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 T E X T S 3 D r i v e r 	 =   S 3   G r a p h i c s   I n s t a l l e r 
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 T E X T L o a d i n g 	 =   L o a d i n g . . . 
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 T E X T U n i n s t a l l L i s t 	 	 =   U n i n s t a l l   L i s t 
 
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 T E X T V e r s i o n 	 	 =   V e r s i o n 
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 T E X T I n s t a l l S t r 	 =   I n s t a l l i n g   % s . . . 
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 T E X T U n i n s t a l l i n g 	 =   U n i n s t a l l a t i o n   i n   p r o g r e s s 
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 T E X T U n I n s t a l l S t r 	 =   U n i n s t a l l i n g   % s . . . 
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 T E X T P r e p a r e I n s t a l l 	 =   P e r p a r i n g   f o r   i n s t a l l a t i o n 
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 T E X T P r e p a r e U n i n s t a l l =   P e r p a r i n g   f o r   u n i n s t a l l a t i o n 
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 T E X T U n i n s t a l l P r o g r e s s 	 =   U n i n s t a l l a t i o n 
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 T E X T L a t e r 	 	 =   & L a t e r 
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 T E X T U N I N S T A L L 	 =   U n i n s t a l l a t i o n 
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 D l l E r r o r   	 	 =   U n a b l e   t o   l o a d   % s . 
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 D l l F u n c E r r o r 	 =   U n a b l e   t o   l o a d   D l l   F u n c t i o n s .   
 
 P a r a m e t e r E r r o r 	 =   \ t S o m e   p a r a m e t e r s   a r e   i l l e g a l . \ n \ t P l e a s e   c h e c k   s 3 i s c f g . d a t   a n d   c o m m a n d   l i n e . \ n \ n \ t U s e   " - h "   t o   g e t   h e l p   i n f o r m a t i o n . 
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 H e l p I n f o 	 	 =   S e t u p   u s a g e : \ n s e t u p   [ - u ]   [ - s ]   [ - n o r e b o o t ] \ n               - u 	 	 U n i n s t a l l   d r i v e r . \ n               - s 	 	 S i l e n t   i n s t a l l / u n i n s t a l l . \ n               - n o r e b o o t 	 N o   r e b o o t   a f t e r   i n s t a l l . \ n 
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 M s g P r o m p t W i n s a t   	 =   \ t S e t u p   w i l l   n o w   r u n   t h e   W i n S A T   a s s e s s m e n t   \ n \ t t o   u p d a t e   y o u r   W i n d o w s   E x p e r i e n c e   I n d e x . \ n \ n \ t D o   y o u   w a n t   t o   c o n t i n u e ? 
 
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 W o r k C a n c e l 	 =   T h e   % s   h a s   b e e n   c a n c e l e d 
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 W o r k F i n i s h 	 =   T h e   % s   h a s   b e e n   f i n i s h e d 
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 R e b o o t R e q u e s t 	 =   R e b o o t   c o m p u t e r   t o   f i n i s h   t h e   % s .     D o   y o u   w a n t   t o   R e b o o t   n o w ? 
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 I n s t a l l A b o r t 	 =   I n s t a l l   A b o r t e d 
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 I n s t a l l A b o r t D e t a i l 	 =   T h e   i n s t a l l a t i o n   c a n   n o t   c o n t i n u e . 
 
 U n i n s t a l l A b o r t 	 =   U n i n s t a l l   A b o r t e d 
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 U n i n s t a l l A b o r t D e t a i l 	 =   T h e   u n i n s t a l l a t i o n   c a n   n o t   c o n t i n u e . 
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 O S R e q u i r e m e n t 	 =   T h i s   S e t u p   s h o u l d   o n l y   b e   r u n   o n   % s . 
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 W r o n g O S 	 	 =   O p e r a t i o n   s y s t e m   n o t   m a t c h e d 
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 W r o n g O S D e t a i l 	 =   T h i s   S e t u p   r e q u i r e s   a   d i f f e r e n t   v e r s i o n   o f   o p e r a t i o n   s y s t e m . 
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 I N F M i s s i n g 	 =   I N F   F i l e   M i s s i n g 
 
 I N F M i s s i n g D e t a i l 	 =   C a n   n o t   f i n d   t h e   . i n f   f i l e   s p e c i f i e d   i n   s 3 i s c f g . d a t . 
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 D A T M i s s i n g D e t a i l 	 =   C a n   n o t   f i n d   t h e   s 3 i s c f g . d a t   f i l e . 
 
 D A T S u m E r r o r 	 =   D a t   F i l e   I l l e g a l 
 
 D A T S u m E r r o r D e t a i l 	 =   P l e a s e   c o n n e c t   w i t h   r e l e a s e   e n g i n e e r   t o   g e t   t h e   c o r r e c t   o n e . 
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 N o D e v F i n d 	 =   D e v i c e   N o t   F o u n d 
 
 N o D e v F i n d D e t a i l 	 =   C a n   n o t   f i n d   t h e   S 3   G r a p h i c s   d e v i c e   i n   c o m p u t e r . 
 
