# 	NVeS7 {A~T N1 . 0 3 Hr
 
 L i n k D a t a   MOn= D : \ S t e a m \ S t e a m A p p s \ c o m m o n \ D y n a s t y   W a r r i o r s   8 
 
 penc!j_= P C 
 
 L i n k D a t a   {|W= 3 5 7 
 
 I D X   eN
T= L I N K D A T A . I D X 
 
 L i n k D a t a   peϑ= 4 
 
 L i n k D a t a   eN
T= L I N K D A T A 0 . B I N / L I N K D A T A 1 . B I N / L I N K D A T A 2 . B I N / L I N K D A T A 3 . B I N 
 
 L i n k D a t a   0W@W= 0 / 4 3 8 0 / 7 5 b a 0 / 7 b 1 e 0 
 
 [Q_= E x t r a c t e d 1 
 
 [eQ_= I m p o r t 1 
 
 
 
 # bVeS  4 - 2   IlSHr
 
 L i n k D a t a   MOn= J : \ S t e a m L i b r a r y \ s t e a m a p p s \ c o m m o n \ S A M U R A I   W A R R I O R S   4 - I I \ D a t a 
 
 penc!j_= P C 
 
 L i n k D a t a   {|W= Z 5 4 
 
 L i n k D a t a   peϑ= 5 
 
 L i n k D a t a   eN
T= L I N K D A T A _ 1 S T _ E N G . B I N / L I N K D A T A _ 2 N D _ E N G . B I N / L I N K D A T A _ A _ E N G . B I N / L I N K D A T A _ B _ E N G . B I N / L I N K D A T A _ C _ E N G . B I N 
 
 [Q_= E x t r a c t e d 2 
 
 [eQ_= I m p o r t 2 
 
 
 
 # bVeS  w0u8N
 
 L i n k D a t a   MOn= J : \ G a m e s \ S A M U R A I   W A R R I O R S   S p i r i t   o f   S a n a d a \ D a t a 
 
 penc!j_= P C 
 
 L i n k D a t a   {|W= Z 5 4 
 
 L i n k D a t a   peϑ= 7 
 
 L i n k D a t a   eN
T= L I N K D A T A _ E N G _ 1 S T . B I N / L I N K D A T A _ E N G _ 2 N D . B I N / L I N K D A T A _ E N G _ A . B I N / L I N K D A T A _ E N G _ B . B I N / L I N K D A T A _ E N G _ C . B I N / L I N K D A T A _ E N G _ L A N G . B I N / L I N K D A T A _ T C H _ L A N G . B I N 
 
 [Q_= E x t r a c t e d 2 
 
 [eQ_= I m p o r t 2 
 
 
 
 # eShQff
 
 L i n k D a t a   MOn= D : \ G a m e s \ W A R R I O R S . A L L . S T A R S . w i t h . E a r l y . P u r c h a s e . B o n u s - A L I 2 1 3 \ c o m m o n \ W A R R I O R S   A L L - S T A R S 
 
 penc!j_= P C 
 
 L i n k D a t a   {|W= 3 5 7 
 
 I D X   eN
T= L I N K D A T A . I D X 
 
 L i n k D a t a   peϑ= 1 
 
 L i n k D a t a   eN
T= L I N K D A T A . B I N 
 
 [Q_= E x t r a c t e d 3 
 
 [eQ_= I m p o r t 3 
 
 
 
 # 	NVeS8 
 
 L i n k D a t a   MOn= J : \ G a m e s \ D W 9 \ c o m m o n \ D y n a s t y   W a r r i o r s   9 
 
 penc!j_= P C 
 
 L i n k D a t a   {|W= 3 5 8 
 
 I D X   eNpeϑ= 2 1 
 
 I D X   eN
T= L I N K I D X _ 0 0 0 . B I N / L I N K I D X _ 0 0 1 . B I N / L I N K I D X _ 0 0 2 . B I N / L I N K I D X _ 0 0 3 . B I N / L I N K I D X _ 0 0 4 . B I N / L I N K I D X _ 0 0 5 . B I N / L I N K I D X _ 0 0 6 . B I N / L I N K I D X _ 0 0 7 . B I N / L I N K I D X _ 0 0 8 . B I N / L I N K I D X _ 0 0 9 . B I N / L I N K I D X _ 0 1 0 . B I N / L I N K I D X _ B P R . B I N / L I N K I D X _ C H S . B I N / L I N K I D X _ C H T . B I N / L I N K I D X _ E N G . B I N / L I N K I D X _ F R A . B I N / L I N K I D X _ G E R . B I N / L I N K I D X _ H A N . B I N / L I N K I D X _ I T A . B I N / L I N K I D X _ J P N . B I N / L I N K I D X _ S P A . B I N 
 
 L i n k D a t a   peϑ= 2 1 
 
 L i n k D a t a   eN
T= L I N K F I L E _ 0 0 0 . B I N / L I N K F I L E _ 0 0 1 . B I N / L I N K F I L E _ 0 0 2 . B I N / L I N K F I L E _ 0 0 3 . B I N / L I N K F I L E _ 0 0 4 . B I N / L I N K F I L E _ 0 0 5 . B I N / L I N K F I L E _ 0 0 6 . B I N / L I N K F I L E _ 0 0 7 . B I N / L I N K F I L E _ 0 0 8 . B I N / L I N K F I L E _ 0 0 9 . B I N / L I N K F I L E _ 0 1 0 . B I N / L I N K F I L E _ B P R . B I N / L I N K F I L E _ C H S . B I N / L I N K F I L E _ C H T . B I N / L I N K F I L E _ E N G . B I N / L I N K F I L E _ F R A . B I N / L I N K F I L E _ G E R . B I N / L I N K F I L E _ H A N . B I N / L I N K F I L E _ I T A . B I N / L I N K F I L E _ J P N . B I N / L I N K F I L E _ S P A . B I N 
 
 [Q_= E x t r a c t e d 4 
 
 [eQ_= I m p o r t 4 
 
 