ n 
 
 1 4 = W h e n   s a v e   d o o r   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 1 5 = OX[[kFOQsN0\ n 
 
 1 5 = S a v e   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 1 6 = ck(W:_6RSb _S
zI{. . . \ n 
 
 1 6 = D o o r   i s   f o r c e   o p e n i n g ,   p l e a s e   w a i t . . . \ n 
 
 1 7 = :_6RSb _S[k0\ n 
 
 1 7 = F o r c e   o p e n   d o o r   c o m p l e t e d . \ n 
 
 1 8 = :_6RSb _S % s  eQsNYN\ n 
 
 1 8 = W h e n   f o r c e   o p e n   d o o r   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n   
 
 1 9 = :_6RSb _S % s  bR0\ n 
 
 1 9 = F o r c e   o p e n   d o o r   " % s "   s u c c e s s f u l l y . \ n 
 
 2 0 = :_6RSb _S[kFOQsN0\ n 
 
 2 0 = F o r c e   o p e n   d o o r   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n   
 
 2 1 = ck(W:_6RsQS
zI{. . . \ n 
 
 2 1 = F o r c e   c l o s i n g   d o o r ,   p l e a s e   w a i t . . . \ n 
 
 2 2 = :_6RsQS[k0\ n 
 
 2 2 = F o r c e   c l o s e   d o o r   c o m p l e t e d . \ n 
 
 2 3 = :_6RsQS% s  eQsNYN: \ n 
 
 2 3 = W h e n   f o r c e   c l o s e   d o o r   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 2 4 = :_6RsQS % s  bR0\ n 
 
 2 4 = F o r c e   c l o s e   d o o r   " % s "   s u c c e s s f u l l y . \ n 
 
 2 5 = :_6RsQS[kFOQsN0\ n 
 
 2 5 = F o r c e   c l o s e   d o o r   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 2 6 = ck(WdSv:_6Rr`
zI{. . . \ n 
 
 2 6 = R e l i e v i n g   d o o r   f o r c e   s t a t e ,   p l e a s e   w a i t . . . \ n 
 
 2 7 = dSv:_6Rr`[k0\ n 
 
 2 7 = R e l i e v e   d o o r   f o r c e   s t a t e   c o m p l e t e d . \ n 
 
 2 8 = dS % s  v:_6Rr`eQsNYN: \ n 
 
 2 8 = W h e n   r e l i e v e   f o r c e   s t a t e   o f   d o o r   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 2 9 = dS % s  v:_6Rr`bR0\ n 
 
 2 9 = R e l i e v e   d o o r   " % s "   f o r c e   s t a t e   s u c c e s s f u l l y . \ n 
 
 3 0 = dSv:_6Rr`[kFOQsN0\ n 
 
 3 0 = R e l i e v e   d o o r   f o r c e   s t a t e   c o m p l e t e d ,   b u t   e r r o r   h a p p e n . \ n 
 
 3 1 = ck(WQYN}Sn
zI{. . . \ n 
 
 3 1 = P r e p a r i n g   u p l o a d   d o o r   s e t u p ,   p l e a s e   w a i t . . . \ n 
 
 3 2 = N}Sn[k0\ n 
 
 3 2 = U p l o a d   d o o r   s e t u p   c o m p l e t e d . \ n 
 
 3 3 = N}Sn[kFOQsN0\ n 
 
 3 3 = U p l o a d   d o o r   s e t u p   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 3 4 =  _Y:NS % s  N}n0\ n 
 
 3 4 = S t a r t   t o   u p l o a d   s e t u p   f r o m   d o o r   " % s " . \ n 
 
 3 5 = S % s  vnN}[k0\ n 
 
 3 5 = U p l o a d   d o o r   " % s "   s e t u p   c o m p l e t e d . \ n 
 
 3 6 = :NS % s  N}neQsNYN\ n 
 
 3 6 = W h e n   u p l o a d   d o o r   " % s "   s e t u p ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 3 7 = ck(WSb _S
zI{. . . \ n 
 
 3 7 = D o o r   i s   o p e n i n g ,   p l e a s e   w a i t . . . \ n 
 
 3 8 = Sb _S % s  bR0\ n 
 
 3 8 = O p e n   d o o r   " % s "   s u c c e s s f u l l y . \ n 
 
 3 9 = Sb _S % s  eQsNYN\ n 
 
 3 9 = W h e n   o p e n   d o o r   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 4 0 = Sb _S[k0\ n 
 
 4 0 = O p e n   d o o r   c o m p l e t e d . \ n 
 
 4 1 = Sb _S[kFOQsN0\ n 
 
 4 1 = O p e n   d o o r   c o m p l e t e d ,   b u t   e r r o r   h a p p e n . \ n 
 
 4 2 = ck(WsQS
zI{. . . \ n 
 
 4 2 = D o o r   i s   c l o s i n g ,   p l e a s e   w a i t . . . \ n 
 
 4 3 = sQS % s  bR0\ n 
 
 4 3 = C l o s e   d o o r   " % s "   s u c c e s s f u l l y . \ n 
 
 4 4 = sQS % s  eQsNYN\ n 
 
 4 4 = W h e n   c l o s e   d o o r   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 4 5 = sQS[k0\ n 
 
 4 5 = C l o s e   d o o r   c o m p l e t e d . \ n 
 
 4 6 = sQS[kFOQsN0\ n 
 
 4 6 = C l o s e   d o o r   c o m p l e t e d ,   b u t   e r r o r   h a p p e n . \ n 
 
 
 
 2 0 0 1 = 7ReSRh
 
 2 0 0 1 = R e f r e s h   D o o r   L i s t 
 
 2 0 0 2 = >f:yc6RhV
Ty
 
 2 0 0 2 = D i s p l a y   C o n t r o l l e r   N a m e 
 
 2 0 0 4 = Smd\O
 
 2 0 0 4 = C a n c e l   O p e r a t i o n 
 
 
 
 / / Sn^\'`
 
 / / D o o r   S e t u p   E d i t   P r o p e r t i e s 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 0 C   T y p e = 1 ] 
 
 0 x 0 = ^\'`
 
 0 x 0 = P r o p e r t y 
 
 1 = W,gSpe
 
 1 = B a s i c   P a r a m e t e r 
 
 2 = 
Ty
 
 2 = N a m e 
 
 3 = S^S
 
 3 = D o o r   S e r i a l   N u m b e r 
 
 4 = ~5uhV
 
 4 = D o o r   L o c k   R e l a y 
 
 5 = 8^ _hTR
 
 5 = N o r m a l - o p e n   W e e k   S c h e d u l e   
 
 6 = Q	cSpe
 
 6 = E x i t   B u t t o n   P a r a m e t e r 
 
 7 = 	c{|W
 
 7 = B u t t o n   T y p e 
 
 8 = 	c1YHehTR
 
 8 = D i s a b l e   E x i t   B u t t o n 
 
 9 = xSpe
 
 9 = D o o r - m a g n e t   P a r a m e t e r 
 
 1 0 = x{|W
 
 1 0 = D o o r - m a g n e t   T y p e 
 
 1 1 =  _ee( y) 
 
 1 1 = T i m e   o f   D o o r - o p e n   T i m e o u t   ( s ) 
 
 1 2 = ^e( y) 
 
 1 2 = D o o r   L o c k   d e l a y   ( s ) 
 
 1 3 = 4Y1 Spe
 
 1 3 = R e a d e r   1   P a r a m e t e r 
 
 1 4 = 4Y1 
Ty
 
 1 4 = N a m e 
 
 1 5 = 4Y1 ^S
 
 1 5 = N u m b e r 
 
 1 6 = 4Y1 Sce!j_
 
 1 6 = A u t h e n t i c a t i o n   M o d e   o f   C o n t r o l l e d   T i m e   
 
 1 7 = 4Y1 ^Sce!j_
 
 1 7 = A u t h e n t i c a t i o n   M o d e   o f   U n c o n t r o l l e d   T i m e 
 
 1 8 = 4Y1 aS
 
 1 8 = F i r s t - c a r d   A u t h e n t i c a t i o n 
 
 1 9 = 4Y1 YaS
 
 1 9 = M u l t i - c a r d   A u t h e n t i c a t i o n 
 
 2 0 = 4Y1 ܏z
 
 2 0 = R e m o t e   A u t h e n t i c a t i o n 
 
 2 1 = 4Y1 x
 
 2 1 = T h r e a t e n   C o d e 
 
 2 5 = 7RaS _
 
 2 5 = O p e n   b y   C a r d 
 
 2 6 = [x _
 
 2 6 = O p e n   b y   P a s s w o r d 
 
 2 7 = 7RaSb[x _
 
 2 7 = O p e n   b y   C a r d   o r   P a s s w o r d 
 
 2 8 = 7RaS+ [x _
 
 2 8 = O p e n   b y   C a r d   +   P a s s w o r d 
 
 2 9 = ybk _
 
 2 9 = F o r b i d   t o   O p e n 
 
 3 0 = e aS
 
 3 0 = N o   N e e d   F i r s t - c a r d   A u t h e n t i c a t i o n 
 
 3 1 = k)YaS
 
 3 1 = F i r s t - c a r d   A u t h e n t i c a t i o n   f o r   E v e r y d a y . 
 
 3 2 = k!kaS
 
 3 2 = F i r s t - c a r d   A u t h e n t i c a t i o n   f o r   e v e r y t i m e 
 
 3 3 = USaS
 
 3 3 = S i n g l e   C a r d 
 
 3 4 = SaS
 
 3 4 = D o u b l e   C a r d s 
 
 3 5 = 	NaS
 
 3 5 = T h r e e   C a r d s 
 
 3 6 = VaS
 
 3 6 = F o u r   C a r d s 
 
 3 7 = 8^ _ybkGPeR
 
 3 7 = N o r m a l - o p e n   f o r b i d   h o l i d a y   s c h e d u l e 
 
 4 2 = 4Y2 Spe
 
 4 2 = R e a d e r   2   P a r a m e t e r 
 
 4 3 = 4Y2 
Ty
 
 4 3 = N a m e   
 
 4 4 = 4Y2 ^S
 
 4 4 = N u m b e r   
 
 4 5 = 4Y2 Sce!j_
 
 4 5 = A u t h e n t i c a t i o n   M o d e   o f   C o n t r o l l e d   T i m e 
 
 4 6 = 4Y2 ^Sce!j_
 
 4 6 = A u t h e n t i c a t i o n   M o d e   U n c o n t r o l l e d   T i m e 
 
 4 7 = 4Y2 aS
 
 4 7 = F i r s t - c a r d   A u t h e n t i c a t i o n 
 
 4 8 = 4Y2 YaS
 
 4 8 = M u l t i - c a r d   A u t h e n t i c a t i o n 
 
 4 9 = 4Y2 ܏z
 
 4 9 = R e m o t e   A u t h e n t i c a t i o n 
 
 5 0 = 4Y2 x
 
 5 0 = T h r e a t e n   C o d e 
 
 5 1 =  _!j_
 
 5 1 = O p e n   M o d e 
 
 5 2 = nf!j_
 
 5 2 = N o r m a l   M o d e 
 
 5 3 = h!j_
 
 5 3 = L a t c h   M o d e 
 
 5 4 = 7RaS8^ _
 
 5 4 = P r e s e n t   C a r d   N o r m a l   O p e n 
 
 5 5 = ꁨR8^ _
 
 5 5 = N o r m a l   o p e n   a u t o m a t i c a l l y 
 
 6 0 = SnShTReQsNYN\ n 
 
 6 0 = W h e n   d o o r   s e t u p   a c q u i r e s   w e e k   s c h e d u l e ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 6 1 = PՋ	SS N*NSNO͑eShTR0\ n 
 
 6 1 = T o   r e - a c q u i r e   w e e k   s c h e d u l e ,   p l e a s e   t r y   a n o t h e r   d o o r . \ n 
 
 6 2 = fJT\ n T Nc6RhVv
NTSO(uNvTvQ~5uhVZP:NQ0\ n 
 
 6 2 = W a r n i n g : \ n D i f f e r e n t   d o o r s   u s e   t h e   s a m e   d e l a y . \ n             
 
 6 3 = SnSGPeReQsNYN\ n 
 
 6 3 = E r r o r   h a p p e n ,   w h e n   d o o r   s e t u p   a c q u i r e s   h o l i d a y   s c h e d u l e : \ n 
 
 6 4 = PՋ	SS N*NSNO͑eSGPeR0\ n 
 
 6 4 = P l e a s e   t r y   t o   s e l e c t   a n o t h e r   d o o r ,   t o   g e t   h o l i d a y   s c h e d u l e   a g a i n . \ n 
 
 
 
 7 0 = c~ _
 
 7 0 = O p e n   b y   F i n g e r p r i n t 
 
 7 1 = c~b7RaS _
 
 7 1 = O p e n   b y   F i n g e r p r i n t   o r   C a r d 
 
 7 2 = c~+ 7RaS _
 
 7 2 = O p e n   b y   F i n g e r p r i n t   +   C a r d 
 
 7 3 = c~+ 7RaS+ [x _
 
 7 3 = O p e n   b y   F i n g e r p r i n t   +   C a r d   +   P a s s w o r d 
 
 7 4 = c~b[x _
 
 7 4 = O p e n   b y   F i n g e r p r i n t   o r   P a s s w o r d 
 
 7 5 = c~+ [x _
 
 7 5 = O p e n   b y   F i n g e r p r i n t   +   P a s s w o r d 
 
 7 9 = c~b[xb7RaS _
 
 7 9 = O p e n   b y   F i n g e r p r i n t   o r   P a s s w o r d   o r   C a r d 
 
 
 
 / / LCgP~
 
 / / A c c e s s   g r o u p 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 0 D   T y p e = 1 ] 
 
 0 = LCgP~
 
 0 = A c c e s s   G r o u p 
 
 1 = LCgP~Rh
 
 1 = A c c e s s   G r o u p   L i s t 
 
 2 = eCgP~
 
 2 = N e w   A c c e s s   G r o u p   
 
 3 = ybkL~
 
 3 = F o r b i d   A c c e s s   G r o u p 
 
 4 = {tXT~
 
 4 = A d m i n i s t r a t o r   G r o u p 
 
 7 = ck(W7ReLCgP~Rh
zI{. . . \ n 
 
 7 = R e f r e s h i n g   a c c e s s   g r o u p   l i s t ,   p l e a s e   w a i t . . . \ n 
 
 8 = 7ReLCgP~Rh]~[k0\ n 
 
 8 = R e f r e s h i n g   a c c e s s   g r o u p   l i s t   c o m p l e t e d . \ n 
 
 9 = 7ReLCgP~RheNuNS	gLCgP~*gRQ0`SNpQ 7ReLCgP~ 	c͑Ջ0\ n 
 
 9 = W h e n   r e f r e s h   a c c e s s   g r o u p   l i s t ,   e r r o r   h a p p e n s .   S o m e   a c c e s s   g r o u p s   m a y   n o t   l i s t e d .   C l i c k   " R e f r e s h   A c c e s s   G r o u p "   t o   t r y   a g a i n . \ n     
 
 1 0 = ck(WOX[O9e
zI{. . . \ n 
 
 1 0 = S a v i n g   m o d i f i c a t i o n ,   p l e a s e   w a i t . . . \ n 
 
 1 1 = OX[[k0\ n 
 
 1 1 = S a v e   c o m p l e t e d . \ n 
 
 1 2 = LCgP~ % s  OX[bR0\ n 
 
 1 2 = S a v e   a c c e s s   g r o u p   " % s "   s u c c e s s f u l l y . \ n 
 
 1 4 = OX[LCgP~ % s  eQsYN\ n 
 
 1 4 = W h e n   s a v e   a c c e s s   g r o u p   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 1 5 = OX[[kFOQsN0\ n 
 
 1 5 = S a v e   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 1 7 = ck(W RdLCgP~
zI{. . . \ n 
 
 1 7 = D e l e t i n g   a c c e s s   g r o u p ,   p l e a s e   w a i t . . . \ n 
 
 1 8 =  Rd[k0\ n 
 
 1 8 = D e l e t e   c o m p l e t e d . \ n 
 
 1 9 =  Rd[kFOQsN0\ n 
 
 1 9 = D e l e t e   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 2 0 =  RdLCgP~ % s  eQsNYN\ n 
 
 2 0 = W h e n   d e l e t e   a c c e s s   g r o u p   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 2 1 =  RdLCgP~ % s  bR0\ n 
 
 2 1 = D e l e t e   a c c e s s   g r o u p   " % s "   s u c c e s s f u l l y . \ n 
 
 2 2 = ck(WS@b	g4YOo`
zI{. . . \ n 
 
 2 2 = A c q u i r i n g   a l l   r e a d e r   i n f o r m a t i o n ,   p l e a s e   w a i t . . . \ n 
 
 2 3 = S4YOo`[k0\ n 
 
 2 3 = A c q u i r e   r e a d e r   i n f o r m a t i o n   c o m p l e t e d . \ n 
 
 2 4 = S4YOo`eNuNLCgP~n ُNOo`LCgP~*gRQ`SNpQ 7ReLCgP~ 	c͑Ջ0\ n 
 
 2 4 = W h e n   a c q u i r e   r e a d e r ,   e r r o r   h a p p e n s .   A c c e s s   g r o u p   s e t u p   n e e d   t h e   r e a d e r   i n f o r m a t i o n   a n d   a c c e s s   g r o u p   i s   n o t   l i s t e d .   C l i c k   " R e f r e s h   a c c e s s   g r o u p "   t o   t r y   a g a i n . \ n 
 
 2 5 = LCgP~*gRQ`SNpQ 7ReLCgP~ 	c͑Ջ0\ n 
 
 2 5 = A c c e s s   g r o u p   s e t u p   n e e d   t h e   r e a d e r   i n f o r m a t i o n   a n d   a c c e s s   g r o u p   i s   n o t   l i s t e d .   C l i c k   " R e f r e s h   a c c e s s   g r o u p "   t o   t r y   a g a i n . \ n 
 
 2 6 = ck(WS@b	ghTR
zI{. . . \ n 
 
 2 6 = A c q u i r i n g   a l l   w e e k   s c h e d u l e ,   p l e a s e   w a i t . . . \ n 
 
 2 7 = ShTR[k0\ n 
 
 2 7 = A c q u i r e   w e e k   s c h e d u l e   c o m p l e t e d . \ n 
 
 2 8 = ShTReNuNLCgP~n ُNOo`LCgP~*gRQ`SNpQ 7ReLCgP~ 	c͑Ջ0\ n 
 
 2 8 = W h e n   a c q u i r e   w e e k   s c h e d u l e ,   e r r o r   h a p p e n s .   A c c e s s   g r o u p   s e t u p   n e e d   t h e   i n f o r m a t i o n   a n d   a c c e s s   g r o u p   i s   n o t   l i s t e d .   C l i c k   " R e f r e s h   a c c e s s   g r o u p "   t o   t r y   a g a i n . \ n 
 
 2 9 = ck(WS@b	gGPeR
zI{. . . \ n 
 
 2 9 = A c q u i r i n g   a l l   h o l i d a y   s c h e d u l e ,   p l e a s e   w a i t . . . \ n 
 
 3 0 = SGPeR[k0\ n 
 
 3 0 = A c q u i r e   h o l i d a y   s c h e d u l e   c o m p l e t e d . \ n 
 
 3 1 = SGPeReNuNLCgP~n ُNOo`LCgP~*gRQ`SNpQ 7ReLCgP~ 	c͑Ջ0\ n 
 
 3 1 = W h e n   a c q u i r e   h o l i d a y   s c h e d u l e ,   e r r o r   h a p p e n s .   A c c e s s   g r o u p   s e t u p   n e e d   t h e   i n f o r m a t i o n   a n d   a c c e s s   g r o u p   i s   n o t   l i s t e d .   C l i c k   " R e f r e s h   a c c e s s   g r o u p "   t o   t r y   a g a i n . \ n   
 
 3 2 = ck(WX[4Ypenc
zI{. . . \ n 
 
 3 2 = C a c h i n g   r e a d e r   d a t a ,   p l e a s e   w a i t . . . \ n 
 
 3 3 = 4YpencX[[k0\ n 
 
 3 3 = C a c h i n g   r e a d e r   c o m p l e t e d . \ n 
 
 3 4 = X[4YpenceQsNYN[elOX[CgP~: \ n 
 
 3 4 = W h e n   c a s h e   r e a d e r .   T h e   a c c e s s   g r o u p   c a n   n o t   b e   s a v e d : \ n 
 
 3 5 = ck(WNc6RhV RdLCgP~
zI{. . . \ n 
 
 3 5 = D e l e t i n g   a c c e s s   c o n t r o l   g r o u p   f r o m   c o n t r o l l e r ,   p l e a s e   w a i t . . . \ n 
 
 3 6 = Nc6RhV RdLCgP~ % s  bR0\ n 
 
 3 6 = D e l e t i n g   a c c e s s   c o n t r o l   g r o u p   " % s "   s u c c e s s f u l l y .   \ n   
 
 3 7 = Nc6RhV RdLCgP~ % s  eQsNYN\ n 
 
 3 7 = W h e n   d e l e t e   a c c e s s   c o n t r o l   g r o u p   " % s "   f r o m   c o n t r o l l e r ,   f o l l o w i n g   e r r o r   h a p p e n s :   \ n 
 
 3 8 = Nc6RhV RdLCgP~[k0\ n 
 
 3 8 = D e l e t i n g   a c c e s s   c o n t r o l   g r o u p   f r o m   c o n t r o l l e r   c o m p l e t e d .   \ n 
 
 3 9 = Nc6RhV RdLCgP~[kFOQsN0\ n 
 
 3 9 = D e l e t i n g   a c c e s s   c o n t r o l   g r o u p   f r o m   c o n t r o l l e r   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s .   \ n 
 
 4 0 = l	gc6RhVe  Rd0\ n 
 
 4 0 = N o   c o n t r o l l e r ,   d o   n o t   n e e d   d e l e t e .   \ n 
 
 4 1 = Sc6RhVOo`QsNYN\ n 
 
 4 1 = W h e n   a c q u i r e   c o n t r o l l e r   i n f o r m a t i o n ,   f o l l o w i n g   e r r o r   h a p p e n s :   \ n 
 
 4 2 = ck(WN}LCgP~0Rc6RhV
zI{. . . \ n 
 
 4 2 = U p l o a d i n g   a c c e s s   c o n t r o l   g r o u p   t o   c o n t r o l l e r ,   p l e a s e   w a i t . . . \ n 
 
 4 3 = N}LCgP~ % s  bR0\ n 
 
 4 3 = d o w n o a d i n g   a c c e s s   c o n t r o l   g r o u p   " % s "   s u c c e s s f u l l y .   \ n 
 
 4 4 = N}LCgP~ % s  eQsNYN\ n 
 
 4 4 = W h e n   u p l o a d   a c c e s s   c o n t r o l   g r o u p   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s :   \ n 
 
 4 5 = N}LCgP~0Rc6RhV[k0\ n 
 
 4 5 = U p l o a d i n g   a c c e s s   c o n t r o l   g r o u p   c o m p l e t e d .   \ n 
 
 4 6 = N}LCgP~0Rc6RhV[kFOQsN0\ n 
 
 4 6 = U p l o a d i n g   a c c e s s   c o n t r o l   g r o u p   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s .   \ n 
 
 4 7 = l	gc6RhVe N}0\ n 
 
 4 7 = N o   c o n t r o l l e r ,   d o   n o t   n e e d   u p l o a d .   \ n 
 
 4 8 = Sc6RhVOo`QsNYN\ n 
 
 4 8 = W h e n   a c q u i r e   c o n t r o l l e r   i n f o r m a t i o n ,   f o l l o w i n g   e r r o r   h a p p e n s :   \ n 
 
 6 0 = LCgP~nS~4YOo`eQsNYN\ n 
 
 6 0 = W h e n   a c c e s s   g r o u p   s e t u p   i s   a c q u i r i n g   r e a d e r   i n f o r m a t i o n ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 6 1 = PՋ	SS N*NLCgP~NO͑eS~4YOo`0\ n 
 
 6 1 = T o   r e - a c q u i r e   r e a d e r   i n f o r m a t i o n ,   p l e a s e   t r y   t o   s e l e c t   a n o t h e r   a c c e s s   g r o u p . \ n 
 
 
 
 
 
 6 6 = 	LCgP~N
Y6RLCgP~vTe 
Y6R0\ n 
 
 6 6 = T h e   a c c e s s   g r o u p s e l e c t e d   i s   s a m e   w i t h   t h e   c o p i e d . \ n 
 
 6 7 = ck(W
Y6R^\'`0R	LCgP~
zI{. . . \ n 
 
 6 7 = C o p i n g ,   p l e a s e   w a i t . . . \ n 
 
 6 8 = 
Y6RLCgP^\'`[k0\ n 
 
 6 8 = C o p y   c o m p l e t e d . \ n 
 
 6 9 = 
Y6RLCgP^\'`[kFOQsN0\ n 
 
 6 9 = C o p y   c o m p l e t e d ,   b u t   i n   e r r o r . \ n 
 
 7 0 = :N % s  
Y6RLCgP^\'`eQsNYN\ n 
 
 7 0 = F o l l o w i n g   e r r o r   h a p p e n s   w h e n   c o p y   a c c e s s   p e r m i s s i o n s   f o r     " % s " : \ n 
 
 7 1 = :N % s  
Y6RLCgP^\'`bR0\ n 
 
 7 1 = C o p y   a c c e s s   p e r m i s s i o n s   f o r     " % s "   s u c c e s s f u l l y . \ n 
 
 
 
 
 
 
 
 2 0 0 1 = 7ReLCgP~
 
 2 0 0 1 = R e f r e s h   A c c e s s   G r o u p 
 
 2 0 0 4 = Smd\O
 
 2 0 0 4 = C a n c e l   O p e r a t i o n 
 
 
 
 / / LCgP~^\'`
 
 / / A c c e s s   G r o u p   E d i t   P r o p e r t i e s 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 0 E   T y p e = 1 ] 
 
 0 x 0 = ^\'`
 
 0 x 0 = P r o p e r t y 
 
 1 = W,gSpe
 
 1 = B a s i c   P a r a m e t e r 
 
 2 = 
Ty
 
 2 = N a m e 
 
 3 = LSpe
 
 3 = A c c e s s   P a r a m e t e r 
 
 5 = 4Y
 
 5 = R e a d e r 
 
 6 = c6RhV
 
 6 = C o n t r o l l e r 
 
 7 = 4Y^S
 
 7 = R e a d e r   S e r i a l   N u m b e r 
 
 8 = S
 
 8 = D o o r 
 
 9 = AQ
 
 9 = P e r m i t   A c c e s s   
 
 1 0 = hTR
 
 1 0 = W e e k   S c h e d u l e 
 
 1 1 = GPeR
 
 1 1 = H o l i d a y   S c h e d u l e 
 
 
 
 / / 
 
 / / D e p a r t m e n t 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 0 F   T y p e = 1 ] 
 
 0 = 
 
 0 = D e p a r t m e n t 
 
 1 = Rh
 
 1 = D e p a r t m e n t   L i s t 
 
 2 = e
 
 2 = N e w   D e p a r t m e n t 
 
 7 = ck(W7ReRh
zI{. . . \ n 
 
 7 = R e f r e s h i n g   d e p a r t m e n t   l i s t ,   p l e a s e   w a i t . . . \ n 
 
 8 = 7ReRh]~[k0\ n 
 
 8 = R e f r e s h   d e p a r t m e n t   c o m p l e t e d . \ n 
 
 9 = 7ReRheNuNS	g*gRQ0`SNpQ 7Re 	c͑Ջ0\ n 
 
 9 = W h e n   r e f r e s h   d e p a r t m e n t   l i s t ,   e r r o r   h a p p e n s .   S o m e   d e p a r t m e n t s   m a y   n o t   b e   l i s t e d ,   c l i c k   o n   " R e f r e s h   d e p a r t m e n t   l i s t "   t o   r e t r y . \ n 
 
 1 0 = ck(WOX[O9e
zI{. . . \ n 
 
 1 0 = S a v i n g   m o d i f i c a t i o n ,   p l e a s e   w a i t . . . \ n 
 
 1 1 = OX[[k0\ n 
 
 1 1 = S a v e   c o m p l e t e d . \ n 
 
 1 2 =  % s  OX[bR0\ n 
 
 1 2 = S a v e   d e p a r t m e n t   " % s "   s u c c e s s f u l l y . \ n 
 
 1 4 = OX[ % s  eQsYN\ n 
 
 1 4 = W h e n   s a v e   d e p a r t m e n t   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 1 5 = OX[[kFOQsN0\ n 
 
 1 5 = S a v e   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 1 7 = ck(W Rd
zI{. . . \ n 
 
 1 7 = D e l e t i n g   d e p a r t m e n t ,   p l e a s e   w a i t . . . \ n 
 
 1 8 =  Rd[k0\ n 
 
 1 8 = D e l e t e   c o m p l e t e d . \ n 
 
 1 9 =  Rd[kFOQsN0\ n 
 
 1 9 = D e l e t e   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 2 0 =  Rd % s  eQsNYN\ n 
 
 2 0 = W h e n   d e l e t e   d e p a r t m e n t   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 2 1 =  Rd % s  bR0\ n 
 
 2 1 = D e l e t e   d e p a r t m e n t   " % s "   s u c c e s s f u l l y . \ n 
 
 
 
 2 0 0 1 = 7ReRh
 
 2 0 0 1 = R e f r e s h   D e p a r t m e n t   L i s t 
 
 2 0 0 4 = Smd\O
 
 2 0 0 4 = C a n c e l   O p e r a t i o n 
 
 
 
 / / ^\'`
 
 / / D e p a r t m e n t   E d i t   P r o p e r t y 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 1 0   T y p e = 1 ] 
 
 0 x 0 = ^\'`
 
 0 x 0 = P r o p e r t y 
 
 1 = W,gSpe
 
 1 = B a s i c   P a r a m e t e r 
 
 2 = 
Ty
 
 2 = N a m e 
 
 
 
 / / aSn
 
 / / C a r d   S e t u p 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 1 1   T y p e = 1 ] 
 
 0 = aS
 
 0 = C a r d   
 
 1 = aSS
 
 1 = C a r d   N u m b e r 
 
 2 = caSNXT
 
 2 = C a r d   H o l d e r 
 
 3 = r`
 
 3 = S t a t e 
 
 4 = RaSe- Am4lS
 
 4 = T i m e   o f   a d d i n g   c a r d - R u n n i n g   N u m b e r 
 
 1 2 = ]RM
 
 1 2 = D i s t r i b u t e d 
 
 1 3 = *gRM
 
 1 3 = N o n - d i s t r i b u t e d 
 
 1 4 = ]c1Y
 
 1 4 = R e p o r t e d   l o s t   c a r d 
 
 2 0 = ck(WSaSRh
zI{. . . \ n 
 
 2 0 = A c q u i r i n g   c a r d   l i s t ,   p l e a s e   w a i t . . . \ n 
 
 2 1 = SaSRh]~[k0\ n 
 
 2 1 = A c q u i r e   c a r d   l i s t   c o m p l e t e d . \ n 
 
 2 2 = SaSRheNuNS,gu	gaS*gRQ0`SNpQ 7Re,gu 	c͑Ջ0\ n 
 
 2 2 = W h e n   a c q u i r e   l i s t ,   e r r o r   h a p p e n s .   S o m e   c a r d s   o f   t h i s   p a g e   m a y   n o t   b e   l i s t e d .   C l i c k   " R e f r e s h   t h i s   p a g e "   t o   t r y   a g a i n . \ n 
 
 2 3 = ck(Wc1YaS
zI{. . . \ n 
 
 2 3 = R e p o r t i n g   l o s t   c a r d ,   p l e a s e   w a i t . . . \ n 
 
 2 4 = c1YaS[k0\ n 
 
 2 4 = R e p o r t   l o s t   c a r d   c o m p l e t e d . \ n 
 
 2 5 = aS % s  c1YbR0\ n 
 
 2 5 = R e p o r t   l o s t   C a r d   " % s "   s u c c e s s f u l l y . \ n 
 
 2 6 = c1YaS % s  eQsYN\ n 
 
 2 6 = W h e n   r e p o r t   l o s t   c a r d   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 2 7 = c1YaS[kFOQsN0\ n 
 
 2 7 = R e p o r t   l o s s   c a r d   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 2 8 = ck(W RdaS
zI{. . . \ n 
 
 2 8 = D e l e t i n g   c a r d ,   p l e a s e   w a i t . . . \ n 
 
 2 9 =  RdaS[k0\ n 
 
 2 9 = D e l e t e   c a r d   c o m p l e t e d . \ n 
 
 3 0 =  RdaS[kFOQsN0\ n 
 
 3 0 = D e l e t e   c a r d   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 3 1 =  RdaS % s  eQsNYN\ n 
 
 3 1 = W h e n   d e l e t e   c a r d   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 3 2 =  RdaS % s  bR0\ n 
 
 3 2 = D e l e t e   c a r d   " % s "   s u c c e s s f u l l y . \ n 
 
 3 3 = ck(WcaS
zI{. . . \ n 
 
 3 3 = R e l i e v i n g   r e p o r t   l o s t   c a r d ,   p l e a s e   w a i t . . . \ n 
 
 3 4 = caS[k0\ n 
 
 3 4 = R e l i e v e   r e p o r t   l o s t   c a r d   c o m p l e t e d . \ n 
 
 3 5 = caS[kFOQsN0\ n 
 
 3 5 = R e l i e v e   r e p o r t   l o s t   c a r d   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 3 6 = caS % s  eQsNYN\ n 
 
 3 6 = W h e n   r e l i e v e   r e p o r t   l o s t   c a r d   " % s " ,   e r r o r   h a p p e n s . \ n 
 
 3 7 = caS % s  bR0\ n 
 
 3 7 = R e l i e v e   r e p o r t   l o s t   c a r d   " % s "   s u c c e s s f u l l y . \ n 
 
 3 8 = ck(WXRaS
zI{. . . \ n 
 
 3 8 = A d d i n g   c a r d ,   p l e a s e   w a i t . . . \ n 
 
 3 9 = XRaS[k0\ n 
 
 3 9 = A d d   c a r d   c o m p l e t e d . \ n 
 
 4 0 = XRaS % s  eQsNYN: \ n 
 
 4 0 = W h e n   a d d   c a r d   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 4 1 = XRaS[kFOQsN0\ n 
 
 4 1 = A d d   c a r d   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 4 2 = la\ n SaShVSaSMRnxSaShV]~N,g{:gޏc0\ n Smd\OMR
N	c.vpeW[.bVf.&TRS[􁷃_vaSS
Ncknx0\ n `nx[~~T
 