 D e v N o t M a t c h 	 =   D e v i c e   N o t   M a t c h e d 
 
 D e v N o t M a t c h D e t a i l 	 =   T h e r e   i s   n o   c o m p a t i b l e   g r a p h i c   h a r d w a r e   f o r   t h i s   d r i v e r . 
 
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 V g a R e b o o t 	 =   R e b o o t   R e q u e s t e d 
 
 V g a R e b o o t D e t a i l 	 =   O S   n e e d s   r e b o o t   t o   i n s t a l l   d i s p l a y   d r i v e r .   P l e a s e   r e b o o t   a n d   i n s t a l l   a g a i n . 
 
 M i n D X V e r 	 	 =   D i r e c t X   V e r s i o n   N o t   M a t c h e d 
 
 M i n D X V e r D e t a i l 	 =   T h e   c u r r e n t   v e r s i o n   o f   D i r e c t X   i n s t a l l e d   o n   t h i s   s y s t e m   ( % s )   d o e s   n o t   m e e t   t h e   r e q u i r e d   m i n i m u m . 
 
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 
 N o U n s N a m e 	 =   U n s   F i l e   W r o n g   N a m e 
 
 N o U n s N a m e D e t a i l 	 =   P l e a s e   s p e c i f y   t h e   u n s   f i l e   n a m e   i n   t h e   e n d   o f   c o m m a n d   l i n e . 
 
 N o U n s F i l e 	 	 =   U n s   F i l e   N o t   F o u n d 
 
 N o U n s F i l e D e t a i l 	 =   C a n   n o t   f i n d   t h e   s p e c i f i e d   . u n s   f i l e :   \ n % s 
 
 B a d U n s F i l e 	 =   U n s   F i l e   E r r o r 
 
 B a d U n s F i l e D e t a i l 	 =   S o m e   u n i n s t a l l   i n f o r m a t i o n   i s   m i s s i n g . \ n P l e a s e   t r y   a g a i n   w i t h   a   p r o p e r   u n i n s t a l l   l o g . 
 
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 T E X T M i s s e d 	 =   M i s s e d 
 
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 
 T E X T R u n W i n S A T   	 =   R u n   W i n S A T 
 
 T E X T I n s t a l l U t i l 	 =   I n s t a l l   S 3   G r a p h i c   U t i l i t i e s . . . 
 
 T E X T U n I n s t a l l U t i l   	 =   U n i n s t a l l   S 3   G r a p h i c   U t i l i t i e s . . . 
 
 T E X T I n s t a l l E n d W o r k   	 =   I n s t a l l a t i o n   i s   a b o u t   t o   f i n i s h . 
 
 T E X T U n I n s t a l l E n d W o r k =   U n i n s t a l l a t i o n   i s   a b o u t   t o   f i n i s h . 
 
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 
 T E X T D e v P r e s e n t 	 =   F i n e 
 
 T E X T D e v N o t P r e s e n t 	 =   N o t   P r e s e n t 
 
 
 
 T E X T P a g e L i c e n s e T i t l e 	 =   S 3   G r a p h i c s   S o f t w a r e   L i c e n s e 
 
 T E X T P a g e L i c e n s e N o t e 	 =   C l i c k   " A g r e e "   t o   a c c e p t   a l l   t e r m s   o f   t h i s   a g r e e m e n t 
 
 T E X T P a g e L i s t T i t l e 	 	 =   C u s t o m   I n s t a l l   O p t i o n s 
 
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 T E X T P a g e T y p e E x p r e s s 	 =   I n s t a l l   o r   u p g r a d e   d r i v e r s   a n d   S 3   G r a p h i c   U t i l i t i e s . 
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 T E X T P a g e L i s t C u s t o m I n s t a l l N o t e     =   N o t e :   D i s p l a y   D r i v e r   m u s t   b e   i n s t a l l e d . 
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 P a r a m e t e r E r r o r 	 =   \ t SpeeHe0\ n \ t hgs 3 i s c f g . d a t eNNS}TNLSpe. \ n \ n \ t O(u\  - h \  S.^ROo`0
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 
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 
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N0
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N9SM0
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 
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 
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 
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 
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 
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 
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 
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 
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 
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 
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 
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 
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 
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 
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 
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 
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 
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 
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 
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 
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 
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 
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 
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 
 R e b o o t R e q u e s t 	 =   % s 0B}NU0[00k0o000000000QwRW0f0O0`0U0D0 0NQwRW0~0Y0K0
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 
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 
 U n i n s t a l l A b o r t 	 =   00000000L0-Nbkk0j00~0W0_0
 
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 
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 
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 
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 
 I N F M i s s i n g 	 =   I N F 0000L0d0K00~0[00
 
 I N F M i s s i n g D e t a i l 	 =   s 3 i s c f g . d a t . k0yr[U00_0. i n f 0000L0d0K00~0[00
 
 
 
