3 . T e r m i n a l 8 1 0 c k U n i t ( F o r M o d e 1 2 0 0 0
,
3 0 0 0 )
U T B A 6 1 t e r m i n a l b l o c k ( T B 1
,
T B 2 ) s i g n a l t a b l e
P
I /
O m o d u l e
P
I /
O m o d u l e
T 8 1 S A I 0 6
S A I 0 6
o p t i o n b o a r d o p t i o n b o a r d S A 0 0 6
S P I 0 6
T 8 2 S A I 0 6
S A I 0 6
o p t i o n b o a r d o p t i o n b o a r d S A 0 0 6
S P I 0 6
F I V C 2 1 / 2 2 F D A 0 1
F I V C 2 1 / 2 2 F D A 0 1
F G ( 0 ) F G
F G
F G
F G
F G ( 0 ) F G
F G
F G
A I 1 ( + )
A I 1 ( + )
A 0 1 ( + ) P I 1 ( + )
1 A I 5 ( + )
A I 5 ( + )
A 0 5 ( + )
2 A I 1 ( ‑ )
A I 1 ( ・ )
A 0 1 ( ‑ ) P I 1 ( 聞 )
2 A I 5 ( ・ )
A I 5 ( ・ )
A 0 5 ( ・ )
3
D P 1
3
D P 5
4 S h i e l d 1 S h i e l d 1 S h i e l d 1
4 S h i e l d 5 S h i e l d 5 S h i e l d 5
5 A I 2 ( + )
A I 2 ( + )
A 0 2 ( + ) P I 2 ( + )
5 A I 6 ( + )
A I 6 ( + )
A 0 6 ( + )
6 A I 2 ( ‑ )
A I 2 ( ー )
A 0 2 ( ・ ) P I 2 ( ‑ )
6 A I 6 ( ー )
A I 6 ( ー )
A 0 6 ( ‑ )
7
D P 2
7
D P 6
8 S h i e l d 2 S h i e l d 2 S h i e l d 2
8 S h i e l d 6 S h i e l d 6 S h i e l d 6
9 A I 3 ( + )
A I 3 ( + )
A 0 3 ( + ) P I 3 ( + )
9 A I 7 ( + )
A I 7 ( + )
A 0 7 ( + )
1 0
A I 3 ( ー )
A I 3 ( ‑ )
A 0 3 ( ー ) P I 3 ( ‑ )
1 0
A I 7
ト )
A I 7 ( ー )
A 0 7 ( ‑ )
1 1
D P 3
1 1
D P 7
1 2
S h i e l d 3 S h i e l d 3 S h i e l d 3
1 2
S h i e l d 7 S h i e l d 7 S h i e l d 7
1 3
A I 4 ( + )
A I 4 ( + )
A 0 4 ( + ) P I 4 ( + )
1 3
A I 8 ( + )
A I 8 ( + )
A 0 8 ( + )
1 4
A I 4 ( ・ )
A 1 4 ( ・ )
A 0 4 ( ・ ) P I 4 ( ‑ )
1 4 A I 8 ( ‑ )
A I 8 ( ‑ )
A 0 8 ( ー )
1 5
D P 4
1 5
D P 8
1 6
S h i e l d 4 S h i e l d 4 S h i e l d 4
1 6
S h i e l d 8 S h i e l d 8 S h i e l d 8
1 7
2 4 V d c
2 4 V d c
1 7
( e x t e r n a l )
( e x t e r n a l )
1 8
O V d c
O V d c
1 8
( e x t e r n a l )
( e x t e r n a l )
1 9
2 4 V d c
2 4 V d c
1 9
( e x t e r n a l )
( e x t e r n a l )
2 0
O V d c
O V d c
2 0
( e x t e r n a 1 )
( e x t e r n a l )
、
N O T I C E :
・
B e f o r em o u n t i n g t h e P I I O m o d u l e
,
a l w a y s c h e c k w h e t h e r t h e c o n n e c t e d s i g n a l m a t c h e s i
t .
• I f a P I I O m o d u l e i s m o u n t e d a n d a n e r r o n e o u s s i g n a l i s c o n n e c t e d
,
t h e P I / O m o d u l e o r e x t e m a l
s e n s o r m a y g o t d a m a g e .
• T h e s h i e l d s o n e a c h t e r m i n a l b l o c k
( 4
t e r m i n a l s ) a r e a l l c o n n e c t e d t o e a c h
FG
t e r m i n a l
i n t e r n a l l y . T h e s h i e l d s a n d t h e P I / O a r e g r o u n d e d b y g r o u n d i n g t h e
FG
t e r m i n a l s .
A l w a y s g r o u n d t h e m .
• O t h e I W i s e p a r t s w i l l b e d a m a g e d o r s y s t e m w i l l b e m a l f u n c t i o n .
• Do n o t c o n n e c t a n e x t e r n a l s i g n a l l i n e o r a p o w e r l i n e t o a n o p e n t e r m i n a
l .
• D o i n g s o m a y c a u s e p a r t s t o b e d a m a g e d o r m a l f u n c t i o n .
• W h e n b r a n c h i n g t h e e x t e r n a l p o w e r s u p p l y c o n n e c t e d t o p i n s 1 7 a n d 1 8 o f t h e t e r m i n a l b l o c k
( T B 2 ) f r o m p i n s 1 9 a n d 2 0
,
m a k e s u r e t h a t t h e m a x i m u m p o w e r ‑ o n c u r r e n t i s w i t h i n 2 A .
• O t h e I W i s e
,
t h e c u π e n t m a y r u n s h o r t t h u s r e s u l t i n g i n b u m i n g o f t h e p a t t e m .
5 7