 4 2 = N o t i c e : \ n P l e a s e   m a k e   s u r e   c a r d   d i s t r i b u t o r   i s   c o n n e c t e d   w i t h   P C   b e f o r e   d i s t r i b u t i n g   c a r d . \ n P l e a s e   d o   n o t   p r e s s   a n y   n u m b e r   o n   k e y b o a r d   o r   E n t e r   b e f o r e   c a n c e l   o p e r a t i o n ,   o t h e r w i s e   t h e   s y s t e m   m a y   a c q u i r e   i n c o r r e c t   c a r d   n u m b e r . \ n A r e   y o u   s u r e   t o   c o n t i n u e ? \ n     
 
 4 3 = el/TRc6RhVRaS͑Ջ0\ n 
 
 4 3 = C o n t r o l l e r   c a n   n o t   a d d   c a r d ,   p l e a s e   t r y   a g a i n . \ n 
 
 4 4 = aSSQV0\ n 
 
 4 4 = C a r d   n u m b e r   f a l l   o u t s i d e . \ n 
 
 4 5 = c6RhVRaS]/TR(W`	bvc6RhVv4Y7RaS0\ n 
 
 4 5 = C o n t r o l l e r   s t a r t   t o   a d d   c a r d ,   p l e a s e   s e l e c t   t h e   r e a d e r   c o n n e c t e d   w i t h   c o n t r o l l e r . \ n 
 
 4 6 = QsYN[c6RhVRaS\Pbk\ n 
 
 4 6 = C o n t r o l l e r   s t o p   a d d i n g   c a r d ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 4 7 = c6RhVRaS]\Pbk0\ n 
 
 4 7 = C o n t r o l l e r   s t o p p e d   a d d i n g   c a r d . \ n 
 
 
 
 / / KbRRaS
 
 / / A d d   c a r d   b y   h a n d   i n   s o f t w a r e 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 1 2   T y p e = 1 ] 
 
 0 = RaS  -   c[aSSV
 
 0 = A d d   c a r d   -   A p p o i n t   C a r d   R a n g e 
 
 1 = wYaSS
 
 1 = S t a r t i n g   C a r d   N u m b e r 
 
 2 = ~_gaSS
 
 2 = E n d   C a r d   N u m b e r 
 
 3 = sS\ReQ % I 6 4 u   % I 6 4 u  qQ% I 6 4 u  _aS`nx[~~T\ n 
 
 3 = W i l l   b e   a d d e d   " % I 6 4 u "   t o   " % I 6 4 u "   ,   t o t a l   " % I 6 4 u "   c a r d s .   A r e   y o u   s u r e   t o   c o n t i n u e ? \ n 
 
 
 
 / / 	bc6RhV
 
 / / S e l e c t   C o n t r o l l e r 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 1 3   T y p e = 1 ] 
 
 0 = 	bc6RhV
 
 0 = S e l e c t   C o n t r o l l e r 
 
 1 = `؏l	gXRc6RhVelO(udkR0\ n 
 
 1 = N o   c o n t r o l l e r   a d d e d ,   c a n   n o t   u s e   t h i s   f u n c t i o n . \ n 
 
 2 = Sc6RhVRheQsNYN\ n 
 
 2 = W h e n   a c q u i r e   c o n t r o l l e r   l i s t ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 
 
 / / NXTn
 
 / / E m p l o y e e   S e t u p 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 1 4   T y p e = 1 ] 
 
 0 = NXT
 
 0 = E m p l o y e e 
 
 1 = NXTRh
 
 1 = E m p l o y e e   L i s t 
 
 2 = eNXT
 
 2 = N e w   E m p l o y e e   
 
 7 = ck(WSNXTRh
zI{. . . \ n 
 
 7 = A c q u i r i n g   E m p l o y e e   l i s t ,   p l e a s e   w a i t . . . \ n 
 
 8 = SNXTRh]~[k0\ n 
 
 8 = A c q u i r e   E m p l o y e e   l i s t   c o m p l e t e d . \ n 
 
 9 = SNXTRheNuNS,gu	gNXT*gRQ0`SNpQ 7Re,gu 	c͑Ջ0\ n 
 
 9 = W h e n   a c q u i r e   E m p l o y e e   l i s t ,   e r r o r   h a p p e n s .   S o m e   E m p l o y e e s   o f   t h i s   p a g e   m a y   n o t   l i s t e d .   C l i c k   " R e f r e s h   T h i s   P a g e "   t o   t r y   a g a i n . \ n 
 
 1 0 = ck(WOX[O9e
zI{. . . \ n 
 
 1 0 = S a v i n g   m o d i f i c a t i o n ,   p l e a s e   w a i t . . . \ n 
 
 1 1 = OX[[k0\ n 
 
 1 1 = S a v e   c o m p l e t e d . \ n 
 
 1 2 = NXT % s  OX[bR0\ n 
 
 1 2 = S a v e   E m p l o y e e   " % s "   c o m p l e t e d . \ n 
 
 1 3 = *ghKm0RNXT % s  O9ee OX[0\ n 
 
 1 3 = E m p l o y e e   " % s "   i s   n o t   m o d i f i e d ,   n o   n e e d   t o   s a v e . \ n 
 
 1 4 = OX[NXT % s  eQsYN\ n 
 
 1 4 = W h e n   s a v e   E m p l o y e e   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 1 5 = OX[[kFOQsN0\ n 
 
 1 5 = S a v e   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 1 6 =  RdNXT\O[N RdNXTvsQv7RaSU_vNXTOo`"N1YvQ[|~_NS	g{|<O`Q`nx[~~T\ n 
 
 1 6 = D e l e t e   e m p l o y e e   w i l l   l o s e   a l l   i n f o r m a t i o n   o f   t h e   e m p l o y e e .   T h i s   m a y   h a p p e n   t o   o t h e r   s y s t e m s   t o o ,   a r e   y o u   s u r e   t o   c o n t i n u e ?   \ n 
 
 1 7 = ck(W RdNXT
zI{. . . \ n 
 
 1 7 = D e l e t i n g   E m p l o y e e ,   p l e a s e   w a i t . . . \ n 
 
 1 8 =  Rd[k0\ n 
 
 1 8 = D e l e t e   c o m p l e t e d . \ n 
 
 1 9 =  Rd[kFOQsN0\ n 
 
 1 9 = D e l e t e   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 2 0 =  RdNXT % s  eQsNYN\ n 
 
 2 0 = W h e n   d e l e t e   E m p l o y e e   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 2 1 =  RdNXT % s  bR0\ n 
 
 2 1 = D e l e t e   E m p l o y e e   " % s "   s u c c e s s f u l l y . \ n 
 
 2 2 = ck(WNc6RhV RdNXT
zI{. . . \ n 
 
 2 2 = D e l e t i n g   e m p l o y e e   i n f o   f r o m   c o n t r o l l e r ,   p l e a s e   w a i t . . . \ n 
 
 2 3 = Nc6RhV RdNXT % s  bR0\ n 
 
 2 3 = D e l e t i n g   e m p l o y e e   i n f o   " % s "   f r o m   c o n t r o l l e r   s u c c e s s f u l l y .   \ n 
 
 2 4 = Nc6RhV RdNXT % s  eQsNYN\ n 
 
 2 4 = W h e n   d e l e t e   e m p l o y e e   i n f o   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s :   \ n 
 
 2 5 = Nc6RhV RdNXT[k0\ n 
 
 2 5 = D e l e t i n g   e m p l o y e e   i n f o   f r o m   c o n t r o l l e r   c o m p l e t e d .   \ n 
 
 2 6 = Nc6RhV RdNXT[kFOQsN0\ n 
 
 2 6 = D e l e t i n g   e m p l o y e e   i n f o   f r o m   c o n t r o l l e r   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s .   \ n 
 
 2 7 = l	gc6RhVe  Rd0\ n 
 
 2 7 = N o   c o n t r o l l e r ,   d o   n o t   n e e d   d e l e t e .   \ n 
 
 2 8 = Sc6RhVOo`QsNYN\ n 
 
 2 8 = W h e n   a c q u i r e   c o n t r o l l e r   i n f o r m a t i o n ,   f o l l o w i n g   e r r o r   h a p p e n s :   \ n 
 
 2 9 = ck(WN}NXT0Rc6RhV
zI{. . . \ n 
 
 2 9 = U p l o a d i n g   e m p l o y e e   i n f o   t o   c o n t r o l l e r ,   p l e a s e   w a i t . . . \ n 
 
 3 0 = N}NXT % s  bR0\ n 
 
 3 0 = U p l o a d   e m p l o y e e   i n f o   " % s "   s u c c e s s f u l l y .   \ n 
 
 3 1 = N}NXT % s  eQsNYN\ n 
 
 3 1 = W h e n   u p l o a d   e m p l o y e e   i n f o   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s :   \ n 
 
 3 2 = N}NXT0Rc6RhV[k0\ n 
 
 3 2 = U p l o a d i n g   e m p l o y e e   i n f o   t o   c o n t r o l l e r   c o m p l e t e d .   \ n 
 
 3 3 = N}NXT0Rc6RhV[kFOQsN0\ n 
 
 3 3 = U p l o a d i n g   e m p l o y e e   i n f o   t o   c o n t r o l l e r   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s .   \ n 
 
 3 4 = l	gc6RhVe N}0\ n 
 
 3 4 = N o   c o n t r o l l e r ,   d o   n o t   n e e d   u p l o a d . \ n 
 
 3 5 = Sc6RhVOo`QsNYN\ n 
 
 3 5 = W h e n   a c q u i r e   c o n t r o l l e r   i n f o r m a t i o n ,   f o l l o w i n g   e r r o r   h a p p e n s :   \ n 
 
 3 6 = WNYegpencv
NS`'`(W[eQKNMRbN^`HQYN\ n penc^`/f&T]~YNpenc^\ n 
 
 3 6 = I t   i s   a d v i c e d   t o   b a c k u p   d a t a b a s e   b e f o r e   t h i s   o p e r a t i o n .   A r e   y o u   s u r e   t o   b a c k u p   d a t a b a s e ? \ n 
 
 3 7 = ck(WSb _ % s  vhUS % s  . . . \ n 
 
 3 7 = O p e n   " % s "   s h e e t   " % s " . . . \ n 
 
 3 8 = ck(W[eQNXT
zI{. . . \ n 
 
 3 8 = I m p o r t   e m p l o y e e ,   p l e a s e   w a i t . . . \ n 
 
 3 9 = Bl[eQvLpeǏNhUSvLpe͑en0\ n 
 
 3 9 = R o w s   t o   b e   i m p o r t e d   a r e   m o r e   t h a n   r o w s   o f   s h e e t ,   p l e a s e   s e t u p   a g a i n . \ n   
 
 4 0 = Bl[eQvRpeǏNhUSvRpe͑en0\ n 
 
 4 0 = C o l u m n s   t o   b e   i m p o r t e d   a r e   m o r e   t h a n   c o l u m n s   o f   s h e e t ,   p l e a s e   s e t u p   a g a i n .   \ n 
 
 4 1 = NXT
Ty:Nzz0\ n 
 
 4 1 = E m p l o y e e   n a m e   i s   e m p t y .   \ n 
 
 4 2 = eg<h_
Ncknx0\ n 
 
 4 2 = D a t e   f o r m a t   i s   i n c o r r e c t .   \ n 
 
 4 3 = '`+R<h_0\ n 
 
 4 3 = G e n d e r   f o r m a t   i s   i n c o r r e c t .   \ n 
 
 4 4 = NXTY
T+ S
N/U N0\ n 
 
 4 4 = E m p l o y e e   n a m e +   c o d e   a r e   n o t   u n i q u e . \ n 
 
 4 5 = 
NX[(W0\ n 
 
 4 5 = D e p a r t m e n t   d o e s   n o t   e x i s t .   \ n 
 
 4 6 = aSS<h_0\ n 
 
 4 6 = C a r d   n u m b e r   f o r m a t   i s   i n c o r r e c t .   \ n 
 
 4 7 = aSX[(Wv^N]~RM0\ n 
 
 4 7 = T h e   c a r d   e x i s t e d   a n d   i s   a s s i g n e d .   \ n 
 
 4 8 = [eQ,{% d LpenceSsNN\ n 
 
 4 8 = W h e n   i m p o r t   t h e   % d   r o w   d a t a ,   f o l l o w   e r r o r   h a p p e n s :   \ n 
 
 4 9 = `؏ ~~nxTYg [T~vۏLnx	c /f 	c&TR	c &T 0Yg~_g[eQ	c Sm 	c0\ n 
 
 4 9 = D o   y o u   w a n t   t o   c o n t i n u e   e r r o r   c h e c k i n g ?   P r e s s   " Y e s "   t o   c o n t i n u e   a n d   " C a n c e l "   t o   s t o p . \ n 
 
 5 0 = [eQ[k0\ n 
 
 5 0 = I m p o r t   c o m p l e t e d .   \ n 
 
 5 1 = [eQ[kFOQsNgNNXT*g[eQ0\ n 
 
 5 1 = I m p o r t   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s ,   s o m e   e m p l o y e e s   a r e   n o t   i m p o r t e d .   \ n 
 
 
 
 6 6 = ONXTyL\[勺NXTel(WvQ[Lub>f:yO勺NXT
NL؏ ۏLzfN}bhQbN}`nx[~~T\ n 
 
 6 6 = I f   s e t u p   s t a f f   a s   E m p l o y e e   L e f t   i n   s o f t w a r e ,   t h i s   s t a f f   i n f o r m a t i o n   w i l l   c a n   n o t   b e   d i s p l a y e d   i n   o t h e r   i n t e r f a c e s .   A f t e r   S m a r t   U p l o a d   o r   U p l o a d   A l l ,   t h e   s t a f f   c a n   n o t   a c c e s s ,   d o   y o u   w a n t   t o   c o n t i n u e ? \ n 
 
 6 7 = ck(WONXTyL
zI{. . . \ n 
 
 6 7 = E m p l o y e e   L e f t   i s   o p e r a t i n g ,   p l e a s e   w a i t . . . \ n 
 
 6 8 = yL[k0\ n 
 
 6 8 = E m p l o y e e   L e f t   i s   c o m p l e t e d . \ n 
 
 6 9 = yL[kFOQsN0\ n 
 
 6 9 = E m p l o y e e   L e f t   i s   c o m p l e t e d ,   b u t   t h e r e   i s   e r r o r . \ n 
 
 7 0 = ONXT % s  yLeQsNYN\ n 
 
 7 0 = W h e n   o p e r a t e   E m p l o p y e e   % s   L e f t ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 7 1 = NXT % s  yLbR0\ n 
 
 7 1 = E m p l o y e e   % s   l e f t   s u c c e e d . \ n 
 
 8 7 = ck(WONXT
YL
zI{. . . \ n 
 
 8 7 = I t   i s   o p e r a t i n g   E m p l o y e e   R e i n s t a t e d ,   p l e a s e   w a i t . . . \ n 
 
 8 8 = 
YL[k0\ n 
 
 8 8 = E m p l o y e e   R e i n s t a t e d   i s   c o m p l e t e d . \ n 
 
 8 9 = 
YL[kFOQsN0\ n 
 
 8 9 = E m p l o y e e   R e i n s t a t e d   i s   f i n i s h e d ,   b u t   t h e r e   i s   e r r o r . \ n 
 
 9 0 = ONXT % s  
YLeQsNYN\ n 
 
 9 0 = W h e n   o p e r a t e   E m p l o y e e   % s   R e i n s t a t e d ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 9 1 = NXT % s  
YLbR0\ n 
 
 9 1 = E m p l y e e   % s   r e i n s t a t e d   s u c c e e d . \ n 
 
 
 
 
 
 / / NXT^\'`
 
 / / E m p l o y e e   E d i t   P r o p e r t i e s 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 1 5   T y p e = 1 ] 
 
 0 x 0 = ^\'`
 
 0 x 0 = P r o p e r t y 
 
 1 = W,gSpe
 
 1 = B a s i c   P a r a m e t e r 
 
 2 = Y
T
 
 2 = N a m e 
 
 3 = S
 
 3 = C o d e 
 
 4 = 
 
 4 = D e p a r t m e n t 
 
 5 = '`+R
 
 5 = G e n d e r 
 
 6 = Queg
 
 6 = D a t e   o f   B i r t h 
 
 7 = LMO
 
 7 = P o s i t i o n 
 
 8 = f[S
 
 8 = E d u c a t i o n 
 
 9 = 5u݋Sx
 
 9 = T e l e p h o n e   N o . 
 
 1 0 = [^OO@W
 
 1 0 = F a m i l y   A d d r e s s 
 
 1 1 = Yl
 
 1 1 = R e m a r k 
 
 1 2 = aSSCgP
 
 1 2 = C a r d   a n d   G r o u p 
 
 1 3 = aSS
 
 1 3 = C a r d   N u m b e r 
 
 1 4 = [x
 
 1 4 = P a s s w o r d 
 
 1 5 = LCgP~
 
 1 5 = A c c e s s   G r o u p 
 
 1 6 = @bcaS:NaS
 
 1 6 = A l l   c a r d   h o l d e r s   a r e   f i r s t   c a r d   
 
 1 7 = AQd^2
 
 1 7 = P e r m i t   D i s m i s s / A c t i v a t e   S e c u r i t y 
 
 1 8 = P6RO(u!kpe
 
 1 8 = L i m i t   U s e   T i m e s 
 
 1 9 = O(u!kpe
 
 1 9 = U s e   T i m e s 
 
 2 0 = P6RO(ueg
 
 2 0 = L i m i t   v a l i d   D a t e 
 
 2 1 = O(ugP
 
 2 1 = A p p l y   V a l i d   T i m e 
 
 2 2 = DROo`
 
 2 2 = A d d i t i o n a l   I n f o r m a t i o n 
 
 2 3 = AQSm8^ _
 
 2 3 = A l l o w   t o   c a n c e l   n o r m a l - o p e n 
 
 2 4 = r`
 
 2 4 = S t a t u s 
 
 2 5 = (WL
 
 2 5 = O n   J o b 
 
 2 6 = yL
 
 2 6 = E m p l o y e e   L e f t 
 
 2 7 = @b	gr`
 
 2 7 = A l l   S t a t u s 
 
 5 0 = e\ n gq\ n Gr
 
 5 0 = N o \ n P h o t o 
 
 5 1 = eQ\ n gqGr\ n 
 
 5 1 = G i v e \ n W r o n g \ n P h o t o   
 
 5 2 = 	bgqGreN
 
 5 2 = S e l e c t   P h o t o   F i l e 
 
 6 0 = NXTnSeQsNYN\ n 
 
 6 0 = W h e n   E m p l o y e e   s e t u p   a c q u i r e   d e p a r t m e n t ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 6 1 = PՋ	SS N*NNXTNO͑eS0\ n 
 
 6 1 = I n   o r d e r   t o   a c q u i r e   d e p a r t m e n t   a g a i n ,   p l e a s e   s e l e c t   a n o t h e r   E m p l o y e e . \ n 
 
 6 2 = NXTnSLCgP~eQsNYN\ n 
 
 6 2 = W h e n   E m p l o y e e   s e t u p   a c q u i r e   a c c e s s   g r o u p ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 6 3 = PՋ	SS N*NNXTNO͑eSLCgP~0\ n 
 
 6 3 = I n   o r d e r   t o   a c q u i r e   a c c e s s   g r o u p   a g a i n ,   p l e a s e   s e l e c t   a n o t h e r   E m p l o y e e . \ n 
 
 6 4 = 	bSaSSe_0\ n \ n 	b /f N^X[	b*gRMaS\ n 	b &T Ǐc6RhVRaS\ n 	b Sm >e_SaSS0
 
 6 4 = P l e a s e   s e l e c t   t h e   w a y   o f   a c q u i r i n g   c a r d . \ n \ n S e l e c t   " Y e s "   t o   s e l e c t   n o n - d i s t r i b u t e d   c a r d   f r o m   d a t a b a s e . \ n S e l e c t   " N O "   t o   a d d   c a r d   b y   c o n t r o l l e r . \ S e l e c t   " C a n c e l "   t o   g i v e   u p   a c q u i r i n g   c a r d   n u m b e r . 
 
 6 5 = c6RhVRaS]/TR\ ReQvaSGr(W`	bvc6RhV4Y
N7RaSaSS\OꁨRkXeQ	bY*NNXTe募R\feybkRbc0RvQ[zSe募R\ꁨR\Pbk0
 
 6 5 = C o n t r o l l e r   s t a r t   t o   a d d   c a r d ,   p l e a s e   p r e s e n t   c a r d s   o n   r e a d e r s   c o n n e c t e d   w i t h   t h e   c o n t r o l l e r   a n d   t h e   c a r d   n u m b e r   w i l l   f i l l e d .   W h e n   s e l e c t   m u l t i - e m p l o y e e ,   t h i s   f u n c t i o n   w i l l   b e   f o r b a d e .   W h e n   r e t u r n   t o   o t h e r   w i n d o w s ,   t h e   f u n c t i o n   s t o p s   a u t o m a t i c a l l y . 
 
 6 6 = O(ugPeN|~eS[NXTl	gNUOCgP`nx[~~T\ n 
 
 6 6 = E m p l o y e e   w i l l   c a n   n o t   a c c e s s   w h e n   a p p l y   V a l i d   T i m e   e a r l i e d   t h a n   s y s t e m   t i m e .   A r e   y o u   s u r e   t o   c o n t i n u e ? \ n   
 
 6 7 = SNXTDROo`
TyeQsNYN\O(u:wv
Ty\ n 
 
 6 7 = W h e n   a c q u i r e   e m p l o y e e   a d d i t i o n a l   i n f o r m a t i o n   n a m e ,   f o l l o w i n g   e r r o r   h a p p e n ,   i t   w i l l   u s e   d e f a u l t   n a m e : \ n 
 
 
 
 / / 	baSGr
 
 / / S e l e c t   C a r d s 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 1 6   T y p e = 1 ] 
 
 0 = 	b@b	gaS
 
 0 = S e l e c t   A l l   C a r d s 
 
 1 = 	b]RMaS
 
 1 = S e l e c t   D i s t r i b u t e d   c a r d 
 
 2 = 	b*gRMaS
 
 2 = S e l e c t   n o n - d i s t r i b u t e d   c a r d 
 
 3 = 	b]c1YaS
 
 3 = S e l e c t   L o s t   C a r d 
 
 
 
 / / nN}
 
 / / S e t u p   U p l o a d 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 1 7   T y p e = 1 ] 
 
 1 = ck(WQYN}c6RhVv@b	gn
zI{. . . \ n 
 
 1 = P r e p a r e   t o   u p l o a d   a l l   c o n t r o l l e r   s e t u p s ,   p l e a s e   w a i t . . . \ n 
 
 2 = N}c6RhVv@b	gn[k0\ n 
 
 2 = A l l   c o n t r o l l e r   s e t u p s   u p l o a d e d . \ n 
 
 3 = N}c6RhVv@b	gn[kFOQsN0\ n 
 
 3 = A l l   c o n t r o l l e r   s e t u p s   u p l o a d e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 4 =  _Y:Nc6RhV % s  N}@b	gn0\ n 
 
 4 = S t a r t   o v e r a l l   u p l o a d   f o r   c o n t r o l l e r   " % s " . \ n 
 
 5 = c6RhV % s  v@b	gnN}[k0\ n 
 
 5 = A l l   s e t u p s   o f   c o n t r o l l e r   " % s "   u p l o a d e d . \ n 
 
 6 = :Nc6RhV % s  N}@b	gneQsNYN\ n 
 
 6 = W h e n   o v e r a l l   u p l o a d   f o r   c o n t r o l l e r   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 7 = ck(WN}4YOS. . . \ n 
 
 7 = U p l o a d i n g   r e a d e r   c o m m u n i c a t i o n   p r o t o c o l . . . \ n 
 
 8 = ck(WN}Nn. . . \ n 
 
 8 = U p l o a d i n g   i n t e r l o c k   s e t u p . . . \ n 
 
 9 = ck(WN}2\oVn. . . \ n 
 
 9 = U p l o a d i n g   a n t i - p a s s b a c k ,   p l e a s e   w a i t . . . \ n 
 
 1 0 = ck(WN}bfeQ{|W. . . \ n 
 
 1 0 = U p l o a d i n g   a l a r m   i n p u t   t y p e . . . \ n 
 
 1 1 = ck(WN}bfQNeQvsQT. . . \ n 
 
 1 1 = U p l o a d i n g   l i n k   o f   a l a r m   o u t p u t   a n d   i n p u t . . . \ n 
 
 1 2 = ck(WN}ibU\bfQNeQvsQT. . . \ n 
 
 1 2 = U p l o a d i n g   l i n k   o f   e x t e n d e d   a l a r m   o u t p u t   a n d   i n p u t . . . \ n   
 
 1 3 = ck(WN}S % s  v5usQT~5uhV. . . \ n 
 
 1 3 = U p l o a d i n g   d o o r   " % s "   l o c k   a s s o c i a t e d   r e l a y   o f   d o o r . . . \ n 
 
 1 4 = ck(WN}S % s  v^e. . . \ n 
 
 1 4 = U p l o a d i n g   d o o r   " % s "   l o c k   d e l a y . . . \ n 
 
 1 5 = ck(WN}S % s  vxbf{|WN^e. . . \ n 
 
 1 5 = U p l o a d i n g   d o o r   " % s "   m a g n e t i c   a l a r m   t y p e   a n d   d e l a y   o f   d o o r . . . \ n 
 
 1 6 = ck(WN}S % s  vQ	c{|WN1YHehTR. . . \ n 
 
 1 6 = U p l o a d i n g   d o o r   " % s "   e x i t   b u t t o n   t y p e   a n d   i n e f f e c t i v e   w e e k   s c h e d u l e . . . \ n 
 
 1 7 = ck(WN}S % s  v8^ _eR. . . \ n 
 
 1 7 = U p l o a d i n g   d o o r   " % s "   n o r m a l   o p e n   s c h e d u l e . . . \ n 
 
 1 8 = ck(WN}4Y % s  n. . . \ n 
 
 1 8 = U p l o a d i n g   r e a d e r   " % s "   s e t u p . . . \ n 
 
 1 9 = ck(WN}GPeR. . . \ n 
 
 1 9 = U p l o a d i n g   h o l i d a y   s c h e d u l e . . . \ n 
 
 2 0 = ck(WN}hTR. . . \ n 
 
 2 0 = U p l o a d i n g   w e e k   s c h e d u l e . . . \ n 
 
 2 1 = ck(WN}LCgP~. . . \ n 
 
 2 1 = U p l o a d i n g   a c c e s s   g r o u p . . . \ n 
 
 2 2 = ck(WN}NXTOo`. . . \ n 
 
 2 2 = U p l o a d i n g   e m p l o y e e   i n f o r m a t i o n . . . \ n 
 
 2 3 = ck(Wf9ec6RhVpe. . . \ n 
 
 2 3 = C h a n g i n g   c o n t r o l l e r   d o o r   q u a n t i t y . . . \ n 
 
 2 4 = ck(WN}ibU\bfeQ{|W. . . \ n 
 
 2 4 = U p l o a d i n g   e x t e n s i o n   a l a r m   i n p u t   t y p e . . . \ n 
 
 2 5 = ck(WN}hQ@\2\oVSpe. . . \ n 
 
 2 5 = U p l o a d i n g   g l o b a l   a n t i - p a s s b a c k   p a r a m e t e r . . . \ n 
 
 1 0 0 = ck(WhKm/f&T	gc6RhV hQbN}. . . \ n 
 
 1 0 0 = D e t e c t i n g   w h e t h e r   s o m e   c o n t r o l l e r s   n e e d   t o   o v e r a l l   u p l o a d   o r   n o t . . . \ n 
 
 1 0 1 =  _Y:Nc6RhV % s  N}@b	gn0\ n 
 
 1 0 1 = S t a r t   t o   u p l o a d   c o n t r o l l e r   " % s "   a l l   s e t u p s . \ n 
 
 1 0 2 = ck(WhKmc6RhVSpe/f&T N}. . . \ n 
 
 1 0 2 = D e t e c t i n g   w h e t h e r   s o m e   c o n t r o l l e r   p a r a m e t e r s   n e e d   t o   u p l o a d   o r   n o t . . . \ n         
 
 1 0 3 = ck(WN}c6RhV % s  vc6RhVSpe. . . \ n 
 
 1 0 3 = U p l o a d i n g   c o n t r o l l e r   " % s "   c o n t r o l l e r   p a r a m e t e r . . . \ n 
 
 1 0 4 = ck(WhKmbfSpe/f&T N}. . . \ n 
 
 1 0 4 = D e t e c t i n g   w h e t h e r   a l a r m   p a r a m e t e r   n e e d   t o   u p l o a d   o r   n o t . . . \ n 
 
 1 0 5 = ck(WN}c6RhV % s  vbfSpe. . . \ n 
 
 1 0 5 = U p l o a d i n g   c o n t r o l l e r   " % s "   a l a r m   p a r a m e t e r . . . \ n 
 
 1 0 6 = ck(WhKmSSpe/f&T N}. . . \ n 
 
 1 0 6 = D e t e c t i n g   w h e t h e r   d o o r   p a r a m e t e r   n e e d   t o   u p l o a d   o r   n o t . . . \ n 
 
 1 0 7 = ck(WN}c6RhV % s  vSSpe. . . \ n 
 
 1 0 7 = U p l o a d i n g   c o n t r o l l e r   " % s "   d o o r   p a r a m e t e r . . . \ n 
 
 1 0 8 = ck(WhKm4YSpe/f&T N}. . . \ n 
 
 1 0 8 = D e t e c t i n g   w h e t h e r   r e a d e r   p a r a m e t e r   n e e d   t o   u p l o a d   o r   n o t . . . \ n 
 
 1 0 9 = ck(WN}c6RhV % s  v4YSpe. . . \ n 
 
 1 0 9 = U p l o a d i n g   c o n t r o l l e r   " % s "   r e a d e r   p a r a m e t e r . . . \ n 
 
 1 1 0 = ck(WhKmhTR/f&T N}. . . \ n 
 
 1 1 0 = D e t e c t i n g   w h e t h e r   w e e k   s c h e d u l e   n e e d   t o   u p l o a d   o r   n o t . . . \ n 
 
 1 1 1 = ck(WN}hTR % s  . . . \ n 
 
 1 1 1 = U p l o a d i n g   w e e k   s c h u e d u l e   " % s " . . . \ n 
 
 1 1 2 = ck(WN}hTR % s  c6RhV % s  ck_HroNedkmo`	. . . \ n 
 
 1 1 2 = U p l o a d i n g   w e e k   s c h e d u l e   " % S "   t o   c o n t r o l l e r   " % s "   ( R e l e a s e   v e r s i o n   w i l l   h a v e   n o   t h i s   i n f o r m a t i o n ) . . . \ n 
 
 1 1 3 = ck(WhKmGPeR/f&T N}. . . \ n 
 
 1 1 3 = D e t e c t i n g   w h e t h e r   h o l i d a y   s c h e d u l e   n e e d   t o   u p l o a d   o r   n o t . . . \ n 
 
 1 1 4 = ck(WN}GPeR % s  . . . \ n 
 
 1 1 4 = U p l o a d i n g   h o l i d a y   s c h e d u l e   " % s " . . . \ n 
 
 1 1 5 = ck(WN}GPeR % s  c6RhV % s  ck_HroNedkmo`	. . . \ n 
 
 1 1 5 = U p l o a d i n g   h o l i d a y   s c h e d u l e   " % s "   t o   c o n t r o l l e r   " % s "   ( R e l e a s e   v e r s i o n   w i l l   h a v e   n o   t h i s   i n f o r m a t i o n ) . . . \ n 
 
 1 1 6 = ck(WhKmCgP~/f&T N}. . . \ n 
 
 1 1 6 = D e t e c t i n g   w h e t h e r   a c c e s s   g r o u p   n e e d   t o   u p l o a d . . . \ n 
 
 1 1 7 = ck(WN}c6RhV % s  vCgP~. . . \ n 
 
 1 1 7 = U p l o a d i n g   c o n t r o l l e r   " % s "   a c c e s s   g r o u p . . . \ n 
 
 1 1 8 = ck(WN}CgP~ % s  c6RhV % s  ck_HroNedkmo`	. . . \ n 
 
 1 1 8 = U p l o a d i n g   a c c e s s   g r o u p   " % s "   t o   c o n t r o l l e r   " % s "   ( R e l e a s e   v e r s i o n   w i l l   h a v e   n o   t h i s   i n f o r m a t i o n ) . . . \ n 
 
 1 1 9 = ck(WhKmCgP~ % s  vXT]/f&T N}c6RhV % s  . . . \ n 
 
 1 1 9 = D e t e c t i n g   w h e t h e r   a c c e s s   g r o u p   " % s "   e m p l o y e e   n e e d   t o   u p l o a d   t o   c o n t r o l l e r   " % s "   o r   n o t . . . \ n 
 
 1 2 0 = ck(W\CgP~ % s  vXT]N}c6RhV % s  . . . \ n 
 
 1 2 0 = U p l o a d i n g   a c c e s s   g r o u p   " % s "   e m p l o y e e   t o   c o n t r o l l e r   " % s " . . . \ n 
 
 1 2 1 = ck(WhKm/f&T	gXT] N}. . . \ n 
 
 1 2 1 = D e t e c t i n g   w h e t h e r   s o m e   e m p l o y e e s   i n f o r m a t i o n   n e e d   t o   u p l o a d   o r   n o t . . . \ n 
 
 1 2 2 = ck(WYtXT] % s  . . . \ n 
 
 1 2 2 = P r o c e s s i n g   e m p l o y e e   " % s " . . . \ n 
 
 1 2 3 = ck(W\XT] % s  N}c6RhV % s  ck_HroNedkmo`	. . . \ n 
 
 1 2 3 = U p l o a d i n g   e m p l o y e e   " % s "   t o   c o n t r o l l e r   " % s "   ( R e l e a s e   v e r s i o n   w i l l   h a v e   n o   t h i s   i n f o r m a t i o n ) . . . \ n 
 
 1 2 4 = ck(W\XT] % s  Nc6RhV % s  -N Rdck_HroNedkmo`	. . . \ n 
 
 1 2 4 = D e l e t i n g   e m p l o y e e   " % s "   f r o m   c o n t r o l l e r   " % s "   ( R e l e a s e   v e r s i o n   w i l l   h a v e   n o   t h i s   i n o f o r m a t i o n ) . . . \ n 
 
 1 2 5 = ck(W:Nc6RhVN}hQ@\2\oVSpe. . . \ n 
 
 1 2 5 = U p l o a d i n g   t h e   g l o b a l   a n t i - p a s s b a c k   p a r m e t e r   t o   c o n t r o l l e r s . . . \ n 
 
 1 2 6 = ck(W:Nc6RhVv4YN}hQ@\2\oV~Spe. . . \ n 
 
 1 2 6 = U p l o a d i n g   t h e   g l o b a l   a n t i - p a s s b a c k   g r o u p   p a r m e t e r   t o   c o n t r o l l e r s . . . \ n 
 
 1 2 7 = ck(WhKm/f&T	gƋ+RN hQbNS. . . \ n 
 
 1 2 7 = I s   t e s t i n g   w h e t h e r   r e c o g n i t i o n   d e v i c e   n e e d   t o   b e   f u l l y   u p l o a d . . . \ n 
 
 1 2 8 =  _Y:NƋ+RN % s  N}@b	gN8penc0\ n 
 
 1 2 8 = U p l o a d i n g   a l l   f a c e   d a t a   f o r   r e c o g n i t i o n   d e v i c e   " % s " . \ n 
 
 1 2 9 = Ƌ+RNޏc1Y%Yޏce0\ n 
 
 1 2 9 = 
 
 2 0 0 0 = :Nc6RhV % s  N}neQsNYN勧c6RhVh:N hQbN}\ n 
 
 2 0 0 0 = W h e n   u p l o a d   c o n t r o l l e r   " % s "   s e t u p ,   f o l l o w i n g   e r r o r   h a p p e n s ,   t h e   c o n t r o l l e r   i s   m a r k e d   t h a t   n e e d   t o   U p l o a d   A l l : \ n 
 
 2 0 0 1 = ndpencO9eheQsNYNS[N!kzfN}͑
Yd\O\ n 
 
 2 0 0 1 = W h e n   c l e a r   d a t a   a n d   c h a n g e   m a r k s ,   f o l l o w i n g   e r r o r   h a p p e n s ,   i t   c a n   c a u s e   r e - o p e r a t e   a t   n e x t   S m a r t   U p l o a d : \ n         
 
 2 0 0 2 = :Nc6RhV % s  N}neQsNYN\ n 
 
 2 0 0 2 = W h e n   u p l o a d   c o n t r o l l e r   " % s "   s e t u p ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 2 0 0 3 = :Nc6RhV % s  N}hQ@\2\oVSpeQsNYN\ n 
 
 2 0 0 3 = W h e n   u p l o a d   t h e   g l o b a l   a n t i - p a s s b a c k   p a r a m e t e r   f o r   c o n t r o l l e r   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 2 0 0 4 = :Nc6RhV % s  v4YN}hQ@\2\oV~SpeeQsNYN\ n 
 
 2 0 0 4 = W h e n   u p l o a d   t h e   g l o b a l   a n t i - p a s s b a c k   g r o u p   p a r a m e t e r   f o r   r e a d e r s   o f   c o n t r o l l e r   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 2 0 0 5 = :NƋ+RN % s  NSN8penceQsNYN\ n 
 
 2 0 0 5 = T h e   f o l l o w i n g   e r r o r   o c c u r r e d   w h e n   s e n d i n g   f a c e   d a t a   f o r   r e c o g n i t i o n   d e v i c e   % s . 
 
