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s a l e s @ l o v a t o . c o . u k L o v a t o . c o . u k T e l : 0 1 3 8 4 8 9 9 7 0 0

L o v a t o E l e c t r i c .

W h e r e t e c h n o l o g y m e e t s t r a d i t i o n .

L o v a t o E l e c t r i c i s a p r o u d f a m i l y o w n e d

b u s i n e s s s t a b l i s h e d i n B e r g a m o , I t a l y i n

1 9 2 2 : t h e s t a r t i n g p o i n t o f a g r e a t

i n d u s t r i a l a d v e n t u r e .

O u r f a m i l y o f p r o d u c t s f e a t u r e a f u l l

r a n g e o f d e v i c e s f o r a w i d e a r r a y o f

i n d u s t r y s e c t o r s :

W e i n n o v a t e w i t h q u a l i t y i n t h e f i e l d s o f

I n d u s t r i a l C o n t r o l & E n e r g y M a n a g e m e n t .

W e s e r v e t h e U K m a r k e t w i t h a v a s t

s t o c k h o l d i n g a n d U K s t a r t e r a s s e m b l y f o r

s a m e d a y c o l l e c t i o n o r n e x t d a y d e l i v e r y .

W e p r i d e o u r s e l v e s o n e x c e l l e n t

c u s t o m e r s e r v i c e a n d t e c h n i c a l s u p p o r t .

S a l e s , T e c h n i c a l S u p p o r t &

C u s t o m e r C a r e

T e l : 0 1 3 8 4 8 9 9 7 0 0

F a x : 0 1 3 8 4 8 9 1 6 5 4

E m a i l : s a l e s @ l o v a t o . c o . u k

w w w . l o v a t o . c o . u k

U K H e a d O f f i c e A d d r e s s

L o v a t o E l e c t r i c L t d

P r o v i d e n c e D r i v e

S t o u r b r i d g e

D Y 9 8 H Q

2

2 M o t o r P r o t e c t i o n

C i r c u i t B r e a k e r s

6 C o n t a c t o r s

1 1 M o t o r P r o t e c t i o n

R e l a y s

1 2 S o f t S t a r t e r s

1 3 V a r i a b l e S p e e d

D r i v e s

1 4

1 9 P u s h b u t t o n &

S e l e c t o r S w i t c h e s

2 8 3 0 S i g n a l T o w e r s

& B e a c o n s

L i m i t , M i c r o &

F o o t S w i t c h e s

3 1 R o t a r y C a m

S w i t c h e s

3 2 S w i t c h

D i s c o n n e c t o r s

3 9 F u s e H o l d e r s

4 0 M C B & R C D

4 3 S u r g e P r o t e c t i o n

4 4 M o d u l a r

C o n t a c t o r s

5 2 M i c r o P L C

4 5 T i m e R e l a y s

4 6 P r o t e c t i o n

R e l a y s

4 8 L e v e l C o n t r o l s

5 0 5 3 P o w e r

S u p p l i e s

5 4 M e t e r i n g

I n s t r u m e n t s &

C u r r e n t

T r a n s f o r m e r s

5 7 P o w e r F a c t o r

C o n t r o l l e r s &

T h y r i s t o r

M o d u l e s

5 8 A u t o m a t i c

T r a n s f e r S w i t c h

C o n t r o l l e r s

5 9 E x p a n s i o n

M o d u l e s

P a g e N u m b e r s

2 7 C o n t r o l S t a t i o n s

& E n c l o s u r e s

G e n e r a l P u r p o s e

R e l a y s

3

S M 1 P 0 0 1 6 0 . 1 - 0 . 1 6 1 0 0 1 0 0

S M 1 P 0 0 2 5 0 . 1 6 - 0 . 2 5 1 0 0 1 0 0

S M 1 P 0 0 4 0 0 . 2 5 - 0 . 4 1 0 0 1 0 0

S M 1 P 0 0 6 3 0 . 4 - 0 . 6 3 1 0 0 1 0 0

S M 1 P 0 1 0 0 0 . 6 3 - 1 1 0 0 1 0 0

S M 1 P 0 1 6 0 1 - 1 . 6 1 0 0 1 0 0

S M 1 P 0 2 5 0 1 . 6 - 2 . 5 1 0 0 1 0 0

S M 1 P 0 4 0 0 2 . 5 - 4 1 0 0 1 0 0

S M 1 P 0 6 5 0 4 - 6 . 5 1 0 0 1 0 0

S M 1 P 1 0 0 0 6 . 3 - 1 0 1 0 0 1 0 0

S M 1 P 1 4 0 0 9 - 1 4 2 5 1 2 . 5

S M 1 P 1 8 0 0 1 3 - 1 8 2 5 1 2 . 5

S M 1 P 2 3 0 0 1 7 - 2 3 1 5 5

S M 1 P 2 5 0 0 2 0 - 2 5 1 5 5

S M 1 P 3 2 0 0 2 4 - 3 2 1 0 5

S M 1 P 4 0 0 0 3 0 - 4 0 1 0 5

S M 1 R 0 0 1 6 0 . 1 - 0 . 1 6 1 0 0 1 0 0

S M 1 R 0 0 2 5 0 . 1 6 - 0 . 2 5 1 0 0 1 0 0

S M 1 R 0 0 4 0 0 . 2 5 - 0 . 4 1 0 0 1 0 0

S M 1 R 0 0 6 3 0 . 4 - 0 . 6 3 1 0 0 1 0 0

S M 1 R 0 1 0 0 0 . 6 3 - 1 1 0 0 1 0 0

S M 1 R 0 1 6 0 1 - 1 . 6 1 0 0 1 0 0

S M 1 R 0 2 5 0 1 . 6 - 2 . 5 1 0 0 1 0 0

S M 1 R 0 4 0 0 2 . 5 - 4 1 0 0 1 0 0

S M 1 R 0 6 5 0 4 - 6 . 5 1 0 0 1 0 0

S M 1 R 1 0 0 0 6 . 3 - 1 0 1 0 0 1 0 0

S M 1 R 1 4 0 0 9 - 1 4 1 0 0 1 0 0

S M 1 R 1 8 0 0 1 3 - 1 8 1 0 0 1 0 0

S M 1 R 2 3 0 0 1 7 - 2 3 5 0 2 5

S M 1 R 2 5 0 0 2 0 - 2 5 5 0 2 5

S M 1 R 3 2 0 0 2 4 - 3 2 5 0 2 5

S M 1 R 4 0 0 0 3 0 - 4 0 2 0 1 0

P u s h B u t t o n C o n t r o l

R o t a r y K n o b C o n t r o l

O r d e r c o d e T h e r m a l t r i p

a d j u s t m e n t r a n g e

[ A ]

I c u

[ k A ]

I c s

[ k A ]

S h o r t c i r c u i t b r e a k i n g

c a p a c i t y a t 4 0 0 V

S M 1 P . . .

S M 1 R . . .

S M 1 . . . S e r i e s

M o t o r P r o t e c t i o n C i r c u i t B r e a k e r s

F o r m o r e i n f o r m a t i o n o n t h e s e p r o d u c t s a n d o t h e r s w i t h i n t h e r a n g e , p l e a s e r e f e r t o t h e g e n e r a l c a t a l o g u e

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S M 1 X 1 1 2 0 F r o n t m o u n t 2 N O

S M 1 X 1 1 1 1 F r o n t m o u n t 1 N O + 1 N C

S M 1 X 1 2 2 0 S i d e m o u n t 2 N O

S M 1 X 1 2 1 1 S i d e m o u n t 1 N O + 1 N C

S M 1 X 1 2 0 2 S i d e m o u n t 2 N C

S M 1 X 1 3 1 1 S i d e m o u n t e d c o n t a c t s f o r t h e r m a l a n d m a g n e t i c

t r i p p i n g i n d i c a t i o n 1 N O + 1 N C

S M 1 X 1 3 1 1 M S i d e m o u n t e d c o n t a c t s f o r m a g n e t i c t r i p p i n g i n d i c a t i o n

1 N O + 1 N C

A d d - o n a u x i l i a r y c o n t a c t s

S M 1 X 1 4 1 1 0 1 1 0 V A C 5 0 / 6 0 H z

S M 1 X 1 4 2 3 0 2 3 0 V A C 5 0 / 6 0 H z

S M 1 X 1 4 4 0 0 4 0 0 V A C 5 0 / 6 0 H z

W i t h e a r l y - m a k e c o n t a c t s a l s o a v a i l a b l e . P l e a s e r e f e r t o t h e m o t o r p r o t e c t i o n c i r c u i t b r e a k e r

s e c t i o n w i t h i n t h e g e n e r a l c a t a l o g u e

S h u n t t r i p r e l e a s e s

U n d e r v o l t a g e t r i p r e l e a s e s

S M 1 X 1 6 0 2 4 2 4 V A C 5 0 / 6 0 H z

S M 1 X 1 6 1 1 0 1 1 0 V A C 5 0 / 6 0 H z

S M 1 X 1 6 2 3 0 2 3 0 V A C 5 0 / 6 0 H z

S M 1 X 1 6 4 0 0 4 0 0 V A C 5 0 / 6 0 H z

S M 1 X 1 8 1 2 W i t h w i r e a n d l e a d i n c l u d e d

A d j u s t e r s e a l i n g k i t

S M 1 X 1 8 2 0 0 R R e d / y e l l o w c o m p l e t e w i t h r o d l e n g t h 2 0 0 m m

S M 1 X 1 8 B 2 0 0 R B l a c k c o m p l e t e w i t h r o d l e n g t h 2 0 0 m m

S M 1 X 1 8 S S u p p o r t f o r r o d > 1 4 5 m m

I P 6 5 ( 4 X ) p a d l o c k a b l e d o o r c o u p l i n g h a n d l e f o r S M 1 R . . .

S M 1 X 9 0 0 0 R F o r T y p e E a s p e r U L 5 0 8

P h a s e s e p a r a t i o n b a r r i e r s f o r S M 1 R . . .

1 1 S M 9 0 3 2 F o r 2 b r e a k e r s

1 1 S M 9 0 3 3 F o r 3 b r e a k e r s

1 1 S M 9 0 3 4 F o r 4 b r e a k e r s

1 1 S M 9 0 3 5 F o r 5 b r e a k e r s

T h r e e - p h a s e c o n n e c t i o n b u s b a r s 4 5 m m s p a c i n g

1 1 S M 9 0 4 2 F o r 2 b r e a k e r s

1 1 S M 9 0 4 3 F o r 3 b r e a k e r s

1 1 S M 9 0 4 4 F o r 4 b r e a k e r s

1 1 S M 9 0 4 5 F o r 5 b r e a k e r s

T h r e e - p h a s e c o n n e c t i o n b u s b a r s 5 4 m m s p a c i n g

T e r m i n a l b l o c k f o r b u s b a r s u p p l y

1 1 S M X 9 0 3 0 F o r a l l b u s b a r t y p e s

S M 1 X 9 0 5 0 F o r a l l b u s b a r t y p e s . T y p e E a s p e r U L 5 0 8

O r d e r C o d e D e s c r i p t i o n

S M 1 X 1 2 . . .

S M 1 X 1 4 . . .

S M 1 X 1 3 . . .

S M 1 X 1 6 . . .

S M 1 X 1 8 2 0 0 R

S M 1 X 9 0 3 2

S M 1 X 9 0 3 0

S M 1 . . . S e r i e s

A c c e s s o r i e s


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1 1 S M X 9 0 3 1 F o r u n u s e d t e r m i n a l s

S a f e t y c o v e r

A c c e s s o r i e s f o r s c r e w - f i x i n g m o t o r p r o t e c t i o n

S M 1 X 8 9 0 2 M e t a l b r a c k e t s f o r f i x i n g S M 1 . . . m o t o r p r o t e c t i o n

b r e a k e r s w i t h s c r e w s

B F X 8 9 0 1 U n i v e r s a l p l a s t i c b a s e f o r s c r e w - f i x i n g S M 1 . . . m o t o r

p r o t e c t i o n b r e a k e r s

S M 1 X 3 0 4 0 P F o r m o t o r p r o t e c t i o n b r e a k e r S M 1 P … w i t h B G . . .

m i n i - c o n t a c t o r s

S M 1 X 3 1 4 1 P F o r m o t o r p r o t e c t i o n b r e a k e r S M 1 P … w i t h B F 0 9 . . 2 5 A

c o n t a c t o r s

S M 1 X 3 2 4 1 P F o r m o t o r p r o t e c t i o n b r e a k e r S M 1 P … w i t h B F 2 6 . . 3 8 A

c o n t a c t o r s

S M 1 X 3 0 4 0 R F o r m o t o r p r o t e c t i o n b r e a k e r S M 1 R … w i t h B G . . .

m i n i - c o n t a c t o r s

S M 1 X 3 1 4 1 R F o r m o t o r p r o t e c t i o n b r e a k e r S M 1 R … w i t h B F 0 9 . . 2 5 A

c o n t a c t o r s

S M 1 X 3 1 4 2 R F o r m o t o r p r o t e c t i o n b r e a k e r S M 1 R … w i t h B F 0 9 . . 2 5 D

a n d B F 0 9 . . 2 5 L

S M 1 X 3 2 4 1 R F o r m o t o r p r o t e c t i o n b r e a k e r S M 1 R … w i t h c o n t a c t o r

B F 2 6 . . 3 8 A

R i g i d S M 1 b r e a k e r - c o n t a c t o r c o n n e c t i o n s

S M 1 Z 1 7 0 1 P W i d t h 8 0 m m r e t r o f i t f o r L M Z . . .

S M 1 Z 1 7 0 2 P W i d t h 8 0 m m . W i t h b u t t o n f o r e m e r g e n c y s t o p

S M 1 Z 1 7 1 1 P E x t r a w i d t h 1 0 0 m m

S M 1 Z 1 7 1 2 P W i d t h 1 0 0 m m . W i t h b u t t o n f o r e m e r g e n c y s t o p

S u r f a c e m o u n t e n c l o s u r e s I P 6 5 f o r S M 1 P . . .

