[ L A N G U A G E ] 
 
 S y s t e m = E/1*  (1  3'E'FG
 
 S t r e a m = E/1*  (1  ,1'F  ('*
 
 S t o r a g e = E/1*  (1  0.1G  3'2
 
 A c c o u n t s = E/1*  (1  '1(1'F
 
 N e t w o r k = E/1*  (1  4(G  'F*1F*
 
 P T Z = E/1*  (1  31  3G  ~'G
 
 E x i t = .1H,
 
 I P C a m   S e t t i n g = *F8E  /H1(F  *5H1(1/'1
 
 O k = B(HD
 
 C a n c e l = 'F51'A
 
 S y s t e m   S e t t i n g = *F8E  33*E
 
 M a i n t e n a n c e = FG/'1  '2  3'E'FG
 
 L o g s = E/1*  (1  A'D  G'  +(*  HB'9
 
 D e v i c e   n a m e : = F'E  '(2'1
 
 P r o d u c t   S N : = 4E'1G  31'D  A1"H1/G
 
 V e r s i o n : = F3.G  (1F'EG: 
 
 P r o d u c t   T y p e : = FH9  A1"H1/G
 
 F o r m a t : = A1E*  2E'F
 
 D a t e   T i m e : = *'1.  H  2E'F: 
 
 C l o u d S E E   I D : = n v s i p   I D 
 
 n v s i p   P o r t : = n v s i p   P o r t : 
 
 n v s i p   P o r t   M o d i f i e d ,   R e s t a r t   t o   E n a b l e   I t   ? = 4E'1G  /G'FG  n v s i p *:1  'A*G  '3*.   "'  AH1'  "F  1'  /H('1G  41H9  F/  *'  *:1'*  A9'D  4H/
 
 L a n g u a g e : = 2('F  3'E'FG: 
 
 W e b   S e r v i c e = ./E'*  W E B 
 
 E n a b l e   m o b i l e   s e r v e r = ":'2  ./E'*  *DAF  GE1'G
 
 P o r t : = /G'FG  ./E'*:   
 
 Q u a l i t y : = A*  *5H1
 
 F P S : = F1.  A1E  *5H1: 
 
 D a t e . . . = *F8E  3'9*
 
 D e f a u l t   S e t t i n g = *F8E'*  ~4  A16
 
 E n a b l e   t a l k   s e r v e r = ','2G  (G  A*H  5H*
 
 h i g h = ('D'
 
 m i d d l e = E*H37
 
 l o w = ~'F
 
 2 5 = 1H'F  *1F
 
 2 0 = 1H'F
 
 1 5 = F3(*'  1H'F
 
 1 0 = ~FG'  E
 
 5 = E*1F  ~GF'
 
 T i m e   a u t o m a t i c a l l y = GE'E  1/F  ('  3'9*  '*E
 
 N T P   S e r v e r : = 3'2'1  (1'  GE'E  1/F
 
 N T P   I n t e r v a l ( H o u r ) : = HBAG  E'F  /A9'*  GE'E  1/F
 
 H o u r = 3'9*  G'
 
 T i m e   S e t t i n g = *F8E  3'9*
 
 F o c u s   H e l p e r = '1  (G  *F8E  A'5DG  'FHF
 
 U p d a t e   m e t h o d : = (1H213'F  3'E'FG
 
 S e l e c t . . . = E1H1. . . 
 
 P r o g r e s s : = ~41A*  (1H213'F
 
 U p d a t e   b e g i n = (1H213'F
 
 C a n c e l = 'F51'A
 
 R e s t a r t = 41H9  E,//  '(2'1
 
 R e c o v e r y = ('2'A*  3'E'FG
 
 W E B   U p d a t e = (1H213'F  ~''G  'F*1F*
 
 F i l e   U p d a t e = (1H213'F  A'D
 
 D e v i c e   i s   b u s i n g   r e f u s e   u p d a t e   r e q u e s t . = '(2'1  EH1/  '3*A'/G.   /1.H'3*  (1'  (1H213'F  1/  4/. 
 