 
 
 / / NNU_
N O
 
 / / E v e n t   R e c o r d   D o w n l o a d 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 1 8   T y p e = 1 ] 
 
 0 = NNU_Rh
 
 0 = E v e n t   R e c o r d   L i s t 
 
 2 = NN{|W
 
 2 = E v e n t   T y p e 
 
 3 = aSS
 
 3 = C a r d   N u m b e r 
 
 4 = NXT
 
 4 = E m p l o y e e 
 
 5 = c6RhV
 
 5 = C o n t r o l l e r 
 
 6 = S
 
 6 = D o o r 
 
 7 = 4Y
 
 7 = R e a d e r 
 
 1 0 = TlaS
 
 1 0 = L e g a l   C a r d 
 
 1 1 = ^laS
 
 1 1 = I l l e g a l   C a r d   
 
 1 2 = [x _
 
 1 2 = O p e n   D o o r   b y   P a s s w o r d 
 
 1 3 = ^l[x
 
 1 3 = I n v a l i d   P a s s w o r d 
 
 1 4 = Q	c
 
 1 4 = E x i t   B u t t o n   
 
 1 5 = x _
 
 1 5 = O p e n   D o o r   b y   T h r e a t e n   C o d e   
 
 1 6 = 2\oV;bk
 
 1 6 = A n t i - p a s s b a c k   B l o c k 
 
 1 7 = d2
 
 1 7 = D i s m i s s   S e c u r i t y 
 
 1 8 = ^2
 
 1 8 = A c t i v a t e   S e c u r i t y 
 
 2 1 = Tlc~
 
 2 1 = L e g a l   F i n g e r p r i n t 
 
 2 2 = ^lc~
 
 2 2 = I l l e g a l   F i n g e r p r i n t 
 
 4 0 = ʑ>e
 
 4 0 =   R e l e a s e 
 
 4 1 = 	cN
 
 4 1 =   P r e s s 
 
 4 2 = d^2
 
 4 2 = A c t i v a t e / D i s m i s s   S e c u r i t y 
 
 6 0 = ck(WQY
N ONNU_. . . \ n 
 
 6 0 = P r e p a r i n g   t o   d o w n l o a d   e v e n t   r e c o r d . . . \ n 
 
 6 1 =  _Y
N Oc6RhV % s  vNNU_. . . \ n 
 
 6 1 = S t a r t   t o   d o w n l o a d   e v e n t   r e c o r d   o f   c o n t r o l l e r   " % s " . . . \ n 
 
 6 2 = c6RhV % s  vNNU_
N O[k0\ n 
 
 6 2 = E v e n t   r e c o r d   o f   c o n t r o l l e r   " % s "   d o w n l o a d e d . \ n 
 
 6 3 = :Nc6RhV % s  
N ONNU_eQsNYN: \ n 
 
 6 3 = W h e n   d o w n l o a d   c o n t r o l l e r   " % s "   e v e n t   r e c o r d ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 6 4 = NNU_
N O[k0\ n 
 
 6 4 = E v e n t   r e c o r d   d o w n l o a d i n g   c o m p l e t e d . \ n 
 
 6 5 = NNU_
N O[kFOQsN0\ n 
 
 6 5 = E v e n t   r e c o r d   d o w n l o a d i n g   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 6 6 = ck(W:Nc6RhV % s  
N ONNU_. . . 
 
 6 6 = D o w n l o a d i n g   c o n t r o l e r   " % s "   e v e n t   r e c o r d . . . 
 
 6 7 = ck(Whg/f&T ꁨR
N O. . . 
 
 6 7 = D e t e c t i n g   t h e   r e q u i r e m e n t   o f   d o w n l o a d i n g . . . 
 
 6 8 = ꁨR
N Od\O؏*g[b`nx[Smd\OT\ n 
 
 6 8 = D o w n l o a d   h a v e   n o t   f i n i s h e d ,   a r e   y o u   s u r e   t o   c a n c e l   t h e   o p e r a t i o n ?   \ n 
 
 6 9 = ꁨR
N OǏz-NgNc6RhVV:NQ_eu^`KbR
N ONnx[0\ n 
 
 6 9 = S i n c e   e r r o r   h a p p e n ,   s o m e   c o n t r o l l e r s   a r e   i g n o r e d   w h e n   d o w n l o a d .   M a n u a l l y   d o w n l o a d   i s   r e c o m m e n d e d ,   i t   c a n   m a k e   s u r e   t h e   e r r o r . \ n 
 
 7 0 = ꁨR
N OǏzQsNYNel[b\ n 
 
 7 0 = I t   c a n   n o t   b e   f i n i s e d ,   w h e n   d o w n l o a d ,   f o l l o w i n g   e r r o r   h a p p e n :   \ n 
 
 7 1 = hQbU_
N OVYNel[b\ n 
 
 7 1 = F u l l y   d o w n l o a d   r e c o r d   c a n   n o t   b e   c o m p l e t e d   d u e   t o   t h e   f o l l o w i n g   e r r o r s : \ n 
 
 
 
 / / bfU_
N O
 
 / / A l a r m   R e c o r d   D o w n l o a d 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 1 9   T y p e = 1 ] 
 
 0 = bfU_Rh
 
 0 = A l a r m   R e c o r d   L i s t 
 
 2 = bf{|W
 
 2 = A l a r m   T y p e 
 
 3 = c6RhV
 
 3 = C o n t r o l l e r 
 
 4 = bfMOn
 
 4 = A l a r m   P o s i t i o n 
 
 1 0 =  _e
 
 1 0 = D o o r   O p e n   O v e r t i m e 
 
 1 1 = bfeQ
 
 1 1 = A l a r m   I n p u t 
 
 1 2 = 4xeQ
 
 1 2 = B r e a k   I n t o 
 
 1 3 = ibU\feQ
 
 1 3 = E x t e n s i o n   A l a r m   I n p u t 
 
 1 4 = bdbf
 
 1 4 = T a m p e r   A l a r m 
 
 4 0 = ~_g
 
 4 0 =   E n d 
 
 4 1 =  _Y
 
 4 1 =   S t a r t 
 
 2 0 = ck(WQY
N ObfU_. . . \ n 
 
 2 0 = P r e p a r i n g   t o   d o w n l o a d   a l a r m   r e c o r d . . . \ n 
 
 2 1 =  _Y
N Oc6RhV % s  vbfU_. . . \ n 
 
 2 1 = S t a r t   t o   d o w n l o a d   c o n t r o l l e r   " % s "   a l a r m   r e c o r d . . . \ n 
 
 2 2 = c6RhV % s  vbfU_
N O[k0\ n 
 
 2 2 = C o n t r o l l e r   " % s "   a l a r m   r e c o r d   d o w n l o a d i n g   c o m p l e t e d . \ n 
 
 2 3 = bfU_
N O[k0\ n 
 
 2 3 = A l a r m   r e c o r d   d o w n l o a d i n g   c o m p l e t e d . \ n 
 
 2 4 = bfU_
N O[kFOQsN0\ n 
 
 2 4 = A l a r m   r e c o r d   d o w n l o a d i n g   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 2 5 = ck(W:Nc6RhV % s  
N ObfU_. . . 
 
 2 5 = D o w n l o a d i n g   a l a r m   r e c o r d   f o r   c o n t r o l l e r   " % s " . . . 
 
 2 6 = :Nc6RhV % s  
N ObfU_eQsNYN: \ n 
 
 2 6 = W h e n   d o w n l o a d   c o n t r o l l e r   " % s "   a l a r m   r e c o r d ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 
 
 / / 5uP[0WVNvc
 
 / / E - m a p   E d i t   a n d   m o n i t o r 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 1 A   T y p e = 1 ] 
 
 1 = Ɖvc
 
 1 = V i d e o   M o n i t o r i n g 
 
 2 = ƉSRh
 
 2 = V i d e o   C h a n n e l   L i s t 
 
 3 = bbVGrȉ
 
 3 = S n a p s h o t   P r e v i e w 
 
 4 = sQTU_P
 
 4 = S n a p s h o t 
 
 5 = ƉSS
 
 5 = V i d e o   C h a n n e l   N u m b e r 
 
 6 = NXTgqGr
 
 6 = E m p l o y e e   P h o t o 
 
 7 = NNRh
 
 7 = E v e n t   L i s t 
 
 8 = bfRh
 
 8 = A l a r m   L i s t 
 
 1 0 = l	gvcpl0R!j_XRvcpT͑Ջ0\ n 
 
 1 0 = N o   m o n i t o r i n g   p o i n t ,   p l e a s e   e n t e r   e d i t   m o d e   t o   a d d   m o n i t o r i n g   p o i n t ,   a n d   t h e n   r e t r y .   \ n 
 
 1 1 = ck(W _/Tvc
zI{. . . \ n 
 
 1 1 = S t a r t i n g   m o n i t o r ,   p l e a s e   w a i t . . . \ n 
 
 1 2 = vc] _/T0\ n 
 
 1 2 = M o n i t o r   s t a r t e d . \ n 
 
 1 3 = vceQNYNvc]\Pbk\ n 
 
 1 3 = F o l l o w i n g   e r r o r   h a p p e n s   d u r i n g   m o n i t o r i n g ,   m o n i t o r i n g   i s   s t o p p e d .   \ n 
 
 1 4 = vc]\Pbk0\ n 
 
 1 4 = m o n i t o r   s t o p p e d .   \ n 
 
 1 5 = ck(WOc6RhV Qvcr`
zI{. . . \ n 
 
 1 5 = C o n t r o l l e r   i s   e x i t i n g   f r o m   m o n i t o r   s t a t e ,   p l e a s e   w a i t . . . \ n 
 
 1 6 = ޏ~Q!kpeǏN g'Y͑Ջ!kpe[c6RhVvvc\Pbk0\ n 
 
 1 6 = T h e   n u m b e r   o f   c o n t i n u o u s   e r r e r   e x c e e d s   m a x   r e t r y   t i m e s ,   t h e   m o n i t o r i n g   o f   c o n t r o l l e r   i s   s t o p p e d .   \ n   
 
 1 7 = [@b	gc6RhVvvc]~\PbksS\ Qvcr`0\ n 
 
 1 7 = M o n i t o r i n g   o n   a l l   c o n t r o l l e r s   s t o p p e d .   T h e   s y s t e m   w i l l   e x i t   m o n i t o r   s t a t e .   \ n 
 
 1 8 = :Nc6RhV % s  ^zeQsYN[勧c6RhVvvc\Pbk\ n 
 
 1 8 = T o   e s t a b l i s h   c o n t r o l l e r   " % s "   C o m m u n i c a t i o n ,   b u t   f o l l o w i n g   e r r o r   h a p p e n s   m o n i t o r i n g   o n   t h i s   c o n t r o l l e r   s t o p s :   \ n 
 
 1 9 = /TRc6RhV % s  eQsYN[勧c6RhVvvc\Pbk\ n 
 
 1 9 = W h e n   s t a r t   t o   c o n t r o l l e r   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s ,   m o n i t o r i n g   o n   t h i s   c o n t r o l l e r   s t o p : \ n 
 
 3 0 = ƉV>e
 
 3 0 = P l a y b a c k 
 
 3 1 = S gяLU_
 
 3 1 = L a t e s t   A c c e s s   R e c o r d s 
 
 2 0 0 5 = l0R0WVvc
 
 2 0 0 5 = E n t e r   M a p   M o n i t o r i n g 
 
 2 0 0 6 = ͑}T
T0WV
 
 2 0 0 6 = R e n a m e   M a p 
 
 2 0 0 7 = OX[
 
 2 0 0 7 = S a v e 
 
 2 0 0 8 = c[̀ofV
 
 2 0 0 8 = L o a d   B a c k g r o u n d   I m a g e 
 
 2 0 0 9 = nd̀ofV
 
 2 0 0 9 = C l e a r   B a c k g r o u n d 
 
 2 0 1 0 = M̀ofV
 
 2 0 1 0 = F i t   B a c k g r o u n d 
 
 2 0 1 1 = >e'Y
 
 2 0 1 1 = Z o o m   I n 
 
 2 0 1 2 = )\
 
 2 0 1 2 = Z o o m   O u t 
 
 2 0 1 3 = 	b>e'Y:SW\ t  Q	b>e'Y
 
 2 0 1 3 = S e l e c t   Z o o m   R e g i o n \ t S t o p   Z o o m 
 
 2 0 1 4 = XQvcp
 
 2 0 1 4 = A d d / R e d u c e   M o n i t o r   P o i n t 
 
 2 0 1 5 =  Rd	b
 
 2 0 1 5 = D e l e t e   S e l e c t 
 
 2 0 1 6 = >f:yh~{
 
 2 0 1 6 = D i s p l a y   L a b e l 
 
 2 0 1 7 = Sb _0WV
 
 2 0 1 7 = O p e n   M a p 
 
 2 0 1 8 = l0R!j_
 
 2 0 1 8 = E n t e r   E d i t   M o d e 
 
 2 0 1 9 =  _/Tvc\ t \Pbkvc
 
 2 0 1 9 = S t a r t   M o n i t o r i n g \ t S t o p   M o n i t o r i n g 
 
 2 0 2 0 = vc	y
 
 2 0 2 0 = M o n i t o r i n g   O p t i o n 
 
 2 0 2 1 =  _/TNNc:y
 
 2 0 2 1 = S t a r t   E v e n t   S o u n d 
 
 2 0 2 2 =  _/Tbfc:y
 
 2 0 2 2 = S t a r t   A l a r m   S o u n d 
 
 2 0 2 3 = ndNNRh
 
 2 0 2 3 = C l e a r   E v e n t   L i s t 
 
 2 0 2 4 = ndbfRh
 
 2 0 2 4 = C l e a r   A l a r m   L i s t 
 
 2 0 2 5 = ndNRbJT
 
 2 0 2 5 = C l e a r   T a s k   R e p o r t 
 
 2 0 2 6 = l0R~Tvc
 
 2 0 2 6 = E n t e r   V i d e o   M o n i t o r i n g 
 
 2 1 0 0 = hQO\
 
 2 1 0 0 = F u l l s c r e e n 
 
 2 1 0 1 = 1 ;ub
 
 2 1 0 1 = 1   P i c t u r e 
 
 2 1 0 2 = 4 ;ub
 
 2 1 0 2 = 4   P i c t u r e s 
 
 2 1 0 3 = 6 ;ub
 
 2 1 0 3 = 6   P i c t u r e s 
 
 2 1 0 4 = 9 ;ub
 
 2 1 0 4 = 9   P i c t u r e s 
 
 2 1 0 5 = 8 ;ub
 
 2 1 0 5 = 8   P i c t u r e s 
 
 2 1 0 6 = 1 3 ;ub
 
 2 1 0 6 = 1 3   P i c t u r e s 
 
 2 1 0 7 = 1 6 ;ub
 
 2 1 0 7 = 1 6   P i c t u r e s 
 
 2 1 0 8 = 3 6 ;ub
 
 2 1 0 8 = 3 6   P i c t u r e s 
 
 2 1 1 0 = 
N NO\
 
 2 1 1 0 = P r e v i o u s   S c r e e n 
 
 2 1 1 1 = N NO\
 
 2 1 1 1 = N e x t   S c r e e n 
 
 2 1 1 2 = nO\>f:y
 
 2 1 1 2 = S c r e e n   R o t a t i o n 
 
 2 1 1 3 = nO\>f:y( USMOy) 
 
 2 1 1 3 = S c r e e n   R o t a t i o n   T i m e   I n t e r v a l ( U n i t :   S e c o n d ) 
 
 
 
 
 
 / / 0WVzS
 
 / / M a p   W i n d o w 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 1 B   T y p e = 1 ] 
 
 1 = *g}T
T
 
 1 = U n n a m e d 
 
 2 = M̀ofV
 
 2 = |   F i t   B a c k g r o u n d 
 
 3 = MzS
 
 3 = |   F i t   W i n d o w 
 
 4 = 0WV'Y\
 
 4 = |   S i z e 
 
 5 = 	b̀ofVGreN
 
 5 = S e l e c t   B a c k g r o u n d   I m a g e   F i l e 
 
 6 = eQe0WV
T
 
 6 = P l e a s e   I n p u t   N e w   M a p   N a m e 
 
 7 = _{:N5uP[0WV}T
T0\ n 
 
 7 = N a m e   t h e   E - m a p .   \ n 
 
 8 = 
Ty]~O(ufbc
Ty0\ n 
 
 8 = T h e   n a m e   i s   u s e d ,   p l e a s e   f i n d   a   n e w   o n e .   \ n 
 
 9 = hg5uP[0WV
TyeQsNYN\ n 
 
 9 = W h e n   c h e c k   E - m a p   n a m e ,   f o l l o w i n g   e r r o r   h a p p e n s :   \ n 
 
 1 0 = !j_
 
 1 0 = |   E d i t   M o d e 
 
 1 1 = vc!j_
 
 1 1 = |   M o n i t o r   M o d e 
 
 1 2 = e0WV
 
 1 2 = N o   m a p 
 
 2 0 = XQvcp
 
 2 0 = A d d   o r   r e d u c e   m o n i t o r i n g   p o i n t 
 
 2 1 = c6RhV
Ty
 
 2 1 = C o n t r o l l e r   N a m e 
 
 2 2 = ޏcMOn
 
 2 2 = A t t a c h e d   B u s 
 
 2 3 = 0W@W
 
 2 3 = A d d r e s s 
 
 2 4 = Sc6RhVOo`eQsNYN\ n 
 
 2 4 = W h e n   a c q u i r e   c o n t r o l l e r   i n f o r m a t i o n ,   f o l l o w i n g   e r r o r   h a p p e n s :   \ n 
 
 2 5 = 2NLS% d 
 
 2 5 = S e r i a l   p o r t   % d 
 
 2 6 = >f:y
 
 2 6 = D i s p l a y 
 
 2 7 = 
Ty
 
 2 7 = N a m e 
 
 2 8 = {|W
 
 2 8 = T y p e 
 
 2 9 = MOn
 
 2 9 = P o s i t i o n 
 
 3 0 = 4Y
 
 3 0 = R e a d e r 
 
 3 1 = 
 
 3 1 = D o o r 
 
 3 2 = bfeQ
 
 3 2 = A l a r m   I n p u t 
 
 3 3 = Q	c
 
 3 3 = E x i t   B u t t o n 
 
 3 4 = 蕥bf
 
 3 4 = D o o r   A l a r m 
 
 3 5 = ibU\bfeQ
 
 3 5 = E x t e n s i o n   A l a r m   I n p u t 
 
 3 6 = 
 
 3 6 = D o o r   L o c k 
 
 3 7 = ~5uhV
 
 3 7 = R e l a y 
 
 3 8 = ibU\~5uhV
 
 3 8 = E x t e n s i o n   R e l a y 
 
 3 9 = Ɖ
 
 3 9 = V i d e o 
 
 4 4 = OX[0WVeQsNYN\ n 
 
 4 4 = W h e n   s a v e   m a p ,   f o l l o w i n g   e r r o r   h a p p e n s :   \ n 
 
 4 5 = 0WV̀ofeNbQQvSVS/f\ n         1 0̀ofX[PvU_X[(WT
TeNbP[vU_N勇eN[bS\ n         2 0̀ofX[PvU_VCgPP6R
NAQ9eQ\ n         3 0xvzz
N\ n 0WVO~~OX[N!kSb _0WVèofVv[SOQ0\ n 
 
 4 5 = I n   c a s e   e r r o r   h a p p e n s   w h e n   c o p i n g   t h e   m a p ,   t h e   r e a s o n   m a y   b e :   1 .   F i l e   o r   d i r e c t o r y   w i t h   t h e   s a m e   n a m e   i n   t h e   b a c k g r o u n d   s t o r a g e   d i r e c t o r y ;   o r   t h e   f i l e   i s   l o c k e d   o r   r e a d - o n l y \ n   2 . B a c k g o u n d   s t o r a g e   d i r e c t o r y   c a n   n o t   b e   c h a n g e d . \ n   3 .   D i s k   s p a c e   i s   n o t   e n o u g h \ n   M a p   w i l l   b e   s a v e d ,   b u t   e r r o r   m a y   o c c u r   w h e n   o p e n   t h e   m a p   n e x t   t i m e . \ n 
 
 4 6 = `nx[ RdS_MR0WVT\ n 
 
 4 6 = A r e   y o u r   s u r e   t o   d e l e t e   c u r r e n t   m a p ?   \ n 
 
 4 7 = S_MR0WV]~ Rd0\ n 
 
 4 7 = C u r r e n t   m a p   i s   d e l e t e d .   \ n 
 
 4 8 =  Rd0WVeQsNYN\ n 
 
 4 8 = W h e n   d e l e t e   m a p ,   f o l l o w i n g   e r r o r   h a p p e n s :   \ n 
 
 4 9 = S_MR0WV]~9eS`OX[O9eT\ n 	c /f OX[O9ev^~~	c &T >e_O9ev^~~,   	c Sm >e_d\O0\ n 
 
 4 9 = C u r r e n t   m a p   h a s   b e e n   c h a n g e d ,   d o   y o u   w a n t   t o   s a v e   t h e   c h a n g e s ?   \ n   P r e s s   " Y e s "   t o   s a v e   t h e   c h a n g e   a n d   c o n t i n u e ,   p r e s s   " N o "   t o   g i v e   u p   c h a n g e   a n d   c o n t i n u e ,   p r e s s   " C a n c e l "   t o   g i v e   u p   o p e r a t i o n .   \ n 
 
 5 0 = OX[
NbR,   d\OSm0\ n 
 
 5 0 = S a v e   u n s u c c e s s f u l l y ,   o p e r a t i o n   c a n c e l e d .   \ n 
 
 5 1 = 	b5uP[0WV
 
 5 1 = S e l e c t   E - m a p 
 
 5 2 = Sb _0WVeQsNYN\ n 
 
 5 2 = W h e n   o p e n   m a p ,   f o l l o w i n g   e r r o r   h a p p e n s :   \ n 
 
 5 3 = SQg NyۏL	b
 
 5 3 = D o u b l e - c l i c k   o p t i o n   t o   s e l e c t 
 
 5 4 = ]b`
Y0\ n 
 
 5 4 = C o m m u n i c a t i o n   h a s   b e e n   r e s t o r e d . \ n 
 
 5 5 = Q
 
 5 5 = O u t p u t 
 
 5 6 = ibU\gQ  
 
 5 6 = E x t e n s i o n   O u t p u t 
 
 
 
 / / vc	y
 
 / / M o n i t o r i n g   O p t i o n 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 1 C   T y p e = 1 ] 
 
 0 = vc	y
 
 0 = M o n i t o r i n g   O p t i o n 
 
 1 = Bgy
 
 1 = M i s c e l l a n e o u s 
 
 2 = Ջ!j_
 
 2 = D e b u g g i n g   M o d e 
 
 3 = sQ
 
 3 = S t o p 
 
 4 =  _/T
 
 4 = S t a r t 
 
 5 =  g'Y͑Ջ!kpe
 
 5 = M a x i m u m   R e t r y   t i m e s 
 
 6 = bfX󗾋Y
 
 6 = A l a r m   S o u n d   D e v i c e 
 
 7 = US
 
 7 = S p e a k e r 
 
 8 = XaS
 
 8 = S o u n d   C a r d 
 
 9 = _eu
 
 9 = I g n o r e 
 
 1 0 = vc
 
 1 0 = M o n i t o r 
 
 1 1 = vcNN
 
 1 1 = M o n i t o r i n g   E v e n t 
 
 1 2 = vcbf
 
 1 2 = M o n i t o r i n g   a l a r m 
 
 
 
 / / gRbczS
 
 / / C h e c k   c u t   o v e r   w i n d o w 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 1 D   T y p e = 1 ] 
 
 0 = g
 
 0 = Q u e r y 
 
 1 = c6RhVOo`
 
 1 = C o n t r o l l e r   I n f o r m a t i o n 
 
 2 = SOo`
 
 2 = D o o r   I n f o r m a t i o n 
 
 3 = NXTOo`
 
 3 = E m p l o y e e   I n f o r m a t i o n 
 
 4 = aSOo`
 
 4 = C a r d   I n f o r m a t i o n 
 
 5 = NNU_
 
 5 = E v e n t   R e c o r d 
 
 6 = bfU_
 
 6 = A l a r m   R e c o r d 
 
 7 = [evcNN
 
 7 = R e a l - t i m e   M o n i t o r   E v e n t 
 
 8 = [evcbf
 
 8 = R e a l - t i m e   M o n i t o r   A l a r m 
 
 9 = |~e_
 
 9 = S y s t e m   L o g 
 
 1 0 = SLSOo`
 
 1 0 = D o o r   o f   E m p l o y e e   I n f o r m a t i o n 
 
 1 1 = SLNXTOo`
 
 1 1 = E m p l o y e e   o f   D o o r   I n f o r m a t i o n 
 
 
 
 / / c6RhVOo`g
 
 / / C o n t r o l l e r   I n f o r m a t i o n   C h e c k 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 1 E   T y p e = 1 ] 
 
 1 = gagN
 
 1 = Q u e r y   C o n d i t i o n 
 
 2 = ޏcMOn
 
 2 = A t t a c h e d   B u s 
 
 3 = 
Ty
 
 3 = N a m e 
 
 4 = WS
 
 4 = M o d e l 
 
 5 = pe
 
 5 = D o o r   Q u a n t i t y 
 
 6 = @b	gMOn
 
 6 = A l l   B u s 
 
 7 = @b	gWS
 
 7 = A l l   m o d e l s 
 
 8 = @b	gpe
 
 8 = A l l   d o o r s 
 
 9 = 0W@W
 
 9 = A d d r e s s 
 
 
 
 / / SOo`g
 
 / / D o o r   I n f o r m a t i o n   C h e c k 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 1 F   T y p e = 1 ] 
 
 1 = S
Ty
 
 1 = D o o r   N a m e 
 
 2 = c6RhV
Ty
 
 2 = C o n t r o l l e r   N a m e 
 
 3 = ~5uhV
 
 3 = L o c k   R e l a y 
 
 4 = 8^ _R
 
 4 = N o r m a l   O p e n   S c h e d u l e 
 
 5 = 	c{|W
 
 5 = E x i t   B u t t o n   T y p e 
 
 6 = 	c1YHeR
 
 6 = B u t t o n   F a i l   S c h e d u l e 
 
 7 = x{|W
 
 7 = D o o r - m a g n e t   T y p e 
 
 8 =  _ee( y) 
 
 8 = D o o r - o p e n   o v e r   t i m e   ( s ) 
 
 9 = ^e( y) 
 
 9 = L o c k   d e l a y   t i m e   ( s ) 
 
 1 0 = 4Ype
 
 1 0 = R e a d e r s 
 
 
 
 / / NXTOo`g
 
 / / E m p l o y e e   I n f o r m a t i o n   C h e c k 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 2 0   T y p e = 1 ] 
 
 1 = @b	g
 
 1 = A l l   D e p a r t m e n t s 
 
 2 = @b	gCgP~
 
 2 = A l l   A c c e s s   G r o u p 
 
 3 = @b	g'`+R
 
 3 = A l l   G e n d e r 
 
 4 = wYt^
 
 4 = S t a r t i n g   A g e 
 
 5 = ~_gt^
 
 5 = E n d   A g e 
 
 6 = Y
T
 
 6 = N a m e 
 
 7 = S
 
 7 = C o d e 
 
 8 = 
 
 8 = D e p a r t m e n t 
 
 9 = aSS
 
 9 = C a r d   N u m b e r 
 
 1 0 = CgP~
 
 1 0 = A c c e s s   G r o u p 
 
 1 1 = aS
 
 1 1 = F i r s t   C a r d 
 
 1 2 = aSd^2
 
 1 2 = D i s m i s s   c a r d   a n d   a c t i v a t e   s e c u r i t y 
 
 1 3 = aSO(u!kpe
 
 1 3 = N u m b e r   o f   c a r d   u s a g e 
 
 1 4 = aSO(ugP
 
 1 4 = V a l i d i t y   o f   c a r d   u s a g e 
 
 1 5 = '`+R
 
 1 5 = G e n d e r 
 
 1 6 = Queg
 
 1 6 = B i r t h d a y 
 
 1 7 = LMO
 
 1 7 = P o s i t i o n 
 
 1 8 = f[S
 
 1 8 = E d u c a t i o n 
 
 1 9 = 5u݋
 
 1 9 = T e l .   N u m b e r 
 
 2 0 = OO@W
 
 2 0 = H o m e   A d d r e s s 
 
 2 1 = *gRM
 
 2 1 = U n a s s i g n e d 
 
 2 2 = eP6R
 
 2 2 = N o n - l i m i t e d 
 
 2 3 = Yl
 
 2 3 = R e m a r k 
 
 
 
 / / aSOo`g
 
 / / C a r d   I n f o r m a t i o n   C h e c k 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 2 1   T y p e = 1 ] 
 
 1 = @b	gr`
 
 1 = A l l   S t a t e s 
 
 2 = caSN
 
 2 = C a r d   H o l d e r 
 
 3 = r`
 
 3 = S t a t e 
 
 4 = RaSe- Am4lS
 
 4 = C a r d   A d d i n g   T i m e - S N . 
 
 5 = caSNS
 
 5 = C a r d   C o d e 
 
 
 
 / / NNOo`g
 
 / / E v e n t   I n f o r m a t i o n   C h e c k 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 2 2   T y p e = 1 ] 
 
 1 = @b	g4Y
 
 1 = A l l   R e a d e r s 
 
 2 = @b	g{|W
 
 2 = A l l   T y p e s 
 
 3 = wYe
 
 3 = S t a r t i n g   T i m e 
 
 4 = ~_ge
 
 4 = E n d   T i m e 
 
 
 
 / / bfOo`g
 
 / / A l a r m   I n f o r m a t i o n   C h e c k 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 2 3   T y p e = 1 ] 
 
 1 = @b	gc6RhV
 
 1 = A l l   C o n t r o l l e r s 
 
 
 
 / / e_Oo`g
 
 / / L o g   I n f o r m a t i o n   C h e c k 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 2 4   T y p e = 1 ] 
 
 1 = (u7b
 
 1 = U s e r n a m e 
 
 2 = @b	g(u7b
 
 2 = A l l   u s e r s 
 
 3 = ~Oo`
 
 3 = D e t a i l e d   I n f o r m a t i o n 
 
 
 
 / / n4YOS
 
 / / S e t u p   R e a d e r   C o m m u n i c a t i o n   P r o t o c o l 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 2 5   T y p e = 1 ] 
 
 0 = n4YOS
 
 0 = S e t u p   r e a d e r   c o m m u n i c a t i o n   p r o t o c o l 
 
 1 = OS	b
 
 1 = P r o t o c o l   S e l e c t i o n 
 
 2 = OS
 
 2 = C o m m u n i c a t i o n   P r o t o c o l 
 
 3 = ꁚ[INSpe
 
 3 = S e l f - d e f i n e d   P a r a m e t e r 
 
 4 = penc;`MOpe
 
 4 = T o t a l   d a t a   b i t 
 
 5 = 	gHepencMOpe
N+T!h	
 
 5 = V a l i d   d a t a   b i t   (   n o   p a r i t y   b i t ) 
 
 6 = 	gHepencMOn
 
 6 = V a l i d   d a t a   p o s i t i o n 
 
 7 = !hMO1 MOn
 
 7 = p a r i t y   b i t   1   p o s i t i o n 
 
 8 = !hMO2 MOn
 
 8 = p a r i t y   b i t   2   p o s i t i o n 
 
 9 = !hMO3 MOn
 
 9 = p a r i t y   b i t   3   p o s i t i o n 
 
 1 0 = Tb
 
 1 0 = B a c k   
 
 1 1 = MRb
 
 1 1 = F r o n t 
 
 1 2 = *gO(u
 
 1 2 = U n u s e d 
 
 1 3 = wYMO
 
 1 3 = S t a r t   b i t 
 
 1 4 = ~bkMO
 
 1 4 = E n d   b i t 
 
 1 5 = SsYN: \ n \ n 
 
 1 5 = F o l l o w i n g   e r r o r   f o u n d :   \ n \ n 
 
 1 6 = 	g$N*Nb	N*N!hMO:NvTMOn0\ n 
 
 1 6 = 2   o r   3   p a r i t y   b i t   s e t   i n   t h e   s a m e   p o s i t i o n . \ n 
 
 1 7 = 	gHepencMOpeR
N!hMOpe'YNpenc;`MOpe0\ n 
 
 1 7 = V a l i d   d a t a   b i t   +   p a r i t y   b i t   >   t o t a l   d a t a   b i t .   \ n 
 
 1 8 = wYMO
 
 1 8 = S t a r t   b i t 
 
 1 9 = ~bkMO
 
 1 9 = E n d   b i t 
 
 2 0 = !hMO1 
 
 2 0 = P a r i t y   b i t   1 
 
 2 1 = !hMO2 
 
 2 1 = P a r i t y   b i t   2 
 
 2 2 = !hMO3 
 
 2 2 = P a r i t y   b i t   3 
 
 2 3 = 	gHepencMO
 
 2 3 = V a l i d   d a t a   b i t 
 
 2 4 = !hpencMO
 
 2 4 = P a r i t y   d a t a   b i t 
 
 2 5 = _eupencMO
 
 2 5 = I g n o r e   d a t a   b i t 
 
 
 
 / / ܏z _[݋Fh
 
 / / R e m o t e   O p e n   d i a l o g   b o x 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 2 6   T y p e = 1 ] 
 
 0 = ܏z _
 
 0 = R e m o t e   o p e n 
 
 1 = BlSb _S % s  	c nx[ Sb _S	c Sm >e_0
 
 1 = R e q u e s t   o p e n   d o o r   " % s " ,   P r e s s   " Y e s "   t o   o p e n   d o o r ,   p r e s s   " C a n c e l "   t o   g i v e   u p 
 
 2 = ,g[݋Fh\(W% d yTsQ. . . 
 