F l u s h m o u n t e n c l o s u r e I P 6 5 f o r S M 1 P

S M 1 Z 1 7 0 5 P R u b b e r m e m b r a n e w i d t h 8 7 m m

S M 1 X 1 7 4 0 P E m e r g e n c y s t o p b u t t o n . I P 6 5 ( 4 X )

S M 1 X 1 7 4 5 P R u b b e r m e m b r a n e i n s e r t . I P 6 5 ( 4 X )

S M 1 X 1 7 4 6 P L o c k a b l e b l o c k . I P 6 5 ( 4 X )

A c c e s s o r i e s a n d s p a r e p a r t s f o r S M 1 Z . . P e n c l o s u r e s

S t a r t e r a s s e m b l y a d a p t e r p l a t e s

1 1 S M X 9 0 1 0 A d a p t e r m o u n t i n g p l a t e f o r d i r e c t s t a r t e r f o r b r e a k e r

S M 1 … a n d c o n t a c t o r s B G … , B F 0 9 A … B F 3 8 A

1 1 S M X 9 0 1 2 A d a p t e r m o u n t i n g p l a t e f o r r e v e r s i n g s w i t c h f o r b r e a k e r

f o r m o t o r p r o t e c t i o n S M 1 … a n d c o n t a c t o r s B G … ,

B F 0 9 A … B F 3 8 A

1 1 S M X 9 0 1 4 A d a p t e r m o u n t i n g p l a t e f o r s t a r t e r s t a r - d e l t a f o r m o t o r

p r o t e c t i o n b r e a k e r S M 1 … a n d c o n t a c t o r s B F 0 9 A … B F 3 8 A

1 1 S M X 9 0 1 8 3 5 m m r a i l f o r p a s s a g e o f w i r e s u n d e r n e a t h t o c o n t a c t o r ;

f o r S M X 9 0 1 4

1 1 S M X 9 0 1 9 D I N r a i l e x t e n s i o n 3 5 m m


B F X 8 9 0 1

S M 1 X 3 0 . . .

S M 1 X 3 1 . . .

S M 1 X 3 2 . . .

S M 1 Z 1 7 0 2 P

S M 1 Z 1 7 0 5 P

1 1 S M X 9 0 1 0

S M 1 . . . S e r i e s


M o t o r P r o t e c t i o n C i r c u i t B r e a k e r s M

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6

S M 2 R 5 0 0 0 3 4 - 5 0 5 0 5 0

S M 2 R 6 3 0 0 4 5 - 6 3 5 0 5 0



S M 3 R 7 5 0 0 5 5 - 7 5 5 0 3 8

S M 3 R 9 0 0 0 7 0 - 9 0 5 0 3 8

S M 3 R 9 9 0 0 8 0 - 1 0 0 5 0 3 8

S M 2 X 1 1 2 0 F r o n t m o u n t 2 N O

S M 2 X 1 1 1 1 F r o n t m o u n t 1 N O + 1 N C

S M 2 X 1 1 0 2 F r o n t m o u n t 2 N C

S M 2 X 1 2 2 0 S i d e m o u n t 2 N O

S M 2 X 1 2 1 1 S i d e m o u n t 1 N O + 1 N C

S M 2 X 1 2 0 2 S i d e m o u n t 2 N C

S M 2 X 1 3 1 1 S i d e m o u n t e d i n d i c a t o r c o n t a c t s f o r t h e r m a l a n d m a g -

n e t i c t r i p p i n g 1 N O + 1 N C

S M 2 X 1 4 2 3 0 2 3 0 V A C 5 0 / 6 0 H z

S M 2 X 1 4 4 0 0 4 0 0 V A C 5 0 / 6 0 H z

S M 2 X 1 4 4 4 0 4 4 0 V A C 5 0 / 6 0 H z

S M 2 X 1 6 0 2 4 2 4 V A C 5 0 / 6 0 H z

S M 2 X 1 6 1 1 0 1 1 0 V A C 5 0 / 6 0 H z

S M 2 X 1 6 2 3 0 2 3 0 V A C 5 0 / 6 0 H z

S M 2 X 1 6 4 0 0 4 0 0 V A C 5 0 / 6 0 H z

S M 2 X 1 8 2 0 0 R R e d / y e l l o w c o m p l e t e w i t h r o d l e n g t h 2 0 0 m m

S M 2 X 1 8 B 2 0 0 R B l a c k c o m p l e t e w i t h r o d l e n g t h 2 0 0 m m

S M 3 X 9 0 0 0 R F o r T y p e E a s p e r U L 5 0 8

R o t a r y m o t o r p r o t e c t i o n c i r c u i t b r e a k e r s u p t o 6 3 A

R o t a r y m o t o r p r o t e c t i o n c i r c u i t b r e a k e r s u p t o 1 0 0 A

O r d e r c o d e T h e r m a l t r i p

a d j u s t m e n t r a n g e

[ A ]

I c u

[ k A ]

I c s

[ k A ]




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U n d e r v o l t a g e t r i p r e l e a s e s

A d d - o n a u x i l i a r y c o n t a c t s

S h u n t t r i p r e l e a s e s

P a d l o c k a b l e I P 6 5 ( 4 X ) d o o r c o u p l i n g h a n d l e

P h a s e s e p a r a t i o n b a r r i e r s f o r S M 3 R . . .

S M 2 R . . . S M 3 R . . .

S M 2 X 1 1 . . .

S M 2 X 1 2 . . .

S M 2 X 1 4 . . . S M 2 X 1 6 . . .

S M 2 X 1 8 . . .

S M 2 … a n d

S M 3 … S e r i e s

S M 2 … a n d

S M 3 … S e r i e s



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9 4 2 0 - 1 2 4 V A C 1 1 B G 0 9 0 1 A 0 2 4 1 1 B G 0 9 T 4 A 0 2 4

- 1 1 1 0 V A C 1 1 B G 0 9 0 1 A 1 1 0 1 1 B G 0 9 T 4 A 1 1 0

- 1 2 3 0 V A C 1 1 B G 0 9 0 1 A 2 3 0 1 1 B G 0 9 T 4 A 2 3 0

- 1 4 0 0 V A C 1 1 B G 0 9 0 1 A 4 0 0 1 1 B G 0 9 T 4 A 4 0 0

- 1 2 4 V D C 1 1 B G 0 9 0 1 D 0 2 4 1 1 B G 0 9 T 4 D 0 2 4

9 4 2 0 1 - 2 4 V A C 1 1 B G 0 9 1 0 A 0 2 4 4 p o l e c o n t a c t o r D O E S N O T i n c l u d e i n t e g r a t e d a u x i l i a r y c o n t a c t

1 - 1 1 0 V A C 1 1 B G 0 9 1 0 A 1 1 0

1 - 2 3 0 V A C 1 1 B G 0 9 1 0 A 2 3 0

1 - 4 0 0 V A C 1 1 B G 0 9 1 0 A 4 0 0

1 - 2 4 V D C 1 1 B G 0 9 1 0 D 0 2 4

1 2 5 . 7 2 0 - 1 2 4 V A C 1 1 B G 1 2 0 1 A 0 2 4 -

- 1 1 1 0 V A C 1 1 B G 1 2 0 1 A 1 1 0 -

- 1 2 3 0 V A C 1 1 B G 1 2 0 1 A 2 3 0 -

- 1 4 0 0 V A C 1 1 B G 1 2 0 1 A 4 0 0 -

- 1 2 4 V D C 1 1 B G 1 2 0 1 D 0 2 4 -

1 2 5 . 7 2 0 1 - 2 4 V A C 1 1 B G 1 2 1 0 A 0 2 4 -

1 - 1 1 0 V A C 1 1 B G 1 2 1 0 A 1 1 0 -

1 - 2 3 0 V A C 1 1 B G 1 2 1 0 A 2 3 0 -

1 - 4 0 0 V A C 1 1 B G 1 2 1 0 A 4 0 0 -

1 - 2 4 V D C 1 1 B G 1 2 1 0 D 0 2 4 -

M i n i - c o n t a c t o r s

B G 0 9 . . . B G 1 2

9 4 . 2 2 5 - 1 2 4 V A C B F 0 9 0 1 A 0 2 4 B F 0 9 T 4 A 0 2 4

- 1 1 1 0 V A C B F 0 9 0 1 A 1 1 0 B F 0 9 T 4 A 1 1 0 - 1 2 3 0 V A C B F 0 9 0 1 A 2 3 0 B F 0 9 T 4 A 2 3 0 - 1 4 0 0 V A C B F 0 9 0 1 A 4 0 0 B F 0 9 T 4 A 4 0 0 - 1 2 4 V D C B F 0 9 0 1 D 0 2 4 B F 0 9 T 4 D 0 2 4

9 4 . 2 2 5 1 - 2 4 V A C B F 0 9 1 0 A 0 2 4

4 p o l e c o n t a c t o r D O E S N O T i n c l u d e i n t e g r a t e d a u x i l i a r y c o n t a c t

1 - 1 1 0 V A C B F 0 9 1 0 A 1 1 0

1 - 2 3 0 V A C B F 0 9 1 0 A 2 3 0

1 - 4 0 0 V A C B F 0 9 1 0 A 4 0 0

1 - 2 4 V D C B F 0 9 1 0 D 0 2 4

1 2 5 . 7 2 8 - 1 2 4 V A C B F 1 2 0 1 A 0 2 4 B F 1 2 T 4 A 0 2 4


1 2 5 . 7 2 8 1 - 2 4 V A C B F 1 2 1 0 A 0 2 4


1 - 1 1 0 V A C B F 1 2 1 0 A 1 1 0

1 - 2 3 0 V A C B F 1 2 1 0 A 2 3 0

1 - 4 0 0 V A C B F 1 2 1 0 A 4 0 0

1 - 2 4 V D C B F 1 2 1 0 D 0 2 4

1 8 7 . 5 3 2 - 1 2 4 V A C B F 1 8 0 1 A 0 2 4 B F 1 8 T 4 A 0 2 4


1 8 7 . 5 3 2 1 - 2 4 V A C B F 1 8 1 0 A 0 2 4


1 - 1 1 0 V A C B F 1 8 1 0 A 1 1 0

1 - 2 3 0 V A C B F 1 8 1 0 A 2 3 0

1 - 4 0 0 V A C B F 1 8 1 0 A 4 0 0

1 - 2 4 V D C B F 1 8 1 0 D 0 2 4

2 5 1 2 . 5 3 2 - 1 2 4 V A C B F 2 5 0 1 A 0 2 4 -

- 1 1 1 0 V A C B F 2 5 0 1 A 1 1 0 -

- 1 2 3 0 V A C B F 2 5 0 1 A 2 3 0 -

- 1 4 0 0 V A C B F 2 5 0 1 A 4 0 0 -

- 1 2 4 V D C B F 2 5 0 1 D 0 2 4 -

2 5 1 2 . 5 3 2 1 - 2 4 V A C B F 2 5 1 0 A 0 2 4 -

1 - 1 1 0 V A C B F 2 5 1 0 A 1 1 0 -

1 - 2 3 0 V A C B F 2 5 1 0 A 2 3 0 -

1 - 4 0 0 V A C B F 2 5 1 0 A 4 0 0 -

1 - 2 4 V D C B F 2 5 1 0 D 0 2 4 -

I e ( A C 3 )

≤ 4 4 0 V a t

≤ 5 5 o C

[ A ]

I E C

o p e r a t i n g

c u r r e n t

I t h ( A C 1 )

≤ 4 0 o C

[ A ]

A u x i l i a r y

c o n t a c t s

N O N C

T h r e e - p o l e

c o n t a c t o r s

o r d e r c o d e

M a x i m u m

E C p o w e r

a t ≤ 5 5 o C

( A C 3 )

4 0 0 V

[ k W ]

C o i l

v o l t a g e

F o u r - p o l e

c o n t a c t o r s

o r d e r c o d e

e x c l u d e s

a u x i l i a r y

c o n t a c t s

Co

nta

cto

rs

S i z e 1 C o n t a c t o r

B F 0 9 . . . B F 2 5

B G . . . a n d

B F . . . S e r i e s

C o n t a c t o r s


Co

nta

cto

rs

8

4 0 1 8 . 5 7 0 - - 2 4 V A C B F 4 0 0 0 A 0 2 4 B F 4 0 T 4 A 0 2 4

- - 1 1 0 V A C B F 4 0 0 0 A 1 1 0 B F 4 0 T 4 A 1 1 0

- - 2 3 0 V A C B F 4 0 0 0 A 2 3 0 B F 4 0 T 4 A 2 3 0

- - 4 0 0 V A C B F 4 0 0 0 A 4 0 0 B F 4 0 T 4 A 4 0 0

- - 2 4 V A C / D C B F 4 0 0 0 E 0 2 4 -

5 0 2 2 9 0 - - 2 4 V A C B F 5 0 0 0 A 0 2 4 B F 5 0 T 4 A 0 2 4

- - 1 1 0 V A C B F 5 0 0 0 A 1 1 0 B F 5 0 T 4 A 1 1 0

- - 2 3 0 V A C B F 5 0 0 0 A 2 3 0 B F 5 0 T 4 A 2 3 0

- - 4 0 0 V A C B F 5 0 0 0 A 4 0 0 B F 5 0 T 4 A 4 0 0

- - 2 4 V A C / D C B F 5 0 0 0 E 0 2 4 - 8 0

6 5

3 0 1 0 0 - - 2 4 V A C B F 6 5 0 0 A 0 2 4 B F 6 5 T 4 A 0 2 4

- - 1 1 0 V A C B F 6 5 0 0 A 1 1 0 B F 6 5 T 4 A 1 1 0

- - 2 3 0 V A C B F 6 5 0 0 A 2 3 0 B F 6 5 T 4 A 2 3 0

- - 4 0 0 V A C B F 6 5 0 0 A 4 0 0 B F 6 5 T 4 A 4 0 0

- - 2 4 V A C / D C B F 6 5 0 0 E 0 2 4 B F 6 5 T 4 E 0 2 4 8 0

8 0 4 5 - - 2 4 V A C B F 8 0 0 0 A 0 2 4 B F 8 0 T 4 A 0 2 4 1 1 5

- - 1 1 0 V A C B F 8 0 0 0 A 1 1 0 B F 8 0 T 4 A 1 1 0

- - 2 3 0 V A C B F 8 0 0 0 A 2 3 0 B F 8 0 T 4 A 2 3 0

- - 4 0 0 V A C B F 8 0 0 0 A 4 0 0 B F 8 0 T 4 A 4 0 0

- - 2 4 V A C / D C B F 8 0 0 0 E 0 2 4 B F 8 0 T 4 E 0 2 4


B F 4 0 . . . B F 8 0


B F 2 6 . . . B F 3 8

2 6 1 3 4 5 - - 2 4 V A C B F 2 6 0 0 A 0 2 4 B F 2 6 T 4 A 0 2 4

- - 1 1 0 V A C B F 2 6 0 0 A 1 1 0 B F 2 6 T 4 A 1 1 0

- - 2 3 0 V A C B F 2 6 0 0 A 2 3 0 B F 2 6 T 4 A 2 3 0

- - 4 0 0 V A C B F 2 6 0 0 A 4 0 0 B F 2 6 T 4 A 4 0 0

- - 2 4 V D C B F 2 6 0 0 D 0 2 4 B F 2 6 T 4 D 0 2 4

3 2 1 6 5 6 - - 2 4 V A C B F 3 2 0 0 A 0 2 4 -

- - 1 1 0 V A C B F 3 2 0 0 A 1 1 0 -

- - 2 3 0 V A C B F 3 2 0 0 A 2 3 0 -

- - 4 0 0 V A C B F 3 2 0 0 A 4 0 0 -

- - 2 4 V D C B F 3 2 0 0 D 0 2 4 -

3 8 1 8 . 5 - - 2 4 V A C B F 3 8 0 0 A 0 2 4 B F 3 8 T 4 A 0 2 4 5 6 ( 6 0 )