 S t a r t   u p d a t e   m o d u l e   f a i l e d . = A9'D  1/F  E/D  (1H213'F  EHAB  F4/
 
 S e n d   d a t a   e r r o r . = '13'D  /'/G  G'  .7'  /'1/
 
 B u r n i n g : = ~41A*  (1F'EG  FH3
 
 U p d a t e   S u c c e s s = ~''F  (1F'EG  FH3
 
 U p d a t e   F a i l e d = (G  1H2  F4/
 
 O p e n   u p d a t e   f i l e   f a i l e d   p l e a s e   c h e c k   i f   t h e   u p d a t e   f i l e   e x i s t = A'D  ('2  F4/.     F/  *'  ((FF/  A'D  H,H/  /'1/  '  .1! 
 
 O p e n   V e r s i o n   f i l e   f a i l = A'D  F3.G  ('2  F4/
 
 D o w n l o a d : = ~41A*  /'FDH/: 
 
 R e s t a r t   t h e   d e v i c e ,   a r e   y o u   s u r e ? = '(2'1  E,//'  41H9  E  4H/.   'F  '*5'D  B79  E  4H/.   E7E&F/
 
 R e c o v e r   t h e   d e v i c e ,   a r e   y o u   s u r e ? = '(2'1  ~3  '2  ('2'A*  *F8E'*  /H('1G  41H9  E  4H/.   'F  '*5'D  B79  E  4H/.   E7E&F/
 
 U p d a t e   t h e   d e v i c e ,   a r e   y o u   s u r e ? = (1H213'F  3'E'FG  41H9  E  4H/.   '/'EG  E  /G/
 
 U p d a t e   o k ,   r e s t a r t   t h e   d e v i c e   n o w ? = (1H213'F  3'E'FG  (G  ~''F  13/.   /H1(F  *5H1(1/'1  1'  /H('1G  41H9  E  F/
 
 L a t e s t   v e r s i o n   d o n ' t   n e e d   u p d a t e . = ,//*1F  F3.G  '3*
 
 U p g r a d e   f i l e   d o e s   n o t   m a t c h . = A'D  (G  1H213'F  *7(B  FE  F/
 
 C h e c k s u m   e r r o r ! = ('213  A'D  (1H213'F  .7'  /'1/. 
 
 U p d a t e   e r r o r   p l e a s e   r e t r y . = (1H213'F  .7'  /'1/.     F/
 
 U s e r   N o   P e r m i s s i o n = '1(1  '2  'F  -BHB  (1.H1/'1  F3*
 
 C o n n e c t   s e r v e r   f a i l e d . = '*5'D  (G  /3*'G  '13'2  /1  EGD*  (1B1'1  F4/.   D7A'  4(G  'F*1F*  1'    F/! 
 
 U p d a t e   w i t h   F T P   B a c k g r o u n d .   Y o u   c a n   l e a v e   h e r e   n o w . = (1H213'F  F T P   /1  ~3  2EFG  'F,'E  E  4H/.   E  *H'F/  '2  'F  5A-G  .'1,  4H/. 
 
 F T P   U p d a t e = (1H213'F  F T P 
 
 D a t e = *'1.
 
 R e f r e s h = *,//
 
 P r i n t = '~
 
 S a v e = 0.1G
 
 F i l e   a l r e a d y   e x i s t s   o v e r w r i t e   i t ? = A'D  H,H/  /'1/.   "F  1H  1HFH3  E  F/
 
 N o   P r i n t e r = '~1  ~/'  F4/
 
 P r i n t   F a i l = '~  F4/
 
 P r i n t   % . 4 d - % . 2 d - % . 2 d   L o g ,   a r e   y o u   s u r e ? = E7E&F/  AG13*  A'D  G'  +(*  HB'9  3'E'FG  /1  1H2  % . 2 d     E'G  % . 2 d       3'D% . 4 d   1'  '~  E  F/
 