 2 = T h i s   d i a l o g   b o x   w i l l   b e   c l o s e d   i n   % d   s e c o n d . 
 
 3 = f\PPe
 
 3 = C o u n t   d o w n   S u s p e n d e d 
 
 4 = Pe]f\P. . . 
 
 4 = C o u n t   d o w n   s t o p p e d 
 
 
 
 / / NXT[eQ[݋Fh
 
 / / E m p l o y e e   I m p o r t   d i a l o g   b o x 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 2 7   T y p e = 1 ] 
 
 0 = NE x c e l h<heN[eQNXT
 
 0 = T o   I m p o r t   E m p l o y e e   f r o m   E x c e l   F i l e 
 
 1 = E x c e l eNSpe
 
 1 = E x c e l   f i l e   p a r a m e t e r 
 
 2 = hUS
Ty
 
 2 = S h e e t   N a m e 
 
 3 = [eQwYL
 
 3 = I m p o r t   S t a r t i n g   R o w 
 
 4 = [eQ~bkL
 
 4 = I m p o r t   E n d   R o w 
 
 5 = NXThUSSpe
 
 5 = E m p l o y e e   S h e e t   P a r a m e t e r 
 
 6 = NXTY
TR
 
 6 = N a m e   C o l u m n 
 
 7 = NXTSR
 
 7 = C o d e   C o l u m n 
 
 8 = NXTR
 
 8 = D e p a r t m e n t   C o l u m n 
 
 9 = XR
NX[(Wv
 
 9 = A d d   N o n - e x i s t   D e p a r t m e n t 
 
 1 0 = NXTaSSR
 
 1 0 = C a r d   N u m b e r   C o l u m n 
 
 1 1 = aSS<h_
 
 1 1 = C a r d   N u m b e r   F o r m a t 
 
 1 2 = NXT'`+RR
 
 1 2 = G e n d e r   C o l u m n 
 
 1 3 = '`+R<h_
 
 1 3 = G e n d e r   C o l u m n 
 
 1 4 = NXTQuegR
 
 1 4 = B i r t h d a y   C o l u m n 
 
 1 5 = Queg<h_
 
 1 5 = B i r t h d a y   F o r m a t 
 
 1 6 = LCgP~Yte_
 
 1 6 = A c c e s s   G r o u p   P r o c e s s i n g   M o d e 
 
 1 7 = NXTLCgP~R
 
 1 7 = A c c e s s   G r o u p   C o l u m n 
 
 1 8 = LCgP~
 
 1 8 = A c c e s s   G r o u p   
 
 1 9 = NXTLMOR
 
 1 9 = P o s i t i o n   C o l u m n 
 
 2 0 = NXTf[SR
 
 2 0 = E d u c a t i o n   C o l u m n 
 
 2 1 = NXT5u݋R
 
 2 1 = T e l .   N u m b e r   c o l u m n 
 
 2 2 = NXT[^OO@WR
 
 2 2 = H o m e   A d d r e s s   C o l u m n 
 
 2 3 = NXTYlR
 
 2 3 = R e m a r k   C o l u m n 
 
 2 4 = CgP~
NX[(WvNXTR_eQ
 
 2 4 = I f   A c c e s s   G r o u p   i s   n o t   E x i s t ,   P l e a s e   S e l e c t   O n e 
 
 3 0 = 
N[eQ
 
 3 0 = D o   n o t   I m p o r t 
 
 3 1 = 1uhUSR[eQ
 
 3 1 = I m p o r t   f r o m   S h e e t 
 
 3 2 = 	bLCgP~
 
 3 2 = S e l e c t   A c c e s s   G r o u p   
 
 3 4 = hUS% c R
 
 3 4 = S h e e t   % c   C o l u m n 
 
 3 5 = 1 0 ۏ6R
 
 3 5 = D e c i m a l 
 
 3 6 = 1 6 ۏ6RؚW[(WMR
 
 3 6 = H e x ,   h i g h   b y t e   i n   f r o n t 
 
 3 7 = 1 6 ۏ6RNOW[(WMR
 
 3 7 = H e x ,   l o w   b i t   b y t e   i n   f r o n t 
 
 3 8 = 7u/ sY
 
 3 8 = M a l e / F e m a l e 
 
 3 9 = T R U E / F A L S E 
 
 4 0 = F A L S E / T R U E 
 
 4 1 = Y Y Y Y - M M - D D 
 
 4 2 = M M - D D - Y Y Y Y 
 
 4 3 = S h e e t 1 
 
 4 4 = SLCgP~RheQsNYN\ n 
 
 4 4 = W h e n   a c q u i r e   a c c e s s   g r o u p   l i s t ,   f o l l o w i n g   e r r o r   h a p p e n s :   \ n 
 
 4 5 = D D - M M - Y Y Y Y 
 
 
 
 / / f9e[x
 
 [ M a i n I D = 0 x D 0 0 0 0 0 2 8   T y p e = 1 ] 
 
 0 = f9e[x
 
 0 = C h a n g e   c o m m u n i c a t i o n   p a s s w o r d 
 
 1 = [x
 
 1 = C o m m u n i c a t i o n   p a s s w o r d 
 
 2 = Q N!k
 
 2 = I n p u t   a g a i n 
 
 3 = zsSQeQc6RhV
 
 3 = W r i t e   i n f o r m a t i o n   t o   c o n t r o l l e r   a t   o n c e 
 
 
 
 9 = %N͑fJT\ n Yg`͑ňNoN[eňoN:w[xNlxN[x
N Ne\^\'`<P9e:N &T v^\[xf9e:NlxN[xSN~ck0(WvQ[`QN^\'`<P_{:N /f 0\ n 
 
 9 = W a r n i n g : \ n W h e n   u s e r   r e - i n s t a l l s   s o f t w a r e ,   t h e   n e w   s o f t w a r e   d e f a u l t   p a s s w o r d   a n d   h a r d w a r e   p a s s w o r d   i s   d i s c o r d a n t .   P l e a s e   c h a n g e   t h e   p r o p e r t y   v a l u e   t o   " N o "   a n d   c h a n g e   t h e   p a s s w o r d   t o   t h e   s a m e   w i t h   h a r d w a r e   p a s s w o r d .   F o r   o t h e r s ,   p l e a s e   k e e p   t h e   p r o p e r t y   v a l u e   i s   " Y e s " .   \ n 
 
 1 0 = [x_{:N4 MOW[&{b:NzzW[&{SNS0 9 0A F 0a f KNvW[&{0\ n 
 
 1 0 = P a s s w o r d   m u s t   b e   4   b i t s   c h a r a c t e r s   o r   e m p t y .   T h e   C h a r a c t e r s   c a n   r a n g e   f r o m   0   t o   9 ,     A   t o   F ,   a n d   a   t o   f . \ n 
 
 1 1 = [xNQ N!kv[x
N N0\ n 
 
 1 1 = C o m m u n i c a t i o n   p a s s w o r d   i s   d i f f e r   f r o m   r e - i n p u t   p a s s w o r d . \ n 
 
 1 2 = ndc6RhV % s  v[xbR0\ n 
 
 1 2 = C l e a r   c o n t r o l l e r   " % s "   p a s s w o r d   s u c c e s s f u l l y . \ n 
 
 1 3 = ck(W\e[xQeQc6RhV % s  . . . \ n 
 
 1 3 = W r i t i n g   n e w   p a s s w o r d   t o   c o n t r o l l e r   " % s " . . . \ n 
 
 1 4 = ndc6RhV % s  v[xeQsNYN\ n 
 
 1 4 = W h e n   c l e a r   c o n t r o l l e r   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 1 5 = f9e[xǏzQ[x*g9eSv^NRc6RhVv[xS]~nd:NNO[hQ^`!hQ@b	gc6RhVv[x0\ n 
 
 1 5 = O w i n g   t o   e r r o r   h a p p e n e d ,   p a s s w o r d s   w e r e   c h a n g e d .   P a r t s   o f   c o n t r o l l e r   p a s s w o r d s   m a y   b e   c l e a r e d .   I n   o r d e r   t o   p r o t e c t   c o m m u n i c a t i o n   s a f e t y ,   t o   a d j u s t   a l l   c o n t r o l l e r   p a s s w o r d s   a r e   r e c o m m e n d e d . \ n 
 
 1 6 = f9e[xbR0\ n 
 
 1 6 = C h a n g e   p a s s w o r d   s u c c e s s f u l l y . \ n 
 
 1 7 = [x]~f9eFORc6RhVf9e[xeQ[ُNc6RhV[x]~nd:NNO[hQ^`!hQ@b	gc6RhVv[x0\ n 
 
 1 7 = P a s s w o r d s   w e r e   c h a n g e d ,   b u t   p a r t s   o f   c o n t r o l l e r   p a s s w o r d s   w e r e   c l e a r e d   d u e   t o   e r r o r .   I n   o r d e r   t o   p r o t e c t   c o m m u n i c a t i o n   s a f e t y ,   t o   a d j u s t   a l l   c o n t r o l l e r   p a s s w o r d s   a r e   r e c o m m e n d e d . \ n 
 
 1 8 = @b	gc6RhVv[x]~nd0\ n 
 
 1 8 = A l l   c o n t r o l l e r   p a s s w o r d s   a r e   c l e a r e d . \ n 
 
 1 9 = !hQ[xbR0\ n 
 
 1 9 = A d j u s t   p a s s w o r d   s u c c e s s f u l l y . \ n 
 
 2 0 = !hQ[x[bRc6RhV!hQǏzQYgbJT>f:y:N[x	c NNُNc6RhVv
YMO	cT͑Ջ0\ n 
 
 2 0 = A d j u s t   p a s s w o r d   c o m p l e t e d ,   p a r t s   o f   c o n t r o l l e r   a d j u s t m e n t   e r r o r   h a p p e n s .   I f   c o m m u n i c a t i o n   p a s s w o r d   e r r o r   i s   r e p o r t e d   i n   t a s k   r e p o r t ,   p l e a s e   " R e s e t   B u t t o n "   a n d   t r y   a g a i n . \ n 
 
 2 1 = S_[x:Nzzb:N F F F F  e@b	gc6RhVv[x\Ond`nx[~~T\ n 
 
 2 1 = W h e n   p a s s w o r d   i s   e m p t y   o r   " F F F F " ,   a l l   c o n t r o l l e r   p a s s w o r d   w i l l   b e   c l e a r e d .   A r e   y o u   s u r e   t o   c o n t i n u e ? \ n 
 
 2 2 = ck(WQYf9ec6RhV[x. . . \ n 
 
 2 2 = P r e p a r i n g   t o   c h a n g e   c o n t r o l l e r   p a s s w o r d . . . \ n 
 
 2 3 = nd[xbRoN[x]~f9e0\ n 
 
 2 3 = C l e a r   p a s s w o r d   s u c c e s s f u l l y ,   t h e   s o f t w a r e   p a s s w o r d   i s   c h a n g e d . \ n 
 
 2 4 = (Wf9e[xvǏz-NQsNYN\ n 
 
 2 4 = W h e n   c h a n g e   p a s s w o r d ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 2 5 = f9ec6RhV % s  v[xbR0\ n 
 
 2 5 = C h a n g e   c o n t r o l l e r   " % s "   p a s s w o r d   s u c c e s s f u l l y . \ n 
 
 2 6 = f9ec6RhV % s  v[xeQsNYN\ n 
 
 2 6 = W h e n   c h a n g e   c o n t r o l l e r   " % s "   p a s s w o r d ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 2 7 = ck(WQY!hQc6RhV[x. . . \ n 
 
 2 7 = P r e p a r i n g   t o   a d j u s t   c o n t r o l l e r   p a s s w o r d . . . \ n 
 
 2 8 = (Wf9e[xvǏz-NQsNYN\ n 
 
 2 8 = W h e n   c h a n g e   p a s s w o r d ,   f o l l o w i n g   e r r o r   h a p p e n s :   \ n 
 
 2 9 = d\O(u7bSmel~~0\ n 
 
 2 9 = O p e r a t i o n   i s   c a n c e l l e d   b y   u s e r ,   c a n   n o t   c o n t i n u e . 
 
 
 
 / / D V R Spen[݋Fh
 
 [ M a i n I D = 0 x D 0 0 0 0 0 2 A   T y p e = 1 ] 
 
 0 = nD V R / N V R Spe
 
 0 = S e t u p   D V R / N V R   P a r a m e t e r 
 
 1 = D V R / N V R Spe
 
 1 = D V R / N V R   P a r a m e t e r 
 
 2 = y(uD V R / N V R Y
 
 2 = D i s a b l e   D V R / N V R   D e v i c e 
 
 3 = I P 0W@W
 
 3 = I P   A d d r e s s 
 
 4 = I P zS
 
 4 = I P   P o r t 
 
 5 = (u7b
T
 
 5 = U s e r n a m e 
 
 6 = [x
 
 6 = P a s s w o r d 
 
 1 0 = 9eS!j_\O[oN͑/T`nx[~~T\ n 
 
 1 0 = I f   t h e   m o d e   i s   c h a n g e d ,   t h e   s o f t w a r e   w i l l   r e s t a r t .   A r e   y o u   s u r e   t o   c o n t i n u e ? \ n 
 
 1 1 = ޏc0W@W:N % s : % d  vD V R / N V R eQ*gSsD V R / N V R ޏcD V R / N V R KNT͑Ջ\ n 
 
 1 1 = D V R / N V R   a d d r e s s e d   a t   " % s : % d "   i s   n o t   d e t e c t e d     P l e a s e   c o n n e c t   t h e   D V R / N V R   a n d   t r y   a g a i n ! \ n 
 
 1 2 = {vU_D V R / N V R e(u7b
Tb[xd\Oel~~0\ n 
 
 1 2 = U s e r n a m e   o r   p a s s w o r d   i s   i n c o r r e c t ,   o p e r a t i o n   c a n   n o t   b e   c o n t i n u e d . \ n 
 
 
 
 / / 5uhn
 
 [ M a i n I D = 0 x D 0 0 0 0 0 2 B   T y p e = 1 ] 
 
 5 = 5uhc6RhV
 
 5 = E l e v a t o r 
 
 6 = |i% d 
 
 6 = F l o o r   % d 
 
 8 = LCgP
 
 8 = A c c e s s   P e r m i s s i o n 
 
 1 0 = ck(WOX[O9e
zI{. . . \ n 
 
 1 0 = S a v i n g ,   p l e a s e   w a i t . . . \ n 
 
 1 1 = OX[[k0\ n 
 
 1 1 = S a v e   c o m p l e t e d . \ n 
 
 1 2 = :NNXT % s  OX[5uhCgPbR0\ n 
 
 1 2 = S a v e   e l e v a t o r   a c c e s s   f o r   e m p l o y e e   " % s "   s u c c e s s f u l l y . \ n 
 
 1 4 = :NNXT % s  OX[5uhCgPeQsYN\ n 
 
 1 4 = F o l l o w i n g   e r r o r   h a p p e n s   w h e n   s a v e   e l e v a t o r   a c c e s s   f o r   e m p l o y e e   " % s " : \ n 
 
 1 5 = OX[[kFOQsN0\ n 
 
 1 5 = S a v e   c o m p l e t e d ,   b u t   i n   e r r o r .   \ n 
 
 1 6 = 	NXTN
Y6RNXTvTe 
Y6R0\ n 
 
 1 6 = T h e   e m p l o y e e   s e l e c t e d   i s   s a m e   w i t h   t h e   c o p i e d . \ n 
 
 1 7 = ck(W
Y6R^\'`0R	NXT
zI{. . . \ n 
 
 1 7 = C o p i n g ,   p l e a s e   w a i t . . . \ n 
 
 1 8 = 
Y6R5uhCgP^\'`[k0\ n 
 
 1 8 = C o p y   c o m p l e t e d . \ n 
 
 1 9 = 
Y6R5uhCgP^\'`[kFOQsN0\ n 
 
 1 9 = C o p y   c o m p l e t e d ,   b u t   i n   e r r o r . \ n 
 
 2 0 = :NNXT % s  
Y6R5uhCgP^\'`eQsNYN\ n 
 
 2 0 = F o l l o w i n g   e r r o r   h a p p e n s   w h e n   c o p y   e l e v a t o r   a c c e s s   p e r m i s s i o n s   f o r   e m p l o y e e   " % s " : \ n 
 
 2 1 = :NNXT % s  
Y6R5uhCgP^\'`bR0\ n 
 
 2 1 = C o p y   e l e v a t o r   a c c e s s   p e r m i s s i o n s   f o r   e m p l o y e e   " % s "   s u c c e s s f u l l y . \ n 
 
 
 
 2 2 = ck(WS@b	g5uhc6RhVOo`
zI{. . . \ n 
 
 2 2 = G e t t i n g   i n f o r m a t i o n   f o r   a l l   e l e v a t o r   c o n t r o l l e r ,   p l e a s e   w a i t . . . \ n 
 
 2 3 = S5uhc6RhVOo`[k0\ n 
 
 2 3 = G e t   i n f o r m a t i o n   c o m p l e t e . \ n 
 
 2 4 = S5uhc6RhVOo`eNuN5uhn ُNOo`LCgP*gRQ`SNpQ 7ReNXT 	c͑Ջ0\ n 
 
 2 4 = F a i l e d   i n   g e t t i n g   i n f o r m a t i o n .   Y o u   m u s t   c l i c k   t h e   " R e f r e s h   T h i s   P a g e "   b u t t o n   t o   r e t r y . \ n 
 
 2 5 = LCgP*gRQ`SNpQ 7Re,gu 	c͑Ջ0\ n 
 
 2 5 = T h e   A c c e s s   p e r m i s s i o n   i s   n o t   l i s t e d .   Y o u   m u s t   c l i c k   t h e   " R e f r e s h   T h i s   P a g e "   b u t t o n   t o   r e t r y . \ n 
 
 3 2 = ck(WX[5uhCgPpenc
zI{. . . \ n 
 
 3 2 = C a c h i n g   t h e   a c c e s s   p e r m i s s i o n   d a t a ,   p l e a s e   w a i t . . . \ n 
 
 3 3 = 5uhCgPpencX[[k0\ n 
 
 3 3 = C a c h e   s u c c e s s f u l l y . \ n 
 
 3 4 = X[5uhCgPpenceQsNYN[elOX[: \ n 
 
 3 4 = F o l l o w i n g   e r r o r   h a p p e n s   w h e n   c a c h i n g   t h e   a c c e s s   p e r m i s s i o n   d a t a : \ n 
 
 
 
 6 0 = 5uhnS5uhCgPOo`eQsNYN\ n 
 
 6 0 = F o l l o w i n g   e r r o r   h a p p e n s   w h e n   g e t   i n f o r m a t i o n : \ n 
 
 6 1 = PՋ	SS N*NNXTNO͑eS5uhCgPOo`0\ n 
 
 6 1 = P l e a s e   t o   s e l e c t   a n o t h e r   e m p l o y e e   f o r   g e t t i n g   a c c e s s   p e r m i s s i o n . \ n 
 
 
 
 / / hQ@\2\o~n
 
 [ M a i n I D = 0 x D 0 0 0 0 0 3 0   T y p e = 1 ] 
 
 0 = hQ@\2\o~
 
 0 = G l o b a l   A n t i - p a s s b a c k   G r o u p 
 
 1 = hQ@\2\o~Rh
 
 1 = A n t i - p a s s b a c k   G r o u p   L i s t 
 
 2 = ehQ@\2\o~
 
 2 = N e w   A n t i - p a s s b a c k   G r o u p 
 
 7 = ck(W7RehQ@\2\o~Rh
zI{. . . \ n 
 
 7 = R e f r e s h i n g   A n t i - p a s s b a c k   G r o u p   l i s t ,   p l e a s e   w a i t . . . \ n 
 
 8 = 7RehQ@\2\o~Rh]~[k0\ n 
 
 8 = R e f r e s h i n g   A n t i - p a s s b a c k   G r o u p   l i s t   c o m p l e t e d . \ n 
 
 9 = 7RehQ@\2\o~RheNuNS	ghQ@\2\o~*gRQ0`SNpQ 7RehQ@\2\o~ 	c͑Ջ0\ n 
 
 9 = W h e n   r e f r e s h   A n t i - p a s s b a c k   G r o u p   l i s t ,   e r r o r   h a p p e n s .   S o m e   A n t i - p a s s b a c k   G r o u p   m a y   n o t   l i s t e d .   C l i c k   " R e f r e s h   A n t i - p a s s b a c k   G r o u p   L i s t "   t o   t r y   a g a i n . \ n 
 
 1 0 = ck(WOX[O9e
zI{. . . \ n 
 
 1 0 = S a v i n g   M o d i f i c a t i o n ,   p l e a s e   w a i t . . . \ n 
 
 1 1 = OX[[k0\ n 
 
 1 1 = S a v e   c o m p l e t e d . \ n 
 
 1 2 = hQ@\2\o~ % s  OX[bR0\ n 
 
 1 2 = S a v e   A n t i - p a s s b a c k   G r o u p   " % s "   c o m p l e t e d . \ n 
 
 1 4 = OX[hQ@\2\o~ % s  eQsYN\ n 
 
 1 4 = W h e n   s a v e   A n t i - p a s s b a c k   G r o u p   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 1 5 = OX[[kFOQsN0\ n 
 
 1 5 = S a v e   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 1 7 = ck(W RdhQ@\2\o~
zI{. . . \ n 
 
 1 7 = D e l e t i n g   A n t i - p a s s b a c k   G r o u p ,   p l e a s e   w a i t . . . \ n 
 
 1 8 =  Rd[k0\ n 
 
 1 8 = D e l e t e   c o m p l e t e d . \ n 
 
 1 9 =  Rd[kFOQsN0\ n 
 
 1 9 = D e l e t e   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 2 0 =  RdhQ@\2\o~ % s  eQsNYN\ n 
 
 2 0 = W h e n   d e l e t e   A n t i - p a s s b a c k   G r o u p   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 2 1 =  RdhQ@\2\o~ % s  bR0\ n 
 
 2 1 = D e l e t e   A n t i - p a s s b a c k   G r o u p   " % s "   s u c c e s s f u l l y . \ n 
 
 2 2 = ck(WS4YOo`
zI{. . . \ n 
 
 2 2 = G e t t i n g   d a t a   o f   r e a d e r s ,   p l e a s e   w a i t . . . \ n 
 
 2 3 = S4YOo`[k0\ n 
 
 2 3 = G e t t i n g   d a t a   o f   r e a d e r s   c o m p l e t e . \ n 
 
 2 4 = S4YOo`eNuNhQ@\2\o~n*gcknxRQ`SNpQ 7RehQ@\2\o~ 	c͑Ջ0\ n 
 
 2 4 = W h e n   g e t   A n t i - p a s s b a c k   G r o u p   l i s t ,   e r r o r   h a p p e n s .   T h e   a n t i - p a s s b a c k   g r o u p   s e t u p   m a y   n o t   l i s t e d   s u c c e s s f u l l y .   C l i c k   " R e f r e s h   A n t i - p a s s b a c k   G r o u p   L i s t "   t o   t r y   a g a i n . \ n 
 
 2 5 = hQ@\2\o~*gRQ`SNpQ 7RehQ@\2\o~ 	c͑Ջ0\ n 
 
 2 5 = W h e n   g e t   A n t i - p a s s b a c k   G r o u p   l i s t ,   e r r o r   h a p p e n s .   C l i c k   " R e f r e s h   A n t i - p a s s b a c k   G r o u p   L i s t "   t o   t r y   a g a i n . \ n 
 
 
 
 3 2 = ck(WX[4Ypenc
zI{. . . \ n 
 
 3 2 = B u f f e r i n g   d a t a   o f   r e a d e r s ,   p l e a s e   w a i t . . . \ n 
 
 3 3 = 4YpencX[[k0\ n 
 
 3 3 = B u f f e r i n g   d a t a   o f   r e a d e r s   c o m p l e t e d . 
 
 3 4 = X[4YpenceQsNYN[elOX[2\o~: \ n 
 
 3 4 = W h e n   b u f f e r   d a t a   o f   r e a d e r s   f o r   s a v i n g   a n t i - p a s s b a c k   g r o u p ,     f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 4 8 = Sc6RhVOo`QsNYN\ n 
 
 4 8 = W h e n   g e t   d a t a   o f   c o n t r o l l e r s ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 6 0 = hQ@\2\o~nS~4YOo`eQsNYN\ n 
 
 6 0 = W h e n   g e t   d a t a   o f   r e a d e r s   f o r   a n t i - p a s s b a c k   g r o u p ,   ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 6 1 = PՋ	SS N*NhQ@\2\o~NO͑eS~4YOo`0\ n 
 
 6 1 = P l e a s e   t r y   t o   s e l e c t   a n o t h e r   a n t i - p a s s b a c k   g r o u p   f o r   g e t t i n g   d a t a   o f   r e a d e r s . \ n 
 
 
 
 / / hQ@\2\o~^\'`
 
 [ M a i n I D = 0 x D 0 0 0 0 0 3 1   T y p e = 1 ] 
 
 0 x 0 = ^\'`
 
 0 x 0 = P r o p e r t y 
 
 1 = W,gSpe
 
 1 = B a s i c   P a r a m e t e r 
 
 2 = 
Ty
 
 2 = N a m e 
 
 3 = 2\oSpe
 
 3 = A n t i - p a s s b a c k   P a r a m e t e r 
 
 4 = ReQ2\o~
 
 4 = A d d   t o   G r o u p 
 
 
 
 / / d"}Q~mRc6RhV
 
 [ M a i n I D = 0 x D 0 0 0 0 0 3 2   T y p e = 1 ] 
 
 0 = d"}mRc6RhV
 
 0 = S e a r c h   a n d   A d d   C o n t r o l l e r 
 
 1 = ReQ@b	g
 
 1 = A d d   A l l 
 
 2 = 
 
 3 = 
 
 1 0 = *gReQ
 
 1 0 = U n - a d d e d 
 
 1 1 = ]ReQ
 
 1 1 = A d d e d 
 
 2 0 = d"}c6RhVeQsYN\ n 
 
 2 0 = F o l l o w i n g   e r r o r   h a p p e n s   w h e n   s e a r c h   c o n t r o l l e r s : \ n 
 
 
 
 / / 	be
 
 [ M a i n I D = 0 x D 0 0 0 0 0 3 3   T y p e = 1 ] 
 
 0 = 	bV>ee
 
 0 = T o   S e l e c t   P l a y b a c k   T i m e 
 
 1 = eg
 
 1 = D a t e 
 
 2 = e
 
 2 = T i m e 
 
 
 
 
 
 / / Ƌ+RN^\'`
 
 [ M a i n I D = 0 x D 0 0 0 0 0 3 4   T y p e = 1 ] 
 
 0 x 0 = ^\'`
 
 0 x 0 = P r o p e r t y 
 
 1 = W,gSpe
 
 1 = B a s i c   P a r a m e t e r 
 
 2 = O(u{|W
 
 2 = U s a g e   T y p e 
 
 3 = I P 0W@WbW
T
 
 3 = I P   A d d r e s s   o r   D o m a i n 
 
 4 = I P zS
 
 4 = I P   P o r t 
 
 5 = [x
 
 5 = A c c e s s   P a s s w o r d 
 
 6 = N(uNǑƖ
 
 6 = O n l y   C o l l e c t 
 
 7 = N(uN]\O
 
 7 = O n l y   R u n 
 
 8 = (uNǑƖT]\O
 
 8 = C o l l e c t   a n d   R u n 
 
 9 = ~9h2 6 
 
 9 = W i e g a n d   2 6 
 
 1 0 = ~9h3 4 
 
 1 0 = W i e g a n d   3 4 
 
 1 1 = db
 
 1 1 = V o i c e   A n n o u n c e m e n t 
 
 1 2 = lQS
Ty
 
 1 2 = C o m a n y   N a m e 
 
 1 3 = O\U^eT
 
 1 3 = S c r e e n   O r i e n t a t i o n 
 
 1 4 = *jO\
 
 1 4 = L a n d s c a p e   M o d e 
 
 1 5 = zO\
 
 1 5 = P o r t r a i t   M o d e 
 
 1 6 = Ƌ+RbR/f&T>f:yY
T
 
 1 6 = D i s p l a y   N a m e   o f   p e r s o n n e l 
 
 1 7 = Ǐ
 
 1 7 = P l e a s e   P a s s   t h r o u g h 
 
 1 8 = D N S 
 
 1 9 = OSQ!j_
 
 1 9 = S i g n a l   O u t p u t   M o d e 
 
 2 0 =  _sQϑ
 
 2 0 = S w i t c h   S i g n a l 
 
 
 
 / / Ƌ+RN
 
 [ M a i n I D = 0 x D 0 0 0 0 0 3 5   T y p e = 1 ] 
 
 0 = Ƌ+RN
 
 0 = F a c e   R e c o g n i t i o n   D e v i c e 
 
 1 = Ƌ+RNRh
 
 1 = R e c o g n i t i o n   D e v i c e   L i s t 
 
 2 = eƋ+RN
 
 2 = N e w   R e c o g n i t i o n   D e v i c e 
 
 7 = ck(W7ReƋ+RNRh
zI{. . . \ n 
 
 7 = R e f r e s h i n g   r e c o g n i t i o n   d e v i c e   l i s t ,   p l e a s e   w a i t . . . \ n 
 
 8 = 7ReƋ+RNRh]~[k0\ n 
 
 8 = R e f r e s h i n g   r e c o g n i t i o n   d e v i c e   l i s t   c o m p l e t e d . \ n 
 
 9 = 7ReƋ+RNRheNuNS	gƋ+RN*gRQ0`SNpQ 7ReƋ+RN 	c͑Ջ0\ n 
 
 9 = E r r o r   w h e n   r e f r e s h i n g   r e c o g n i t i o n   d e v i c e   l i s t .   D e v i c e   m a y   n o t   b e   l i s t e d .   C l i c k   " R e f r e s h   D e v i c e   L i s t "   a n d   r e t r y . \ n   
 
 1 0 = ck(WOX[O9e
zI{. . . \ n 
 
 1 0 = S a v i n g   m o d i f i c a t i o n ,   p l e a s e   w a i t . . . \ n 
 
 1 1 = OX[[k0\ n 
 
 1 1 = S a v e   c o m p l e t e d . \ n 
 
 1 2 = Ƌ+RN % s  OX[bR0\ n 
 
 1 2 = S a v e   r e c o g n i t i o n   d e v i c e   " % s "   s u c c e s s f u l l y . \ n 
 
 1 4 = OX[Ƌ+RN % s  eQsYN\ n 
 
 1 4 = W h e n   s a v e   r e c o g n i t i o n   d e v i c e   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 1 5 = OX[[kFOQsN0\ n 
 
 1 5 = S a v e   c o m p l e t e d ,   b u t   i s   i n   e r r o r . \ n 
 
 1 7 = ck(W RdƋ+RN
zI{. . . \ n 
 
 1 7 = D e l e t i n g   r e c o g n i t i o n   d e v i c e ,   p l e a s e   w a i t . . . \ n 
 
 1 8 =  Rd[k0\ n 
 
 1 8 = D e l e t e   c o m p l e t e d . \ n 
 
 1 9 =  Rd[kFOQsN0\ n 
 
 1 9 = D e l e t i n g   c o m p l e t e d ,   b u t   i s   i n   e r r o r . \ n 
 
 2 0 =  RdƋ+RN % s  eQsNYN\ n 
 
 2 0 = W h e n   d e l e t e   r e c o g n i t i o n   d e v i c e   " % s " ,   f o l l o w i n g   e r r o r   i s   h a p p e n : \ n 
 
 2 1 =  RdƋ+RN % s  bR0\ n 
 
 2 1 = D e l e t e   r e c o g n i t i o n   d e v i c e   " % s "   s u c c e s s f u l l y . \ n 
 
 2 2 = ck(WhKmƋ+RN
zI{. . . \ n 
 
 2 2 = D e t e c t i n g   r e c o g n i t i o n   d e v i c e ,   p l e a s e   w a i t . . . \ n 
 
 2 3 = hKm[k0\ n 
 
 2 3 = D e t e c t i n g   c o m p l e t e d . \ n 
 
 2 4 = hKmMON % s  vƋ+RN % s  eQsNYN\ n 
 
 2 4 = W h e n   d e t e c t   r e c o g n i t i o n   d e v i c e   l o c a t e d   i n   " % s "   n a m e d   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 2 5 = MON % s  vƋ+RN % s  ]ޏc0\ n 
 
 2 5 = R e c o g n i t i o n   d e v i c e   l o c a t e d   i n   " % s "   n a m e d   " % s "   i s   c o n n e c t e d . \ n 
 
 2 6 = MON % s  vƋ+RN % s  *gޏc0\ n 
 
 2 6 = R e c o g n i t i o n   d e v i c e   l o c a t e d   i n   " % s "   n a m e d   " % s "   i s   c o n n e c t e d . \ n 
 
 2 7 = hKm[kFOQsN0\ n 
 
 2 7 = D e t e c t i n g   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 2 8 = |~AQ	gNN	g NSǑƖƋ+RN]X[(W NSǑƖƋ+RNeXbO9e,gƋ+RNN(uNǑƖ\O:_6Rb]X[(Wv(uNǑƖvƋ+RNf9e:NN(uN]\O`nx[~~T\ n 
 