- - 1 1 0 V A C B F 3 8 0 0 A 1 1 0 B F 3 8 T 4 A 1 1 0

- - 2 3 0 V A C B F 3 8 0 0 A 2 3 0 B F 3 8 T 4 A 2 3 0

- - 4 0 0 V A C B F 3 8 0 0 A 4 0 0 B F 3 8 T 4 A 4 0 0

- - 2 4 V D C B F 3 8 0 0 D 0 2 4 B F 3 8 T 4 D 0 2 4

I e ( A C 3 )

≤ 4 4 0 V

a t

≤ 5 5 o C

[ A ]

I E C

o p e r a t i n g

c u r r e n t

I t h ( A C 1 )

≤ 4 0 o C

[ A ]

A u x i l i a r y

c o n t a c t s

N O N C

T h r e e - p o l e c o n t a c t o r s

o r d e r c o d e

M a x i m u m

E C p o w e r

a t ≤ 5 5 o C

( A C 3 )

4 0 0 V

[ k W ]

C o i l

v o l t a g e

F o u r - p o l e c o n t a c t o r s

o r d e r c o d e B F . . . S e r i e s

F o r C a p a c i t o r s w i t c h i n g c o n t a c t o r s p l e a s e s e e P o w e r F a c t o r C o n t r o l l e r s s e c t i o n

C o n t a c t o r s

Co

nta

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rs


8 5 4 5 1 2 5 - - 2 4 V A C B F 8 5 0 0 A 0 2 4 B F 8 5 T 4 A 0 2 4

- - 1 1 0 V A C B F 8 5 0 0 A 1 1 0 B F 8 5 T 4 A 1 1 0

- - 2 3 0 V A C B F 8 5 0 0 A 2 3 0 B F 8 5 T 4 A 2 3 0

- - 4 0 0 V A C B F 8 5 0 0 A 4 0 0 B F 8 5 T 4 A 4 0 0

- - 2 4 V A C / D C B F 8 5 0 0 E 0 2 4 B F 8 5 T 4 E 0 2 4

9 5 5 5 1 4 0 - - 2 4 V A C B F 9 5 0 0 A 0 2 4 B F 9 5 T 4 A 0 2 4

- - 1 1 0 V A C B F 9 5 0 0 A 1 1 0 B F 9 5 T 4 A 1 1 0

- - 2 3 0 V A C B F 9 5 0 0 A 2 3 0 B F 9 5 T 4 A 2 3 0

- - 4 0 0 V A C B F 9 5 0 0 A 4 0 0 B F 9 5 T 4 A 4 0 0

- - 2 4 V A C / D C B F 9 5 0 0 E 0 2 4 B F 9 5 T 4 E 0 2 4

1 1 5

5 5 1 6 0 - - 2 4 V A C B F 1 1 5 0 0 A 0 2 4 B F 1 1 5 T 4 A 0 2 4

- - 1 1 0 V A C B F 1 1 5 0 0 A 1 1 0 B F 1 1 5 T 4 A 1 1 0

- - 2 3 0 V A C B F 1 1 5 0 0 A 2 3 0 B F 1 1 5 T 4 A 2 3 0

- - 4 0 0 V A C B F 1 1 5 0 0 A 4 0 0 B F 1 1 5 T 4 A 4 0 0

- - 2 4 V A C / D C B F 1 1 5 0 0 E 0 2 4 -

1 5 0 7 5 - - 2 4 V A C B F 1 5 0 0 0 A 0 2 4 B F 1 5 0 T 4 A 0 2 4 1 6 5

- - 1 1 0 V A C B F 1 5 0 0 0 A 1 1 0 B F 1 5 0 T 4 A 1 1 0

- - 2 3 0 V A C B F 1 5 0 0 0 A 2 3 0 B F 1 5 0 T 4 A 2 3 0

- - 4 0 0 V A C B F 1 5 0 0 0 A 4 0 0 B F 1 5 0 T 4 A 4 0 0

- - 2 4 V A C / D C B F 1 5 0 0 0 E 0 2 4 B F 1 5 0 T 4 E 0 2 4


B F 8 5 . . . B F 1 5 0

9

Co

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rs


A u x i l i a r y c o n t a c t s . S c r e w t e r m i n a l s

1 1 B G X 1 0 0 2 2 N C

1 1 B G X 1 0 1 1 1 N O + 1 N C

1 1 B G X 1 0 2 0 2 N O

1 1 B G X 1 0 0 4 4 N C

1 1 B G X 1 0 1 3 1 N O + 3 N C

1 1 B G X 1 0 2 2 2 N O + 2 N C

1 1 B G X 1 0 3 1 3 N O + 1 N C

1 1 B G X 1 0 4 0 4 N O

1 1 B G X 5 0 0 0 F o r B G . . . A a n d B G . . . D

M e c h a n i c a l i n t e r l o c k

1 1 B G X 7 7 0 4 8 ≤ 4 8 V A C / D C ( V a r i s t o r )

1 1 B G X 7 7 1 2 5 4 8 . . . 1 2 5 V A C / D C ( V a r i s t o r )

1 1 B G X 7 7 2 4 0 1 2 5 . . . 2 4 0 V A C / D C ( V a r i s t o r )

Q u i c k c o n n e c t s u r g e s u p p r e s s o r s


A u x i l i a r y c o n t a c t s w i t h f r o n t c e n t r e m o u n t i n g . S c r e w t e r m i n a l s

1 1 B F X 1 0 0 2 2 N C

1 1 B F X 1 0 1 1 1 N O + 1 N C

1 1 B F X 1 0 2 0 2 N O

1 1 B F X 1 0 0 4 4 N C

1 1 B F X 1 0 1 3 1 N O + 3 N C

1 1 B F X 1 0 2 2 2 N O + 2 N C

1 1 B F X 1 0 3 1 3 N O + 1 N C

1 1 B F X 1 0 4 0 4 N O

A u x i l i a r y c o n t a c t s w i t h l o w s i d e m o u n t i n g . S c r e w t e r m i n a l s

B F X 1 2 0 2 2 N C f o r B F 0 9 . . . B F 8 0 o n l y

B F X 1 2 1 1 1 N O + 1 N C f o r B F 0 9 . . . B F 8 0 o n l y

B F X 1 2 2 0 2 N O f o r B F 0 9 . . . B F 8 0 o n l y

D e l a y e d a u x i l i a r y c o n t a c t s 1 N O + 1 N C ( p n e u m a t i c o p e r a t i o n ) o n

e n e r g i s a t i o n f o r f r o n t c e n t r e m o u n t i n g . S c r e w t e r m i n a l s

1 1 G 4 8 5 3 3 s

1 1 G 4 8 5 6 6 s

1 1 G 4 8 5 1 5 1 5 s

1 1 G 4 8 5 3 0 3 0 s

1 1 G 4 8 5 6 0 6 0 s

1 1 G 4 8 5 1 2 0 1 2 0 s

1 1 G 4 8 6 3 3 s

1 1 G 4 8 6 6 6 s

1 1 G 4 8 6 1 5 1 5 s

1 1 G 4 8 6 3 0 3 0 s

1 1 G 4 8 6 6 0 6 0 s

1 1 G 4 8 6 1 2 0 1 2 0 s

1 1 G 4 8 7 7 0 m s

D e l a y e d a u x i l i a r y c o n t a c t s 1 N O + 1 N C ( p n e u m a t i c o p e r a t i o n ) o n

d e - e n e r g i s a t i o n f o r f r o n t c e n t e r m o u n t i n g . S c r e w t e r m i n a l s

1 1 B G X 1 0 … ( 0 2 , 2 2 , 2 0 )

1 1 B G X 5 0 0 0

B F X 1 0 . . .

B F X 1 0 . . .

B F X 1 2 . . .

1 1 G 4 8 5 …

1 1 G 4 8 6 …

Co

nta

cto

rs

B G . . . S e r i e s


B F . . . S e r i e s


C o n t a c t o r s


Co

nta

cto

rs

1 0



B F X 5 0 0 0 S i d e m o u n t f o r B F 0 0 , B F 0 9 . . . B F 3 8

B F X 5 0 0 1 S i d e m o u n t w i t h 2 N C c o n t a c t s f o r B F 0 0 , B F 0 9 . . . B F 3 8

B F X 5 0 0 2 F r o n t m o u n t , l o w p r o f i l e f o r B F 0 0 , B F 0 9 . . . B F 3 8

B F X 5 3 0 0 S i d e m o u n t f o r B F 4 0 . . . B F 8 0

B F X 5 3 0 1 S i d e m o u n t w i t h 2 N C c o n t a c t s f o r B F 4 0 . . . B F 8 0

B F X 5 3 0 3 F r o n t m o u n t f o r B F 4 0 . . . B F 8 0

B F X 5 4 0 0 S i d e m o u n t f o r B F 8 5 . . . B F 1 5 0

B F X 5 4 0 1 S i d e m o u n t w i t h 2 N C c o n t a c t s f o r B F 8 5 . . . B F 1 5 0

B F X 5 4 0 3 F r o n t m o u n t f o r B F 8 5 . . . B F 1 5 0

B F X 7 7 0 4 8 ≤ 4 8 V A C / D C ( V a r i s t o r )

B F X 7 7 1 2 5 4 8 . . . 1 2 5 V A C / D C ( V a r i s t o r )

B F X 7 7 2 4 0 1 2 5 . . . 2 4 0 V A C / D C ( V a r i s t o r )

B F X 3 1 0 1 F o r c o n t a c t o r s B F 0 9 . . . B F 2 5 s i d e b y s i d e w i t h B F X 5 0 0 2

a n d B F X 5 0 0 3 m e c h a n i c a l i n t e r l o c k

B F X 3 1 0 2 F o r c o n t a c t o r s B F 0 9 . . . B F 2 5 s i d e b y s i d e w i t h B F X 5 0 0 0

a n d B F X 5 0 0 1 m e c h a n i c a l i n t e r l o c k

B F X 3 2 0 1 F o r c o n t a c t o r s B F 2 6 . . . B F 3 8 s i d e b y s i d e w i t h B F X 5 0 . . .

m e c h a n i c a l i n t e r l o c k

B F X 3 1 3 1 F o r c o n t a c t o r s B F 0 9 . . . B F 2 5

B F X 3 2 3 1 F o r c o n t a c t o r s B F 2 6 . . . B F 3 8

B F X 3 2 3 2 F o r c o n t a c t o r s B F 2 6 . . . B F 3 8 ( L / )

B F 0 9 . . . B F 2 5 ( )

1 1 G 2 3 1 1 x 6 m m 2 f o r c o n t a c t o r s B F 0 9 . . . B F 2 5 t y p e s

1 1 G 2 3 2 1 x 1 6 m m 2 f o r c o n t a c t o r s B F 2 6 . . . B F 3 8 t y p e s

Q u i c k c o n n e c t s u r g e s u p p r e s s o r s f o r B F 0 0 A , B F 0 9 A . . . B F 1 5 0 A c o n t a c t o r s

1 1 B A 1 3 5 2 p o l e s f o r c o n t a c t o r s B F 0 9 . . . B F 2 5 t y p e s

1 1 B A 2 3 5 2 p o l e s f o r c o n t a c t o r s B F 2 6 . . . B F 3 8 t y p e s

1 1 B A 4 3 5 3 p o l e s f o r c o n t a c t o r s B F 8 5 . . . B F 1 5 0 t y p e s

Y

R i g i d c o n n e c t i n g k i t s f o r t h r e e - p o l e r e v e r s i n g c o n t a c t o r a s s e m b l y

R i g i d c o n n e c t i n g k i t s f o r s t a r - d e l t a s t a r t e r s

P a r a l l e l i n g l i n k s

O n e - p o l e e n l a r g e d t e r m i n a l s

B F X 5 0 0 1

B F X 5 3 0 1

B F X 5 4 0 1

B F X 7 7 . . . B F X 3 1 …

B F X 3 2 …

1 1 B A 1 3 5

1 1 B A 2 3 5

1 1 B A 4 3 5

B F . . . S e r i e s


C o n t a c t o r s

E m p t y

E n c l o s u r e s M 0 N B G 0 6 , B G 0 9 , B G 1 2 R F 9 . . . 1 8 4 x 8 8 x 1 1 9 . 5

M 1 N B F 0 9 A , B F 1 2 A , B F 1 8 A R F 3 8 … 2 0 2 x 8 8 x 1 3 4 . 5

M 2 N B F 2 5 A , B F 2 6 A , B F 3 2 A R F 3 8 … 2 3 4 x 1 1 0 x 1 4 8 . 5

M 2 4 N

( I n c m o u n t p l a t e )

A l l A b o v e A l l A b o v e 2 1 0 x 1 7 5 x 9 8 . 5

M 2 5 N

( I n c m o u n t p l a t e )

A l l A b o v e + B F 3 8 R F 3 8 … 2 1 0 x 1 7 5 x 1 5 8 . 5

M 3 N B F 4 0 A , B F 5 0 , B F 6 5 ,

B F 8 0 , B F 9 5 , B F 1 1 0

R F 8 2 …

1 1 R F 9 5 . . .