 I P C   S y s   N o t e   I n f o = AG13*  A'D  G'  +(*  HB'9  3'E'FG  /H1(F  *-*  4(G
 
 P r i n t   t i m e : % . 4 d - % . 2 d - % . 2 d   % . 2 d : % . 2 d = 2E'F  '~: 3'9*  % . 2 d   H  % . 2 d     /BBG        1H2  % . 2 d     E'G  % . 2 d       3'D% . 4 d 
 
 F o r m a t : = A1E*  2E'F
 
 D a t e : = 2E'F  H  *'1.: 
 
 S e r v e r 0 1 - U = HF'E  1 
 
 S e r v e r 0 2 - T = *D'E1 
 
 S e r v e r 0 3 - T = *D'E2 
 
 O S D   p o s i t i o n : = EHB9*  O S D 
 
 L E F T _ T O P = ~  ('D'
 
 L E F T _ B O T T O M = ~  ~'F
 
 R I G H T _ T O P = 1'3*  ('D'
 
 R I G H T _ B O T T O M = 1'3*  ~'F
 
 H I D E = ~FG'F
 
 I P C a m   S e t t i n g = *F8E  /H1(F  *5H1(1/'1
 
 O k = B(HD
 
 C a n c e l = 'F51'A
 
 V i d e o = EHB9*  H/H
 
 R e g i o n   C o v e r = ,DH  1A*F  EF7BG
 
 M o t i o n   D e t e c t = ('213  *DAF  GE1'G
 
 A l a r m   P a r a m e t e r s = E4.5'*  G4/'1
 
 V i d e o   S t r e a m 1 : = ,1'F  ('*  ('  *A~01  ('D'
 
 R e s o l u t i o n : = 13HDH4F
 
 F r a m e   R a t e : = F1.  A1E
 
 M B P H : = A*  *5H1
 
 V i d e o   S t r e a m 2 : = ,1'F  ('*  ('  *A~01  '3*'F/'1/
 
 M o b i l e   P h o n e   S t r e a m = ,1'F  ('*  4(G  'F*1F*
 
 D e f a u l t   S e t t i n g = *F8E'*  ~4  A16
 
 B i t r a t e   C o n t r o l = F*1D  (1  F1.  ('*
 
 M i n   Q P = -/  'BD  Q P 
 
 M a x   Q P = -/  '+1  Q P 
 
 C B R = F1.  ('*  +'(*
 
 V B R = F1.  ('*  E*:1
 
 M a x   Q p   S h o u l d   b e   B i g g e r = -/  '+1  Q P   ('/  (4*1  '2  -/  'BD  Q P 
 
 I m a g e = *F8E  *5H1
 
 B r i g h t n e s s : = 1H4F
 
 S a t u r a t i o n : = '4('9
 
 D e f a u l t   S e t t i n g = *F8E'*  ~4  A16
 
 C o n t r a s t : = F*1'3*
 
 S h a r p n e s s : = *2
 
 S e n c e : = 5-FG: 
 
 I n D o o r = /'.D
 
 O u t D o o r = .'1,
 
 D e f a u l t   S e t t i n g = /A'D*
 
 M o d e o n e = *1
 
 A U T O   A W B = *H'2F  1F  3A/
 
 M I R R O R = 'F9'3  *5H1
 
 T U R N = 1.'F/F  *5H1
 
 N O C O L O U R = -'D*  1F  G'  3'G  H  3A/
 
 E n a b l e   W D R = 41H9  -'D*  ~GF  H  ~H'
 
 W D R   C h a n g e d ,   R e b o o t   t o   E f f e c t   ? = *:1  -'D*  ~GF  H  ~H'.   ''  /H('1G  41H9  E  F/  *'  A9'D  4H/
 
