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