2 8 0 x 2 2 0 x 1 7 0

O r d e r c o d e C o m p a t i b l e

c o n t a c t o r

C o m p a t i b l e

t h e r m a l r e l a y

D i m e n s i o n s

[ m m ]

M X 3 0 - - 1 8 5 W x 2 4 4 H

M e t a l m o u n t i n g p l a t e f o r M 3 N e n c l o s u r e

M 0 N

M 1 N

M 2 N

M 3 N

Co

nta

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rs


B F X 5 0 0 0

B F X 5 3 0 0

B F X 5 4 0 0

M 2 4 N

1 1

Co

nta

cto

rs

I e ( A C 3 )

≤ 4 4 0 V

a t

≤ 5 5 o C

[ A ]

I E C

o p e r a t i n g

c u r r e n t

I t h ( A C 1 )

≤ 4 0 o C

[ A ]

A u x i l i a r y

c o n t a c t s

N O N C

T h r e e - p o l e c o n t a c t o r s

o r d e r c o d e

M a x i m u m

E C p o w e r

a t ≤ 5 5 o C

( A C 3 )

4 0 0 V

[ k W ]

C o i l

v o l t a g e

A C / D C

F o u r - p o l e c o n t a c t o r s

o r d e r c o d e

B 1 1 5 . . . B 6 3 0

B 1 2 5 0 . . . B 1 6

1 1 0 6 1 1 6 0 - - 2 4 V 1 1 B 1 1 5 0 0 2 4 1 1 B 1 1 5 4 0 0 2 4

- - 1 1 0 V 1 1 B 1 1 5 0 0 1 1 0 1 1 B 1 1 5 4 0 0 1 1 0

- - 2 3 0 V 1 1 B 1 1 5 0 0 2 2 0 1 1 B 1 1 5 4 0 0 2 2 0

- - 4 0 0 V 1 1 B 1 1 5 0 0 3 8 0 1 1 B 1 1 5 4 0 0 3 8 0

1 5 0 8 0 2 5 0 - - 2 4 V 1 1 B 1 4 5 0 0 2 4 1 1 B 1 4 5 4 0 0 2 4

- - 1 1 0 V 1 1 B 1 4 5 0 0 1 1 0 1 1 B 1 4 5 4 0 0 1 1 0

- - 2 3 0 V 1 1 B 1 4 5 0 0 2 2 0 1 1 B 1 4 5 4 0 0 2 2 0

- - 4 0 0 V 1 1 B 1 4 5 0 0 3 8 0 1 1 B 1 4 5 4 0 0 3 8 0

1 8 5 1 0 0 2 7 5 - - 2 4 V 1 1 B 1 8 0 0 0 2 4 1 1 B 1 8 0 4 0 0 2 4

- - 1 1 0 V 1 1 B 1 8 0 0 0 1 1 0 1 1 B 1 8 0 4 0 0 1 1 0

- - 2 3 0 V 1 1 B 1 8 0 0 0 2 2 0 1 1 B 1 8 0 4 0 0 2 2 0

- - 4 0 0 V 1 1 B 1 8 0 0 0 3 8 0 1 1 B 1 8 0 4 0 0 3 8 0

2 6 5 1 4 0 3 5 0 - - 2 4 V 1 1 B 2 5 0 0 0 2 4 1 1 B 2 5 0 4 0 0 2 4

- - 1 1 0 V 1 1 B 2 5 0 0 0 1 1 0 1 1 B 2 5 0 4 0 0 1 1 0

- - 2 3 0 V 1 1 B 2 5 0 0 0 2 2 0 1 1 B 2 5 0 4 0 0 2 2 0

- - 4 0 0 V 1 1 B 2 5 0 0 0 3 8 0 1 1 B 2 5 0 4 0 0 3 8 0

3 2 0 1 7 0 4 5 0 - - 2 4 V 1 1 B 3 1 0 0 0 2 4 1 1 B 3 1 0 4 0 0 2 4

- - 1 1 0 V 1 1 B 3 1 0 0 0 1 1 0 1 1 B 3 1 0 4 0 0 1 1 0

- - 2 3 0 V 1 1 B 3 1 0 0 0 2 2 0 1 1 B 3 1 0 4 0 0 2 2 0

- - 4 0 0 V 1 1 B 3 1 0 0 0 3 8 0 1 1 B 3 1 0 4 0 0 3 8 0

4 2 0 2 2 5 5 5 0 - - 2 4 V 1 1 B 4 0 0 0 0 2 4 1 1 B 4 0 0 4 0 0 2 4

- - 1 1 0 V 1 1 B 4 0 0 0 0 1 1 0 1 1 B 4 0 0 4 0 0 1 1 0

- - 2 3 0 V 1 1 B 4 0 0 0 0 2 2 0 1 1 B 4 0 0 4 0 0 2 2 0

- - 4 0 0 V 1 1 B 4 0 0 0 0 3 8 0 1 1 B 4 0 0 4 0 0 3 8 0

5 2 0 2 9 0 7 0 0 - - 1 1 0 V 1 1 B 5 0 0 0 0 1 1 0 1 1 B 5 0 0 4 0 0 1 1 0

- - 2 3 0 V 1 1 B 5 0 0 0 0 2 2 0 1 1 B 5 0 0 4 0 0 2 2 0

- - 4 0 0 V 1 1 B 5 0 0 0 0 3 8 0 1 1 B 5 0 0 4 0 0 3 8 0

6 3 0 3 3 5 8 0 0 - - 1 1 0 V 1 1 B 6 3 0 0 0 1 1 0 1 1 B 6 3 0 4 0 0 1 1 0

- - 2 3 0 V 1 1 B 6 3 0 0 0 2 2 0 1 1 B 6 3 0 4 0 0 2 2 0

- - 4 0 0 V 1 1 B 6 3 0 0 0 3 8 0 1 1 B 6 3 0 4 0 0 3 8 0

- 1 0 0 0 - - 1 1 0 V 1 1 B 6 3 0 1 0 0 0 0 0 1 1 0 1 1 B 6 3 0 1 0 0 0 4 0 0 1 1 0 F o r A C 1 /

R e s i s t i v e

d u t i e s o n l y - - 2 3 0 V 1 1 B 6 3 0 1 0 0 0 0 0 2 2 0 1 1 B 6 3 0 1 0 0 0 4 0 0 2 2 0

- - 4 0 0 V 1 1 B 6 3 0 1 0 0 0 0 0 3 8 0 1 1 B 6 3 0 1 0 0 0 4 0 0 3 8 0

- F o r A C 1 /

R e s i s t i v e

d u t i e s o n l y

1 2 5 0 - - 1 1 0 V * 1 1 B 1 2 5 0 2 4 1 1 0 1 1 B 1 2 5 0 4 2 4 1 1 0

- - 2 3 0 V * 1 1 B 1 2 5 0 2 4 2 2 0 1 1 B 1 2 5 0 4 2 4 2 2 0

- F o r A C 1 /

R e s i s t i v e

d u t i e s o n l y

1 6 0 0 - - 1 1 0 V * 1 1 B 1 6 0 0 2 4 1 1 0 1 1 B 1 6 0 0 4 2 4 1 1 0

- - 2 3 0 V * 1 1 B 1 6 0 0 2 4 2 2 0 1 1 B 1 6 0 0 4 2 4 2 2 0

1 1 G 3 5 0 2 N O + 1 N C o r 1 N O + 2 N C r e v e r s i b l e

1 1 G 3 5 4 1 N O + 1 N C


1 1 G 3 5 5 S i d e b y s i d e

1 1 B A 1 5 4 6 B 1 1 5 - B 1 4 5 - B 1 8 0

1 1 B A 1 6 7 1 B 2 5 0 - B 3 1 0 - B 4 0 0

1 1 B A 1 7 9 6 B 5 0 0 - B 6 3 0 - B 6 3 0 1 0 0 0 , B 1 2 5 0 - B 1 6 0 0

1 1 G 3 6 0 F o r c o n t a c t o r B 1 1 5

1 1 G 3 6 1 F o r c o n t a c t o r s B 1 4 5 - B 1 8 0

1 1 G 3 6 3 F o r c o n t a c t o r s B 2 5 0 - B 3 1 0 - B 4 0 0

A u x i l i a r y c o n t a c t s . F a s t o n t e r m i n a l s . S i d e m o u n t i n g


C o i l a s s e m b l y ( C o i l , r e c t i f i e r a n d c o i l p r o t e c t i o n )

1 1 G 3 5 0 - 1 1 G 3 5 4

1 1 B A 1 5 4 6 - 1 1 B A 1 7 9 6

U p t o B 6 3 0 . . . R e f e r t o g e n e r a l c a t a l o g u e f o r l a r g e r s i z e s

P o w e r t e r m i n a l p r o t e c t i o n

A d d c o i l v o l t a g e d i g i t - 2 4 / 1 1 0 / 2 2 0 / 3 8 0

Co

nta

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rs

B . . . S e r i e s

M a x i

C o n t a c t o r s

B . . . S e r i e s


* O n l y a v a i l a b l e i n A C

C o n t a c t o r s


Co

nta

cto

rs

1 2

O r d e r c o d e A d j u s t m e n t r a n g e

[ A ]

T h r e e P h a s e

M o t o r a t 4 0 0 V

D O L

[ k W ]

T h r e e P h a s e

M o t o r a t 4 0 0 V

S t a r D e l t a

[ k W ]

R F 9 1 0 . 6 - 1 0 . 3 7 -

R F 9 1 V 5 0 . 9 - 1 . 5 0 . 5 5 -

R F 9 2 V 3 1 . 4 - 2 . 3 0 . 7 5 -

R F 9 3 3 2 - 3 . 3 1 . 1 -

R F 9 5 3 - 5 1 . 5 -

R F 9 7 5 4 . 5 - 7 . 5 2 . 2 -

R F 9 1 0 6 - 1 0 4 . 0 -

R F 9 1 5 9 - 1 5 5 . 5 -

R F 9 o v e r l o a d r e l a y f o r u s e w i t h B G . . . m i n i c o n t a c t o r s

R F 3 8 0 1 0 0 0 . 6 3 - 1 0 . 2 5 -

R F 3 8 0 1 6 0 1 - 1 . 6 0 . 5 5 -

R F 3 8 0 2 5 0 1 . 6 - 2 . 5 0 . 7 5 -

R F 3 8 0 4 0 0 2 . 5 - 4 1 . 5 2 . 2 - 3

R F 3 8 0 6 5 0 4 - 6 . 5 2 . 2 4

R F 3 8 1 0 0 0 6 . 3 - 1 0 4 5 . 5 - 7 . 5

R F 3 8 1 4 0 0 9 - 1 4 5 . 5 1 1

R F 3 8 1 8 0 0 1 3 - 1 8 7 . 5 1 5

R F 3 8 2 3 0 0 1 7 - 2 3 1 1 1 8 . 5

R F 3 8 2 5 0 0 2 0 - 2 5 1 1 2 2

R F 3 8 3 2 0 0 2 4 - 3 2 1 5 3 0

R F 3 8 3 8 0 0 3 2 - 3 8 1 8 . 5 3 0

R F X 3 8 0 4 I n d e p e n d e n t m o u n t i n g , s c r e w f i x o r d i n r a i l m o u n t

R F 3 8 o v e r l o a d r e l a y f o r u s e w i t h B F 0 9 - B F 3 8 c o n t a c t o r s

R F 8 2 3 3 0 0 2 0 - 3 3 1 5 2 2

R F 8 2 4 2 0 0 2 8 - 4 2 1 8 . 5 3 0

R F 8 2 5 0 0 0 3 5 - 5 0 2 2 4 5

R F 8 2 6 5 0 0 4 6 - 6 5 3 0 5 5

R F 8 2 8 2 0 0 6 0 - 8 2 3 7 -

R F 1 1 0 0 8 2 6 0 - 8 2 3 7 7 5

R F 1 1 0 0 9 5 7 0 - 9 5 4 5 -

R F 1 1 0 1 1 0 9 0 - 1 1 0 5 5 -

1 1 G 2 7 0 I n d e p e n d e n t m o u n t i n g f o r R F 8 2 … a n d R F 1 1 0 o v e r l o a d s R F 1 1 0 . . .

R F 8 2 o v e r l o a d r e l a y f o r u s e w i t h B F 4 0 - B F 8 0 c o n t a c t o r s . M a n u a l r e s e t t i n g

R F 1 1 0 o v e r l o a d r e l a y f o r u s e w i t h B F 8 5 - 1 1 B F 1 5 0 c o n t a c t o r s .

M a n u a l r e s e t t i n g

F o r h i g h e r r a t i n g s , r e f e r t o t h e g e n e r a l c a t a l o g u e

R F 9 . . .

R F 3 8 . . .

R F 8 2 . . .