 S o f t w a r e   C u t : = (1F'EG  C U T 
 
 S e n s i t i v i t y : = -3'3*
 
 E n a b l e   p r i v a t e   a r e a = 41H9  E'3  H/H
 
 R e f r e s h   P h o t o = *,//  *5H1
 
 S a v e   S e t t i n g s = 0.1G  3'2  *F8E'*
 
 D r a g g i n g   t h e   m o u s e   f o r   t h e   a r e a ,   r i g h t   c a n c e l   a r e a . = E'HH3  1'  (4/  *'  F'-G  'F*.'(  F/.   (1'  D:H  'F*.'(  F'-G  D/  1'3*  E'HH3  1'  A4'1  /G/
 
 E n a b l e = 41H9  ('213  3'1
 
 S e n s i t i v i t y : = -3'3*
 
 S e n d   A l a r m   T o   C l i e n t = '13'D  G4/'1  (G  '1(1
 
 S e n d   A l a r m   E - M a i l = '13'D  G4/'1  (G  ~3*
 
 R e f r e s h   P h o t o = *,//  *5H1
 
 S a v e   S e t t i n g s = 0.1G  3'2  *F8E'*
 
 A l a r m   d u r a t i o n : = 7HD  2E'F  G4/'1
 
 E - M a i l   S e t u p = *F8E  ~3*  G'
 
 S e n d e r : = '13'D  FF/G
 
 S e r v e r : = /3*'G  E2('F
 
 U s e r I D : = F'E  '1(1
 
 P a s s w d : = 1E2
 
 P o r t : = /G'FG  P o r t 
 
 C r y p t o : = 1E2(F/: 
 
 R e c e i v e r 1 : = F4'F  /1'A*  FF/G1 
 
 R e c e i v e r 2 : = F4'F  /1'A*  FF/G2 
 
 R e c e i v e r 3 : = F4'F  /1'A*  FF/G3 
 
 R e c e i v e r 4 : = F4'F  /1'A*  FF/G4 
 
 S n a p s h o t = *F8E  931
 
 D e f a u l t   S e t t i n g = *F8E'*  ~4  A16
 
 E m a i l   T e s t = '13'D  ~3*  "2E'4
 
 E m a i l   s u c c e e d ,   p l e a s e   c h e c k   y o u r   m a i l b o x = ~3*  "2E'4  '13'D  4/.   5F/HB  ~3*  1'  (1'  *'/  F/
 
 E m a i l   f a i l ,   p l e a s e   c h e c k   y o u r   p a r a m e t e r = ~3*  "2E'4  '13'D  F4/.   E4.5'*  *F8E  4/G  1'    F/
 
 E m a i l   R e s u l t = F*,G  "2E'4  ~3*
 
 S e c o n d s = +'FG
 
 N o n e = '(2'1  0.1G  3'2  ~/'  F4/
 
 U n f o r m a t t e d = A1E*  F4/
 
 S t o r e a g e   i s   f u l l = '(2'1  0.1G  3'2  ~1  '3*
 
 R e c o r d i n g . . . = /1  -'D  ADE(1/'1
 
 G e t   r e a d y = "E'/G  '3*
 
 I P C a m   S e t t i n g = *F8E  /H1(F  *5H1(1/'1
 
 O k = B(HD
 
 C a n c e l = 'F51'A
 
 M a n a g e m e n t = E/1*  (1  0.1G  3'2
 
 S t a r t   r e c o r d i n g   f a i l e d = *5H1(1/'1  41H9  F4/
 
 S t o p   r e c o r d i n g   f a i l e d = *5H1(1/'1  E*HBA  F4/
 
 F a i l e d = A1E*  F4/
 
 S u c c e e d = ~''F  A1E*  1/F
 
 S t o r e   C a r d = '1*  -'A8G
 
 A l r e a d y   u s e d = EH1/  '3*A'/G
 
 S t o p   R e c o r d = ~''F  AD(1/'1
 
 S t a r t   R e c o r d = ":'2  *5H1(1/'1
 
 D e v i c e s   l i s t : = AG13*  '(2'1G': 
 