 2 8 = T h e r e   i s   o n l y   o n e   c o l l e t i o n   d e v i c e   a l l o w e d   i n   t h e   s y s t e m .   I f   t h e   u s a g e   t y p e   o f   t h i s   d e v i c e   i s   s e t   t o   " O n l y   C o l l e c t "   o r   " C o l l e c t   o r   R u n " ,   t h e   u s a g e   t y p e   o f   p r e v i o u s   c o l l e c t i o n   d e v i c e   w i l l   c h a n g e   t o   " O n l y   R u n " ,   D o   y o u   w a n t   t o   c o n t i n u e ? \ n 
 
 2 9 = f9e[x
 
 2 9 = C h a n g e   A c c e s s   P a s s w o r d 
 
 3 0 = [x
 
 3 0 = A c c e s s   P a s s w o r d 
 
 3 1 = [xNQ N!kv[x
N N0\ n 
 
 3 1 = P a s s w o r d   i s   d i f f e r   f r o m   r e - i n p u t   p a s s w o r d . \ n 
 
 3 2 = f9e[xbR0\ n 
 
 3 2 = C h a n g e   p a s s w o r d   s u c c e s s f u l l y . \ n 
 
 3 3 = f9e[x[k0\ n 
 
 3 3 = C h a n g e   p a s s w o r d   c o m p l e t e d . \ n 
 
 3 4 = :NƋ+RN % s  f9e[xeQsNYN\ n 
 
 3 4 = W h e n   c h a n g e   p a s s w o r d   o f   r e c o g n i t i o n   d e v i c e   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 3 5 = Ƌ+RN % s  vf9e[x[k0\ n 
 
 3 5 = C h a n g e   p a s s w o r d   o f   r e c o g n i t i o n   d e v i c e   " % s "   c o m p l e t e d . \ n 
 
 3 6 =  _Y:NƋ+RN % s  f9e[x0\ n 
 
 3 6 = C h a n g i n g   p a s s w o r d   o f   r e c o g n i t i o n   d e v i c e   " % s " . \ n 
 
 3 7 = ck(Wf9eƋ+RN[x. . . \ n 
 
 3 7 = P r e p a r i n g   t o   c h a n g e   p a s s w o r d   o f   r e c o g n i t i o n   d e v i c e . . . \ n 
 
 3 8 = ck(WnI P 0W@W. . . \ n 
 
 3 8 = P r e p a r i n g   t o   s e t   I P   a d d r e s s   o f   r e c o g n i t i o n   d e v i c e . . . \ n 
 
 3 9 =  _Y:NƋ+RN % s  nI P 0W@W0\ n 
 
 3 9 = S e t t i n g   I P   a d d r e s s   o f   r e c o g n i t i o n   d e v i c e   " % s " . \ n 
 
 4 0 = Ƌ+RN % s  vnI P 0W@W[k0\ n 
 
 4 0 = S e t   I P   a d d r e s s   o f   r e c o g n i t i o n   d e v i c e   " % s "   c o m p l e t e d . \ n 
 
 4 1 = :NƋ+RN % s  nI P 0W@WeQsNYN\ n 
 
 4 1 = W h e n   s e t   I P   a d d r e s s   o f   r e c o g n i t i o n   d e v i c e   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 4 2 = nI P 0W@W[k0\ n 
 
 4 2 = S e t   I P   a d d r e s s   c o m p l e t e d . \ n 
 
 4 3 = nI P 0W@WbR0\ n 
 
 4 3 = S e t   I P   a d d r e s s   s u c c e s s f u l l y . \ n 
 
 4 4 = nI P 0W@W
 
 4 4 = S e t   I P   A d r e s s 
 
 4 5 = ck(W!hQƋ+RNe
zI{. . . \ n 
 
 4 5 = A d j u s t i n g   d e v i c e   t i m e ,   p l e a s e   w a i t . . . \ n 
 
 4 6 = !hQe[k0\ n 
 
 4 6 = T i m e   a d j u s t m e n t   i s   c o m p l e t e d . \ n 
 
 4 7 = !hQƋ+RN % s  veQsNYN\ n 
 
 4 7 = W h e n   a d j u s t   t h e   t i m e   o f   d e v i c e   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 4 8 = Ƌ+RN % s  ve]!hQ0\ n 
 
 4 8 = T h e   t i m e   o f   d e v i c e   " % s "   h a v e   b e e n   a d j u s t e d . \ n 
 
 4 9 = !hQe[kFOQsN0\ n 
 
 4 9 = W h e n   a d j u s t   t h e   t i m e   o f   d e i v c e   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 
 
 2 0 0 1 = 7ReRh
 
 2 0 0 1 = R e f r e s h   D e v i c e   L i s t 
 
 2 0 0 4 = Smd\O
 
 2 0 0 4 = C a n c e l   t h e   o p e r a t i o n 
 
 
 
 
 
 / / N8ǑƖ
 
 [ M a i n I D = 0 x D 0 0 0 0 0 3 6   T y p e = 1 ] 
 
 1 = NXTY
T
 
 1 = N a m e 
 
 2 = aSS
 
 2 = C a r d   N u m b e r 
 
 3 = ]ǑƖ
 
 3 = C o l l e c t e d 
 
 4 = S
 
 4 = C o d e 
 
 5 = 
 
 5 = D e p a r t m e n t 
 
 6 = Sm
 
 6 = C a n c e l 
 
 7 = euǏdkN
 
 7 = S k i p   t h i s   e m p l o y e e 
 
 8 = nxǑƖ[b
 
 8 = C o n f i r m   c o l l e c t i o n   i s   c o m p l e t e 
 
 9 = 勺NXT\byǑƖƋ+RNmvfeFh>f:y:SW0
 
 9 = E m p l o y e e   m o v e   t h e   f a c e   t o   d i s p l a y   a r e a   o f   c o l l e c t i o n   r e c o g n i t i o n   d e v i c e   L C D . 
 
 1 0 = N8ǑƖ
 
 1 0 = F a c e   C o l l e c t i o n 
 
 1 1 = NXTY
T% s   \ n aS        S% s \ n         S% s \ n         % s \ n \ n 
 
 1 1 = E m p l o y e e   N a m e :   % s \ n   C a r d   N u m b e r :   % s \ n   C o d e :   % s \ n   D e p a r t m e n t : % s \ n \ n 
 
 1 2 = ck(WꁨRbgqǑƖN8penc
zI{. . . \ n 
 
 1 2 = A u t o m a t i c a l l y   t a k e   p h o t o   t o   c o l l e c t   f a c e   d a t a ,   p l e a s e   w a i t . . . \ n 
 
 1 3 = NXT % s  N8pencǑƖbR0\ n 
 
 1 3 = E m p l o y e e   % s   f a c e   d a t a   c o l l e c t i o n   w a s   s u c c e s s f u l . \ n 
 
 1 4 = NXT % s  N8pencǑƖeQsYN: \ n 
 
 1 4 = E m p l o y e e   % s   f a c e   d a t a   c o l l e c t i o n   e r r o r : \ n 
 
 1 5 = 	bgqGr. . . 
 
 1 5 = S e l e c t   p h o t o . . . 
 
 1 6 = N8pencǑƖ[k0\ n 
 
 1 6 = F a c e   d a t a   c o l l e c t i o n   i s   c o m p l e t e . \ n 
 
 1 7 = N8pencǑƖ[kFOQsN0\ n 
 
 1 7 = F a c e   d a t a   c o l l e c t i o n   i s   c o m p l e t e d ,   b u t   a n   e r r o r   h a s   o c c u r r e d . \ n 
 
 1 8 = ck(WQYhQbNSN8penc
zI{. . . \ n 
 
 1 8 = P r e p a r i n g   t o   f u l l y   u p l o a d   f a c e   d a t a ,   p l e a s e   w a i t . . . \ n 
 
 1 9 = hQbNSN8penc[k0\ n 
 
 1 9 = F a c e   d a t a   u p l o a d   i s   c o m p l e t e d . \ n 
 
 2 0 = hQbNSN8penc[kFOQsN0\ n 
 
 2 0 = F u l l y   u p l o a d   f a c e   d a t a   i s   c o m p l e t e d ,   b u t   e r r o r   h a s   o c c u r r e d . \ n 
 
 2 1 = ck(WNSN8penc
zI{. . . \ n 
 
 2 1 = T h e   f a c e   d a t a   i s   u p l o a d i n g ,   p l e a s e   w a i t . . . \ n 
 
 2 2 = NSN8penc[k0\ n 
 
 2 2 = T h e   f a c e   d a t a   u p l o a d   i s   c o m p l e t e d . \ n 
 
 2 3 = NSN8penc[kFOQsN0\ n 
 
 2 3 = T h e   f a c e   d a t a   w a s   u p l o a d e d ,   b u t   e r r o r   o c c u r r e d . \ n 
 
 2 4 =  _Y:NƋ+RN % s  NSN8penc0\ n 
 
 2 4 = S t a r t   t o   s e n d   f a c e   d a t a   f o r   t h e   r e c o g n i t i o n   d e v i c e   % s . \ n 
 
 2 5 = Ƌ+RN % s  v@b	gN8pencNS[k0\ n 
 
 2 5 = A l l   f a c e   d a t e   o f   r e c o g n i t i o n   d e v i c e   % s   i s   u p l o a d e d . \ n 
 
 2 6 = :NƋ+RN % s  NSN8penceQsNYN\ n 
 
 2 6 = T h e   f o l l o w i n g   e r r o r   o c c u r r e d   w h e n   s e n d i n g   f a c e   d a t a   f o r   r e c o g n i t i o n   d e v i c e   % s : \ n 
 
 2 7 = ck(W RdN8penc
zI{. . . \ n 
 
 2 7 = D e l e t i n g   f a c e   d a t a ,   p l e a s e   w a i t . . . \ n 
 
 2 8 = NXT % s  N8penc RdbR0\ n 
 
 2 8 = E m p l o y e e   % s   f a c e   d a t a   d e l e t e d   s u c c e s s f u l l y . \ n 
 
 2 9 = NXT % s  N8penc RdeQsYN\ n 
 
 2 9 = T h e   f o l l o w i n g   e r r o r   o c c u r r e d   w h e n   d e l e t i n g   t h e   f a c e   d a t a   o f   t h e   e m p l o y e e   % s : \ n 
 
 3 0 =  RdN8penc[k0\ n 
 
 3 0 = D e l e t e   f a c e   d a t a   i s   c o m p l e t e . \ n 
 
 3 1 =  RdN8penc[k  FOQsN0\ n 
 
 3 1 = D e l e t e   f a c e   d a t a   i s   c o m p l e t e ,   b u t   a n   e r r o r   h a s   o c c u r r e d . \ n 
 
 3 2 = HQ:NNXT % s  XRc[aSS0\ n 
 
 3 2 = P l e a s e   a d d   s p e c i f i e d   c a r d   n u m b e r   t o   t h e   e m p l o y e e   % s   f i r s t l y . \ n 
 
 3 3 = ǑƖƋ+RNޏc1Y%Yޏce0\ n 
 
 3 3 = F a i l e d   t o   c o n n e c t   w i t h   c o l l e c t i o n   r e c o g n i t i o n   d e v i c e   a n d   t h e   d e v i c e   c o n n e c t i o n   t i m e   o u t . \ n 
 
 3 4 = hKm0R勺NXTN8pencǑƖ*gbRnx/f&TI{_b͑/TǑƖ\ n 
 
 3 4 = I t   i s   d e t e c t e d   t h a t   t h e   f a c e   d a t a   c o l l e c t i o n   o f   t h e   e m p l o y e e   i s   u n s u c c e s s f u l .   P l e a s e   c o n f i r m   w h e t h e r   t o   w a i t   o r   r e s t a r t   t h e   c o l l e c t i o n . 
 
 3 5 = I{_
 
 3 5 = W a i t 
 
 3 6 = ͑/T
 
 3 6 = R e b o o t 
 
 3 7 = Yck_I{_ NR. . . \ n 
 
 3 7 = D e v i c e   i s   b u s y ,   p l e a s e   w a i t   a   m i n u t e . . . \ n 
 
 3 8 = l	gc[ǑƖƋ+RNHQ(WN8Ƌ+RNLubn NSǑƖƋ+RN0\ n 
 
 3 8 = I f   t h i s   i s   n o   c o l l e c t i o n   r e c o g n i t i o n   d e v i c e   i s   s p e c i f i e d ,   p l e a s e   s e t   u p   c o l l e c t i o n   r e c o g n i t i o n   d e v i c e   o n   t h e   f a c e   r e c o g n i t i o n   d e v i c e   i n t e r f a c e   f i r s t l y . \ n 
 
 3 9 = ck(W:Nc[gqGrubN8penc
zI{. . . \ n 
 
 3 9 = G e n e r a t i n g   f a c e   d a t a   f o r   t h e   s p e c i f i e d   p h o t o ,   p l e a s e   w a i t . . . \ n 
 
 
 
 / / c~ǑƖ
 
 [ M a i n I D = 0 x D 0 0 0 0 0 3 7   T y p e = 1 ] 
 
 2 0 0 1 = 7ReRh
 
 2 0 0 1 = R e f r e s h   D e v i c e   L i s t 
 
 2 0 0 4 = Smd\O
 
 2 0 0 4 = C a n c e l   t h e   o p e r a t i o n 
 
 0 = c~:g]\O!j_
 
 0 = F i n g e r p r i n t   D e v i c e   W o r k i n g   M o d e 
 
 1 = c~ NSO:gRh
 
 1 = F i n g e r p r i n t   D e v i c e   L i s t 
 
 7 = ck(W7Rec~ NSO:gRh
zI{. . . \ n 
 
 7 = R e f r e s h i n g   f i n g e r p r i n t   d e v i c e   l i s t ,   p l e a s e   w a i t . . . \ n 
 
 8 = 7Rec~ NSO:gRh]~[k0\ n 
 
 8 = F i n g e r p r i n t   d e v i c e   l i s t   w a s   R e f r e s h e d . \ n   
 
 9 = 7Rec~ NSO:gRheNuNS	g NSO:g*gRQ0`SNpQ 7ReRh 	c͑Ջ0\ n 
 
 9 = A n   e r r o r   o c c u r r e d   w h i l e   r e f r e s h i n g   t h e   f i n g e r p r i n t   d e v i c e   l i s t ,   a n d   t h e r e   m a y   b e   a n   f i n g e r p r i n t   d e v i c e   i s   n o t   l i s t e d .   U s e r   c a n   t r y   a g a i n   b y   c l i c k i n g   t h e   R e f r e s h   L i s t   b u t t o n . \ n 
 
 
 
 1 7 = ck(W Rdc~penc
zI{. . . \ n 
 
 1 7 = D e l e t i n g   f i n g e r p r i n t   d a t a ,   p l e a s e   w a i t . . . \ n 
 
 1 8 = NXT % s  c~penc RdbR0\ n 
 
 1 8 = T h e   f i n g e r p r i n t   d a t a   o f   e m p l o y e e   " % s "   w a s   d e l e t e d   s u c c e s s f u l l y . \ n 
 
 1 9 = NXT % s  c~penc RdeQsYN\ n 
 
 1 9 = T h e   f o l l o w i n g   e r r o r   o c c u r r e d   w h e n   d e l e t i n g   t h e   " % s "   f i n g e r p r i n t   d a t a : \ n 
 
 2 0 =  Rdc~penc[k0\ n 
 
 2 0 = D e l e t i n g   f i n g e r p r i n t   d a t a   w a s   c o m p l e t e d . \ n 
 
 2 1 =  Rdc~penc[k  FOQsN0\ n 
 
 2 1 = T h e   f i n g e r p r i n t   d a t a   w a s   d e l e t e d ,   b u t   a n   e r r o r   o c c u r r e d . \ n 
 
 
 
 2 2 = ck(WNSc~penc
zI{. . . \ n 
 
 2 2 = 
 
 2 3 = NSc~penc[k0\ n 
 
 2 3 = 
 
 2 4 = NSc~penc[kFOQsN0\ n 
 
 2 4 = 
 
 2 5 =  _Y:NƋ+RN % s  NSN8penc0\ n 
 
 2 5 = 
 
 2 6 = Ƌ+RN % s  v@b	gc~pencNS[k0\ n 
 
 2 6 = 
 
 2 7 = :NƋ+RN % s  NSc~penceQsNYN\ n 
 
 2 7 = 
 
 
 
 2 8 = ǑƖc~Ǐz-NQsNYN\ n 
 
 2 8 = T h e   f o l l o w i n g   e r r o r   o c c u r r e d   d u r i n g   f i n g e r p r i n t   c o l l e c t i o n : \ n 
 
 2 9 = *gc[ǑƖc~ NSO:gHQ(W c~ NSO:g Lub\(uNǑƖvƋ+RNvO(u{|Wn:N N(uNǑƖ b (uNǑƖT]\O 0\ n 
 
 2 9 = I f   t h e   f i n g e r p r i n t   d e i v c e   i s   n o t   s p e c i f i e d ,   p l e a s e   s e l e c t   t h e   u s a g e   t y p e   O n l y   C o l l e c t   o r   C o l l e c t   a n d   R u n   i n   F i n g e r p r i n t   D e v i c e   i n t e r f a c e . \ n 
 
 3 0 = NXT % s  	cgq
NbvV:y(WǑƖz{	cKbc(W NSO:gSQw#T~g _Kbc0YdkS
YY!kv0RoNc:yǑƖbR0
 
 3 0 = E m p o y e e   " % s "   p u t   f i n g e r   i n   c o l l e c t i o n   w i n d o w   a c c o r d i n g   t o   a b o v e   p i c t u r e ,   a n d   r e l e a s e   t h e   f i n g e r   a f t e r   f i n g e r p r i n t   d e v i c e   m a k e s   a   s h o r t   b e e p .   T h i s   i s   r e p e a t e d   
 
 3 1 = la勺NXTf~bRǑƖǏc~penc0`SNǏpQ N NNXT b 
N NNXT 	ceuǏdkN0\ n 
 
 3 1 = N o t e :   T h e   f i n g e r p r i n t   i s   r e g i s t e r e d ,   y o u   c a n   p a s s   b y   c l i c k i n g   N e x t   o r   L a s t . \ n 
 
 3 3 = :NNXT % s  ǑƖc~pencbR0\ n 
 
 3 3 = T h e   f i n g e r p r i n t   d a t a   o f   e m m p l o y e e   % s   w a s   c o l l e c t e d   s u c c e s s f u l l y . \ n 
 
 3 4 = :NN NNXTǑƖc~pencpQ N NNXT 	c0
 
 3 4 = T o   c o l l e c t   n e x t   e m p l o y e e   f i n g e r p r i n t   d a t a   b y   c l i c k i n g   N e x t   b u t t o n . 
 
 3 5 =  gT NMONXTYt[k0`SNsQ[݋FhN~_gc~ǑƖ0
 
 3 5 = T h e   l a s t   e m p l o y e e   h a s   f i n i s h e d   p r o c e s s i n g .   Y o u   c a n   c l o s e   t h e   d i a l o g   t o   e n d   t h e   w o r k . 
 
 3 6 = `SNpQ ǑƖ 	c͑e:N勺NXTǑƖc~0
 
 3 6 = U s e r   c a n   r e - c o l l e c t   t h e   e m p l o y e e ' s   f i n g e r p r i n t   b y   c l i c k i n g   t h e   C o l l e c t   b u t t o n . 
 
 3 7 = :NdkNXTǑƖc~pQ ǑƖ 	c0
 
 3 7 = P l e a s e   c l i c k   C o l l e c t   b u t t o n   t o   g e t   e m p l o y e e   f i n g e r p r i n t . 
 
 
 
 3 8 = *ghKm0Rc~ǑƖhV0hg`vǑƖhV/f&T]cknxޏc0\ n 
 
 3 8 = N o   f i n g e r p r i n t   c o l l e c t o r   d e t e c t e d .   P l e a s e   c h e c k   i f   y o u r   c o l l e c t o r   i s   c o n n e c t e d   c o r r e c t l y . \ n 
 
 3 9 = NXT % s  	cgq
NbvV:y(WǑƖz{Kbc0 bRǑƖ3 !kiRYOǑƖ!kpe% d 0
 
 3 9 = E m p l o y e e   % s   p r e s s   f i n g e r   i n   c o l l e c t i o n   w i n d o w   a s   s h o w n   a b o v e .   I t   n e e d s   c o l l e c t   3   t i m e s   s u c c e s s f u l l y ,   a n d   t h e   n u m b e r   o f   r e m a i n i n g   c o l l e c t i o n :   % d . 
 
 4 0 = NXT % s  ~g _Kbc0
 
 4 0 = E m p l o y e e   % s   r e l e a s e   h i s   f i n g e r . 
 
 4 1 = ǑƖǏz-N	gR_vpenc
Ncknx0O(uT NKbcv^	c
NVc:ycknx{	cKbc0\ n 
 
 4 1 = S o m e   o f   d a t a   o b t a i n e d   i s   i n c o r r e c t   d u r i n g   c o l l e c t i o n   p r o c e s s .   P l e a s e   u s e   t h e   s a m e   f i n g e r   a n d   f o l l o w   a b o v e   i n s t r u c t i o n s . \ n 
 
 
 
 8 0 = ǑƖ( & S ) 
 
 8 0 = & C o l l e c t 
 
 8 1 = 
N NNXT( & P ) 
 
 8 1 = & P r e v i o u s 
 
 8 2 = N NNXT( & N ) 
 
 8 2 = & N e x t 
 
 8 3 = \PbkǑƖ( & S ) 
 
 8 3 = & S t o p 
 
 8 4 = RbcNXTTꁨR/TRǑƖ
 
 8 4 = A u t o   s t a r t   t o   c o l l e c t 
 
 8 5 = c~1 
 
 8 5 = F i n g e r p r i n t   1 
 
 8 6 = c~2 
 
 8 6 = F i n g e r p r i n t   2 
 
 8 7 = c~3 
 
 8 7 = F i n g e r p r i n t   3 
 
 
 
 / / Nw
 
 [ M a i n I D = 0 x D 0 0 0 0 0 3 8   T y p e = 1 ] 
 
 0 = vcNw
 
 0 = E m a i l   N o t i f i c a t i o n 
 
 
 
 1 0 = W,gSpe
 
 1 0 = B a s i c   P a r a m e t e r 
 
 1 1 =  _/TNNNw
 
 1 1 = E n a b l e   E v e n t   N o t i f i c a t i o n 
 
 1 2 =  _/TbfNw
 
 1 2 = E n a b l e   A l a r m   N o t i f i c a t i o n 
 
 
 
 1 3 = NS
gRhV
 
 1 3 = S M T P   S e r v e r 
 
 1 4 = 
gR0W@W
 
 1 4 = A d d r e s s 
 
 1 5 = 
gRzS
 
 1 5 = P o r t 
 
 1 6 = &S
 
 1 6 = A c c o u n t 
 
 1 7 = [x
 
 1 7 = P a s s w o r d 
 
 
 
 2 0 = 6eNN
 
 2 0 = R e c i p i e n t 
 
 2 1 = N0W@W1 
 
 2 1 = F i r s t   E m a i l   A d d r e s s 
 
 2 2 = N0W@W2 
 
 2 2 = S e c o n d   E m a i l   A d d r e s s 
 
 2 3 = N0W@W3 
 
 2 3 = T h i r d   E m a i l   A d d r e s s 
 
 
 
 5 1 = OX[NwnbR0\ n 
 
 5 1 = S a v e   c o m p l e t e d . \ n 
 
 5 2 = OX[NwneQsYN\ n 
 
 5 2 = E r r o r   h a p p e n s   w h e n   s a v i n g : \ n 
 
 
 
 / / vQ[W[&{
 
 / / O t h e r   C h a r a c t e r 
 
 / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / 
 
 / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / 
 
 / /  N,W[&{
 
 / / G e n e r a l   C h a r a c t e r 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 0 0   T y p e = 0 ] 
 
 0 x 0 = 蕁y{t|~
 
 0 x 0 = A c c e s s   C o n t r o l   M a n a g e m e n t   S y s t e m 
 
 0 x 1 = A c c e s s E n . c h m 
 
 0 x 2 = A c c e s s E n . c h m : : / Q u i c k G u i d e . h t m 
 
 0 x 3 = A c c e s s E n . c h m : : / F A Q . h t m 
 
 
 
 / / CgP
T
 
 / / A c c e s s   G r o u p   N a m e 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 0 4   T y p e = 0 ] 
 
 0 = (u7b{t
 
 0 = U s e r   M a n a g e m e n t 
 
 1 = 	yn
 
 1 = O p t i o n s   S e t u p 
 
 2 = penc{t
 
 2 = D a t a   M a n a g e m e n t 
 
 3 = 2NLSn
 
 3 = S e r i a l   P o r t   S e t u p 
 
 4 = lbchVn
 
 4 = C o n v e r t e r   S e t u p 
 
 5 = Q~c6RhVn
 
 5 = N e t w o r k   C o n t r o l l e r   S e t u p 
 
 6 = hTRn
 
 6 = W e e k   S c h e d u l e   S e t u p 
 
 7 = GPeRn
 
 7 = H o l i d a y   S c h e d u l e   S e t u p 
 
 8 = c6RhVn
 
 8 = C o n t r o l l e r   S e t u p 
 
 9 = bfn
 
 9 = A l a r m   S e t u p 
 
 1 0 = Sn
 
 1 0 = D o o r   S e t u p 
 
 1 1 = LCgP~n
 
 1 1 = A c c e s s   G r o u p   S e t u p 
 
 1 2 = aSn
 
 1 2 = C a r d   S e t u p 
 
 1 3 = 蕾n
 
 1 3 = D e p a r t m e n t   S e t u p 
 
 1 4 = NXTn
 
 1 4 = E m p l o y e e   S e t u p 
 
 1 5 = nN}
 
 1 5 = U p l o a d   S e t u p   
 
 1 6 = NNU_
N O
 
 1 6 = D o w n l o a d   E v e n t   R e c o r d   
 
 1 7 = bfU_
N O
 
 1 7 = D o w n l o a d   A l a r m   R e c o r d   
 
 1 8 = vc- !j_
 
 1 8 = V i s i t   M o n i t o r - E d i t   M o d e 
 
 1 9 = vc- vc!j_
 
 1 9 = V i s i t   M o n i t o r - M o n i t o r   M o d e 
 
 2 0 = hQ@\2\on
 
 2 0 = G l o b a l   A n t i - P a s s b a c k 
 
 2 1 = :_6R _sQ
 
 2 1 = F o r c e d   D o o r   O p e n / C l o s e 
 
 2 2 = ܏z _
 
 2 2 = R e m o t e   O p e n 
 
 2 3 = dbf
 
 2 3 = R e l i e v e   A l a r m 
 
 2 4 = !hQc6RhVe
 
 2 4 = A d j u s t   C o n t r o l l e r   T i m e 
 
 2 5 = RYSc6RhV
 
 2 5 = I n i t i a l i z e   C o n t r o l l e r   
 
 2 6 = d^2
 
 2 6 = D i s m i s s / A c t i v a t e   S e c u r i t y   
 
 2 7 = SbpS
 
 2 7 = P r i n t 
 
 2 8 = c6RhVOo`g
 
 2 8 = Q u e r y   C o n t r o l l e r   I n f o r m a t i o n 
 
 2 9 = SOo`g
 
 2 9 = Q u e r y   d o o r   i n f o r m a t i o n 
 
 3 0 = NXTOo`g
 
 3 0 = Q u e r y   E m p l o y e e   I n f o r m a t i o n 
 
 3 1 = aSOo`g
 
 3 1 = Q u e r y   C a r d   I n f o r m a t i o n 
 
 3 2 = NNU_g
 
 3 2 = Q u e r y   E v e n t   R e c o r d 
 
 3 3 = bfU_g
 
 3 3 = Q u e r y   A l a r m   R e c o r d 
 
 3 4 = [evcNNg
 
 3 4 = Q u e r y   R e a l - T i m e   M o n i t o r   E v e n t   
 
 3 5 = [evcbfg
 
 3 5 = Q u e r y   R e a l - T i m e   M o n i t o r   A l a r m   
 
 3 6 = |~e_g
 
 3 6 = Q u e r y   S y s t e m   L o g 
 
 3 7 = SLSOo`
 
 3 7 = D o o r   o f   E m p l o y e e   I n f o r m a t i o n 
 
 3 8 = SLNXTOo`
 
 3 8 = E m p l o y e e   o f   D o o r   I n f o r m a t i o n 
 
 
 
 / / LubQ.^ReNMOn
N ы
 
 / / H e l p   f i l e   p o s i t i o n   w i t h i n   i n t e r f a c e ,   d o   n o t   n e e d   t r a n s l a t e . 
 
 [ M a i n I D = 0 x D 0 0 0 0 0 0 5   T y p e = 0 ] 
 