T h e r m a l O v e r l o a d

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R F E 4 5 0 2 0 0 0 . 4 - 2 0 . 1 2 - 0 . 7 5 -

R F E 4 5 0 8 0 0 1 . 6 - 8 0 . 7 5 - 3 2 . 2 - 4

R F E 4 5 3 2 0 0 6 . 4 - 3 2 3 - 1 5 5 . 5 - 2 2

R F E 1 1 0 1 1 0 2 2 - 1 1 0 1 1 - 5 5 2 2 - 1 1 0

R F E E l e c t r o n i c o v e r l o a d r e l a y f o r u s e w i t h B F 0 9 - B F 3 8 c o n t a c t o r s . M a n u a l

o r A u t o r e s e t t i n g . R F E 1 1 0 f o r i n d e p e n d e n t m o u n t i n g , m a n u a l o r a u t o r e s e t .

R F E 4 5 . . .

R F E 1 1 0 . . .

1 3

O r d e r c o d e I E C r a t e d s t a r t e r

c u r r e n t l e a t 4 0 0 V

[ A ]

[ k W ]

[ H P ]

A D X L 0 0 1 8 6 0 0 9 - 1 8 4 . 0 - 7 . 5 1 0

A D X L 0 0 3 0 6 0 0 1 5 - 3 0 7 . 5 - 1 5 1 5

A D X L 0 0 4 5 6 0 0 2 3 - 4 5 1 1 - 2 2 2 5

A D X L 0 0 6 0 6 0 0 3 0 - 6 0 1 5 - 3 0 3 0

A D X L 0 0 7 5 6 0 0 3 8 - 7 5 1 8 . 5 - 3 7 4 0

A D X L 0 0 8 5 6 0 0 4 3 - 8 5 2 2 . 5 - 4 5 5 0

A D X L 0 1 1 5 6 0 0 5 8 - 1 1 5 2 7 . 5 - 5 5 6 0

A D X L 0 1 3 5 6 0 0 6 8 - 1 3 5 3 7 . 5 - 7 5 7 5

A D X L 0 1 6 2 6 0 0 8 1 - 1 6 2 4 5 - 9 0 7 5

A D X L 0 1 9 5 6 0 0 9 8 - 1 9 5 5 5 - 1 1 0 1 0 0

A D X L 0 2 5 0 6 0 0 1 2 5 - 2 5 0 6 6 - 1 3 2 1 5 0

A D X L 0 3 2 0 6 0 0 1 6 0 - 3 2 0 8 0 - 1 6 0 2 0 0

M o t o r r a t e d p o w e r

≤ 4 0 o C a t 4 0 0 V

F o r s t a n d a r d a n d h e a v y - d u t y a p p l i c a t i o n s . W i t h b u i l t - i n b y p a s s r e l a y .

1 0 0 . . . 2 4 0 V A C a u x i l i a r y p o w e r s u p p l y . S t a r t c o n t r o l f r o m d r y c o n t a c t

A D X L 0 0 7 5 …

A D X L 0 1 1 5 . . .

A D X L 0 0 3 0 …

A D X L 0 0 6 0 . . .

A D X L 0 1 9 5 …

A D X L 0 3 2 0 . . .

A D X L S o f t S t a r t e r s

S o f t S t a r t e r s

A D X L 0 1 3 5 …

A D X L 0 1 6 2 . . .

C X 0 1 U S B c o n n e c t i o n d o n g l e P C ↔ A D X L w i t h o p t i c a l

c o n n e c t o r f o r p r o g r a m m i n g , d a t a d o w n l o a d ,

d i a g n o s t i c s , a n d f i r m w a r e u p d a t e

C X 0 2 W i - f i c o n n e c t i o n d o n g l e P C ↔ A D X L f o r d a t a

d o w n l o a d , p r o g r a m m i n g , d i a g n o s t i c s , a n d c l o n i n g

E X C R D U 1 R e m o t e k e y p a d , L C D d i s p l a y w i t h t o u c h s c r e e n ,

1 2 8 x 1 1 2 p i x e l , I P 6 5 p r o t e c t i o n

E X C 1 0 4 2 R S 4 8 5 c o m m u n i c a t i o n b o a r d

E X C C O N 1 R S 4 8 5 / E t h e r n e t c o n v e r t e r , 1 2 . . . 4 8 V D C , i n c l u d i n g D I N

m o u n t i n g g u i d e k i t

E X C M 3 G 0 1 R S 4 8 5 g a t e w a y , 3 G m o d e m , 9 . 5 . . . 2 7 V A C / 9 . 5 . . . 3 5 V D C ,

i n c l u d i n g a n t e n n a a n d p r o g r a m m i n g c a b l e

E X P 8 0 0 3 D I N g u i d e m o u n t k i t f o r A D X L 0 0 3 0 . . . A D X L 0 1 1 5

E X P 8 0 0 4 F a n f o r A D X L 0 0 3 0 . . . A D X L 0 1 1 5 ( c o d e s

A D X L 0 0 7 5 … . A D X L 0 1 1 5 m a x . o f t w o E X P 8 0 0 4 f a n s )

O r d e r C o d e D e s c r i p t i o n A c c e s s o r i e s

O r d e r c o d e I E C r a t e d s t a r t e r

c u r r e n t l e

[ A ]

I E C

[ k W ]

U L / C S A

[ H P ]

A D X C 0 1 2 4 0 0 1 2 5 . 5 5

A D X C 0 1 6 4 0 0 1 6 7 . 5 7 . 5

A D X C 0 2 5 4 0 0 2 5 1 1 1 0

A D X C 0 3 2 4 0 0 3 2 1 5 1 5

A D X C 0 3 7 4 0 0 3 7 1 8 . 5 2 0

A D X C 0 4 5 4 0 0 4 5 2 2 2 5

W i t h b u i l t - i n b y p a s s r e l a y . T h r e e - p h a s e 4 0 0 V A C m o t o r c o n t r o l . I n p u t

v o l t a g e L 1 - L 2 - L 3 2 2 0 . . . 4 0 0 V A C . S t a r t c o m m a n d 1 1 0 . . . 4 0 0 V A C

( A 1 - A 2 t e r m i n a l s )

A D X C 0 1 2 . . . A D X C 0 3 2

M o t o r r a t e d p o w e r

≤ 4 0 o C A D X C S o f t S t a r t e r s

1 2

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C X 0 1

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1 4

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3 - p h a s e

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a t 4 0 0 V A C

[ k W ]

O u t p u t

c u r r e n t

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3 - p h a s e

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a t 4 0 0 V A C

[ k W ]

V L B 3 0 0 0 4 A 4 8 0 1 . 5 0 . 7 5 1 . 3 0 . 4

V L B 3 0 0 0 7 A 4 8 0 2 . 7 1 . 5 2 . 4 0 . 7 5

V L B 3 0 0 1 5 A 4 8 0 4 . 5 2 . 2 3 . 9 1 . 5

V L B 3 0 0 2 2 A 4 8 0 6 . 4 4 5 . 6 2 . 2

V L B 3 0 0 4 0 A 4 8 0 1 1 . 9 5 . 5 9 . 5 4

V L B 3 0 0 5 5 A 4 8 0 1 5 . 6 7 . 5 1 3 5 . 5

V L B 3 0 0 7 5 A 4 8 0 2 3 1 1 1 6 . 5 7 . 5

V L B 3 0 1 1 0 A 4 8 0 2 8 . 2 1 5 2 3 . 5 1 1

V L B 3 0 1 5 0 A 4 8 0 3 8 . 4 1 8 . 5 3 2 1 5

V L B 3 0 1 8 5 A 4 8 0 4 8 2 2 4 0 1 8 . 5

V L B 3 0 2 2 0 A 4 8 0 5 6 . 4 3 0 4 7 2 2

V L B 3 0 3 0 0 A 4 8 0 7 3 . 2 3 7 6 1 3 0

T h r e e - p h a s e s u p p l y 4 0 0 . . . 4 8 0 V A C 5 0 / 6 0 H z . T h r e e - p h a s e m o t o r o u t p u t

4 8 0 V A C m a x . B u i l t - i n E M C s u p p r e s s o r .

B u i l t - i n d i s p l a y a n d R S 4 8 5 c o m m u n i c a t i o n p o r t

S t a n d a r d D u t y A p p l i c a t i o n

V L B 3 . . .

H e a v y D u t y A p p l i c a t i o n T h r e e - P h a s e

V a r i a b l e S p e e d

D r i v e s

A v a i l a b l e i n s i z e s u p t o 9 0 k W ( s t a n d a r d d u t y ) . P l e a s e r e f e r t o g e n e r a l c a t a l o g u e

V a r i a b l e S p e e d D r i v e s

V L B X C 0 1 D i s p l a y a n d k e y b o a r d ( i n c l u d e d i n c o m p l e t e d r i v e s a b o v e )

V L B X P 0 1 D o o r - m o u n t i n s t a l l a t i o n

V L B X C 0 2 U S B c o m m u n i c a t i o n m o d u l e

V L B X C 0 3 W i - f i c o m m u n i c a t i o n m o d u l e

V L B X S M S . T . O ( S a f e t o r q u e o f f ) m o d u l e

V L B X L 0 1 L o g i c u n i t w i t h c a n O P E N

V L B X L 0 2 L o g i c u n i t w i t h P r o f i B U S

V L B X L 0 3 L o g i c u n i t w i t h P r o f i N E T ( a v a i l a b l e u p o n r e q u e s t )

V L B X L 0 4 L o g i c u n i t w i t h E t h e r c a t ( a v a i l a b l e u p o n r e q u e s t )

V L B X L 0 6 L o g i c u n i t w i t h M o d b u s R T U ( i n c l u d e d i n c o m p l e t e d r i v e s a b o v e )

V L B X C 0 1

V L B X C 0 2

A c c e s s o r i e s O r d e r C o d e D e s c r i p t i o n

S i n g l e - P h a s e

V a r i a b l e S p e e d

D r i v e s

V L B X L . . .

O r d e r c o d e O u t p u t c u r r e n t

[ A ]

3 - p h a s e m o t o r p o w e r a t 2 4 0 V A C

[ k W ] [ H P ]

V L A 1 0 2 A 2 4 0 1 . 7 0 . 2 5 0 . 3 3

V L A 1 0 4 A 2 4 0 2 . 4 0 . 4 0 . 5

V L A 1 0 7 A 2 4 0 4 . 2 0 . 7 5 1

V L A 1 1 5 A 2 4 0 7 . 0 1 . 5 2

V L A 1 2 2 A 2 4 0 9 . 6 2 . 2 3

S i n g l e - p h a s e s u p p l y 2 0 0 . . . 2 4 0 V A C 5 0 / 6 0 H z . T h r e e - p h a s e m o t o r o u t p u t

2 4 0 V A C m a x . B u i l t - i n E M C s u p p r e s s o r , c a t . C 2

V L A 1 . . . M

S i d e b y s i d e i n s t a l l a t i o n

M u l t i p l e u n i t s c a n b e

i n s t a l l e d w i t h o u t s i d e

c l e a r a n c e f o r s p a c e s a v i n g

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1 F o r m o r e i n f o r m a t i o n o n t h e s e p r o d u c t s a n d o t h e r s w i t h i n t h e r a n g e , p l e a s e r e f e r t o t h e g e n e r a l c a t a l o g u e

V L A 1 . . .

1 5

L - S t a r t e r i s o u r U K b r a n d o f f e r i n g a c o m p l e t e r a n g e o f c o m p a c t a n d s t a n d a r d

d i r e c t - o n - l i n e s t a r t e r s w i t h o p t i o n s f o r b u i l t i n i s o l a t o r s a n d r e v e r s i n g

c o n f i g u r a t i o n s u p t o 1 5 k W . B e y o n d t h i s w e h a v e s t a r - d e l t a s t a r t e r s u p t o 7 5 k W

w i t h b u i l t - i n i s o l a t o r o p t i o n s . A l l o u r s t a n d a r d m o d e l s p r o v i d e a m p l e r o o m f o r

e a s e o f i n s t a l l a t i o n a n d c o m e w i t h c l e a r a n d s i m p l e w i r i n g i n s t r u c t i o n s .

A s s e m b l e d i n t h e U K

L - S t a r t e r

O r d e r c o d e C o n t r o l

v o l t a g e

[ V A C ]

M o t o r

p o w e r

a t 4 0 0 V

[ k W ]

H o r s e

p o w e r

[ H P ]

M a x m o t o r

c u r r e n t

A C 3

[ A ]

D i m e n s i o n s

H x W x D

[ m m ]

D O L C 0 . 7 5 2 3 0 2 3 0 0 . 7 5 1 1 . 9

1 7 5 x 8 8 x 1 1 9

D O L C 0 . 7 5 4 0 0 4 0 0

D O L C 1 . 1 2 3 0 2 3 0 1 . 1 1 . 5 2 . 7

D O L C 1 . 1 4 0 0 4 0 0

D O L C 2 . 2 2 3 0 2 3 0 2 . 2 3 . 0 5

D O L C 2 . 2 4 0 0 4 0 0

D O L C 4 . 0 2 3 0 2 3 0 4 5 . 5 8 . 6

D O L C 4 . 0 4 0 0 4 0 0

C o m p a c t d i r e c t o n - l i n e s t a r t e r ( 3 p h a s e ) - C o m p l e t e w i t h f i t t e d

o v e r l o a d r e l a y

D O L C . . .

C o m p a c t D i r e c t

O n - l i n e S t a r t e r s -

O v e r l o a d I n c l u d e d

S p e c i a l S o l u t i o n s

S D S I 1 1 4 1 5 4 0 0 1 1 1 5 2 2

3 0 0 x 3 0 0 x 2 0 0

S D S I 1 5 4 1 5 4 0 0 1 5 2 0 2 8

S D S I 2 2 4 1 5 4 0 0 2 2 3 0 4 2

S D S I 3 0 4 1 5 4 0 0 3 0 4 0 5 6

S D S I 4 5 4 1 5 4 0 0 4 5 6 0 8 3

5 0 0 x 4 0 0 x 2 0 0 S D S I 5 5 4 1 5 4 0 0 5 5 7 5 9 8

S D S I 7 5 4 1 5 4 0 0 7 5 1 0 0 1 3 5

S t a r d e l t a s t a r t e r w i t h i s o l a t o r - O v e r l o a d i n c l u d e d


v o l t a g e

[ V A C ]

M o t o r

p o w e r

a t 4 0 0 V

[ k W ]

H o r s e

p o w e r

[ H P ]

M a x m o t o r

c u r r e n t

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[ A ]

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H x W x D

[ m m ]

S t e e l E n c l o s e d

S t a r - D e l t a S t a r t e r s -

O v e r l o a d I n c l u d e d

S D S I . . .