 R e f r e s h   L i s t s = *,//  AG13*
 
 D e v i c e   s t a t u s : = -'D*  '(2'1: 
 
 U s e d   S p a c e : = 41'7  '1(1: 
 
 F o r m a t = A1E*
 
 F o r m a t   t h e   S D   c a r d   a r e   y o u   s u r e ? = '1*  S D   1'  A1E*  E  F/
 
 I P C a m   S e t t i n g = *F8E  /H1(F  *5H1(1/'1
 
 O K = B(HD
 
 E x i t = .1H,
 
 M a n a g e m e n t = E/1*  (1  '1(1'F
 
 U s e r   S e t t i n g = E/1*  (1  -3'(
 
 U s e r : = -3'(: 
 
 G r o u p : = 1HG
 
 D e s c r i p t i o n : = *H6-'*: 
 
 P a s s w o r d : = 1E2
 
 C o n f i r m : = *'/  1E2: 
 
 R e f r e s h   L i s t s = *,//  AG13*
 
 A d d   A c c o u n t = '6'AG
 
 D e l e t e = -0A
 
 M o d i f y = *9/D
 
 U s e r = '1(1
 
 G r o u p = 1HG
 
 D e s c r i p t i o n = *H6-'*
 
 A d m i n i s t r a t o r = E/1
 
 U s e r = '1(1  9'/
 
 N e w   U s e r = -3'(  ,//
 
 U s e r   a l r e a d y   e x i s t   p l e a s e   c h e c k   t h e   i n p u t ! = '1(1/  H,H/  /'1/.   F'E  '1(1  1'    F/
 
 P l e a s e   i n p u t   u s e r   a n d   p a s s w o r d ! = F'E  '1(1  H  1E2  1'  H'1/  F/! 
 
 T h e   c o n f i r m   p a s s w d   i s   d i f f e r e n t   f r o m   p a s s w d   a b o v e ! = /H  1E2  H'1/  4/G  ('  GE  *7(B  F/'1/! 
 
 P l e a s e   i n p u t   t h e   u s e r   t o   d e l e t e ! = F'E  '1(1  -0A  4/F  1'  H'1/  F/! 
 
 T h e   u s e r   t o   d e l e t e   i s   n o t   e x i s t ! = '1(1  -0A  4/F  H,H/  F/'1/! 
 
 P l e a s e   i n p u t   u s e r   a n d   p a s s w o r d   t o   m o d i f y ! = F'E  H  1E2  '1(1  B'(D  '5D'-  1'  H'1/  F/
 
 T h e   u s e r   t o   m o d i f y   i s   n o t   e x i s t ! = '1(1  B'(D  '5D'-  H,H/  F/'1/! 
 
 T h e   c o u n t s   o f   u s e r   a r e   l i m i t e d ! = ~1  '2  '1(1'F  '3*! 
 
 P a s s w o r d   i n c o r r e c t ! = 1E2  H'1/  4/G  :D7  '3*
 
 G u e s t = ('2//  FF/G
 
 P l e a s e   S e l e c t   T h e   A c c o u n t = -3'(  1'  'F*.'(  F/
 
 N o   P e r m i s s i o n   ! = '1(1  '2  'F  -BHB  (1.H1/'1  F3*
 
 N e t   M a n a g e m e n t = E/1*  (1  4(G  'F*1F*
 
 D e f a u l t   C o n n : = '*5'D  ~4  A16: 
 
 E T H   C o n n : = '*5'D  3E/'1: 
 
 P P P O E   C o n n : = '*5'D  ('  4E'1G  1:   
 
 W I F I   C o n n : = '*5'D  (  3E
 
 U s e r   N a m e : = F'E  '1(1
 
 P a s s w d : = 1E2
 
 R e f r e s h = *,//
 
 C o n n e c t = '*5'D
 
 N e t   I n f o = '7D'9'*  4(G  'F*1F*
 
 I P   A d d r e s s : = F4'F  I P : 
 