 0 = R e p o r t . h t m 
 
 1 0 = A C S e r i a l . h t m 
 
 1 1 = A C S e r i a l L i s t . h t m 
 
 1 2 = A C S e r i a l P r o p . h t m 
 
 1 3 = A C S e r i a l P R a t e . h t m 
 
 2 0 = A C C o n v e r t e r . h t m 
 
 2 1 = A C C o n v e r t L i s t . h t m 
 
 2 2 = A C C o n v e r t P r o p . h t m 
 
 2 3 = A C C o n v e r t P T y p e . h t m 
 
 2 4 = A C C o n v e r t P M a c . h t m 
 
 2 5 = A C C o n v e r t P I P . h t m 
 
 2 6 = A C C o n v e r t P M a s k . h t m 
 
 2 7 = A C C o n v e r t P G a t e . h t m 
 
 4 0 = A C N e t C t r l . h t m 
 
 4 1 = A C N e t C t r l L i s t . h t m 
 
 4 2 = A C N e t C t r l P r o p . h t m 
 
 4 3 = A C N e t C t r l P T y p e . h t m 
 
 4 4 = A C N e t C t r l P M a c . h t m 
 
 4 5 = A C N e t C t r l P V e r . h t m 
 
 4 6 = A C C o n v e r t P I P . h t m 
 
 4 7 = A C C o n v e r t P M a s k . h t m 
 
 4 8 = A C C o n v e r t P G a t e . h t m 
 
 6 0 = A C W e e k . h t m 
 
 6 1 = A C W e e k L i s t . h t m 
 
 6 2 = A C W e e k P r o p . h t m 
 
 6 3 = A C P N a m e . h t m 
 
 6 4 = A C W e e k P T i m e . h t m 
 
 7 0 = A C H o l i d a y . h t m 
 
 7 1 = A C H o l i d a y L i s t . h t m 
 
 7 2 = A C H o l i d a y P r o p . h t m 
 
 7 3 = A C P N a m e . h t m 
 
 7 4 = A C H o l i d a y P D a y . h t m 
 
 1 0 0 = A C A l a r m . h t m 
 
 1 0 1 = A C A l a r m L i s t . h t m 
 
 1 0 2 = A C A l a r m P r o p . h t m 
 
 1 0 3 = A C A l a r m P O N a m e . h t m 
 
 1 0 4 = A C A l a r m P M o d e . h t m 
 
 1 0 5 = A C A l a r m P D e l a y . h t m 
 
 1 0 6 = A C A l a r m P I n . h t m 
 
 1 0 7 = A C A l a r m P S e n s o r . h t m 
 
 1 0 8 = A C A l a r m P B u t t o n . h t m 
 
 1 0 9 = A C A l a r m P V a l i d . h t m 
 
 1 1 0 = A C A l a r m P I n v a l i d . h t m 
 
 1 1 1 = A C A l a r m P C o d e . h t m 
 
 1 2 0 = A C G a t e . h t m 
 
 1 2 1 = A C G a t e L i s t . h t m 
 
 1 2 2 = A C G a t e P r o p . h t m 
 
 1 2 3 = A C P N a m e . h t m 
 
 1 2 4 = A C G a t e P L o c k . h t m 
 
 1 2 5 = A C G a t e P O W e e k . h t m 
 
 1 2 6 = A C G a t e P B T y p e . h t m 
 
 1 2 7 = A C G a t e P B W e e k . h t m 
 
 1 2 8 = A C G a t e P S T y p e . h t m 
 
 1 2 9 = A C G a t e P S O T i m e . h t m 
 
 1 3 0 = A C G a t e P S L T i m e . h t m 
 
 1 3 1 = A C G a t e P R N a m e . h t m 
 
 1 3 2 = A C G a t e P R G M o d e . h t m 
 
 1 3 3 = A C G a t e P R R M o d e . h t m 
 
 1 3 4 = A C G a t e P F i r s t . h t m 
 
 1 3 5 = A C G a t e P M u l t i . h t m 
 
 1 3 6 = A C G a t e P R m o t e . h t m 
 
 1 3 7 = A C G a t e P C o d e . h t m 
 
 1 3 8 = A C G a t e P S n . h t m 
 
 1 3 9 = A C G a t e P R S n . h t m 
 
 1 4 0 = A C G r o u p . h t m 
 
 1 4 1 = A C G r o u p L i s t . h t m 
 
 1 4 2 = A C G r o u p P r o p . h t m 
 
 1 4 3 = A C P N a m e . h t m 
 
 1 4 4 = A C G r o u p P R e a d e r . h t m 
 
 1 5 0 = A C A P G r o u p . h t m 
 
 1 5 1 = A C A P G r o u p L i s t . h t m 
 
 1 5 2 = A C A P G r o u p P r o p . h t m 
 
 1 5 3 = A C A P G r o u p P R e a d e r . h t m 
 
 2 2 0 = A C D o w n l o a d . h t m 
 
 2 2 1 = A C D o w n l o a d L i s t . h t m 
 
 2 4 0 = A C R D A l a r m . h t m 
 
 2 4 1 = A C R D A l a r m L i s t . h t m 
 
 2 4 2 = A C R D A l a r m R e s u l t . h t m 
 
 2 5 0 = A C E d i t M a p . h t m 
 
 2 5 1 = A C E d i t M a i n . h t m 
 
 2 5 2 = A C E d i t T o o l b a r . h t m 
 
 2 5 3 = A C E d i t V L i s t . h t m 
 
 2 5 4 = A C V i d e o . h t m 
 
 2 6 0 = A C M o n i t o r . h t m 
 
 2 6 1 = A C M o n i t o r M a i n . h t m 
 
 2 6 2 = A C M o n i t o r T o o l b a r . h t m 
 
 2 6 3 = A C M o n i t o r S n a p s h o t . h t m 
 
 2 6 4 = A C M o n i t o r E v e n t . h t m 
 
 2 6 5 = A C M o n i t o r A l a r m . h t m 
 
 2 7 3 = A C Q u e r y G a t e . h t m 
 
 2 7 7 = A C Q u e r y A l a r m . h t m 
 
 2 7 8 = A C Q u e r y R T E v e n t . h t m 
 
 2 7 9 = A C Q u e r y R T A l a r m . h t m 
 
 2 8 0 = A C L i f t . h t m 
 
 2 8 1 = A C L i f t E m p l o y e e L i s t . h t m 
 
 2 8 2 = A C L i f t P r o p . h t m 
 
 2 8 3 = A C L i f t P P r o p . h t m 
 
 1 0 8 0 = A C C o n t r o l l e r . h t m 
 
 1 0 8 1 = A C C o n t r o l l e r L i s t . h t m 
 
 1 0 8 2 = A C C o n t r o l l e r P r o p . h t m 
 
 1 0 8 3 = A C P N a m e . h t m 
 
 1 0 8 4 = A C C o n t r o l l e r P T y p e . h t m 
 
 1 0 8 5 = A C C o n t r o l l e r P D N u m . h t m 
 
 1 0 8 6 = A C C o n t r o l l e r P R P . h t m 
 
 1 0 8 7 = A C C o n t r o l l e r P C T y p e . h t m 
 
 1 0 8 8 = A C C o n t r o l l e r P S e r i a l . h t m 
 
 1 0 8 9 = A C C o n t r o l l e r P I P . h t m 
 
 1 0 9 0 = A C C o n t r o l l e r P P o r t . h t m 
 
 1 0 9 1 = A C C o n t r o l l e r P A d d r e s s . h t m 
 
 1 0 9 2 = A C C o n t r o l l e r P L o c k . h t m 
 
 1 0 9 3 = A C C o n t r o l l e r P B a c k . h t m 
 
 1 1 6 0 = A C C a r d . h t m 
 
 1 1 6 1 = A C C a r d L i s t . h t m 
 
 1 1 6 2 = A C C a r d P C a r d . h t m 
 
 1 1 8 0 = A C D e p a r t m e n t . h t m 
 
 1 1 8 1 = A C D e p a r t m e n t L i s t . h t m 
 
 1 1 8 2 = A C D e p a r t m e n t P r o p . h t m 
 
 1 1 8 3 = A C P N a m e . h t m 
 
 1 1 9 0 = A C E m p l o y e e . h t m 
 
 1 1 9 1 = A C E m p l o y e e L i s t . h t m 
 
 1 1 9 2 = A C E m p l o y e e P r o p . h t m 
 
 1 1 9 3 = A C E m p l o y e e P N a m e . h t m 
 
 1 1 9 4 = A C E m p l o y e e P C o d e . h t m 
 
 1 1 9 5 = A C E m p l o y e e P D e p a r t m e n t . h t m 
 
 1 1 9 6 = A C E m p l o y e e P S e x . h t m 
 
 1 1 9 7 = A C E m p l o y e e P B i r t h d a y . h t m 
 
 1 1 9 8 = A C E m p l o y e e P J o b . h t m 
 
 1 1 9 9 = A C E m p l o y e e P E d u c a t i o n . h t m 
 
 1 2 0 0 = A C E m p l o y e e P T e l e p h o n e . h t m 
 
 1 2 0 1 = A C E m p l o y e e P A d d r e s s . h t m 
 
 1 2 0 2 = A C E m p l o y e e P R e m a r k . h t m 
 
 1 2 0 3 = A C E m p l o y e e P C a r d . h t m 
 
 1 2 0 4 = A C E m p l o y e e P P a s s w o r d . h t m 
 
 1 2 0 5 = A C E m p l o y e e P G r o u p . h t m 
 
 1 2 0 6 = A C E m p l o y e e P F i r s t . h t m 
 
 1 2 0 7 = A C E m p l o y e e P S e t A l a r m . h t m 
 
 1 2 0 8 = A C E m p l o y e e P N u m . h t m 
 
 1 2 0 9 = A C E m p l o y e e P S e t N u m . h t m 
 
 1 2 1 0 = A C E m p l o y e e P D a t e . h t m 
 
 1 2 1 1 = A C E m p l o y e e P S e t D a t e . h t m 
 
 1 2 1 2 = A C E m p l o y e e P P h o t o . h t m 
 
 1 2 1 3 = A C E m p l o y e e P E x t I n f o . h t m 
 
 1 2 1 4 = A C E m p l o y e e P D N o r m a l O p e n . h t m 
 
 1 2 3 0 = A C R D E v e n t . h t m 
 
 1 2 3 1 = A C R D E v e n t L i s t . h t m 
 
 1 2 3 2 = A C R D E v e n t R e s u l t . h t m 
 
 1 2 7 0 = A C Q u e r y C o n d i t i o n . h t m 
 
 1 2 7 1 = A C Q u e r y R e s u l t . h t m 
 
 1 2 7 2 = A C Q u e r y C o n t r o l l e r . h t m 
 
 1 2 7 4 = A C Q u e r y E m p l o y e e . h t m 
 
 1 2 7 5 = A C Q u e r y C a r d . h t m 
 
 1 2 7 6 = A C Q u e r y E v e n t . h t m 
 
 1 2 8 0 = A C Q u e r y L o g . h t m 
 
 1 2 8 1 = A C L E D P L o g o . h t m 
 
 1 2 8 2 = A C P r o g C a r d . h t m 
 
 1 2 8 3 = A C G a t e P M o d e . h t m 
 
 1 2 8 4 = A C G a t e P O H d y . h t m 
 
 1 2 8 5 = A C A l a r m C t r l . h t m 
 
 1 2 8 6 = A C A r m W e e k . h t m 
 
 1 2 8 7 = A C A r m H o l i d a y . h t m 
 
 1 2 8 8 = R e p o r t 1 . h t m 
 
 
 
 / / * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * 
 
 / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / 
 
 / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / 
 
 / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / 
 
 / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / 
 
 / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / 
 
 / / * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * 
 
 / / RP[|~W[&{2N
 
 / / A t t e n d a n c e   S u b s y s t e m   c h a r a c t e r   s t r i n g 
 
 / / * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * 
 
 / / * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * * 
 
 / / ܃US
 
 / / M e n u 
 
 / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / 
 
 / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / 
 
 / / ;N܃USI D R _ M A I N 
 
 [ M a i n I D = 0 x D 0 0 1 1 7 7 0   T y p e = 2 ] 
 
 0 x 8 0 0 0 0 0 0 1 = {t( & M ) 
 
 0 x 8 0 0 0 0 0 0 1 = & M a n a g e m e n t 
 
 0 x d e 0 1 = 2NLS( & S ) 
 
 0 x d e 0 1 = & S e r i a l   P o r t 
 
 0 x d e 0 2 = lbchV( & R ) 
 
 0 x d e 0 2 = C o n v e & r t e r   
 
 0 x d e 0 3 = Q~c6RhV( & N ) 
 
 0 x d e 0 3 = & N e t w o r k   C o n t r o l l e r 
 
 0 x d e 0 5 = c6RhV( & C ) 
 
 0 x d e 0 5 = & C o n t r o l l e r 
 
 0 x d e 0 6 = 7RaSU_
N O( & U ) 
 
 0 x d e 0 6 = C a r d   R e c o r d   & D o w n l o a d 
 
 
 
 0 x d e 0 8 = aS( & D ) 
 
 0 x d e 0 8 = C a r & d 
 
 0 x d e 0 9 = ( & T ) 
 
 0 x d e 0 9 = D e p a r & t m e n t 
 
 0 x d e 0 a = NXT( & E ) 
 
 0 x d e 0 a = & E m p l o y e e 
 
 
 
 0 x d e 0 c = R;`ĉR( & G ) 
 
 0 x d e 0 c = A t t e n d a n c e   R u & l e 
 
 0 x d e 0 d = eĉR( & Y ) 
 
 0 x d e 0 d = D a & y   S c h e d u l e 
 
 0 x d e 0 e = cs( & J ) 
 
 0 x d e 0 e = & S h i f t 
 
 0 x d e 0 f = XT]sQ `( & P ) 
 
 0 x d e 0 f = E m & p l o y e e   C a r e 
 
 0 x d e 1 0 = l[GPe( & H ) 
 
 0 x d e 1 0 = O f f i c i a l   & H o l i d a y 
 
 
 
 0 x d e 1 2 = GP{v( & L ) 
 
 0 x d e 1 2 = & L e a v e   R e g i s t e r 
 
 0 x d e 1 3 = Rs{v( & O ) 
 
 0 x d e 1 3 = & O v e r t i m e   R e g i s t e r 
 
 0 x d e 1 4 = e{v7RaSU_( & I ) 
 
 0 x d e 1 4 = A d d   & M i s s e d   C a r d   R e c o r d 
 
 0 x d e 1 5 = R{( & A ) 
 
 0 x d e 1 5 = & A t t e n d a n c e   C o u n t 
 
 
 
 0 x 8 0 0 0 0 0 0 2 = g( & Q ) 
 
 0 x 8 0 0 0 0 0 0 2 = & Q u e r y 
 
 0 x d e 2 1 = c6RhVOo`( & C ) 
 
 0 x d e 2 1 = & C o n t r o l l e r   I n f o r m a t i o n 
 
 0 x d e 2 2 = NXTOo`( & D ) 
 
 0 x d e 2 2 = & E m p l o y e e   I n f o r m a t i o n 
 
 0 x d e 2 3 = aSOo`( & E ) 
 
 0 x d e 2 3 = C a r & d   I n f o r m a t i o n 
 
 0 x d e 2 4 = R~gf~( & R ) 
 
 0 x d e 2 4 = A t t e n d a n c e   & R e s u l t   D e t a i l 
 
 0 x d e 2 5 = R~g~( & S ) 
 
 0 x d e 2 5 = A t t e n d a n c e   R e s u l t   & S t a t i s t i c s 
 
 0 x d e 2 7 = GP{v( & L ) 
 
 0 x d e 2 7 = & L e a v e   R e g i s t e r 
 
 0 x d e 2 8 = Rs{v( & O ) 
 
 0 x d e 2 8 = & O v e r t i m e   R e g i s t e r 
 
 0 x d e 2 9 = e{v7RaSU_( & S ) 
 
 0 x d e 2 9 = A d d   & M i s s e d   C a r d   R e c o r d 
 
 0 x d e 2 a = 7RaSU_( & G ) 
 
 0 x d e 2 a = C & a r d   R e c o r d 
 
 0 x d e 2 b = |~e_( & G ) 
 
 0 x d e 2 b = S y s t e m   L o & g 
 
 
 
 
 
 [ M a i n I D = 0 x D 0 0 1 1 7 7 1   T y p e = 2 ] 
 
 3 2 7 8 5 = 	b@b	g( & S ) 
 
 3 2 7 8 5 = & S e l e c t   A l l 
 
 3 2 7 8 6 = Sl	b( & V ) 
 
 3 2 7 8 6 = R e & v e r s e d   S e l e c t 
 
 3 2 7 9 2 = XRGPU_( & A ) 
 
 3 2 7 9 2 = & A d d   L e a v e   R e c o r d 
 
 3 2 7 9 3 = O9eGPU_( & U ) 
 
 3 2 7 9 3 = & C h a n g e   L e a v e   R e c o r d   
 
 3 2 7 9 4 =  RdGPU_( & D ) 
 
 3 2 7 9 4 = & D e l e t e   L e a v e   R e c o r d   
 
 
 
 [ M a i n I D = 0 x D 0 0 1 1 7 7 2   T y p e = 2 ] 
 
 3 2 7 8 5 = 	b@b	g( & S ) 
 
 3 2 7 8 5 = & S e l e c t   A l l 
 
 3 2 7 8 6 = Sl	b( & V ) 
 
 3 2 7 8 6 = R e & v e r s e d   S e l e c t 
 
 3 2 7 9 5 = XRRsU_( & A ) 
 
 3 2 7 9 5 = & A d d   O v e r t i m e   R e c o r d 
 
 3 2 7 9 6 = O9eRsU_( & U ) 
 
 3 2 7 9 6 = & C h a n g e   O v e r t i m e   R e c o r d 
 
 3 2 7 9 7 =  RdRsU_( & D ) 
 
 3 2 7 9 7 = & D e l e t e   O v e r t i m e   R e c o r d 
 
 
 
 [ M a i n I D = 0 x D 0 0 1 1 7 7 3   T y p e = 2 ] 
 
 3 2 7 8 5 = 	b@b	g( & S ) 
 
 3 2 7 8 5 = & S e l e c t   A l l 
 
 3 2 7 8 6 = Sl	b( & V ) 
 
 3 2 7 8 6 = R e & v e r s e d   S e l e c t 
 
 3 2 7 9 8 = XRe{v7RaSU_( & A ) 
 
 3 2 7 9 8 = & A d d   M i s s e d   C a r d   R e c o r d 
 
 3 2 7 9 9 = O9ee{v7RaSU_( & U ) 
 
 3 2 7 9 9 = & C h a n g e   M i s s e d   C a r d   R e c o r d 
 
 3 2 8 0 0 =  Rde{v7RaSU_( & D ) 
 
 3 2 8 0 0 = & D e l e t e   M i s s e d   C a r d   R e c o r d 
 
 
 
 [ M a i n I D = 0 x D 0 0 1 1 7 7 4   T y p e = 2 ] 
 
 3 2 7 8 5 = 	b@b	g( & S ) 
 
 3 2 7 8 5 = & S e l e c t   A l l 
 
 3 2 7 8 6 = Sl	b( & V ) 
 
 3 2 7 8 6 = R e & v e r s e d   S e l e c t 
 
 3 2 8 0 1 = XRR~g~{aSU_( & A ) 
 
 3 2 8 0 1 = & A d d   M o d i f i e d   A t t e n d a n c e   R e s u l t   o f   M i s s e d   C a r d   R e c o r d 
 
 3 2 8 0 2 = O9eR~g~{aSU_( & U ) 
 
 3 2 8 0 2 = & C h a n g e   M o d i f i e d   A t t e n d a n c e   R e s u l t   o f   M i s s e d   C a r d   R e c o r d 
 
 3 2 8 0 3 =  RdR~g~{aSU_( & D ) 
 
 3 2 8 0 3 = & D e l e t e   M o d i f i e d   A t t e n d a n c e   R e s u l t   o f     M i s s e d   C a r d   R e c o r d 
 
 
 
 [ M a i n I D = 0 x D 0 0 1 1 7 7 5   T y p e = 2 ] 
 
 3 2 7 8 5 = 	b@b	g( & S ) 
 
 3 2 7 8 5 = & S e l e c t   A l l 
 
 3 2 7 8 6 = Sl	b( & V ) 
 
 3 2 7 8 6 = R e & v e r s e d   S e l e c t 
 
 3 2 8 1 0 = nfcs( & G ) 
 
 3 2 8 1 0 = O r d i n a r y   S c h e d u l e d   S h i & f t 
 
 3 2 8 1 2 = ybϑcs( & B ) 
 
 3 2 8 1 2 = & B a t c h   S c h e d u l e d   S h i f t 
 
 
 
 / / eĉRn܃US
 
 [ M a i n I D = 0 x D 0 0 1 1 7 7 6   T y p e = 2 ] 
 
 3 2 7 8 5 = 	b@b	g( & S ) 
 
 3 2 7 8 5 = & S e l e c t   A l l 
 
 3 2 7 8 6 = Sl	b( & V ) 
 
 3 2 7 8 6 = R e & v e r s e d   S e l e c t 
 
 3 2 8 0 8 = XReĉR( & A ) 
 
 3 2 8 0 8 = & A d d   D a y   S c h e d u l e 
 
 3 2 8 0 9 =  RdeĉR( & D ) 
 
 3 2 8 0 9 = & D e l e t e   D a y   S c h e d u l e 
 
 
 
 [ M a i n I D = 0 x D 0 0 1 1 7 7 7   T y p e = 2 ] 
 
 3 2 7 8 5 = 	b@b	g( & S ) 
 
 3 2 7 8 5 = & S e l e c t   A l l 
 
 3 2 7 8 6 = Sl	b( & V ) 
 
 3 2 7 8 6 = R e & v e r s e d   S e l e c t 
 
 3 2 8 0 4 = XRl[GPe( & A ) 
 
 3 2 8 0 4 = & A d d   O f f i c i a l   H o l i d a y 
 
 3 2 8 0 5 =  Rdl[GPe( & D ) 
 
 3 2 8 0 5 = & D e l e t e   O f f i c i a l   H o l i d a y 
 
 
 
 [ M a i n I D = 0 x D 0 0 1 1 7 7 8   T y p e = 2 ] 
 
 3 2 7 8 5 = 	b@b	g( & S ) 
 
 3 2 7 8 5 = & S e l e c t   A l l 
 
 3 2 7 8 6 = Sl	b( & V ) 
 
 3 2 7 8 6 = R e & v e r s e d   S e l e c t 
 
 3 2 8 0 6 =  RdcsU_( & D ) 
 
 3 2 8 0 6 = & D e l e t e   S h i f t   R e c o r d 
 
 
 
 [ M a i n I D = 0 x D 0 0 1 1 7 7 9   T y p e = 2 ] 
 
 3 2 7 8 5 = 	b@b	g( & S ) 
 
 3 2 7 8 5 = & S e l e c t   A l l 
 
 3 2 7 8 6 = Sl	b( & V ) 
 
 3 2 7 8 6 = R e & v e r s e d   S e l e c t 
 
 3 2 8 0 7 = NR{	[( & C ) 
 
 3 2 8 0 7 = O n l y   A t t e n d a n c e   & C o u n t   S e l e c t e d   D e p a r t m e n t 
 
 3 2 8 4 6 = R{@b	gNXT( & A ) 
 
 3 2 8 4 6 = C o u n t   & A l l   E m p l y e e s 
 
 
 
 [ M a i n I D = 0 x D 0 0 1 1 7 8 0   T y p e = 2 ] 
 
 3 2 8 9 2 = SKmՋN( & S ) 
 
 3 2 8 9 2 = & S e n d   T e s t   E m a i l 
 
 
 
 / / zS
 
 / / W i n d o w s 
 
 / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / 
 
 / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / 
 
 [ M a i n I D = 0 x D 0 0 1 0 0 0 0   T y p e = 1 ] 
 
 1 = lxN{t
 
 1 = H a r d w a r e   M a n a g e m e n t 
 
 2 = c6RhV
 
 2 = C o n t r o l l e r 
 
 3 = 7RaSU_
N O
 
 3 = C a r d   R e c o r d   D o w n l o a d   
 
 1 1 = NXT{t
 
 1 1 = E m p l o y e e   M a n a g e m e n t 
 
 1 2 = aS
 
 1 2 = C a r d 
 
 1 3 = 
 
 1 3 = D e p a r t m e n t 
 
 1 4 = NXT
 
 1 4 = E m p l o y e e 
 
 1 5 = XT]sQ `
 
 1 5 = E m p l o y e e   C a r e 
 
 2 1 = ĉR{t
 
 2 1 = R u l e   M a n a g e m e n t 
 
 2 2 = R;`ĉR
 
 2 2 = A t t e n d a n c e   R u l e 
 
 2 3 = eĉR
 
 2 3 = D a y   S c h e d u l e 
 
 2 4 = cs
 
 2 4 = S h i f t 
 
 2 5 = :_6RRscs
 
 2 5 = O v e r t i m e   S h i f t 
 
 2 6 = l[GPe
 
 2 6 = O f f i c i a l   H o l i d a y 
 
 3 1 = R{t
 
 3 1 = A t t e n d a n c e   M a n a g e m e n t 
 
 3 2 = GP{v
 
 3 2 = L e a v e   R e g i s t e r 
 
 3 3 = Rs{v
 
 3 3 = O v e r t i m e   R e g i s t e r 
 
 3 4 = e{v7RaSU_
 
 3 4 = A d d   M i s s e d   C a r d   R e c o r d 
 
 3 5 = R{
 
 3 5 = A t t e n d a n c e   C o u n t 
 
 
 
 6 0 = g
 
 6 0 = Q u e r y 
 
 6 1 = c6RhVOo`
 
 6 1 = C o n t r o l l e r   I n f o r m a t i o n 
 
 6 2 = NXTOo`
 
 6 2 = E m p l o y e e   I n f o r m a t i o n 
 
 6 3 = aSOo`
 
 6 3 = C a r d   I n f o r m a t i o n 
 
 6 4 = R~gf~
 
 6 4 = A t t e n d a n c e   R e s u l t   D e t a i l 
 
 6 5 = R~g~
 
 6 5 = A t t e n d a n c e   R e s u l t   S t a t i s t i c s 
 
 6 7 = GP{v
 
 6 7 = L e a v e   R e g i s t e r 
 
 6 8 = Rs{v
 
 6 8 = O v e r t i m e   R e g i s t e r 
 
 6 9 = e{v7RaSU_
 
 6 9 = A d d   M i s s e d   C a r d   R e c o r d 
 
 7 0 = 7RaSU_
 
 7 0 = C a r d   R e c o r d 
 
 7 1 = |~e_
 
 7 1 = S y s t e m   L o g 
 
 
 
 0 x d e 0 6 = 7RaSU_
N O
 
 0 x d e 0 6 = C a r d   R e c o r d   D o w n l o a d 
 
 0 x d e 0 8 = aS
 
 0 x d e 0 8 = C a r d 
 
 0 x d e 0 a = NXT
 
 0 x d e 0 a = E m p l o y e e 
 
 0 x d e 0 d = eĉR
 
 0 x d e 0 d = D a y   S c h e d u l e 
 
 0 x d e 0 e = cs
 
 0 x d e 0 e = S h i f t 
 
 0 x d e 1 2 = GP{v
 
 0 x d e 1 2 = L e a v e   R e g i s t e r 
 
 0 x d e 1 5 = R{
 
 0 x d e 1 5 = A t t e n d a n c e   C o u n t 
 
 0 x d e 2 4 = R~gf~
 
 0 x d e 2 4 = A t t e n d a n c e   R e s u l t   D e t a i l 
 
 0 x d e 2 5 = R~g~
 
 0 x d e 2 5 = A t t e n d a n c e   R e s u l t   S t a t i s t i c s 
 
 0 x d e 2 a = 7RaSU_
 
 0 x d e 2 a = C a r d   R e c o r d 
 
 0 x d e 2 b = |~e_
 
 0 x d e 2 b = S y s t e m   L o g 
 
 
 
 3 2 7 9 1 = MR NƉV
 
 3 2 7 9 1 = P a g e   U p 
 
 3 2 7 9 2 = T NƉV
 
 3 2 7 9 2 = P a g e   D o w n 
 
 
 
 [ M a i n I D = 0 x D 0 0 1 0 0 0 1   T y p e = 1 ] 
 
 0 x 0 = {t
 
 0 x 0 = M a n a g e m e n t 
 
 0 x 1 = Oo`g
 
 0 x 1 = I n f o r m a t i o n   Q u e r y 
 
 3 = @b	geĉR
 
 3 = A l l   D a y   S c h e d u l e 
 
 4 = eĉR
 
 4 = D a y   S c h e d u l e 
 
 5 = ^\'`
 
 5 = P r o p e r t y 
 
 6 = W,gSpe
 
 6 = B a s i c   P a r a m e t e r 
 
 7 = 
Ty
 
 7 = N a m e 
 
 8 = {|W
 
 8 = T y p e 
 
 1 0 = e6R
 
 1 0 = T i m e d   S y s t e m 
 
 1 1 = s!k6R
 
 1 1 = S h i f t   S y s t e m 
 
 1 2 = *gcs
 
 1 2 = N o   S h i f t 
 
 
 
 1 5 = 7RaS	gHewYe
 
 1 5 = V a l i d   S t a r t   T i m e   o f   P r e s e n t i n g   C a r d 
 
 1 6 = 7RaS	gHe~bke
 
 1 6 = V a l i d   E n d   T i m e   o f   P r e s e n t i n g   C a r d 
 
 
 
 1 7 = /T(u gߏ
Nse
 
 1 7 = E n a b l e   t h e   L a t e s t   T i m e   o f   D u t y   o n   
 
 1 8 =  gߏ
Nse
 
 1 8 = T h e   L a t e s t   T i m e   o f   D u t y   o n 
 
 1 9 = /T(u g\
Nse
 
 1 9 = E n a b l e   t h e   M i n u m u m   L e n g t h   o f   D u t y   o n 
 
 2 0 =  g\
Nse( R) 
 
 2 0 = M i n u m u m   L e n g t h   o f   D u t y   o n   ( M i n u t e ) 
 
 
 
 2 1 = ~Rs
 
 2 1 = S t a t i s t i c s   O v e r t i m e 
 
 2 2 = s!k
Nsee{Rs
 
 2 2 = S t a t i s t i c s   O v e r t i m e   f o r   W o r k i n g   i n   A d v a n c e   a n d   D e l a y 
 
 2 3 = s!k
NseeRseP
 
 2 3 = O v e r t i m e   L i m i t e d   f o r   W o r k i n g   i n   A d v a n c e   a n d   D e l a y 
 
 / / 2 4 = /f&TU_ߏ0R
 
 / / 2 5 = /f&TU_e 
 
 
 
 2 6 = s!kSpe
 
 2 6 = S h i f t   P a r a m e t e r 
 
 2 7 = s!kpe
 
 2 7 = T h e   N u m b e r   o f   S h i f t 
 
 2 8 = s% d 
Nse
 
 2 8 = T h e   t i m e   o f   d u t y   o n   f o r   S h i f t   % d   
 
 2 9 = s% d Nse
 
 2 9 = T h e   t i m e   o f   d u t y   o f   f o r   S h i f t   % d 
 
 
 
 2 5 0 = eĉR
 
 2 5 0 = N e w   S c h e d u l e 
 
 2 0 0 1 = 7ReeĉRRh
 
 2 0 0 1 = R e f r e s h   d a y   s c h e d u l e   l i s t 
 
 2 0 0 4 = Smd\O
 
 2 0 0 4 = C a n c e l   O p e r a t i o n 
 
 
 
 1 1 0 = ck(WOX[O9e
zI{. . . \ n 
 
 1 1 0 = S a v i n g ,   p l e a s e   w a i t . . . \ n 
 
 1 1 1 = OX[[k0\ n 
 
 1 1 1 = S a v e   C o m p l e t e d .   \ n 
 
 1 1 2 = eĉR % s  OX[bR0\ n 
 
 1 1 2 = D a y   S c h e d u l e   " % s "   s a v e d   s u c c e s s f u l l y .   \ n 
 
 1 1 3 = *ghKm0ReĉR % s  O9ee OX[0\ n 
 
 1 1 3 = D a y   S c h e d u l e   " % s "   w a s   n o t   c h a n g e d ,   n o   n e e d   t o   s a v e .   \ n 
 
 1 1 4 = OX[eĉR % s  eQsYN\ n 
 
 1 1 4 = W h e n   s a v e   d a y   s c h e d u l e   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s :   \ n 
 
 1 1 5 = fJT\ n s!kv
NNseb7RaS	gHewY~_gQsNY<PelvcnxvQcknx'`cknx'`vnx\cߏ0ROX[vǏz-NۏLYg(WǏz-NSsn
NcknxRS[d\O
N[hQbR`nx[~~T\ n 
 
 1 1 5 = W a r n i n g : / n   i t   c a n   n o t   c o n f i r m   t h e   c o r r e c t n e s s   d i r e c t l y ,   w h e n   m u l t i p l e   v a l u e   a p p e a r   f o r   s h i f t   d u t y   o n / o f f   t i m e   o r   t h e   v a l i d   s t a r t / e n d   t i m e   o f   p r e s e n t i n g   c a r d .   H o w e v e r ,   i t   c a n   b e   c o n f i r m e d   w h e n   s a v e d .   W h e n   s a v e   i t ,   i f   s o m e   c e r t a i n   s e t u p   i s   f o u n d   w h e n   s a v e ,   t h e   o p e r a t i o n   m a y   u n s u c c e s s f u l y .   A r e   y o u   s u r e   t o   c o n t i n u e ? \ n 
 
 
 
 2 2 1 = 7ReeĉRRh]~[k0\ n 
 
 2 2 1 = R e f r e s h   d a y   s c h e d u l e   l i s t   c o m p l e t e d . \ n 
 
 2 2 2 = ck(W7ReeĉRRh
zI{. . . \ n 
 
 2 2 2 = R e f r e s h i n g   d a y   s c h e d u l e   l i s t ,   p l e a s e   w a i t . . . \ n 
 
 2 2 3 = 7ReeĉRRheNuNS	geĉR*gRQ0`SNpQ 7ReeĉRRh 	c͑Ջ0\ n 
 
 2 2 3 = W h e n   r e f r e s h   d a y   s c h e d u l e   l i s t ,   s o m e   e r r o r s   h a p p e n .   M a y b e   s o m e   d a y   s c h e d u l e s   w e r e   n o t   d i s p l a y e d .   P l e a s e   t r y   a g a i n   b y   p r e s s i n g   b u t t o n   " R e f r e s h   D a y   S c h e d u l e   L i s t " . \ n 
 
 2 2 6 =  RdeĉR\O[N RdeĉRvsQvcsU_vOo`"N1YvQ[|~_NS	g{|<O`Q`nx[~~T\ n 
 
 2 2 6 = D e l e t e   d a y   s c h e d u l e   w i l l   l o s s   t h e   r e c o r d   o f   s c h e d u l e d   s h i f t   r e l a t e d   t o   t h e   d a y   s c h e d u l e .   O t h e r   s y s t e m s   m a y   s u f f e r   i n f o r m a t i o n   l o s s .   ,   A r e   y o u   s u r e   t o   c o n t i n u e ? \ n 
 
 2 2 7 = ck(W RdeĉR
zI{. . . \ n 
 
 2 2 7 = D e l e t i n g   d a y   s c h e d u l e ,   p l e a s e   w a i t . . . \ n 
 
 2 2 8 =  RdeĉR % s  eQsNYN\ n 
 
 2 2 8 = W h e n   d e l e t e   d a y   s c h e d u l e   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 2 2 9 =  RdeĉR % s  bR0\ n 
 
 2 2 9 = D e l e t e   d a y   s c h e d u l e   " % s "   s u c c e s s f u l l y . \ n 
 
 2 3 0 =  Rd[k0\ n 
 
 2 3 0 = D e l e t e   c o m p l e t e d . \ n 
 
 2 3 1 =  Rd[kFOQsN0\ n 
 
 2 3 1 = D e l e t e   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 2 3 2 = OX[[kFOQsN0\ n 
 
 2 3 2 = S a v e   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 2 0 0 1 = 7ReeĉRRh
 
 2 0 0 1 = R e f r e s h   d a y   s c h e d u l e   l i s t 
 
 2 0 0 4 = Smd\O
 
 2 0 0 4 = C a n c e l   O p e r a t i o n 
 
 
 
 [ M a i n I D = 0 x D 0 0 1 0 0 0 7   T y p e = 1 ] 
 
 0 = XRGPU_
 
 0 = A d d   L e a v e   R e c o r d 
 
 1 = NXT
 
 1 = E m p l o y e e 
 
 2 = GPU_Rh
 
 2 = L e a v e   R e c o r d   L i s t 
 
 3 = O9eGPU_
 
 3 = C h a n g e   L e a v e   R e c o r d 
 
 
 
 1 1 = GPeg
 
 1 1 = D a t e   f o r   L e a v e 
 
 1 2 = GPU_
 
 1 2 = L e a v e   R e c o r d   
 
 
 
 2 1 = wYeg
 
 2 1 = S t a r t   D a t e   
 
 2 2 = ~bkeg
 
 2 2 = E n d   D a t e 
 
 
 
 2 3 = @b	g{|W
 
 2 3 = A l l   T y p e s 
 
 2 4 = hQ)YGP
 
 2 4 = W h o l e   D a y   L e a v e 
 
 2 5 = s!keGP
 
 2 5 = L e a v e   i n   S h i f t   D a y 
 
 2 6 = eeGP
 
 2 6 = L e a v e   i n   T i m e d   D a y 
 
 
 
 3 1 = NXTS
 
 3 1 = E m p l o y e e   N u m b e r 
 
 3 2 = NXTY
T
 
 3 2 = E m p l o y e e   N a m e 
 
 3 3 = GP{|W
 
 3 3 = L e a v e   T y p e 
 
 3 4 = GPeg
 
 3 4 = D a t e   f o r   L e a v e 
 
 3 5 = GP
 
 3 5 = L e a v e   t i m e   t o 
 
 3 6 = cߏ
Ns
 
 3 6 = D e l a y   t o   w o r k   f o r 
 
 3 7 = 
Nse)w( R) 
 
 3 7 = T h e   T i m e   o f   D u t y   o n   i s   s h o r t e d   f o r 
 
 3 9 = ~{rN
 
 3 9 = S i g n a t u r e   P e r s o n 
 
 4 0 = Yl
 
 4 0 = R e m a r k 
 
 4 1 = GPN
 
 4 1 = L e a v e   T i m e   f r o m 
 
 4 2 = cߏ
Ns
 
 4 2 = D e l a y   t o   W o r k 
 
 4 3 = 
Nse)w
 
 4 3 = T h e   L e n g t h   o f   D u t y   o n   i s   s h o r t e d 
 
 
 
 5 1 = nxOX[dkagGPU_\ n 
 
 5 1 = A r e   y o u   s u r e   t o   s a v e   t h e   l e a v e   r e c o r d ? \ n 
 
 
 
 5 7 =  % s  vGPeN]~ReQvGPeRb[hQ͑T0\ n 
 
 5 7 = L e a v e   t i m e   f o r   " % s "   i s   p a r t   o r   t o t a l   o v e r l a p s   w i t h   a d d e d   l e a v e   t i m e . \ n 
 
 5 8 = OX[GPU_[kFOQsN0\ n 
 
 5 8 = L e a v e   r e c o r d   i s   s a v e d   s u c c e s s f u l l y ,   b u t   e r r o r   h a p p e n s . \ n 
 
 5 9 =  % s  vGPU_OX[bR0\ n 
 
 5 9 = S a v e   l e a v e   r e c o r d   f o r   " % s "   s u c c e s s f u l l y . \ n 
 
 6 0 = OX[[k0\ n 
 
 6 0 = S a v e   c o m p l e t e d . \ n 
 
 6 2 = ck(WSGPU_
zI{. . . \ n 
 
 6 2 = A c q u i r i n g   l e a v e   r e c o r d ,   p l e a s e   w a i t . . . \ n 
 
 6 3 = SGPU_]~[k0\ n 
 
 6 3 = A c q u i r e   l e a v e   r e c o r d   c o m p l e t e d . \ n 
 
 6 4 = SGPU_eNuNS,gu	gGPU_*gRQ0`SNpQ 7Re,gu 	c͑Ջ0\ n 
 
 6 4 = W h e n   a c q u i r e   l e a v e   r e c o r d ,   e r r o r   h a p p e n s .   S o m e   l e a v e   r e c o r d s   m a y   n o t   b e   d i s p l a y e d   i n   t h i s   l i s t ,   p l e a s e   c l i c k   " R e f r e s h   T h i s   P a g e "   b u t t o n   t o   t r y   a g a i n . \ n 
 
 6 5 =  Rd % s  (W % s  vGPU_eQsNYN\ n 
 
 6 5 = W h e n   d e l e t e   " % s "   i n   " % s "   l e a v e   r e c o r d ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 6 6 =  Rd % s  (W % s  vGPU_bR0\ n 
 
 6 6 = D e l e t e   " % s "   i n   " % s "   l e a v e   r e c o r d   s u c c e s s f u l l y . \ n 
 
 6 7 =  Rd[k0\ n 
 
 6 7 = D e l e t e   c o m p l e t e d . \ n 
 
 6 8 =  RdGPU_[kFOQsN0\ n 
 
 6 8 = D e l e t e   l e a v e   r e c o r d   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s .   \ n 
 
 6 9 = ck(W RdGPU_
zI{. . . \ n 
 
 6 9 = D e l e t i n g   l e a v e   r e c o r d ,   p l e a s e   w a i t . . . \ n 
 
 7 0 = O9e[k0\ n 
 
 7 0 = C h a n g e   c o m p l e t e d . \ n 
 
 7 1 = O9eGPU_QsYN\ n 
 
 7 1 = W h e n   c h a n g e   l e a v e   r e c o r d ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 7 2 =  % s  vGPU_O9ebR0\ n 
 
 7 2 = C h a n g e   " % s "   l e a v e   r e c o r d   s u c c e s s f u l l y .   \ n   
 
 7 3 = ck(WO9eGPU_
zI{. . . \ n 
 
 7 3 = C h a n g i n g   l e a v e   r e c o r d ,   p l e a s e   w a i t . . . \ n 
 
 7 4 = ck(WXRGPU_
zI{. . . \ n 
 
 7 4 = A d d i n g   l e a v e   r e c o r d ,   p l e a s e   w a i t . . . \ n 
 
 7 5 = OX[ % s  vGPU_eQsYN. . . \ n 
 
 7 5 = W h e n   s a v e   " % s "   l e a v e   r e c o r d ,   f o l l o w i n g   e r r o r   h a p p e n s . . . \ n 
 
 7 6 = O9e % s  vGPU_eQsYN. . . \ n 
 
 7 6 = W h e n   c h a n g e   " % s "   l e a v e   r e c o r d ,   f o l l o w i n g   e r r o r   h a p p e n s . . . \ n 
 
 8 0 = /f&T RddkGPU_\ n 
 
 8 0 = A r e   y o u   s u r e   t o   d e l e t e   t h i s   l e a v e   r e c o r d ?   \ n 
 
 8 1 = hKm0RYN: \ n cߏ
NsN
Nse)w*gc[0\ n 
 
 8 1 = D e t e c t e d   f o l l o w i n g   e r r o r : / n   I t   i s   n o t   a p p o i n t e d   f o r   d e l a y i n g   a n d   s h o r t i n g   t o   d u t y   o n   t i m e .   
 