 D A T M i s s i n g 	 =   D A T 0000L0d0K00~0[00
 
 D A T M i s s i n g D e t a i l 	 =   s 3 i s c f g . d a t 0000L0d0K00~0[00
 
 D A T S u m E r r o r 	 =   D a t 0000L0Ulg0Y0
 
 D A T S u m E r r o r D e t a i l 	 =   ckxj00n0k0Y00_00k00000W0_000000h0#a}W0f0O0`0U0D0
 
 
 
 N o D e v F i n d 	 =   0000L0d0K00~0[00
 
 N o D e v F i n d D e t a i l 	 =   0000000k0S 3   G r a p h i c s n00000L0d0K00~0[00
 
 D e v N o t M a t c h 	 =   0000L0Tc0f0D0~0[00
 
 D e v N o t M a t c h D e t a i l 	 =   S0n000000k0o0Nc'`n0B00000000000000o0B00~0[00
 
 
 
 V g a R e b o o t 	 =   QwRW0f0O0`0U0D0
 
 V g a R e b o o t D e t a i l 	 =   000000000000000000Y00_00k0O S 0QwRY00_L0B00~0Y0 0QwRW0f0K000000000W0f0O0`0U0D0
 
 M i n D X V e r 	 	 =   D i r e c t X 00000L0TD0~0[00
 
 M i n D X V e r D e t a i l 	 =   s(WS0n00000( % s ) k0000000U00_0D i r e c t X n000000o0BlU00_000000k00RTW0f0~0[00
 
 
 
 N o U n s N a m e 	 =   U n s 0000 0Uc0_0
TMRg0Y0
 
 N o U n s N a m e D e t a i l 	 =   0000000n0B}00g0u n s 0000
T0yr[W0f0O0`0U0D0
 
 N o U n s F i l e 	 	 =   U n s 0000L0d0K00~0[00
 
 N o U n s F i l e D e t a i l 	 =   yr[U00_0. u n s 0000  \ n % s L0d0K00~0[00
 
 B a d U n s F i l e 	 =   U n s 0000000
 
 B a d U n s F i l e D e t a i l 	 =   D0O0d0K0n000000000`1XL0d0K00~0[00 0iRj00000000000g00F0 N^fW0f0O0`0U0D0
 
 
 
 T E X T M i s s e d 	 =   1YWe
 
 T E X T N o n e 	 	 =   j0W0
 
 T E X T R u n W i n S A T   	 =   W i n S A T 0wRW0f0O0`0U0D0
 
 T E X T I n s t a l l U t i l 	 =   S 3   G r a p h i c s   00000000000000. . . 
 
 T E X T U n I n s t a l l U t i l   	 =   S 3   G r a p h i c s   0000000000000000. . . 
 
 T E X T I n s t a l l E n d W o r k   	 =   000000o00j0O0B}NW0~0Y0
 
 T E X T U n I n s t a l l E n d W o r k =   00000000o00j0O0B}NW0~0Y0
 
 
 
 T E X T D e v P r e s e n t 	 =   oD0
 
 T E X T D e v N o t P r e s e n t 	 =   X[(WW0~0[00
 
 
 
 T E X T P a g e L i c e n s e T i t l e 	 =   S 3   G r a p h i c s 00000000000
 
 T E X T P a g e L i c e n s e N o t e 	 =   S0n0TS[n0Y0y0f0n0agN0bY004XT" Ta" 00000W0f0O0`0U0D0
 
 T E X T P a g e L i s t T i t l e 	 	 =   000000000000000
 
 T E X T P a g e L i s t P r o m p t 	 	 =   0000000000000x0g0O0`0U0D0
 
 T E X T P a g e L i s t N o t e 	 	 =   l
 
 T E X T P a g e P r o c e s s T i t l e 	 =   0000tX0y0f0D0~0Y0
 
 T E X T P a g e P r o c e s s D e t a i l 	 =   s0}
 
 T E X T P a g e T y p e T y p e 	 	 =   000000000
 
 T E X T P a g e T y p e R a d i o E x p 	 =   ؚchY	
 
 T E X T P a g e T y p e E x p r e s s 	 =   00000h0S 3   G r a p h i c s 00000000000000~0_0o00000000
 
 T E X T P a g e T y p e R a d i o C u s t o m 	 =   0000
N}	
 
 T E X T P a g e T y p e C u s t o m 	 =   000000~0_0o00000000Y00_00k000000000x0g0O0`0U0D0
 
 T E X T P a g e T y p e N o t e 	 	 =   l000000Bfk000000L0UO^K0IQ0K00W00~0[00
 
 T E X T P a g e L i s t C u s t o m I n s t a l l N o t e     =   l000000000000000000W0j0Q00p0D0Q0~0[00
 
 
 
 ; ;   L i c e n s e 
 
 T E X T L i c e n s e I n f o   =   W\O)j 0   2 0 0 4 - 2 0 1 2   S 3   G r a p h i c s   C o . ,   L t d .   Y0y0f0n0)jPL0OX[U00f0~0Y0
 
 