 N e t   M a s k : = E'3  21  4(G
 
 G a t e w a y : = 1'G'G  ~4  A16: 
 
 D N S : = /3*'G  '13'2  F'E  /'EFG: 
 
 M A C : = F4'F  '1*  4(G: 
 
 C l o u d S E E   I D : = n v s i p   I D : 
 
 n v s i p   S t a t u s : = -'D*  n v s i p : 
 
 O n l i n e = "FD'F
 
 O f f l i n e = 'AD'F
 
 D i s c o n n e c t = B79  '*5'D
 
 P l e a s e   R e f r e s h   N e t   L i s t   F i r s t ! = '(*/'  AG13*  4(G  G'  1'  *,//  F/! 
 
 U s e r   A n d   P a s s w d   C a n n ' t   E m p t y ! = F'E  '  1E2  '1(1  FE  *H'F/  .'D  ('4/! 
 
 C o n n e c t i n g = /1  -'D  (1B1'1  '*5'D
 
 C o n n e c t   S u c c e e d = '*5'D  (1B1'1  4/
 
 C o n n e c t   F a i l = (1B1'1  '*5'D  EHAB  F4/
 
 C o n n e c t   T i m e o u t = EGD*  '*5'D  *E'E  4/
 
 D i s c o n n e c t i n g = E1  -'D  B79  '*5'D
 
 D i s c o n n e c t   S u c c e e d = '*5'D  B79  4/
 
 D i s c o n n e c t   F a i l = B79  F4/
 
 D i s c o n n e c t   T i m e o u t = 9ED  '2  EGD*  A1'*1  1A*
 
 S e a r c h   I n   N e t = ,3*,H  (1'  'A*F  4(G
 
 N o t   F o u n d   I n   N e t ! = 4(G  ~/'  F4/! 
 
 P a s s w d   C a n n ' t   E m p t y ! = 1E2  FE  *H'F/  .'D  ('4/
 
 M a n a g e m e n t = E/1*  (1  4(G  'F*1F*
 
 N e t w o r k   T y p e : = '*5'D  ~4  A16: 
 
 E t h e r n e t = '*5'D  3E/'1: 
 
 P P P O E = '*5'D  ('  4E'1G  1:   
 
 W I F I = '*5'D  (  3E
 
 I D : = F'E  '1(1
 
 P a s s w d : = 1E2
 
 S e a r c h = ,3*,H
 
 C o n n e c t = '*5'D
 
 I D : = -3'(: 
 
 S S I D : = S S I D   4(G  (  3E
 
 N e t w o r k   I n f o = '7D'9'*  4(G  'F*1F*
 
 I P : = F4'F  I P : 
 
 N e t m a s k : = E'3  21  4(G
 
 G a t e w a y : = 1'G'G  ~4  A16: 
 
 D N S : = /3*'G  '13'2  F'E  /'EFG: 
 
 M A C : = F4'F  '1*  4(G: 
 
 D H C P = /3*13  .H/'1  (G  F4'F: 
 
 C l o u d S E E   I D : = n v s i p   I D : 
 
 n v s i p   S t a t u s : = -'D*  n v s i p : 
 
 O n l i n e = "FD'F
 
 O f f l i n e = 'AD'F
 
 D i s c o n n e c t = B79  '*5'D
 
 P l e a s e   s e a r c h   S S I D   a t   f i r s t ! = S S I D   4(G  (  3E  1'  ,3*,H  F/! 
 
 I D   o r   P a s s w d   C a n n ' t   b e   e m p t y ! = F'E  '  1E2  '1(1  FE  *H'F/  .'D  ('4/! 
 
