u m s - 7 0 0 1 s e r i e s o u t l i n e d i m e n s i o n 1 . 6 0 . 1 9 . 2 ( m a x ) 5 . 8 0 . 2 0 . 4 8 0 . 5 2 0 . 5 2 0 . 4 8 ( 1 ) 1 2 8 * 6 4 d o t s ( 2 ) 1 / 6 4 d u t y c y c l e . ( 3 ) c . o . b a s s e m b l y . p i n t a b l e e l e c t r i c a l c h a r a c t e r i s t i c s f e a t u r e p i n n o . 1 2 3 4 5 6 7 8 9 1 0 1 1 1 2 1 3 1 4 1 5 1 6 1 7 1 8 1 9 2 0 s y m b o l v s s v d d v 0 d / i r / w e d b 0 d b 1 d b 2 d b 3 d b 4 d b 5 d b 6 d b 7 c s 1 c s 2 r s t v o u t n c n c s y m b o l v d d - v d d - v s s v 0 v i h v i l v o h v o l f o s c i d d s u p p l y v o l t a g e ( l o g i c ) i t e m s s u p p l y v o l t a g e ( l c d ) i n p u t h i g h l e v e l v o l t a g e i n p u t l o w l e v e l v o l t a g e o u t p u t h i g h l e v e l v o l t a g e o u t p u t l o w l e v e l v o l t a g e o s c f r e q u e n c y p o w e r s u p p l y c u r r e n t m i n . 4 . 5 1 2 . 2 0 . 7 v d d v s s v d d - 0 . 4 - 3 1 5 - t y p . 5 . 0 1 2 . 8 - - - - 4 5 0 - m a x . 5 . 5 1 3 . 4 v d d 0 . 3 v d d - 0 . 4 5 8 5 1 4 . 2 u n i t v v v v v v k h z m a b l o c k d i a g r a m u n i t e d r a d i a n t t e c h n o l o g y c o r p . h t t p : / / w w w . u r t . c o m . t w v s s = 0 v , a t 2 5 c o 3 3 . 2 4 ( a . a ) 3 8 . 8 ( v . a ) 5 2 . 0 0 . 3 6 5 . 0 0 . 2 7 0 . 0 0 . 4 2 0 - 1 . 0 2 0 - 0 . 1 4 8 . 2 6 0 . 2 ( p 2 . 5 4 x 1 9 ) 1 1 4 . 5 0 . 2 4 - 2 . 5 4 - 0 . 1 2 . 5 0 . 4 2 0 8 3 . 5 0 . 3 6 6 . 5 2 ( a . a ) 7 0 . 8 0 . 2 ( v . a ) 8 8 . 0 0 . 2 9 3 . 0 0 . 4 1 5 . 8 8 0 . 4 1 3 . 1 0 . 3 6 . 5 0 . 3 2 . 5 0 . 4 1 0 . 7 4 0 . 4 8 . 6 0 . 3 4 . 0 0 . 3 2 . 5 0 . 4 d o t s i z e i c 3 i c 1 i c 2 6 4 6 4 v s s v o u t l c d ( 1 2 8 * 6 4 d o t s ) 6 4 d c - d c c o n v e r t e r 1 6 4 1 ~ 6 4 6 5 ~ 1 2 8 v 0 c s 1 c s 2 e , r / w , d / i , d b 0 ~ d b 7 , r s t v d d
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