L - S t a r t e r S o l u t i o n s p r o v i d e s

b e s p o k e s t a r t e r s o l u t i o n s f o r O E M

a n d u n i q u e v o l u m e a p p l i c a t i o n s .

S t a r t e r s c a n b e m a n u f a c t u r e d t o

y o u r b e s p o k e r e q u i r e m e n t s .

I n t h i s i m a g e a r e s t a r t e r s

p r e - w i r e d w i t h p l u g s r e a d y f o r

r a p i d i n s t a l l w i t h e x t e r n a l f i x i n g s

r e m o v i n g t h e n e e d f o r w i r i n g b y

q u a l i f i e d p e r s o n s .

L - S t a r t e r

L-S

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2


v o l t a g e

[ V A C ]

M o t o r

p o w e r

a t 4 0 0 V

[ k W ]

H o r s e

p o w e r

[ H P ]

M a x m o t o r

c u r r e n t

A C 3

[ A ]

D i m e n s i o n s

H x W x D

[ m m ]

D O L C 5 . 5 2 3 0 2 3 0 5 . 5 7 . 5 1 7 5 x 8 8 x 1 1 9 1 2

D O L C 5 . 5 4 0 0 4 0 0

C o m p a c t d i r e c t o n - l i n e s t a r t e r ( 3 p h a s e ) - R e q u i r e s R F 9 … o v e r l o a d r e l a y

D O L S 5 . 5 2 3 0 2 3 0 5 . 5 7 . 5 1 2 1 9 3 x 8 8 x 1 3 4

D O L S 5 . 5 4 0 0 4 0 0

D O L S 7 . 5 2 3 0 2 3 0 7 . 5 1 0 1 8 1 9 3 x 8 8 x 1 3 4

D O L S 7 . 5 4 0 0 4 0 0

D O L S 1 1 2 3 0 2 3 0 1 1 1 5 2 5

2 2 5 x 1 1 0 x 1 4 8 D O L S 1 1 4 0 0 4 0 0

D O L S 1 5 2 3 0 2 3 0 1 5 2 0 2 8 . 5

D O L S 1 5 4 0 0 4 0 0

S t a n d a r d d i r e c t o n - l i n e s t a r t e r ( 3 p h a s e ) - R e q u i r e s R F 3 8 … o v e r l o a d r e l a y

D O L S W 5 . 5 2 3 0 2 3 0

5 . 5 7 . 5 1 2

2 2 5 x 1 1 0 x 1 4 8

D O L S W 5 . 5 4 0 0 4 0 0

D O L S W 7 . 5 2 3 0 2 3 0

7 . 5 1 0 1 8 D O L S W 7 . 5 4 0 0 4 0 0

D O L S W 1 1 2 3 0 2 3 0

1 1 1 5 2 5 D O L S W 1 1 4 0 0 4 0 0

S t a n d a r d d i r e c t o n - l i n e s t a r t e r w i t h i s o l a t o r ( 3 p h a s e )

R e q u i r e s R F 3 8 … o v e r l o a d r e l a y

D O L R 5 . 5 2 3 0 2 3 0

5 . 5 7 . 5 1 2

2 2 5 x 1 1 0 x 1 4 8

D O L R 5 . 5 4 0 0 4 0 0

D O L R 7 . 5 2 3 0 2 3 0

7 . 5 1 0 1 8 D O L R 7 . 5 4 0 0 4 0 0

D O L R 1 1 2 3 0 2 3 0

1 1 1 5 2 5 D O L R 1 1 4 0 0 4 0 0

D i r e c t o n - l i n e r e v e r s i n g s t a r t e r F W D / S T O P / R E V ( 3 p h a s e )

R e q u i r e s R F 3 8 … o v e r l o a d r e l a y

D O L S W . . .

D O L C 5 . 5 . . .

D O L S . . .

B F A 0 0 9 7 0 * 1 6 7 . 5 N o

B F A 0 1 2 7 0 * 2 2 1 1 N o

B F A 0 1 8 7 0 * 2 8 1 5 N o

B F A 0 2 5 7 0 * 3 5 1 8 . 5 N o

B F A 0 2 6 7 0 * 4 3 2 2 N o

B F A 0 3 8 7 0 * 6 0 3 0 N o

O r d e r C o d e T h r e e - p h a s e m o t o r

c o n t r o l . M a x I E C o p e r a t i n g

c u r r e n t ( ≤ 4 4 0 V )

[ A ]

T h e r m a l

o v e r l o a d r e l a y

M o t o r p o w e r a t

4 0 0 V

[ k W ]

C o m p l e t e s t a r - d e l t a s t a r t e r s , o p e n f r a m e f o r s t a r t i n g t i m e u p t o 1 2 s a n d a

m a x i m u m o f 3 0 o p e r a t i o n s / h o u r

B F A 0 0 9 . . . B F A 0 2 5

S t a n d a r d D i r e c t

O n - l i n e S t a r t e r s -

O v e r l o a d N o t

I n c l u d e d

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S t a r - D e l t a

* C o m p l e t e w i t h c o i l v o l t a g e 0 2 4 , 1 1 0 , 2 3 0 , 4 0 0 V A C . O v e r l o a d r e l a y n o t i n c l u d e d

L - S t a r t e r


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Y D 7 . 5 2 3 0 2 3 0 7 . 5 1 0 1 5 . 2

2 2 0 x 2 8 0 x 1 7 0

Y D 7 . 5 4 0 0 4 0 0

Y D 1 1 2 3 0 2 3 0 1 1 1 5 2 2

Y D 1 1 4 0 0 4 0 0

Y D 1 5 2 3 0 2 3 0 1 5 2 0 2 8

Y D 1 5 4 0 0 4 0 0

Y D 2 2 2 3 0 2 3 0 2 2 3 0 4 3

Y D 2 2 4 0 0 4 0 0

Y D 3 0 2 3 0 2 3 0 3 0 4 0 6 0

Y D 3 0 4 0 0 4 0 0

S t a r d e l t a s t a r t e r - R e q u i r e s R F 3 8 … o v e r l o a d r e l a y

Y D S W 7 . 5 2 3 0 2 3 0 7 . 5 1 0 1 5 . 2

2 2 0 x 2 8 0 x 1 7 0

Y D S W 7 . 5 4 0 0 4 0 0

Y D S W 1 1 2 3 0 2 3 0 1 1 1 5 2 2

Y D S W 1 1 4 0 0 4 0 0

Y D S W 1 5 2 3 0 2 3 0 1 5 2 0 2 8

Y D S W 1 5 4 0 0 4 0 0

Y D S W 2 2 2 3 0 2 3 0 2 2 3 0 4 3

Y D S W 2 2 4 0 0 4 0 0

Y D S W 3 0 2 3 0 2 3 0 3 0 4 0 6 0

Y D S W 3 0 4 0 0 4 0 0

S t a r d e l t a s t a r t e r w i t h i s o l a t o r - R e q u i r e s R F 3 8 … o v e r l o a d r e l a y


v o l t a g e

[ V A C ]

M o t o r

p o w e r

a t 4 0 0 V

[ k W ]

H o r s e

p o w e r

[ H P ]

M a x m o t o r

c u r r e n t

A C 3

[ A ]

D i m e n s i o n s

H x W x D

[ m m ]

Y D . . .

Y D S W . . .

S t a r - D e l t a S t a r t e r s


R e l a y s - F o r

D O L C . . . s t a r t e r s

O r d e r c o d e A d j u s t m e n t r a n g e

[ A ]

T h r e e P h a s e

M o t o r a t 4 0 0 V

D O L

[ k W ]

T h r e e P h a s e

M o t o r a t 4 0 0 V

S t a r D e l t a

[ k W ]

R F 9 1 0 . 6 - 1 0 . 3 7 -

R F 9 1 V 5 0 . 9 - 1 . 5 0 . 5 5 -

R F 9 2 V 3 1 . 4 - 2 . 3 0 . 7 5 -

R F 9 3 3 2 - 3 . 3 1 . 1 -

R F 9 5 3 - 5 1 . 5 -

R F 9 7 5 4 . 5 - 7 . 5 2 . 2 -

R F 9 1 0 6 . 3 - 1 0 4 . 0 -

R F 9 1 5 9 - 1 5 5 . 5 -

R F 3 8 0 1 0 0 0 . 6 3 - 1 0 . 2 5 -

R F 3 8 0 1 6 0 1 - 1 . 6 0 . 5 5 -

R F 3 8 0 2 5 0 1 . 6 - 2 . 5 0 . 7 5 -

R F 3 8 0 4 0 0 2 . 5 - 4 1 . 5 2 . 2 - 3

R F 3 8 0 6 5 0 4 - 6 . 5 2 . 2 4

R F 3 8 1 0 0 0 6 . 3 - 1 0 4 5 . 5 - 7 . 5

R F 3 8 1 4 0 0 9 - 1 4 5 . 5 1 1

R F 3 8 1 8 0 0 1 3 - 1 8 7 . 5 1 5

R F 3 8 2 3 0 0 1 7 - 2 3 1 1 1 8 . 5

R F 3 8 3 2 0 0 2 4 - 3 2 1 5 2 2

R F 3 8 3 8 0 0 3 2 ~ 3 8 A 1 8 . 5 3 0

R F 3 8 . . .

* I M P O R T A N T *

F o r D O L s t a r t e r s s e l e c t R F . . . o v e r l o a d r e l a y a b o v e f o r s e t t i n g m o t o r a t

f u l l l o a d c u r r e n t ( F L C )

F o r Y D s t a r - d e l t a s t a r t e r s s e l e c t R F 3 8 . . . o v e r l o a d r e l a y a b o v e f o r

s e t t i n g a t 5 8 % o f f u l l l o a d c u r r e n t ( F L C )

R F 9 . . .


R e l a y s - F o r

D O L S , D O L S W ,

D O L R , Y D a n d

Y D S W . . . s t a r t e r s

L - S t a r t e r

L-S

tart

er


4

S t a n d a r d G R E E N P B “ I ” ( S t a r t )

c / w 1 N O c o n t a c t

S 1 P 1 0 S 1 M 1 0 S 1 S 1 0

S t a n d a r d R E D P B “ O ” ( S t o p )

c / w 1 N C c o n t a c t

S 1 P 0 1 S 1 M 0 1 S 1 S 0 1

D o u b l e t o u c h P B “ I O ” ( S t a r t / S t o p )

c / w 1 N O & 1 N C c o n t a c t s

S 1 P 3 3 S 1 M 3 3 S 1 S 3 3

K e y s w i t c h 2 p o s “ I - O ” c / w 1 N O c o n t a c t S 1 P K 0 2 S 1 M K 0 2 S 1 S K 0 2

K e y s w i t c h 3 p o s “ I - O - I I ” c / w 2 N O c o n t a c t S 1 P K 0 5 S 1 M K 0 5 S 1 S K 0 5

K e y s w i t c h 2 p o s “ I - O ” c / w 1 N O c o n t a c t S 1 P S W 7 S 1 M S W 7 S 1 S W 7

K e y s w i t c h 3 p o s “ I - O - I I ” c / w 2 N O c o n t a c t s S 1 P S W 9 S 1 M S W 9 S 1 S S W 9

D e s c r i p t i o n P l a s t i c

O r d e r C o d e

M e t a l

O r d e r C o d e

S t a i n l e s s

S t e e l

O r d e r

C o d e

S t a n d a r d G R E E N “ I ” P B ’ s ( S t a r t / S t o p ) c / w

1 N O & 1 N C c o n t a c t s

S 2 P 1 0 0 1 S 2 M 1 0 0 1 S 2 S 1 0 0 1

S t a n d a r d G R E E N “ I ” & 4 0 m m m u s h r o o m

t w i s t r e l e a s e P B ’ s ( S t a r t / S t o p )


S 2 P 1 0 7 1 S 2 M 1 0 7 1 S 2 S 1 0 7 1

S t a n d a r d G R E E N “ I ” & 4 0 m m m u s h r o o m

t w i s t r e l e a s e E N 4 1 8 P B ’ s ( S t a r t / E m e r g e n c y

S t o p ) c / w 1 N O & 1 N C c o n t a c t s

S 2 P 1 0 9 1 S 2 M 1 0 9 1 S 2 S 1 0 9 1

2 x s t a n d a r d B L A C K “ ↑ ” & 1 x s t a n d a r d R E D

“ O ” P B ’ s ( F w d / S t o p / R e v )


S 3 P 1 0 1 1 1 0 S 3 M 1 0 1 1 1 0 -

2 x s t a n d a r d B L A C K “ ↑ ” & 1 x 4 0 m m

m u s h r o o m t w i s t r e l e a s e P B ’ s ( F w d / S t o p /

R e v ) c / w 2 N O & 1 N C c o n t a c t s

S 3 P 1 0 7 1 1 0 S 3 M 1 0 7 1 1 0 -

2 x s t a n d a r d B L A C K “ ↑ ” & 1 x 4 0 m m m u s h -

r o o m t w i s t r e l e a s e E N 4 1 8 P B ’ s

( F w d / E m e r g e n c y S t o p / R e v )


S 3 P 1 0 9 1 1 0 S 3 M 1 0 9 1 1 0 -

1 g a n g e n c l o s u r e . G R E Y c o v e r i n P l a s t i c a n d M e t a l v e r s i o n