 8 2 = hKm0RYN: \ n 
 
 8 2 = D e t e c t e d   f o l l o w i n g   e r r o r : / n 
 
 8 3 = el~b0RGPU_0\ n 
 
 8 3 = T h e   l e a v e   r e c o r d   c a n   n o t   b e   f o u n d . \ n 
 
 
 
 [ M a i n I D = 0 x D 0 0 1 0 0 0 8   T y p e = 1 ] 
 
 0 = XRRsU_
 
 0 = A d d   O v e r t i m e   R e c o r d 
 
 1 = NXT
 
 1 = E m p l o y e e 
 
 2 = RsU_Rh
 
 2 = O v e r t i m e   R e c o r d   L i s t 
 
 3 = O9eRsU_
 
 3 = C h a n g e   O v e r t i m e   R e c o r d 
 
 
 
 1 1 = Rseg
 
 1 1 = O v e r t i m e   D a t e 
 
 1 2 = RsU_
 
 1 2 = O v e r t i m e   R e c o r d 
 
 
 
 2 1 = wYeg
 
 2 1 = S t a r t   D a t e 
 
 2 2 = ~bkeg
 
 2 2 = E n d   D a t e 
 
 
 
 3 1 = NXTS
 
 3 1 = E m p l o y e e   N u m b e r 
 
 3 2 = NXTY
T
 
 3 2 = E m p l o y e e   N a m e 
 
 3 3 = RsN
 
 3 3 = O v e r t i m e   f r o m 
 
 3 4 = Rs
 
 3 4 = O v e r t i m e   t o 
 
 3 6 = e( R) 
 
 3 6 = L e n g t h   ( M i n u t e ) 
 
 3 7 = Rse
Ps
 
 3 7 = T i m e s   R a t e   f o r   O v e r t i m e 
 
 3 9 = ~{rN
 
 3 9 = S i g n a t u r e   P e r s o n 
 
 4 0 = Yl
 
 4 0 = R e m a r k 
 
 
 
 5 1 = nxOX[dkagRsU_\ n 
 
 5 1 = A r e   y o u   s u r e   t o   s a v e   t h i s   o v e r t i m e   r e c o r d ?   \ n 
 
 
 
 5 7 =  % s  vRseN]~ReQvRseRb[hQ͑T0\ n 
 
 5 7 = O v e r t i m e   f o r   " % s "   i s   p a r t   o r   t o t a l   o v e r l a p s   w i t h   a d d e d   o v e r t i m e . \ n 
 
 5 8 = OX[RsU_[kFOQsN0\ n 
 
 5 8 = O v e r t i m e   r e c o r d   i s   s a v e d ,   b u t   f o l l o w i n g   e r r o r   h a p p e n s :   \ n 
 
 5 9 =  % s  vRsU_OX[bR0\ n 
 
 5 9 = S a v e   o v e r t i m e   r e c o r d   f o r   " % s "   s u c c e s s f u l l y . \ n 
 
 6 0 = OX[[k0\ n 
 
 6 0 = S a v e   c o m p l e t e d . \ n 
 
 6 2 = ck(WSRsU_
zI{. . . \ n 
 
 6 2 = A c q u i r i n g   o v e r t i m e   r e c o r d ,   p l e a s e   w a i t . . . \ n 
 
 6 3 = SRsU_]~[k0\ n 
 
 6 3 = A c q u i r e   o v e r t i m e   r e c o r d   c o m p l e t e d . \ n 
 
 6 4 = SRsU_eNuNS,gu	gRsU_*gRQ0`SNpQ 7Re,gu 	c͑Ջ0\ n 
 
 6 4 = W h e n   a c q u i r e   o v e r t i m e   r e c o r d ,   s o m e   r e c o r d s   m a y   n o t   b e   d i s p l a y e d .   Y o u   c a n   c l i c k   " R e f r e s h   T h i s   P a g e "   t o   t r y   a g a i n . \ n 
 
 6 5 =  Rd % s  (W % s  vRsU_eQsNYN\ n 
 
 6 5 = W h e n   d e l e t e   " % s "   i n   " % s "   o v e r t i m e   r e c o r d ,   f o l l o w i n g   e r r o r   h a p p e n s :   \ n 
 
 6 6 =  Rd % s  (W % s  vRsU_bR0\ n 
 
 6 6 = D e l e t e   " % s "   i n   " % s "   o v e r t i m e   r e c o r d   s u c c e s s f u l l y . \ n 
 
 6 7 =  Rd[k0\ n 
 
 6 7 = D e l e t e   c o m p l e t e d . \ n 
 
 6 8 =  RdRsU_[kFOQsN0\ n 
 
 6 8 = D e l e t e   o v e r t i m e   r e c o r d   c o m p l e t e d ,   b u t   f o l l o w i n g   e r r o r   h a p p e n s :   \ n 
 
 6 9 = ck(W RdRsU_
zI{. . . \ n 
 
 6 9 = D e l e t i n g   o v e r t i m e   r e c o r d ,   p l e a s e   w a i t . . . \ n 
 
 7 0 = O9e[k0\ n 
 
 7 0 = C h a n g e   c o m p l e t e d . \ n 
 
 7 1 = O9eRsU_QsYN\ n 
 
 7 1 = W h e n   c h a n g e   o v e r t i m e   r e c o r d ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 7 2 =  % s  vRsU_O9ebR0\ n 
 
 7 2 = C h a n g e   " % s "   o v e r t i m e   r e c o r d   s u c c e s s f u l l y . \ n 
 
 7 3 = ck(WO9eRsU_
zI{. . . \ n 
 
 7 3 = C h a n g i n g   o v e r t i m e   r e c o r d ,   p l e a s e   w a i t . . . \ n 
 
 7 4 = ck(WXRRsU_
zI{. . . \ n 
 
 7 4 = A d d i n g   o v e r t i m e   r e c o r d ,   p l e a s e   w a i t . . . \ n 
 
 7 5 = OX[ % s  vRsU_eQsYN. . . \ n 
 
 7 5 = W h e n   s a v e   " % s "   o v e r t i m e   r e c o r d ,   f o l l o w i n g   e r r o r   h a p p e n s . . . \ n 
 
 7 6 = O9e % s  vRsU_eQsYN. . . \ n 
 
 7 6 = W h e n   c h a n g e   " % s "   o v e r t i m e   r e c o r d ,   f o l l o w i n g   e r r o r   h a p p e n s . . . \ n 
 
 8 0 = /f&T RddkRsU_\ n 
 
 8 0 = A r e   y o u   s u r e   t o   d e l e t e   t h i s   o v e r t i m e   r e c o r d ?   \ n 
 
 
 
 [ M a i n I D = 0 x D 0 0 1 0 0 0 9   T y p e = 1 ] 
 
 0 = XRe{v7RaSU_
 
 0 = A d d   M i s s e d   C a r d   R e c o r d 
 
 1 = NXT
 
 1 = E m p l o y e e 
 
 2 = e{v7RaSU_Rh
 
 2 = A d d   M i s s e d   C a r d   R e c o r d   L i s t 
 
 3 = O9ee{v7RaSU_
 
 3 = C h a n g e   M i s s e d   C a r d   R e c o r d 
 
 
 
 1 1 = 7RaSeg
 
 1 1 = D a t e   o f   P r e s e n t i n g   C a r d 
 
 1 2 = e{v7RaSU_
 
 1 2 = A d d   M i s s e d   P r e s e n t i n g   C a r d   R e c o r d 
 
 
 
 2 1 = wYeg
 
 2 1 = S t a r t   D a t e 
 
 2 2 = ~bkeg
 
 2 2 = E n d   D a t e 
 
 
 
 3 1 = NXTS
 
 3 1 = E m p l o y e e   N u m b e r 
 
 3 2 = NXTY
T
 
 3 2 = E m p l o y e e   N a m e 
 
 3 3 = _SbaSe
 
 3 3 = T i m e   o f   M i s s e d   C a r d   R e c o r d   
 
 3 4 = ۏQeT
 
 3 4 = T h e   D i r e c t i o n   f o r   E n t e r / E x i t 
 
 3 6 = e{veg
 
 3 6 = D a t e   o f   A d d i n g   M i s s e d   C a r d   R e c o r d   
 
 3 9 = ~{rN
 
 3 9 = S i g n a t u r e   P e r s o n 
 
 4 0 = Yl
 
 4 0 = R e m a r k 
 
 
 
 5 1 = nxOX[dkage{v7RaSU_\ n 
 
 5 1 = A r e   y o u   s u r e   t o   s a v e   t h i s   m i s s e d   c a r d   r e c o r d ?   \ n   
 
 
 
 5 7 =  % s  (We]~	ge{v7RaSU_0\ n 
 
 5 7 = " % s "   M i s s e d   C a r d   R e c o r d   i s   e x i s t e d   d u r i n g   t h e   t i m e . \ n   
 
 5 8 = OX[e{v7RaSU_[kFOQsN0\ n 
 
 5 8 = M i s s e d   c a r d   r e c o r d   i s   s a v e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 5 9 =  % s  ve{v7RaSU_OX[bR0\ n 
 
 5 9 = S a v e   m i s s e d   c a r d   r e c o r d   f o r   " % s "   s u c c e s s f u l l y . \ n 
 
 6 0 = OX[[k0\ n 
 
 6 0 = S a v e   c o m p l e t e d . \ n 
 
 6 2 = ck(WSe{v7RaSU_
zI{. . . \ n 
 
 6 2 = A c q u i r i n g   m i s s e d   c a r d   r e c o r d ,   p l e a s e   w a i t . . . \ n 
 
 6 3 = Se{v7RaSU_]~[k0\ n 
 
 6 3 = A c q u i r e   m i s s e d   c a r d   r e c o r d   c o m p l e t e d . \ n 
 
 6 4 = Se{v7RaSU_eNuNS,gu	ge{v7RaSU_*gRQ0`SNpQ 7Re,gu 	c͑Ջ0\ n 
 
 6 4 = W h e n   a c q u i r e   m i s s e d   c a r d   r e c o r d ,   e r r o r   h a p p e n s .   S o m e   m i s s e d   c a r d   r e c o r d s   m a y   n o t   b e   d i s p l a y e d   i n   t h i s   l i s t .   Y o u   c a n   c l i c k   " R e f r e s h   T h i s   P a g e "   b u t t o n   t o   t r y   a g a i n . \ n 
 
 6 5 =  Rd % s  (W % s  ve{v7RaSU_eQsNYN\ n 
 
 6 5 = W h e n   d e l e t e   " % s "   i n   " % s "   m i s s e d   c a r d   r e c o r d ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 6 6 =  Rd % s  (W % s  ve{v7RaSU_bR0\ n 
 
 6 6 = D e l e t e   " % s "   i n   " % s "   m i s s e d   c a r d   r e c o r d   s u c c e s s f u l l y . \ n 
 
 6 7 =  Rd[k0\ n 
 
 6 7 = D e l e t e   c o m p l e t e d . \ n 
 
 6 8 =  Rde{v7RaSU_[kFOQsN0\ n 
 
 6 8 = D e l e t e   m i s s e d   c a r d   r e c o r d   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 6 9 = ck(W Rde{v7RaSU_
zI{. . . \ n 
 
 6 9 = D e l e t i n g   m i s s e d   c a r d   r e c o r d ,   p l e a s e   w a i t . . . \ n 
 
 7 0 = O9e[k0\ n 
 
 7 0 = C h a n g e   c o m p l e t e d . \ n 
 
 7 1 = O9ee{v7RaSU_QsYN\ n 
 
 7 1 = W h e n   c h a n g e   m i s s e d   c a r d   r e c o r d ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 7 2 =  % s  ve{v7RaSU_O9ebR0\ n 
 
 7 2 = C h a n g e   " % s "   m i s s e d   c a r d   r e c o r d   s u c c e s s f u l l y . \ n 
 
 7 3 = ck(WO9ee{v7RaSU_
zI{. . . \ n 
 
 7 3 = C h a n g i n g   m i s s e d   c a r d   r e c o r d ,   p l e a s e   w a i t . . . \ n 
 
 7 4 = ck(WXRe{v7RaSU_
zI{. . . \ n 
 
 7 4 = A d d i n g   m i s s e d   c a r d   r e c o r d ,   p l e a s e   w a i t . . . \ n 
 
 7 5 = OX[ % s  ve{v7RaSU_eQsYN. . . \ n 
 
 7 5 = W h e n   s a v e   " % s "   m i s s e d   c a r d   r e c o r d ,   f o l l o w i n g   e r r o r   h a p p e n s . . . \ n 
 
 7 6 = O9e % s  ve{v7RaSU_eQsYN. . . \ n 
 
 7 6 = W h e n   c h a n g e   " % s "   m i s s e d   c a r d   r e c o r d ,   f o l l o w i n g   e r r o r   h a p p e n s . . . \ n 
 
 8 0 = /f&T Rddke{v7RaSU_\ n 
 
 8 0 = A r e   y o u   s u r e   t o   d e l e t e   t h i s   m i s s e d   c a r d   r e c o r d ?   \ n 
 
 
 
 [ M a i n I D = 0 x D 0 0 1 0 0 0 A   T y p e = 1 ] 
 
 0 x 0 = R~g~{aSU_Spe
 
 0 x 0 = P a r a m e t e r   o f   M o d i f i e d   A t t e n d a n c e   R e s u l t   o f   M i s s e d   C a r d   R e c o r d   
 
 1 = NXT
 
 1 = E m p l o y e e 
 
 2 = R~{aSU_{v
 
 2 = R e g i s t e r   M o d i f i e d   A t t e n d a n c e   R e s u l t   o f   M i s s e d   C a r d   R e c o r d   
 
 
 
 1 0 = ,{% d u/ qQ% d u
 
 1 0 = P a g e   % d / % d   p a g e ( s ) 
 
 1 1 = ~{aSeg
 
 1 1 = D a t e   o f   A d d i n g   M i s s e d   C a r d   R e c o r d 
 
 1 2 = ~{aSU_
 
 1 2 = R e g i s t r a t i o n   R e c o r d   o f   M i s s e d   C a r d   R e c o r d 
 
 
 
 2 1 = wYeg
 
 2 1 = S t a r t   D a t e 
 
 2 2 = ~bkeg
 
 2 2 = E n d   D a t e 
 
 
 
 3 1 = NXTS
 
 3 1 = E m p l o y e e   N u m b e r 
 
 3 2 = NXTY
T
 
 3 2 = E m p l o y e e   N a m e 
 
 3 3 = ~{aSeg
 
 3 3 = D a t e   o f   M i s s e d   C a r d   R e c o r d   
 
 3 5 = ~{aSe
 
 3 5 = T i m e   o f   M i s s e d   C a r d   R e c o r d 
 
 3 6 = ~{aSeg
 
 3 6 = R e g i s t e r e d   C a r d   D a t e 
 
 3 7 = ~{rN
 
 3 7 = S i g n a t u r e   P e r s o n 
 
 3 8 = Yl
 
 3 8 = R e m a r k 
 
 
 
 5 1 = nxOX[dkagR~g~{aSU_\ n 
 
 5 1 = A r e   y o u   s u r e   t o   s a v e   t h e   a t t e n d a n c e   r e s u l t   o f   m i s s e d   c a r d   r e c o r d 
 
 5 2 = ~{aSeg
N^(W~{aSegMR\ n 
 
 5 2 = D a t e   o f   a d d i n g   m i s s e d   c a r d   r e c o r d   s h o u l d   n o t   b e   e a r l i e r   t h a n   d a t e   o f   M i s s e d   C a r d   R e c o r d ! \ n 
 
 5 6 =  % s  vR~g~{aS(WX[PvU_-N]X[(W0\ n 
 
 5 6 = " % s "   a t t e n d a n c e   r e s u l t   o f   m i s s e d   C a r d   R e c o r d   e x i s t s   i n   t h e   r e c o r d . \ n 
 
 5 8 = OX[R~g~{aSU_QsYN: \ n 
 
 5 8 = W h e n   s a v e   a t t e n d a n c e   r e s u l t   o f   m i s s e d   c a r d   r e c o r d ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 5 9 =  % s  vR~g~{aSU_OX[bR0\ n 
 
 5 9 = " % s "   a t t e n d a n c e   r e s u l t   o f   m i s s e d   c a r d   r e c o r d   s a v e d   s u c c e s s f u l l y . \ n 
 
 6 0 = OX[[k0\ n 
 
 6 0 = S a v e   C o m p l e t e d . \ n 
 
 6 2 = ck(WSR~g~{aSU_
zI{. . . \ n 
 
 6 2 = A c q u i r i n g   a t t e n d a n c e   r e s u l t   o f   m i s s e d   c a r d   r e c o r d ,   p l e a s e   w a i t & \ n 
 
 6 3 = SR~g~{aSU_]~[k0\ n 
 
 6 3 = A c q u i r e   a t t e n d a n c e   r e s u l t   o f   m i s s e d   c a r d   r e c o r d   c o m p l e t e d . \ n 
 
 6 4 = SR~g~{aSU_eNuNS,gu	gR~g~{aSU_*gRQ0`SNpQ 7Re,gu 	c͑Ջ0\ n 
 
 6 4 = W h e n   a c q u i r e   a t t e n d a n c e   r e s u l t   o f   m i s s e d   c a r d   r e c o r d ,   s o m e   e r r o r s   h a p p e n s .   S o m e   a t t e n d a n c e   r e s u l t s   o f   m i s s e d   c a r d   m a y   n o t   b e   d i s p l a y e d   o n   t h i s   p a g e .   U s e r   c a n   c l i c k   " R e f r e s h "   b u t t o n   t o   t r y   a g a i n . \ n 
 
 6 5 =  Rd % s  (W % s  vR~g~{aSU_eQsNYN\ n 
 
 6 5 = W h e n   D e l e t e   " % s "   i n   " % s "   a t t e n d a n c e   r e s u l t   o f   m i s s e d   c a r d   r e c o r d ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 6 6 =  Rd % s  (W % s  vR~g~{aSU_bR0\ n 
 
 6 6 = D e l e t e   " % s "   i n   " % s "   a t t e n d a n c e   r e s u l t   o f   m i s s e d   c a r d   r e c o r d   s u c c e s s f u l l y . \ n 
 
 6 7 =  Rd[k0\ n 
 
 6 7 = D e l e t e   c o m p l e t e d . \ n 
 
 6 8 =  RdR~g~{aSU_[kFOQsN0\ n 
 
 6 8 = D e l e t e   a t t e n d a n c e   r e s u l t   o f   m i s s e d   c a r d   r e c o r d   c o m p l e t e d ,   b u t   s o m e   e r r o r   h a p p e n s . \ n 
 
 6 9 = ck(W RdR~g~{aSU_
zI{. . . \ n 
 
 6 9 = D e l e t i n g   a t t e n d a n c e   r e s u l t   o f   m i s s e d   c a r d   r e c o r d ,   p l e a s e   w a i t & \ n 
 
 7 0 = O9e[k0\ n 
 
 7 0 = C h a n g e   c o m p l e t e d . \ n 
 
 7 1 = O9eR~g~{aSU_QsYN\ n 
 
 7 1 = W h e n   c h a n g e   a t t e n d a n c e   r e s u l t   o f   m i s s e d   c a r d   r e c o r d ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 7 2 =  % s  vR~g~{aSU_O9ebR0\ n 
 
 7 2 = " % s "   a t t e n d a n c e   r e s u l t   m i s s e d   c a r d   r e c o r d   c h a n g e   s u c c e s s f u l l y . \ n 
 
 7 3 = ck(WO9eR~g~{aSU_
zI{. . . \ n 
 
 7 3 = C h a n g i n g   a t t e n d a n c e   r e s u l t   m i s s e d   c a r d   r e c o r d ,   p l e a s e   w a i t & \ m 
 
 7 4 = ck(WXRR~g~{aSU_
zI{. . . \ n 
 
 7 4 = A d d i n g   a t t e n d a n c e   r e s u l t   m i s s e d   c a r d   r e c o r d ,   p l e a s e   w a i t & \ n 
 
 7 5 = XR % s  vR~g~{aSU_eQsYN\ n 
 
 7 5 = W h e n   a d d   " % s "   a t t e n d a n c e   r e s u l t   m i s s e d   c a r d   r e c o r d ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 7 6 = O9e % s  vR~g~{aSU_eQsYN\ n 
 
 7 6 = W h e n   c h a n g e   " % s "   a t t e n d a n c e   r e s u l t   m i s s e d   c a r d   r e c o r d ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 
 
 [ M a i n I D = 0 x D 0 0 1 0 0 0 B   T y p e = 1 ] 
 
 0 x 0 = csSpe
 
 0 x 0 = S h i f t   P a r a m e t e r 
 
 1 = NXT
 
 1 = E m p l o y e e 
 
 2 = ^\'`
 
 2 = P r o p e r t y 
 
 3 = cs
 
 3 = S h i f t 
 
 4 = eĉR
 
 4 = D a y   S c h e d u l e 
 
 1 1 = W,gSpe
 
 1 1 = B a s i c   P a r a m e t e r 
 
 1 2 = hTgUSMO
 
 1 2 = P e r i o d   U n i t 
 
 1 3 = )Y
 
 1 3 = D a y 
 
 1 4 = g
 
 1 4 = M o n t h 
 
 1 5 = wYeg
 
 1 5 = S t a r t   D a t e 
 
 1 6 = ~bkeg
 
 1 6 = E n d   D a t e 
 
 1 7 = cshTg
 
 1 7 = S h i f t   P e r i o d 
 
 1 8 = d\ON
 
 1 8 = O p e r a t o r 
 
 1 9 = Yl
 
 1 9 = R e m a r k 
 
 2 0 = S	eĉR
 
 2 0 = O p t i o n a l   D a y   S c h e d u l e 
 
 2 1 = NXTS
 
 2 1 = E m p l o y e e   N u m b e r 
 
 2 2 = NXTY
T
 
 2 2 = E m p l o y e e   N a m e 
 
 2 3 = cs!j_
 
 2 3 = S h i f t   M o d e 
 
 2 4 = nfcs
 
 2 4 = O r d i n a r y   S c h e d u l e d   S h i f t 
 
 2 5 = ybϑcs
 
 2 5 = B a t c h   S c h e d u l e d   S h i f t 
 
 
 
 5 1 = O9e % s  (WdkgNv,{ % d  )YcsbR0\ n 
 
 5 1 = C h a n g e   " % s "   t h e   " % d "   d a y   o f   t h i s   m o n t h   s c h e d u l e d   s h i f t   s u c c e s s f u l l y . \ n   
 
 5 2 =  % s  (WdkgN*g	gcsU_. . . ۏLXR. . . XRbR0\ n 
 
 5 2 = " % s "   n o   s c h e d u l e d   s h i f t   r e c o r d   i n   t h i s   m o n t h . . . T o   a d d . . . A d d   s u c c e s s f u l l y . \ n 
 
 5 3 =  % s  (WdkgNg0RYagcsU_. . . ۏL Rd. . .  RdbR0\ n 
 
 5 3 = " % s "   h a v e   m o r e   t h a n   o n e   s c h e d u l e d   s h i f t   r e c o r d s . . . T o   d e l e t e . . . D e l e t e   s u c c e s s f u l l y . \ n 
 
 5 4 =  % s  (WdkgNvU_O9eX[(WYN\ n 
 
 5 4 = W h e n   c h a n g e   " % s "   r e c o r d   i n   t h i s   m o n t h ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 5 5 = OX[[kFOQsN0\ n 
 
 5 5 = S a v e   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 5 7 = OX[[k0\ n 
 
 5 7 = S a v e   c o m p l e t e d . \ n 
 
 5 8 = ck(WOX[O9e
zI{. . . \ n 
 
 5 8 = S a v i n g   c h a n g e ,   p l e a s e   w a i t . . . \ n 
 
 5 9 = OX[ % s  vcsSpebR0\ n 
 
 5 9 = S a v e   " % s "   s h i f t   p a r a m e t e r   s u c c e s s f u l l y . \ n 
 
 6 0 = OX[ % s  vcseSuX[(WYN\ n 
 
 6 0 = W h e n   s a v e   " % s "   s h i f t ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 6 1 = csvhTg_{(W1 ~ 3 6 5 KNQ0\ n 
 
 6 1 = T h e   p e r i o d   o f   s h i f t   m u s t   b e   1 - 3 6 5   d a y s . \ n 
 
 2 0 0 3 = 
N Ng
 
 2 0 0 3 = L a s t   M o n t h 
 
 2 0 0 4 = N Ng
 
 2 0 0 4 = N e x t   M o n t h 
 
 2 0 0 5 = OX[
 
 2 0 0 5 = S a v e 
 
 2 0 0 6 = Smd\O
 
 2 0 0 6 = C a n c e l   O p e r a t i o n 
 
 2 0 0 7 = 7RecsSpe
 
 2 0 0 7 = R e f r e s h   S h i f t   P a r a m e t e r 
 
 2 0 0 8 = Smd\O
 
 2 0 0 8 = C a n c e l   O p e r a t i o n 
 
 
 
 [ M a i n I D = 0 x D 0 0 1 0 0 0 C   T y p e = 1 ] 
 
 0 x 0 = R;`ĉR
 
 0 x 0 = A t t e n d a n c e   R u l e s 
 
 1 0 = S_O(u{USRe@b	gveĉRNcspenc\ndꁨRRs~0e0)YRRy(uFO/fR(uc6RhVSNTe(uN蕁y{tv^N
N:SR
NsNs4Y0`nx[~~T\ n 
 
 1 0 = W h e n   s i m p l e   a t t e n d a n c e   i s   u s e d ,   a l l   d a t e   o f   d a y   s c h e d u l e   a n d   s h i f t   w i l l   b e   c l e a r e d ,   t h e n   a u t o m a t i c a l l y   o v e r t i m e   s t a t i s t i c s ,   t i m e d ,   c r o s s - d a y   a t t e n d a n c e   f u n c t i o n s   w i l l   b e   d i s a b l e .   T h e   c o n t r o l l e r   a l s o   c a n   b e   u s e d   i n   A c c e s s   C o n t r o l   s y s t e m   m a n a g e m e n t   a n d   i t   c a n   d i f f e r e n t i a t e   d u t y   o n   r e a d e r   a n d   d u t y   o f f   r e a d e r ,   a r e   y o u   s u r e   t o   c o n t i n u e ? \ n 
 
 1 1 = S_O(u
YBgReꁨRRs~0e0)YRRAQO(uFO/fR_{O(urzvc6RhVZP:NR:g
N(uN蕧c	R:gv1 3 S4YZP:N
Ns4Y2 4 S4YZP:NNs4Y0`nx[~~T\ n 
 
 1 1 = W h e n   c o m p l e x   a t t e n d a n c e   i s   u s e d ,   a u t o m a t i c a l l y   o v e r t i m e   s t a t i s t i c s ,   t i m e d ,   c r o s s - d a y   a t t e n d a n c e   f u n c t i o n s   w i l l   b e   e n a b l e ,   b u t   t h e   a t t e n d a n c e   s y s t e m   m u s t   b e   u s e d   i n   i n d e p e n d e n c e   c o n t r o l l e r   ( d o   n o t   u s e d   i n   A c c e s s   C o n t r o l   S y s t e m   a t   t h e   s a m e   t i m e ) .   A t t e d n a c e   c o n t r o l l e r   c o n s i d e r   r e a d e r   1   a n d   3   a r e   d u t y   o n ,   r e a d e r   2   a n d   4   a r e   d u t y   o f f ,   a r e   y o u   s u r e   t o   c o n t i n u e ?   \ n   
 
 5 1 = OX[R;`ĉRbR0\ n 
 
 5 1 = S a v e   a t t e n d a n c e   r u l e   s u c c e s s f u l l y . \ n 
 
 5 2 = OX[R;`ĉReQsX[(WYN\ n 
 
 5 2 = W h e n   s a v e   a t t e n d a n c e   r u l e s ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 5 3 = ck(WSR;`ĉRU_
zI{. . . \ n 
 
 5 3 = A c q u i r i n g   a t t e n d a n c e   r u l e   r e c o r d ,   p l e a s e   w a i t . . . \ n 
 
 5 4 = S;`ĉRU_]~[k0\ n 
 
 5 4 = A c q u i r e   a t t e n d a n c e   r u l e   r e c o r d   c o m p l e t e d . \ n 
 
 5 5 = S;`ĉRU_]~[kFOQsN0\ n 
 
 5 5 = A c q u i r e   a t t e n d a n c e   r u l e   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 
 
 6 0 = W,gSpe
 
 6 0 = B a s i c   P a r a m e t e r 
 
 6 1 = R!j_
 
 6 1 = A t t e n d a n c e   M o d e 
 
 6 2 = ߏ0R/ e Spe
 
 6 2 = L a t e   /   L e a v e   E a r l y   P a r a m e t e r 
 
 6 3 = ߏ0R/ e ePR	
 
 6 3 = L i m i t e d   T i m e   f o r   L a t e   a r r i v a l /   L e a v e   E a r l y 
 
 6 4 = %N͑ߏ0R/ e ePR	
 
 6 4 = L i m i t e d   T i m e   f o r   e x c e p t i o n a l   L a t e   a r r i v a l   /   L e a v e   e a r l y 
 
 6 5 = e]ePR	
 
 6 5 = L i m i t e d   T i m e   f o r   a b s e n t e e i s m   ( M i n u t e ) 
 
 6 6 = s!k6Re]e{e_
 
 6 6 = C a l c u l a t e   t i m e   o f   a b s e n t e e i s m   b y   s h i f t 
 
 6 7 = RsSpe
 
 6 7 = O v e r t i m e   P a r a m e t e r 
 
 6 8 = ]\Oe~Rs
 
 6 8 = W o r k i n g   D a y   S t a t i s t i c s   O v e r t i m e   
 
 6 9 = ]\OeRs
Ps
 
 6 9 = W o r k i n g   D a y   O v e r t i m e   T i m e s   R a t e 
 
 7 0 = Oo`e~Rs
 
 7 0 = R e s t   D a y   S t a t i s t i c s   O v e r t i m e 
 
 7 1 = Oo`eRs
Ps
 
 7 1 = R e s t   D a y   S t a t i s t i c s   O v e r t i m e   T i m e s   R a t e 
 
 7 2 = l[GPe~Rs
 
 7 2 = O f f i c i a l   H o l i d a y   S t a t i s t i c s   O v e r t i m e 
 
 7 3 = l[GPeRs
Ps
 
 7 3 = O f f i c i a l   H o l i d a y   S t a t i s t i c s   O v e r t i m e   T i m e s   R a t e 
 
 8 0 = {USR
 
 8 0 = S i m p l e   A t t e n d a n c e 
 
 8 1 = 
YBgR
 
 8 1 = C o m p l e x   A t t e n d a n c e 
 
 8 2 = [Ee
 
 8 2 = A c t u a l   T i m e 
 
 8 3 = tes!k
 
 8 3 = W h o l e   S h i f t 
 
 
 
 8 4 = 	gHeRseR	
 
 8 4 = T h e   L e n g t h   o f   V a l i d   O v e r t i m e   ( M i n u t e ) 
 
 8 5 = e6Re]e{e_
 
 8 5 = C a l c u l a t e   t i m e   o f   A b s e n t e e i s m   b y   t i m e 
 
 8 6 = e6R:we]eR	
 
 8 6 = T h e   d e f a u l t   l e n g t h   o f   t i m e d   a b s e n t e e i s m   ( M i n u t e )   
 
 
 
 
 
 
 
 [ M a i n I D = 0 x D 0 0 1 0 0 0 D   T y p e = 1 ] 
 
 1 = l[GPe
 
 1 = O f f i c i a l   H o l i d a y 
 
 2 = ^\'`
 
 2 = P r o p e r t y 
 
 3 = Spe
 
 3 = P a r a m e t e r 
 
 4 = 
Ty
 
 4 = N a m e 
 
 5 = wYeg
 
 5 = S t a r t   D a t e 
 
 6 = f
 
 6 = R e m a r k 
 
 5 1 = ~bkeg
 
 5 1 = E n d   D a t e 
 
 5 2 = eGPe
 
 5 2 = N e w   H o l i d a y 
 
 
 
 7 = ck(W7Rel[GPeRh
zI{. . . \ n 
 
 7 = R e f r e s h i n g   o f f i c i a l   h o l i d a y   l i s t ,   p l e a s e   w a i t . . . \ n 
 