 C o n n e c t i n g = /1  -'D  (1B1'1  '*5'D
 
 C o n n e c t   S u c c e e d = '*5'D  (1B1'1  4/
 
 C o n n e c t   F a i l e d = (1B1'1  '*5'D  EHAB  F4/
 
 C o n n e c t   T i m e o u t = EGD*  '*5'D  *E'E  4/
 
 D i s c o n n e c t i n g = E1  -'D  B79  '*5'D
 
 D i s c o n n e c t   S u c c e e d = '*5'D  B79  4/
 
 D i s c o n n e c t   F a i l = B79  F4/
 
 D i s c o n n e c t   T i m e o u t = 9ED  '2  EGD*  A1'*1  1A*
 
 S e a r c h i n g   W I F I   S S I D = ,3*,H  (1'  'A*F  4(G
 
 N o t   f o u n d   W I F I   S S I D ! = 4(G  ~/'  F4/! 
 
 P a s s w d   c a n n ' t   b e   N U L L ! = 1E2  FE  *H'F/  .'D  ('4/
 
 I D   o r   p a s s w o r d   c a n   n o t   b e   e m p u t y ! = F'E  '  1E2  '1(1  FE  *H'F/  .'D  ('4/! 
 
 P l e a s e   r e f r e s h   a n d   s e l e c t   W I F I   A P ! = 4(G  (  3E  E/  F81  (1'  '*5'D  1'  'F*.'(  F/! 
 
 R e s t a r t   t o   e n a b l e   t h e   c h a n g i n g ,   a r e   y o u   s u r e ? = (1'  *:1  *F8E'*  4(G  ('/  '(2'1  1'  /H('1G  41H9  1/.   E7E&F/
 
 R e f r e s h = *,//
 
 O k = B(HD
 
 E x i t = .1H,
 
 U s e r   N o   P e r m i s s i o n = '1(1  '2  'F  -BHB  (1.H1/'1  F3*
 
 T h e   L a s t   b y t e   o f   t h e   I P   S h o u l d   n o t   b e   2 5 5 = G'1EF  ('*  F4''F  I P   FE  *H'F/  2 5 5   ('4/
 
 I P C a m   S e t t i n g = *F8E  /H1(F  *5H1(1/'1
 
 I r i s = /G'FG  H1H/  FH1
 
 F o c u s = 2HE
 
 Z o o m = 2HE
 
 A s s i s t = -'D*  '3
 
 S p e e d = 319*
 
 P r e s e t = FB7G  ~4  *F8E
 
 P a t r o l = 4*2F
 
 P a t h   &   W a t c h = E31  H  FB7G  'F*8'1
 
 S c a n = '3F
 
 N a m e = F'E
 
 A d d = '6'AG  1/F
 
 D e l e t e = -0A
 
 C a l l = '3*A'/G  EHB*
 
 P r e s e t ( % d ) = FB7G  ~4  *F8E( % d ) 
 
 T h e   S p e e p   i s   1 ~ 2 5 5 = 319*  E'F  1   *'  2 5 5   '3*
 
 T h i s   i s   b e y o n d   t h e   T o t a l ! = *01:   (4  '2  *9/'/  D  FB'7*  ~4  *F8E  4/G  '3*
 
 E r r o r : T h i s   P r e s e t t i n g   L o c a t i o n   N u m b e r   h a s   b e e n   u s e d ! = .7':   FB7G  ~4  *F8E  4/G  *1'1.   D7A'  '2  /1  FB7G  ~4  *F8E  4/G  '3*A'/G  F/
 
 S t a y   T i m e = 2E'F  ('B  E'F/F
 
 S t a r t = 41H9
 
 S t o p = *HBA
 
 R e c o r d   P a t h = 6(7  E31
 
 R e c o r d = 6(7
 
 F i n i s h = 'F,'E  4/. 
 
 W a t c h = 'F*8'1
 
 W a i t   T i m e = 2E'F  'F*8'1
 
 L e f t   L i m i t = E12  '2  ~
 
 R i g h t   L i m i t = E12  '2  1'3*
 
 S t a r t   S c a n = ":'2  '3F
 
 S t o p   S c a n = ~''F  '3F
 
 V a r i o u s   S c a n = '3F  ~*1F
 
 N U L L = N U L L 