2 g a n g e n c l o s u r e . G R E Y c o v e r i n P l a s t i c a n d M e t a l v e r s i o n

3 g a n g e n c l o s u r e . G R E Y C o v e r

4 0 m m m u s h r o o m t w i s t r e s e t ( S t o p )


S 1 P Y 7 1 S 1 M Y 7 1 S 1 S 7 1

4 0 m m m u s h r o o m k e y r e s e t ( S t o p )


S 1 P Y 8 1 S 1 M Y 8 1 S 1 S 8 1

4 0 m m m u s h r o o m t w i s t r e s e t ( E m e r g e n c y

S t o p ) c / w 1 N C c o n t a c t

S 1 P Y 9 1 S 1 M Y 9 1 S 1 S 9 1

4 0 m m m u s h r o o m k e y r e s e t ( e m e r g e n c y s t o p )

c / w N C c o n t a c t

S 1 P Y 9 1 K S S 1 M Y 9 1 K S S 1 S 9 1 K S

4 0 m m m u s h r o o m k e y r e s e t ( e m e r g e n c y s t o p )

c / w N C c o n t a c t a n d p a d l o c k a b l e s h r o u d

S 1 P Y 9 1 K S S S 1 M Y 9 1 K S S S 1 S 9 1 K S S

4 0 m m m u s h r o o m p u l l r e s e t ( e m e r g e n c y

s t o p ) c / w N C c o n t a c t

S 1 P Y 9 1 P S 1 M Y 9 1 P S 1 S 9 1 P

4 0 m m m u s h r o o m p u l l r e s e t ( e m e r g e n c y

s t o p ) c / w N C c o n t a c t a n d p a d l o c k a b l e

s h r o u d

S 1 P Y 9 1 P S S 1 M Y 9 1 P S S 1 S 9 1 P S

4 0 m m m u s h r o o m t w i s t r e l e a s e ( e m e r g e n c y

s t o p ) c / w N C c o n t a c t a n d p a d l o c k a b l e

s h r o u d

S 1 P Y 9 1 S S 1 M Y 9 1 S S 1 S 9 1 S

1 g a n g e n c l o s u r e . Y E L L O W c o v e r i n P l a s t i c a n d M e t a l v e r s i o n

S 1 P 1 0

S 1 P Y 9 1

S 2 P 1 0 0 1

S 1 S 9 1

S 1 M Y 7 1

E n c l o s e d C o n t r o l

S t a t i o n s

L - S t a r t e r

L-S

tart

er


5

D e s c r i p t i o n B l a c k

o r d e r c o d e

G r e e n

o r d e r c o d e

R e d

o r d e r c o d e

Y e l l o w

o r d e r c o d e

W h i t e

o r d e r c o d e

B l u e

o r d e r c o d e

F l u s h L P C B 1 0 2 L P C B 1 0 3 L P C B 1 0 4 L P C B 1 0 5 L P C B 1 0 6 L P C B 1 0 8

E x t e n d e d L P C B 2 0 2 L P C B 2 0 3 L P C B 2 0 4 L P C B 2 0 5 L P C B 2 0 6 L P C B 2 0 8

O L P C B 1 1 0 2 - L P C B 1 1 0 4 - - -

I - L P C B 1 1 1 3 - - - L P C B 1 1 1 8

I I - L P C B 1 1 2 3 - - - L P C B 1 1 2 8

L P C B 1 1 4 2 - - - - L P C B 1 1 4 8

L P C B 1 1 5 2 - - - - L P C B 1 1 5 8

O L P C B 2 1 0 2 - L P C B 2 1 0 4 - - -

P u s h b u t t o n a c t u a t o r s ( w i t h o u t m o u n t i n g a d a p t o r s ) Ø 2 2 m m

F l u s h p u s h b u t t o n a c t u a t o r s w i t h s y m b o l s Ø 2 2 m m

E x t e n d e d p u s h b u t t o n a c t u a t o r s w i t h s y m b o l s Ø 2 2 m m

L P C B 2 1 0 . . .

L P C B 1 0 . . .

L P C B 2 0 . . .

L P C B 1 1 0 . . .

L P C B 1 1 4 . . .

H i g h D e g r e e o f P r o t e c t i o n

I P 6 6 , I P 6 7 a n d I P 6 9 K

T h e a c t u a t o r s h a v e b e e n t e s t e d t o

g u a r a n t e e a d e g r e e o f p r o t e c t i o n

p e r I E C / E N I P 6 6 , I P 6 7 , I P 6 9 K

a n d U L T y p e 4 X

L o n g A c t u a t o r M e c h a n i c a l

L i f e

H i g h p e r f o r m a n c e c h a r a c t e r i s t i c s

a s s u r e 5 , 0 0 0 , 0 0 0 c y c l e m e c h a n i c a l

l i f e f o r s p r i n g - r e t u r n a c t u a t o r s ,

1 , 0 0 0 , 0 0 0 f o r d o u b l e a n d t r i p l e

t o u c h u n i t s a n d 3 0 0 , 0 0 0 f o r

e m e r g e n c y - s t o p t y p e s

M a t e r i a l s R e s i s t a n t

t o O i l s , S o l v e n t s &

H y d r o c a r b o n s

A c t u a t o r f i x i n g i s o b t a i n e d

u s i n g i t s t h r e a d e d r i n g ,

e a s i l y r o t a t e d b y h a n d .

Ø 2 2 m m r i n g f i x i n g

Q u i c k a n d E a s y I n s t a l l a t i o n

D i v e r s e R a n g e

A v a r i e t y o f b u t t o n s a p p r o p r i a t e

f o r m a n y d i f f e r e n t f u n c t i o n s

U s a g e a t E x t r e m e

T e m p e r a t u r e C o n d i t i o n s

O p e r a t i o n t e m p e r a t u r e

b e t w e e n – 2 5 a n d + 7 0 O C

E l e c t r i c a l c o n t a c t a n d L E D

e l e m e n t s a r e s n a p p e d o n t o

t h e m o u n t i n g a d a p t e r .

U p t o 9 e l e m e n t s c a n b e

m o u n t e d o n a s i n g l e a d a p t e r

T h e m o u n t i n g a d a p t e r s

a n d a c t u a t o r s h a v e c l e a r

v i s i b l e r e f e r e n c e i n d i c a t o r s

m a k i n g t h e s n a p - o n f i t t i n g

s i m p l e

T h e a n t i - r o t a t i o n f a s t e n e r

p r e v e n t s a c t u a t o r r o t a t i o n

o n t h e m o u n t i n g s u r f a c e

a n d p r o v i d e s a n o r i e n t a t i o n

r e f e r e n c e p o i n t

S p r i n g R e t u r n

P u s h b u t t o n s & S e l e c t o r S w i t c h e s

Pu

sh

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tto

ns


6

D e s c r i p t i o n B l a c k o r d e r

c o d e

G r e e n o r d e r

c o d e

R e d o r d e r

c o d e

Ø 4 0 m m L P C B 6 1 4 2 L P C B 6 1 4 3 L P C B 6 1 4 4

S p r i n g R e t u r n ( w i t h o u t m o u n t i n g a d a p t o r s ) Ø 2 2 m m

L a t c h , t u r n t o r e l e a s e ( w i t h o u t m o u n t i n g a d a p t o r s ) Ø 2 2 m m

F o r n o r m a l s t o p p i n g Ø 4 0 m m L P C B 6 7 4 2 - -

F o r e m e r g e n c y s t o p p i n g

I S O 1 3 8 5 0 c o m p l i a n t Ø 4 0 m m

- - L P C B 6 7 4 4

L a t c h , p u l l t o r e l e a s e ( w i t h o u t m o u n t i n g a d a p t o r s ) Ø 2 2 m m

F o r n o r m a l s t o p p i n g Ø 4 0 m m L P C B 6 3 4 2 - L P C B 6 3 4 4



- - L P C B 6 6 3 4



- - L P C B 6 6 4 4

L a t c h , t u r n k e y t o r e l e a s e . K e y c o d e n o 4 5 5 ( w i t h o u t m o u n t i n g a d a p t o r s ) Ø 2 2 m m

F o r n o r m a l s t o p p i n g Ø 4 0 m m L P C B 6 8 4 2 - -



- - L P C B 6 8 4 4

D e s c r i p t i o n B l a c k / R e d

o r d e r c o d e

G r e e n / R e d

o r d e r c o d e

W h i t e / B l a c k

o r d e r c o d e

N o s y m b o l L P C B 7 2 1 2 L P C B 7 2 1 3 L P C B 7 2 1 4

I - O L P C B 7 2 2 2 L P C B 7 2 2 3 L P C B 7 2 2 4

S t a r t / S t o p - L P C B 7 2 3 3 -

O n e e x t e n d e d a n d o n e f l u s h p u s h b u t t o n ( w i t h o u t m o u n t i n g a d a p t o r ) .

Ø 2 2 m m . B o t h s p r i n g r e t u r n

D e s c r i p t i o n B l a c k / R e d G r e e n / R e d W h i t e / B l a c k

I

S T O P

I I

- L P C B 7 3 4 5 -

S T O P

- L P C B 7 3 5 5 -

S T O P

- L P C B 7 3 6 5 -

S T O P

- L P C B 7 3 7 5 -

O n e e x t e n d e d m i d d l e b u t t o n ( w i t h o u t m o u n t i n g a d a p t o r ) . S p r i n g r e t u r n

Ø 2 2 m m

L P C B 6 1 4 . . .

L P C B 6 7 4 . . .

L P C B 6 6 3 4

L P C B 6 8 4 . . .

L P C B 7 2 . . .

L P C B 7 3 7 5

L P C B 7 3 5 5

O t h e r c o l o u r s a v a i l a b l e . P l e a s e s e e t h e g e n e r a l c a t a l o g u e

M u s h r o o m H e a d

D o u b l e - t o u c h

T r i p l e - t o u c h


Pu

sh

bu

tto

ns


7

A c t i v a t i o n o f t h e m i d d l e c o n t a c t s i s c o u p l e d t o t h e

s i d e c o n t a c t s ; t h e r e l a t i v e m e c h a n i s m p i n s a r e

s t a n d a r d s u p p l i e d .

T h e m i d d l e c o n t a c t a c t i v a t i o n , w i t h r e s p e c t t o t h e

r i g h t a n d l e f t s i d e c o n t a c t , c a n b e c h a n g e d b y t h e

u s e r , i f r e q u i r e d , b y r e m o v i n g o n e o r b o t h

m e c h a n i s m p i n s .

T y p e o f p o s i t i o n s R e g u l a r l e v e r

o r d e r c o d e

L o n g l e v e r

o r d e r c o d e

K n o b

o r d e r c o d e

L P C S 1 2 0 L P C S 2 2 0 L P C S 4 2 0

L P C S 1 2 1 L P C S 2 2 1 L P C S 4 2 1

2 p o s i t i o n ( w i t h o u t m o u n t i n g a d a p t o r s ) Ø 2 2 m m


L P C S 1 3 0 L P C S 2 3 0 L P C S 4 3 0

L P C S 1 3 1 L P C S 2 3 1 L P C S 4 3 1

L P C S 1 3 2 L P C S 2 3 2 L P C S 4 3 2

L P C S 1 3 3 L P C S 2 3 3 L P C S 4 3 3

L P C S 3 2 0

L P C S 3 2 1

L P C S 3 4 0

T y p e o f p o s i t i o n s O r d e r c o d e

L P C S 3 3 0

L P C S 3 3 1

L P C S 3 3 2

L P C S 3 3 3

L P C S 3 5 0

L P C S 3 6 0

L P C S 3 7 0

L P C S 3 8 0

L P C S 3 9 0



L P C S 1 . . .

L P C S 2 . . .

L P C S 4 . . .

L P C S 3 . . .

S e l e c t o r S w i t c h

A c t u a t o r s

S e l e c t o r S w i t c h

A c t u a t o r s K e y

A c t i v a t i o n o f t h e m i d d l e c o n t a c t s i s c o u p l e d t o t h e

s i d e c o n t a c t s ; t h e r e l a t i v e m e c h a n i s m p i n s a r e

s t a n d a r d s u p p l i e d .

T h e m i d d l e c o n t a c t a c t i v a t i o n , w i t h r e s p e c t t o t h e

r i g h t a n d l e f t s i d e c o n t a c t , c a n b e c h a n g e d b y t h e

u s e r , i f r e q u i r e d , b y r e m o v i n g o n e o r b o t h

T y p e o f p o s i t i o n

M a i n t a i n e d p o s i t i o n

S p r i n g r e t u r n p o s i t i o n

K e y e x t r a c t i o n p o s i t i o n





Pu

sh

bu

tto

ns


8

I l l u m i n a t e d

S e l e c t o r

S w i t c h

D e s c r i p t i o n G r e e n

o r d e r c o d e

R e d

o r d e r c o d e

Y e l l o w

o r d e r c o d e

B l u e

o r d e r c o d e

T r a n s p a r e n t

o r d e r c o d e

F l u s h L P C B L 1 0 3 L P C B L 1 0 4 L P C B L 1 0 5 L P C B L 1 0 6 L P C B L 1 0 7

E x t e n d e d L P C B L 2 0 3 L P C B L 2 0 4 L P C B L 2 0 5 L P C B L 2 0 6 L P C B L 2 0 7


o r d e r c o d e

R e d

o r d e r c o d e

Y e l l o w

o r d e r c o d e

B l u e

o r d e r c o d e

W h i t e

o r d e r c o d e

Ø 4 0 m m L P C B L 6 1 4 3 L P C B L 6 1 4 4 L P C B L 6 1 4 5 L P C B L 6 1 4 6 L P C B L 6 1 4 8

F o r n o r m a l s t o p p i n g

Ø 4 0 m m

L P C B L 6 6 4 3 - L P C B L 6 6 4 5 L P C B L 6 6 4 6 -

F o r e m e r g e n c y

s t o p p i n g I S O 1 3 8 5 0

c o m p l i a n t Ø 4 0 m m

- L P C B L 6 6 4 4 - - -

S p r i n g R e t u r n ( w i t h o u t m o u n t i n g a d a p t o r s ) Ø 2 2 m m

L a t c h , t u r n t o r e l e a s e ( w i t h o u t m o u n t i n g a d a p t o r s ) Ø 2 2 m m

D e s c r i p t i o n B l a c k / R e d

o r d e r c o d e

G r e e n / R e d

o r d e r c o d e

W h i t e / B l a c k

o r d e r c o d e

N o s y m b o l L P C B L 7 2 1 2 L P C B L 7 2 1 3 L P C B L 7 2 1 4

I - O L P C B L 7 2 2 2 L P C B L 7 2 2 3 L P C B L 7 2 2 4

S t a r t / S t o p - L P C B L 7 2 3 3 -

O n e e x t e n d e d a n d o n e f l u s h p u s h b u t t o n ( w i t h o u t m o u n t i n g a d a p t o r ) Ø 2 2 m m .

