5 5 f e a t u r e s %? l o d r i v e l e v e l : + 1 0 d b m %? %? l o s s , h i g h i s o l a t i o n l o w c o n v e r s i o n %? ? 5 0 i m p e d a n c e m a t c h i n g h i g h r e l i a b i l i t y %? r e m o v a b l e s m a c o n n e c t o r s %? !?^ ! o p e r a t i n g t e m p e r a t u r e r a n g e : - 5 5 + 8 5 s p e c i f i c a t i o n s ( m e a s u r e d i n a s y s t e m t a = 2 5 ) 5 0 ? , ! b r o a d b a n d d o u b l e b a l a n c e m i x e r - d p a r a m e t e r u n i t g u a r a n t e e d t y p i c a l a b s o l u t e m a x i m u m r a t i n g s b o w e i i n t e g r a t e d c i r c u i t s c o . , l t d . b w e i o i s o l a t i o n ( d b ) l o & r f v s w r v s f r e q u e n c y c o n v e r s i o n l o s s v s f r e q u e n c y c o n v e r s i o n l o s s ( d b ) f r e q u e n c y ( m h z ) v s w r t y p i c a l p e r f o r m a n c e i s o l a t i o n v s f r e q u e n c y f r e q u e n c y ( g h z ) f r e q u e n c y ( g h z ) c o n v e r s i o n l o s s v s l o p o w e r l o p o w e r ( s y m b o l f r e q u e n c y r a n g e l o & r f i f f g h z 2 . 0 ?^ 1 8 . 0 2 . 0 ?^ 1 8 . 0 c o n v e r s i o n l o s s c . l d b i s o l o r f - l o i f - r f i f - i s o d b 1 d b c o m p r e s s i o n p o i n t i n p u t i n t e r c e p t 3 r d o r d e r p o i n t p - 1 i p 3 d b m d b m m d b - 0 2 1 8 g 0 0 0 5 5 . ?^ . 0 0 0 0 1 5 . ?^ . 0 1 8 ( 4 0 1 8 0 g h z ) . ?^ . 4 0 ( 4 0 8 0 g h z ) . ?^ . 1 5 ( 2 0 4 0 g h z ) . ?^ . 2 0 ( 2 0 4 0 g h z ) . ?^ . 1 4 ( 8 0 1 8 0 g h z ) . ?^ . 2 5 ( 2 0 8 0 g h z ) . ?^ . 2 0 ( 2 0 8 0 g h z ) . ?^ . 2 0 ( 8 0 1 8 0 g h z ) . ?^ . 3 . 0 6 . 0 - 1 4 . 0 ( t y p ) l o : g h z & |