 8 = 7Rel[GPeRh]~[k0\ n 
 
 8 = R e f r e s h   o f f i c i a l   h o l i d a y   l i s t   c o m p l e t e d . \ n 
 
 9 = 7Rel[GPeRheNuNS	gl[GPe*gRQ0`SNQ!k	bl[GPe
Ty͑Ջ0\ n 
 
 9 = W h e n   r e f r e s h   o f f i c i a l   h o l i d a y   l i s t ,   e r r o r   h a p p e n s ,   s o m e   o f f i c i a l   h o l i d a y s   m a y   n o t   b e   d i s p l a y e d .   U s e r   c a n   s e l e c t   o f f i c i a l   h o l i d a y   n a m e   t o   t r y   a g a i n . \ n 
 
 1 0 = ck(WOX[O9e
zI{. . . \ n 
 
 1 0 = S a v i n g   a d j u s t m e n t ,   p l e a s e   w a i t . . . \ n 
 
 1 1 = OX[[k0\ n 
 
 1 1 = S a v e   c o m p l e t e d . \ n 
 
 1 2 = l[GPe % s  OX[bR0\ n 
 
 1 2 = S a v e   o f f i c i a l   h o l i d a y   " % s "   s u c c e s s f u l l y . \ n 
 
 1 3 = *ghKm0Rl[GPeO9ee{OX[0\ n 
 
 1 3 = N o   o f f i c i a l   h o l i d a y   w a s   c h a n g e d ,   d o   n o t   n e e d   s a v e . \ n 
 
 1 4 = OX[l[GPe % s  eQsYN\ n 
 
 1 4 = W h e n   s a v e   o f f i c i a l   h o l i d a y   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 1 5 = OX[[kFOQsN0\ n 
 
 1 5 = S a v e   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 1 7 = ck(W Rdl[GPe
zI{. . . \ n 
 
 1 7 = D e l e t i n g   o f f i c i a l   h o l i d a y ,   p l e a s e   w a i t . . . \ n 
 
 1 8 =  Rd[k0\ n 
 
 1 8 = D e l e t e   c o m p l e t e d . \ n 
 
 1 9 =  Rd[kFOQsN0\ n 
 
 1 9 = D e l e t e   c o m p l e t e d ,   b u t   e r r o r   h a p p e n s . \ n 
 
 2 0 =  Rdl[GPe % s  eQsNYN\ n 
 
 2 0 = W h e n   d e l e t e   o f f i c i a l   h o l i d a y   " % s " ,   f o l l o w i n g   e r r o r   h a p p e n s : \ n 
 
 2 1 =  Rdl[GPe % s  bR0\ n 
 
 2 1 = D e l e t e   o f f i c i a l   h o l i d a y   " % s "   s u c c e s s f u l l y . \ n 
 
 2 2 = @b	gl[GPe
 
 2 2 = A l l   O f f i c i a l   H o l i d a y 
 
 4 0 = l[GPeeg	g͑
Y\ n 
 
 4 0 = T h e   D a t e   o f   o f f i c i a l   h o l i d a y   e x i s t e d ! \ n 
 
 2 0 0 1 = 7Rel[GPeRh
 
 2 0 0 1 = R e f r e s h   o f f i c i a l   h o l i d a y   l i s t 
 
 2 0 0 4 = Smd\O
 
 2 0 0 4 = C a n c e l   O p e r a t i o n 
 
 
 
 [ M a i n I D = 0 x D 0 0 1 0 0 0 E   T y p e = 1 ] 
 
 1 = 
 
 1 = D e p a r t m e n t 
 
 2 = eV
 
 2 = T i m e   R a n g e 
 
 3 = wYeg
 
 3 = S t a r t   D a t e 
 
 4 = ~bkeg
 
 4 = E n d   D a t e 
 
 5 = S	
 
 5 = O p t i o n a l   D e p a r t m e n t 
 
 6 = 
 
 6 = D e p a r t m e n t 
 
 
 
 1 1 =  _YۏLR{
zI{. . . \ n 
 
 1 1 = S t a r t   a t t e n d a n c e   c o u n t ,   p l e a s e   w a i t . . . \ n 
 
 1 2 = R{][b% d % % . . . \ n 
 
 1 2 = A t t e n d a n c e   c o u n t   c o m p l e t e d % d % % . . . \ n 
 
 1 3 = R{~_g0\ n 
 
 1 3 = A t t e n d a n c e   c o u n t   c o m p l e t e d . \ n 
 
 1 4 = (WۏLR{MRnx[`]~NRc6RhV
N ON7RaSU_v^N[v^NXTۏLNGP{v0Rs{vTe{vN7RaSU_0(WR{KNTۏLvMRd\O\
NOS f0RR~g-N`nx[~~T\ n 
 
 1 4 = B e f o r e   a t t e n d a n c e   c o u n t ,   p l e a s e   e n s u r e   u s e r   h a v e   d o w n l o a d e d   c a r d   r e c o r d   f r o m   c o n t r o l l e r ,   a l s o   l e a v e   r e g i s t e r ,   o v e r t i m e   r e g i s t e r   a n d   r e g i s t e r   m i s s e d   c a r d   r e c o r d .   A f t e r   f i n i s h   a t t e n d a n c e   c o u n t ,   a b o v e   o p e r a t i o n   w i l l   n o t   d i s p l a y   i n   a t t e n d a n c e   r e s u l t ,   a r e   y o u   s u r e   t o   c o n t i n u e ? \ n         
 
 1 5 = ck(WYtRs{v
zI{. . . \ n 
 
 1 5 = D e a l i n g   w i t h   o v e r t i m e   r e g i s t e r ,   p l e a s e   w a i t . . . \ n 
 
 1 6 = ck(WYtGP{v
zI{. . . \ n 
 
 1 6 = D e a l i n g   w i t h   l e a v e   r e g i s t e r ,   p l e a s e   w a i t . . . \ n 
 
 
 
 2 0 0 7 = 7ReRh
 
 2 0 0 7 = R e f r e s h   D e p a r t m e n t   L i s t 
 
 2 0 0 8 = Smd\O
 
 2 0 0 8 = C a n c e l   O p e r a t i o n 
 
 
 
 [ M a i n I D = 0 x D 0 0 1 0 0 0 F   T y p e = 1 ] 
 
 1 = R~gf~
 
 1 = A t t e n d a n c e   R e s u l t   D e t a i l 
 
 2 = gagN
 
 2 = Q u e r y   C o n d i t i o n 
 
 3 = NXTY
T
 
 3 = E m p l o y e e   N a m e 
 
 4 = NXTaSS
 
 4 = E m p l o y e e   C a r d   N u m b e r 
 
 5 = 
 
 5 = D e p a r t m e n t 
 
 6 = wYeg
 
 6 = S t a r t   D a t e 
 
 7 = ~bkeg
 
 7 = E n d   D a t e 
 
 9 = @b	g
 
 9 = A l l   d e p a r t m e n t s 
 
 
 
 1 1 = NXTS
 
 1 1 = E m p l o y e e   N u m b e r 
 
 1 2 = Y
T
 
 1 2 = N a m e 
 
 1 3 = aSS
 
 1 3 = C a r d   N u m b e r 
 
 1 4 = eg
 
 1 4 = D a t e 
 
 1 5 = eĉR{|W
 
 1 5 = D a y   S c h e d u l e   T y p e 
 
 1 6 = 
Nse
 
 1 6 = D u t y   o n   T i m e 
 
 1 7 = Nse
 
 1 7 = D u t y   o f f   T i m e 
 
 1 8 = 
NsSbaSe
 
 1 8 = P r e s e n t i n g   c a r d   t i m e   f o r   d u t y   o n 
 
 1 9 = NsSbaSe
 
 1 9 = P r e s e n t i n g   c a r d   t i m e   f o r   d u t y   o f f 
 
 2 0 = 
Ns;`e
 
 2 0 = T h e   t o t a l   l e n g t h   o f   d u t y   o n 
 
 2 1 = ߏ0R{|W
 
 2 1 = L a t e   T y p e 
 
 2 2 = ߏ0Re
 
 2 2 = L e n g t h   o f   L a t e 
 
 2 3 = e {|W
 
 2 3 = E a r l y   L e a v e 
 
 2 4 = e e
 
 2 4 = L e n g t h   o f   E a r l y   L e a v e 
 
 2 5 = e]e
 
 2 5 = L e n g t h   o f   A b s e n t e e i s m 
 
 2 6 = Rs{|W
 
 2 6 = O v e r t i m e   T y p e 
 
 2 7 = Rse
 
 2 7 = L e n g t h   o f   O v e r t i m e   
 
 2 8 = Rs
Ps
 
 2 8 = T i m e s   R a t e   o f   O v e r t i m e 
 
 2 9 = GP`Q
 
 2 9 = L e a v e   S t a t u s 
 
 
 
 4 0 = QRr`
 
 4 0 = A t t e n d a n c e   S t a t u s   
 
 4 1 = @b	gr`
 
 4 1 = A l l   S t a t u s 
 
 4 2 = ߏ0R
 
 4 2 = L a t e 
 
 4 3 = e 
 
 4 3 = E a r l y   L e a v e 
 
 4 4 = e]
 
 4 4 = A b s e n t e e i s m 
 
 4 5 = *gSbaS
 
 4 5 = N o   p r e s e n t i n g   c a r d 
 
 4 6 = NUOǏ1Y
 
 4 6 = A n y   f a u l t   
 
 4 7 = Rs
 
 4 7 = O v e r t i m e 
 
 4 8 = GP
 
 4 8 = L e a v e 
 
 
 
 5 0 = %N͑ߏ0R
 
 5 0 = E x c e p t i o n a l   L a t e 
 
 5 1 = %N͑e 
 
 5 1 = E x c e p t i o n a l   E a r l y   L e a v e 
 
 
 
 6 1 = ]\OeRs
 
 6 1 = O v e r t i m e   o n   W o r k i n g   d a y 
 
 6 2 = Oo`eRs
 
 6 2 = O v e r t i m e   o n   R e s t   D a y 
 
 6 3 = l[GPeRs
 
 6 3 = O v e r t i m e   o n   O f f i c i a l   H o l i d a y 
 
 6 4 = Kb]{vRs
 
 6 4 = M a n u a l l y   R e g i s t e r   O v e r t i m e 
 
 
 
 7 0 = hQ)YGP
 
 7 0 = L e a v e   w h o l e   d a y 
 
 7 1 = cߏ
Ns
 
 7 1 = D e l a y   t o   W o r k 
 
 7 2 = )w
Nse
 
 7 2 = S h o r t   t h e   l e n g t h   o f   d u t y   o n 
 
 7 3 = cߏ
Ns)w
Nse
 
 7 3 = D e l y   t o   w o r k   a d n   s h o r t   t h e   l e n g t h   o f   d u t y   o n 
 
 7 4 = s!kGP
 
 7 4 = S h i f t   L e a v e 
 
 
 
 [ M a i n I D = 0 x D 0 0 1 0 0 1 1   T y p e = 1 ] 
 
 1 = R~g~
 
 1 = A t t e n d a n c e   R e s u l t   S t a t i s t i c s 
 
 3 = e{|+R
 
 3 = D a y   T y p e 
 
 
 
 9 = 
Nse
 
 9 = L e n g t h   o f   D u t y   o n 
 
 1 0 = Rse
 
 1 0 = L e n g t h   o f   O v e r t i m e 
 
 1 1 = Rs
Pse
 
 1 1 = L e n g t h   o f   O v e r t i m e   T i m e s   R a t e 
 
 1 2 = ߏ0R!kpe
 
 1 2 = T h e   T i m e s   o f   L a t e 
 
 1 3 = ߏ0Re
 
 1 3 = L e n g t h   o f   L a t e   A r r i v a l 
 
 1 4 = %N͑ߏ0R!kpe
 
 1 4 = E x c e p t i o n a l   L a t e   A r r i v a l   T i m e s 
 
 1 5 = %N͑ߏ0Re
 
 1 5 = L e n g t h   o f   E x c e p t i o n a l   L a t e   A r r i v a l 
 
 1 6 = e !kpe
 
 1 6 = E a r l y   L e a v e   T i m e s 
 
 1 7 = e e
 
 1 7 = L e n g t h   o f   E a r l y   L e a v e 
 
 1 8 = %N͑e !kpe
 
 1 8 = E x c e p t i o n a l   E a r l y   L e a v e   T i m e s 
 
 1 9 = %N͑e e
 
 1 9 = L e n g t h   o f   E x c e p t i o n a l   E a r l y   L e a v e   
 
 2 0 = e]!kpe
 
 2 0 = A b s e n t e e i s m   T i m e s 
 
 2 1 = e]e
 
 2 1 = L e n g t h   O f   A b s e n t e e i s m 
 
 2 2 = *gSbaS!kpe
 
 2 2 = N o   p r e s e n t i n g   C a r d   T i m e s 
 
 
 
 3 0 = ~@b	g
 
 3 0 = S t a t i s t i c s   A l l 
 
 3 1 = eeN^]\Oe
 
 3 1 = T i m e d   D a y   a n d   n o n w o r k d a y s 
 
 3 2 = s!keN^]\Oe
 
 3 2 = S h i f t   D a y   a n d   N o n w o r k d a y s 
 
 3 3 = N~ee
 
 3 3 = O n l y   S t a t i s t i c s   T i m e d   D a y 
 
 3 4 = N~]\Oe
 
 3 4 = O n l y   S t a t i s t i c s   W o r k i n g   D a y 
 
 
 
 [ M a i n I D = 0 x D 0 0 1 0 0 1 3   T y p e = 1 ] 
 
 1 = Rs{v
 
 1 = O v e r t i m e   R e g i s t e r 
 
 
 
 [ M a i n I D = 0 x D 0 0 1 0 0 1 4   T y p e = 1 ] 
 
 1 = GP{v
 
 1 = L e a v e   R e g i s t e r 
 
 
 
 [ M a i n I D = 0 x D 0 0 1 0 0 1 5   T y p e = 1 ] 
 
 1 = e{v7RaSU_
 
 1 = A d d   M i s s e d   C a r d   R e c o r d 
 
 
 
 [ M a i n I D = 0 x D 0 0 1 0 0 1 6   T y p e = 1 ] 
 
 1 = |~e_
 
 1 = S y s t e m   L o g 
 
 2 = gagN
 
 2 = Q u e r y   C o n d i t i o n 
 
 3 = (u7b
 
 3 = U s e r 
 
 4 = |~e_
 
 4 = S y s t e m   L o g 
 
 5 = ~Oo`
 
 5 = D e t a i l   I n f o r m a t i o n 
 
 6 = wYe
 
 6 = S t a r t   T i m e 
 
 7 = ~bke
 
 7 = E n d   T i m e 
 
 8 = g~g
 
 8 = Q u e r y   R e s u l t 
 
 9 = @b	g(u7b
 
 9 = A l l   U s e r 
 
 
 
 2 0 0 7 = 	cR{|z^
 
 2 0 0 7 = O r d e r   b y   C l a s s i f i c a t i o n 
 
 2 0 0 8 = W[kz^
 
 2 0 0 8 = O r d e r   b y   A l p h a b e t 
 
 2 0 0 3 = Smd\O
 
 2 0 0 3 = C a n c e l   O p e r a t i o n 
 
 2 0 0 4 = g
 
 2 0 0 4 = Q u e r y 
 
 2 0 0 5 = !j|g
 
 2 0 0 5 = F u z z y   Q u e r y 
 
 
 
 [ M a i n I D = 0 x D 0 0 1 0 0 1 7   T y p e = 1 ] 
 
 1 = 7RaSU_
 
 1 = C a r d   R e c o r d 
 
 2 = gagN
 
 2 = Q u e r y   C o n d i t i o n 
 
 3 = NXTY
T
 
 3 = E m p l o y e e   N a m e 
 
 4 = NXTaSS
 
 4 = E m p l o y e e   C a r d   N u m b e r 
 
 5 = 
 
 5 = D e p a r t m e n t 
 
 6 = wYe
 
 6 = S t a r t   T i m e 
 
 7 = ~bke
 
 7 = E n d   T i m e 
 
 8 = g~g
 
 8 = Q u e r y   R e s u l t 
 
 9 = @b	g
 
 9 = A l l   D e p a r t m e n t 
 
 
 
 1 1 = NXTS
 
 1 1 = E m p l o y e e   N u m b e r 
 
 1 2 = NXTY
T
 
 1 2 = E m p l o y e e   N a m e 
 
 1 3 = aSS
 
 1 3 = C a r d   N u m b e r 
 
 1 4 = e
 
 1 4 = T i m e 
 
 
 
 3 0 = g~g
 
 3 0 = Q u e r y   R e s u l t 
 
 3 1 =  _YV
 
 3 1 = S t a r t   R a n g e 
 
 3 2 = ~_gV
 
 3 2 = E n d   R a n g e 
 
 
 
 2 0 0 7 = 	cR{|z^
 
 2 0 0 7 = O r d e r   b y   C l a s s i f i c a t i o n 
 
 2 0 0 8 = W[kz^
 
 2 0 0 8 = O r d e r   b y   A l p h a b e t 
 
 2 0 0 3 = Smd\O
 
 2 0 0 3 = C a n c e l   O p e r a t i o n 
 
 2 0 0 4 = g
 
 2 0 0 4 = Q u e r y 
 
 2 0 0 5 = !j|g
 
 2 0 0 5 = F u z z y   Q u e r y 
 
 
 
 / / XT]sQ `
 
 [ M a i n I D = 0 x D 0 0 1 0 0 1 8   T y p e = 1 ] 
 
 0 = XT]sQ `
 
 0 = E m p l o y e e   C a r e 
 
 
 
 1 0 = W,gSpe
 
 1 0 = B a s i c   P a r a m e t e r 
 
 1 1 =  _/TXT]sQ `
 
 1 1 = E n a b l e   E m p l o y e e   C a r e 
 
 1 2 =  gߏ0Re( e: R) 
 
 1 2 = L a t e s t   a r r i v a l   t i m e ( h h : m m )   
 
 
 
 1 3 = NS
gRhV
 
 1 3 = S M T P   S e r v e r 
 
 1 4 = 
gR0W@W
 
 1 4 = A d d r e s s 
 
 1 5 = 
gRzS
 
 1 5 = P o r t 
 
 1 6 = &S
 
 1 6 = A c c o u n t 
 
 1 7 = [x
 
 1 7 = P a s s w o r d 
 
 
 
 2 0 = 6eNN
 
 2 0 = R e c i p i e n t 
 
 2 1 = N0W@W1 
 
 2 1 = F i r s t   E m a i l   A d d r e s s 
 
 2 2 = N0W@W2 
 
 2 2 = S e c o n d   E m a i l   A d d r e s s 
 
 2 3 = N0W@W3 
 
 2 3 = T h i r d   E m a i l   A d d r e s s 
 
 
 
 5 1 = OX[XT]sQ `nbR0\ n 
 
 5 1 = S a v e   c o m p l e t e d . \ n 
 
 5 2 = OX[XT]sQ `neQsYN\ n 
 
 5 2 = E r r o r   h a p p e n s   w h e n   s a v i n g : \ n 
 
 
 
 
 
 / / vQ[W[&{
 
 / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / 
 
 / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / / 
 
 / /  N,W[&{
 
 [ M a i n I D = 0 x D 0 0 1 0 0 0 0   T y p e = 0 ] 
 
 0 x 0 = R{t|~
 
 0 x 0 = A t t e n d a n c e   M a n a g e m e n t   S y s t e m 
 
 0 x 1 = A t t e n d a n c e E n . c h m 
 
 0 x 2 = A t t e n d a n c e E n . c h m : : / Q u i c k G u i d e . h t m 
 
 0 x 3 = A t t e n d a n c e E n . c h m : : / F A Q . h t m 
 
 
 
 / / CgP
T
 
 [ M a i n I D = 0 x D 0 0 1 0 0 0 4   T y p e = 0 ] 
 
 0 = (u7b{t
 
 0 = U s e r   M a n a g e m e n t 
 
 1 = 	yn
 
 1 = O p t i o n s   S e t u p 
 
 2 = penc{t
 
 2 = D a t a b a s e   M a n a g e m e n t 
 
 3 = nN}
 
 3 = S e t u p   U p l o a d 
 
 4 = 2NLSn
 
 4 = S e r i a l   P o r t   S e t u p 
 
 5 = lbchVn
 
 5 = C o n v e r t e r   S e t u p 
 
 6 = Q~c6RhVn
 
 6 = N e t w o r k   C o n t r o l l e r   S e t u p 
 
 7 = c6RhVn
 
 7 = C o n t r o l l e r   S e t u p 
 
 8 = 7RaSU_
N O
 
 8 = C a r d   R e c o r d   D o w n l o a d   
 
 9 = aSn
 
 9 = C a r d   S e t u p 
 
 1 0 = 蕾n
 
 1 0 = D e p a r t m e n t   S e t u p 
 
 1 1 = NXTn
 
 1 1 = E m p l o y e e   S e t u p 
 
 1 2 = R;`ĉRn
 
 1 2 = A t t e n d a n c e   R u l e   S e t u p 
 
 1 3 = eĉRn
 
 1 3 = D a y   S c h e d u l e   S e t u p 
 
 1 4 = cs
 
 1 4 = S h i f t 
 
 1 5 = l[GPen
 
 1 5 = O f f i c i a l   H o l i d a y   S e t u p 
 
 1 6 = GP{v
 
 1 6 = L e a v e   R e g i s t e r 
 
 1 7 = Rs{v
 
 1 7 = O v e r t i m e   R e g i s t e r 
 
 1 8 = e{v7RaSU_
 
 1 8 = A d d   M i s s e d   C a r d   R e c o r d 
 
 1 9 = R{
 
 1 9 = A t t e n d a n c e   C o u n t 
 
 2 0 = !hQc6RhVe
 
 2 0 = A d j u s t   C o n t r o l l e r   T i m e 
 
 2 1 = RYSc6RhV
 
 2 1 = I n i t i a l i z a t i o n   C o n t r o l l e r 
 
 2 2 = SbpS
 
 2 2 = P r i n t 
 
 2 3 = c6RhVOo`g
 
 2 3 = Q u e r y   C o n t r o l l e r   I n f o r m a t i o n   
 
 2 4 = NXTOo`g
 
 2 4 = Q u e r y   E m p l o y e e   I n f o r m a t i o n   
 
 2 5 = aSOo`g
 
 2 5 = Q u e r y   C a r d   I n f o r m a t i o n   
 
 2 6 = R~gf~g
 
 2 6 = Q u e r y   A t t e n d a n c e   R e s u l t   D e t a i l   
 
 2 7 = R~g~g
 
 2 7 = Q u e r y   A t t e n d a n c e   R e s u l t   S t a t i s t i c s   
 
 2 8 = GP{vg
 
 2 8 = Q u e r y   L e a v e   R e g i s t e r 
 
 2 9 = Rs{vg
 
 2 9 = Q u e r y   O v e r t i m e   R e g i s t e r 
 
 3 0 = e{v7RaSU_g
 
 3 0 = Q u e r y   A d d   M i s s e d   C a r d   R e c o r d   
 
 3 1 = 7RaSU_g
 
 3 1 = Q u e r y   C a r d   R e c o r d 
 
 3 2 = |~e_g
 
 3 2 = Q u e r y   S y s t e m   L o g 
 
 
 
 
 
 [ M a i n I D = 0 x D 0 0 1 0 0 0 5   T y p e = 0 ] 
 
 0 = R e p o r t . h t m 
 
 1 0 = A C S e r i a l . h t m 
 
 1 1 = A C S e r i a l L i s t . h t m 
 
 1 2 = A C S e r i a l P r o p . h t m 
 
 1 3 = A C S e r i a l P R a t e . h t m 
 
 2 0 = A C C o n v e r t e r . h t m 
 
 2 1 = A C C o n v e r t L i s t . h t m 
 
 2 2 = A C C o n v e r t P r o p . h t m 
 
 2 3 = A C C o n v e r t P T y p e . h t m 
 
 2 4 = A C C o n v e r t P M a c . h t m 
 
 2 5 = A C C o n v e r t P I P . h t m 
 
 2 6 = A C C o n v e r t P M a s k . h t m 
 
 2 7 = A C C o n v e r t P G a t e . h t m 
 
 4 0 = A C N e t C t r l . h t m 
 
 4 1 = A C N e t C t r l L i s t . h t m 
 
 4 2 = A C N e t C t r l P r o p . h t m 
 
 4 3 = A C N e t C t r l P T y p e . h t m 
 
 4 4 = A C N e t C t r l P M a c . h t m 
 
 4 5 = A C N e t C t r l P V e r . h t m 
 
 4 6 = A C C o n v e r t P I P . h t m 
 
 4 7 = A C C o n v e r t P M a s k . h t m 
 
 4 8 = A C C o n v e r t P G a t e . h t m 
 
 
 
 1 3 0 = A T G R e g u l a r . h t m 
 
 1 3 1 = A T G R e g u l a r P r o p . h t m 
 
 1 3 2 = A T G R e g u l a r M o d e . h t m 
 
 1 3 3 = A T G R e g u l a r L a t e . h t m 
 
 1 3 4 = A T G R e g u l a r L a t e S . h t m 
 
 1 3 5 = A T G R e g u l a r A b s e n t . h t m 
 
 1 3 6 = A T G R e g u l a r S h i f t . h t m 
 
 1 3 7 = A T G R e g u l a r W o r k F l a g . h t m 
 
 1 3 8 = A T G R e g u l a r W o r k R a t e . h t m 
 
 1 3 9 = A T G R e g u l a r R e s t F l a g . h t m 
 
 1 4 0 = A T G R e g u l a r R e s t R a t e . h t m 
 
 1 4 1 = A T G R e g u l a r H o l i d a y F l a g . h t m 
 
 1 4 2 = A T G R e g u l a r H o l i d a y R a t e . h t m 
 
 1 4 4 = A T G R e g u l a r V a l i d S e g . h t m 
 
 1 4 5 = A T G R e g u l a r T i m i n g . h t m 
 
 1 4 6 = A T G R e g u l a r D e f S e g . h t m 
 
 
 
 1 5 0 = A T D a y R e g u l a r . h t m 
 
 1 5 1 = A T D a y R e g u l a r L i s t . h t m 
 
 1 5 2 = A T D a y R e g u l a r P r o p . h t m 
 
 1 5 3 = A C P N a m e . h t m 
 
 1 5 4 = A T D a y R e g u l a r T y p e . h t m 
 
 1 5 5 = A T D a y R e g u l a r L e f t . h t m 
 
 1 5 6 = A T D a y R e g u l a r R i g h t . h t m 
 
 1 5 7 = A T D a y R e g u l a r L a t e s t F l a g . h t m 
 
 1 5 8 = A T D a y R e g u l a r L a t e s t . h t m 
 
 1 5 9 = A T D a y R e g u l a r T i m e F l a g . h t m 
 
 1 6 0 = A T D a y R e g u l a r T i m e . h t m 
 
 1 6 1 = A T D a y R e g u l a r O T F l a g . h t m 
 
 1 6 2 = A T D a y R e g u l a r S h i f t O T F l a g . h t m 
 
 1 6 3 = A T D a y R e g u l a r S h i f t O T . h t m 
 
 1 6 6 = A T D a y R e g u l a r S h i f t N u m . h t m 
 
 1 6 7 = A T D a y R e g u l a r O n D u t y . h t m 
 
 1 6 8 = A T D a y R e g u l a r O f f D u t y . h t m 
 
 
 
 1 8 0 = A T T e a m R e g u l a r . h t m 
 
 1 8 1 = A T T e a m R e g u l a r L i s t . h t m 
 
 1 8 2 = A T T e a m R e g u l a r P r o p . h t m 
 
 1 8 3 = A T T e a m R e g u l a r U n i t . h t m 
 
 1 8 4 = A T T e a m R e g u l a r S t a r t . h t m 
 
 1 8 5 = A T T e a m R e g u l a r E n d . h t m 
 
 1 8 6 = A T T e a m R e g u l a r P e r i o d . h t m 
 
 1 8 7 = A T T e a m R e g u l a r M o d e . h t m 
 
 1 8 8 = A T T e a m R e g u l a r R e g u l a r . h t m 
 
 1 8 9 = A T T e a m R e g u l a r S h i f t . h t m 
 
 
 
 2 0 0 = A T H o l i d a y . h t m 
 
 2 0 1 = A T H o l i d a y L i s t . h t m 
 
 2 0 2 = A T H o l i d a y P r o p . h t m 
 
 2 0 3 = A C P N a m e . h t m 
 
 2 0 4 = A T H o l i d a y D a t e . h t m 
 
 2 0 5 = A T H o l i d a y M e m o . h t m 
 
 
 
 2 1 0 = A T L e a v e . h t m 
 
 2 1 1 = A T L e a v e E m p L i s t . h t m 
 
 2 1 3 = A T L e a v e L i s t . h t m 
 
 2 1 4 = A T L e a v e S t a r t . h t m 
 
 2 1 5 = A T L e a v e E n d . h t m 
 
 
 
 2 3 0 = A T O T . h t m 
 
 2 3 1 = A T O T E m p L i s t . h t m 
 
 2 3 3 = A T O T L i s t . h t m 
 
 
 
 2 5 0 = A T C a u s e S i g n . h t m 
 
 2 5 1 = A T C a u s e S i g n E m p L i s t . h t m 
 
 2 5 3 = A T C a u s e S i g n L i s t . h t m 
 
 
 
 2 7 0 = A T C o u n t R e s u l t . h t m 
 
 2 7 2 = A T C o u n t R e s u l t L i s t . h t m 
 
 2 7 3 = A T C o u n t R e s u l t S t a r t . h t m 
 
 2 7 4 = A T C o u n t R e s u l t E n d . h t m 
 
 
 
 2 8 1 = A T Q u e r y D e t a i l . h t m 
 
 2 8 2 = A T Q u e r y S t a t . h t m 
 
 2 8 4 = A T Q u e r y O v e r t i m e . h t m 
 
 2 8 5 = A T Q u e r y L e a v e . h t m 
 
 2 8 6 = A T Q u e r y S i g n C a r d . h t m 
 
 
 
 1 0 8 0 = A T C o n t r o l l e r . h t m 
 
 1 0 8 1 = A T C o n t r o l l e r L i s t . h t m 
 
 1 0 8 2 = A C C o n t r o l l e r P r o p . h t m 
 
 1 0 8 3 = A C P N a m e . h t m 
 
 1 0 8 4 = A C C o n t r o l l e r P T y p e . h t m 
 
 1 0 8 5 = A C C o n t r o l l e r P D N u m . h t m 
 
 1 0 8 6 = A C C o n t r o l l e r P R P . h t m 
 
 1 0 8 7 = A C C o n t r o l l e r P C T y p e . h t m 
 
 1 0 8 8 = A C C o n t r o l l e r P S e r i a l . h t m 
 
 1 0 8 9 = A C C o n t r o l l e r P I P . h t m 
 
 1 0 9 0 = A C C o n t r o l l e r P P o r t . h t m 
 
 1 0 9 1 = A C C o n t r o l l e r P A d d r e s s . h t m 
 
 1 0 9 2 = A C C o n t r o l l e r P L o c k . h t m 
 
 1 0 9 3 = A C C o n t r o l l e r P B a c k . h t m 
 
 1 0 9 4 = A C C o n t r o l l e r P A t t . h t m 
 
 
 
 1 1 6 0 = A T C a r d . h t m 
 
 1 1 6 1 = A C C a r d L i s t . h t m 
 
 1 1 6 2 = A T C a r d P C a r d . h t m 
 
 
 
 1 1 8 0 = A T D e p a r t m e n t . h t m 
 
 1 1 8 1 = A C D e p a r t m e n t L i s t . h t m 
 
 1 1 8 2 = A C D e p a r t m e n t P r o p . h t m 
 
 1 1 8 3 = A C P N a m e . h t m 
 
 
 
 1 1 9 0 = A C E m p l o y e e . h t m 
 
 1 1 9 1 = A C E m p l o y e e L i s t . h t m 
 
 1 1 9 2 = A C E m p l o y e e P r o p . h t m 
 
 1 1 9 3 = A C E m p l o y e e P N a m e . h t m 
 
 1 1 9 4 = A C E m p l o y e e P C o d e . h t m 
 
 1 1 9 5 = A T E m p l o y e e P D e p a r t m e n t . h t m 
 
 1 1 9 6 = A C E m p l o y e e P S e x . h t m 
 
 1 1 9 7 = A C E m p l o y e e P B i r t h d a y . h t m 
 
 1 1 9 8 = A C E m p l o y e e P J o b . h t m 
 
 1 1 9 9 = A C E m p l o y e e P E d u c a t i o n . h t m 
 
 1 2 0 0 = A C E m p l o y e e P T e l e p h o n e . h t m 
 
 1 2 0 1 = A C E m p l o y e e P A d d r e s s . h t m 
 
 1 2 0 2 = A C E m p l o y e e P R e m a r k . h t m 
 
 1 2 0 3 = A T E m p l o y e e P C a r d . h t m 
 
 1 2 0 4 = A T E m p l o y e e P P a s s w o r d . h t m 
 
 1 2 0 5 = A C E m p l o y e e P G r o u p . h t m 
 
 1 2 0 6 = A C E m p l o y e e P F i r s t . h t m 
 
 1 2 0 7 = A C E m p l o y e e P S e t A l a r m . h t m 
 
 1 2 0 8 = A C E m p l o y e e P N u m . h t m 
 
 1 2 0 9 = A C E m p l o y e e P S e t N u m . h t m 
 
 1 2 1 0 = A C E m p l o y e e P D a t e . h t m 
 
 1 2 1 1 = A C E m p l o y e e P S e t D a t e . h t m 
 
 1 2 1 2 = A C E m p l o y e e P P h o t o . h t m 
 
 1 2 1 3 = A C E m p l o y e e P E x t I n f o . h t m 
 
 1 2 1 4 = A C E m p l o y e e P D N o r m a l O p e n . h t m 
 
 
 
 1 2 3 0 = A T R D E v e n t . h t m 
 
 1 2 3 1 = A C R D E v e n t L i s t . h t m 
 
 1 2 3 2 = A C R D E v e n t R e s u l t . h t m 
 
 
 
 1 2 7 0 = A T Q u e r y C o n d i t i o n . h t m 
 
 1 2 7 1 = A C Q u e r y R e s u l t . h t m 
 
 1 2 7 2 = A C Q u e r y C o n t r o l l e r . h t m 
 
 1 2 7 4 = A C Q u e r y E m p l o y e e . h t m 
 
 1 2 7 5 = A C Q u e r y C a r d . h t m 
 
 1 2 7 6 = A T Q u e r y R e c o r d . h t m 
 
 1 2 8 0 = A T Q u e r y L o g . h t m 
 
 1 2 8 8 = R e p o r t 1 . h t m 