B o t h s p r i n g r e t u r n

L P C B L 7 2 . . .


o r d e r c o d e

R e d

o r d e r c o d e

Y e l l o w

o r d e r c o d e

B l u e

o r d e r c o d e

W h i t e

o r d e r c o d e

L P C S L 1 2 0 3 L P C S L 1 2 0 4 L P C S L 1 2 0 5 L P C S L 1 2 0 8 L P C S L 1 2 0 6








L P C B L 1 0 . . .

L P C B L 6 1 4 . . .

L P C S L 1 2 . . .

L P C S L 1 3 . . .


B u t t o n S p r i n g

R e t u r n P u s h b u t t o n a c t u a t o r s ( w i t h o u t m o u n t i n g a d a p t o r s ) Ø 2 2 m m


M u s h r o o m

H e a d

D o u b l e - T o u c h

W i t h W h i t e

I n d i c a t o r

A c t i v a t i o n o f t h e m i d d l e c o n t a c t s i s c o u p l e d t o t h e s i d e

c o n t a c t s ; t h e r e l a t i v e m e c h a n i s m p i n s a r e s t a n d a r d

s u p p l i e d .

T h e m i d d l e c o n t a c t a c t i v a t i o n , w i t h r e s p e c t t o t h e r i g h t

a n d l e f t s i d e c o n t a c t , c a n b e c h a n g e d b y t h e u s e r , i f

r e q u i r e d , b y r e m o v i n g o n e o r b o t h m e c h a n i s m p i n s .





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9

L P C D 0 1

G r e e n

o r d e r c o d e

R e d

o r d e r c o d e

Y e l l o w

o r d e r c o d e

B l u e

o r d e r c o d e


o r d e r c o d e


o r d e r c o d e *

L P L 3 L P L 4 L P L 5 L P L 6 L P L 7 L P L 1 1 8 7

S u p p l y

V o l t a g e

G r e e n

o r d e r c o d e

R e d

o r d e r c o d e

Y e l l o w

o r d e r c o d e

B l u e

o r d e r c o d e


o r d e r c o d e

O r a n g e

o r d e r c o d e

1 2 V A C / D C L P M L A 3 L P M L A 4 L P M L A 5 L P M L A 6 L P M L A 7 L P M L A 1

2 4 V A C / D C L P M L B 3 L P M L B 4 L P M L B 5 L P M L B 6 L P M L B 7 L P M L B 1

4 8 V A C / D C L P M L D 3 L P M L D 4 L P M L D 5 L P M L D 6 L P M L D 7 L P M L D 1

1 1 0 V A C L P M L E 3 L P M L E 4 L P M L E 5 L P M L E 6 L P M L E 7 L P M L E 1

2 3 0 V A C L P M L M 3 L P M L M 4 L P M L M 5 L P M L M 6 L P M L M 7 L P M L M 1

L P C P A 0 0 1 1 k Ω

L P C P A 0 0 2 2 . 5 k Ω

L P C P A 0 0 5 5 k Ω

L P C P A 0 1 0 1 0 k Ω

L P C P A 0 5 0 5 0 k Ω

L P C P A 1 0 0 1 0 0 k Ω

L P C P A 5 0 0 5 0 0 k Ω

O r d e r c o d e R e s i s t a n c e v a l u e

L P C Z S A 9 . . . 1 5 V A C / D C 9 0

L P C Z S B 1 8 . . . 3 0 V A C / D C 9 0

L P C Z S E 8 5 . . . 1 4 0 V A C / D C 9 0

L P C Z S M 1 8 5 . . . 2 6 5 V A C / D C 9 0

O r d e r c o d e V o l t a g e S o u n d i n t e n s i t y a t 2 8 0 0 H z

L P C Z S A I P 9 . . . 1 5 V A C / D C 8 0

L P C Z S B I P 1 8 . . . 3 0 V A C / D C 8 0

L P C Z S E I P 8 5 . . . 1 4 0 V A C / D C 8 0

L P C Z S M I P 1 8 5 . . . 2 6 5 V A C / D C 8 0

C o n t i n u o u s o r p u l s e t o n e , I P 4 0 v e r s i o n Ø 2 2 m m

C o n t i n u o u s o r p u l s e t o n e , I P 6 6 , I P 6 7 , I P 6 9 K Ø 2 2 m m

L P C D 0 1 U S B i n t e r f a c e , A / A f e m a l e t y p e c o n n e c t i o n

L P C D 0 3 U S B i n t e r f a c e , A / B f e m a l e t y p e c o n n e c t i o n

L P C D 0 5 U S B i n t e r f a c e , B / A f e m a l e t y p e c o n n e c t i o n

L P C D 0 6 R J 4 5 i n t e r f a c e , E t h e r n e t c o n n e c t i o n t y p e

O r d e r c o d e D e s c r i p t i o n

L P L . . .

L P M . . .

L P C P A . . .

L P C Z S . . .

L P C Z S . . . I P

L E D

M o n o b l o c k

P i l o t L i g h t s

S t e a d y L i g h t

M o n o b l o c k

P o t e n t i o m e t e r s

M o n o b l o c k

B u z z e r s

U S B a n d R J 4 5

C o m m u n i c a t i o n

I n t e r f a c e s

P i l o t L i g h t H e a d s


* W i t h s y m b o l i n d i c a t i n g d a n g e r o u s v o l t a g e





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1 0

L P X A U 1 0 0 L a b e l h o l d e r f o r e n g r a v e d p l a s t i c L P X A U 1 0 9 l a b e l

L P X A U 1 0 9 E n g r a v a b l e s i l v e r p l a s t i c l a b e l t o u s e w i t h L P X A U 1 0 0

h o l d e r

L P X A U 1 0 5 L a b e l h o l d e r f o r e n g r a v e d p l a s t i c L P X A U 1 0 8 h o l d e r

L P X A U 1 0 8 E n g r a v a b l e s i l v e r p l a s t i c l a b e l t o u s e w i t h L P X A U 1 0 5

h o l d e r

L P X A U 1 3 7 C l e a r r u b b e r b o o t f o r f l u s h b u t t o n L P C B 1 / B L 1 / R 1 . . .

L P X A U 1 4 7 C l e a r r u b b e r b o o t f o r b u t t o n s L P C B 2 / 3 … , L P C B L 2 …

a n d L P C R 2 …

L P X A U 1 5 7 R u b b e r b o o t f o r d o u b l e a n d t r i p l e - t o u c h b u t t o n s ,

t r a n s p a r e n t

L P X A U 1 5 8 P a d l o c k a b l e p r o t e c t i o n , Ø 5 - 8 m m l o c k s o r b u t t o n s L P C

B 6 6 / 6 7 / 6 8 / B L 6 6 4 … ; F O R L P C B 6 3 4 . . . Ø 5 - 6 m m l o c k s

o n l y

L P X A U 1 5 9 S h r o u d f o r b u t t o n s L P C B 6 3 … , L P C B 6 6 / 6 7 / 6 8 B L 6 6 6

L P X D I N A d a p t o r f o r m o u n t i n g L P C . . . b u t t o n s o n D I N r a i l

3 5 m m w i d e ( 2 m o d u l e s )


8 L M 2 T A U 2 0 6 B l a n k f o r w r i t i n g

8 L M 2 T A U 2 0 7 S h e e t w i t h 1 0 8 l a b e l s

f o r l a s e r p r i n t i n g

8 L M 2 T A G B 2 1 1 O P E N

8 L M 2 T A G B 2 1 2 S T O P

8 L M 2 T A G B 2 1 4 S T O P R E S E T

8 L M 2 T A G B 2 1 5 F O R W A R D

8 L M 2 T A G B 2 1 6 C L O S E

8 L M 2 T A G B 2 1 8 L O W E R

8 L M 2 T A G B 2 2 1 O F F

8 L M 2 T A G B 2 2 2 R E V E R S E

8 L M 2 T A G B 2 2 3 O N

8 L M 2 T A G B 2 2 5 S T A R T

8 L M 2 T A G B 2 2 6 R E S E T

8 L M 2 T A G B 2 2 7 R A I S E


8 L M 2 T A I 2 3 3 A U T O - M A N

8 L M 2 T A I 2 3 4 A U T O - O - M A N

8 L M 2 T A I 2 4 2 M A N - O - A U T O

8 L M 2 T A I 2 3 5 F W D - O - R E V

8 L M 2 T A I 2 3 6 O N - O F F

8 L M 2 T A I 2 4 1 M A N - A U T O

8 L M 2 T A G B 2 3 2 S T O P - S T A R T

8 L M 2 T A G B 2 3 6 O F F - O N

F o r s e l e c t o r s w i t c h e s

F o r t h e c o m p l e t e r a n g e o f l a b e l s p l e a s e s e e t h e

g e n e r a l c a t a l o g u e


L P X A U 1 0 0

L P X A U 1 5 8

L P X D I N

8 L M 2 T A G B 2 3 0

P u s h b u t t o n


L a b e l s w i t h

T e x t f o r L P X

A U 1 0 0

L e g e n d

H o l d e r

G e n e r a l u s e


F o r m o r e i n f o r m a t i o n o n t h e s e p r o d u c t s a n d o t h e r s w i t h i n t h e r a n g e , p l e a s e r e f e r t o t h e g e n e r a l c a t a l o g u e 2

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1 1

L P X A U 1 2 0

L P X A U 1 2 0 M o u n t i n g A d a p t e r


L P X C 1 0 N O ( N o r m a l l y o p e n )

L P X C 1 0 A E M ( E a r l y m a k e )

L P X C 0 1 N C ( N o r m a l l y c l o s e d )

L P X C 0 1 D L B ( L a t e b r e a k )


L P X C 0 1 S M 1 N C ( N o r m a l l y c l o s e d )

L P X C 0 2 S M 2 N C ( N o r m a l l y c l o s e d )

L P X T 1 0 0 U s e w i t h L E D e l e m e n t s i n A C / D C , t y p e s L P X L E … ( a l l ) ,

L P X L F B … , L P X L P B a n d L P X L P S B

L P X T 1 0 1 U s e w i t h L E D e l e m e n t s A T 8 5 - 1 4 0 V A C f o r t y p e s

L P X L F E … , L P X L P E . . . a n d L P X L P S E . . .

L P X T 1 0 2 U s e w i t h L E D e l e m e n t s A T 1 8 5 - 2 6 5 V A C f o r t y p e s

L P X L F M … , L P X L P M . . . a n d L P X L P S M . . .


S c r e w t e r m i n a t i o n . W i t h o u t m o u n t i n g a d a p t e r

S c r e w t e r m i n a t i o n . W i t h o u t m o u n t i n g a d a p t e r . A u t o - m o n i t o r c o n t a c t

e l e m e n t s f o r n o n - i l l u m i n a t e d l a t c h m u s h r o o m - h e a d p u s h b u t t o n s

L P X C . . .

L P X C 0 1 S M L P X C 0 2 S M

L P X T . . .

L P X A U 1 1 5 E m e r g e n c y S t o p Ø 6 0 m m

L P X A U 1 2 3 W i t h I E C 6 0 4 1 7 - 5 6 3 8 s y m b o l Ø 6 0 m m


L P X A U 1 1 5

P l a s t i c D i s k f o r

M u s h r o o m H e a d

P u s h b u t t o n s

M o u n t i n g A d a p t e r

C o n t a c t E l e m e n t s

T e s t E l e m e n t s f o r

S t e a d y - l i g h t L E D

E l e m e n t s

L P X A U 1 2 3

F o r u s e w i t h L P C . . . a c t u a t o r s a n d L P L . . . p i l o t l i g h t h e a d s


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2 5 F o r m o r e i n f o r m a t i o n o n t h e s e p r o d u c t s a n d o t h e r s w i t h i n t h e r a n g e , p l e a s e r e f e r t o t h e g e n e r a l c a t a l o g u e

1 2

L P X L F . . .

L P X C B 1 0 N O ( N o r m a l l y o p e n )

L P X C B 0 1 N C ( N o r m a l l y c l o s e d )



o r d e r c o d e

R e d

o r d e r c o d e

Y e l l o w

o r d e r c o d e

B l u e

o r d e r c o d e

W h i t e

o r d e r c o d e

1 2 . . . 3 0 V A C / D C L P X L P B B 3 L P X L P B B 4 L P X L P B B 5 L P X L P B B 6 L P X L P B B 8

8 5 . . . 1 4 0 V A C L P X L P B E 3 L P X L P B E 4 L P X L P B E 5 L P X L P B E 6 L P X L P B E 8

1 8 5 . . . 2 6 5 V A C L P X L P B M 3 L P X L P B M 4 L P X L P B M 5 L P X L P B M 6 L P X L P B M 8

S c r e w t e r m i n a t i o n . D i r e c t s n a p - o n m o u n t i n g o n L P Z . . . c o n t r o l s t a t i o n b a s e

L P X C B . . . .

L P X L P B . . .


o r d e r c o d e

R e d

o r d e r c o d e

Y e l l o w

o r d e r c o d e

B l u e

o r d e r c o d e

W h i t e

o r d e r c o d e

1 2 . . . 3 0 V A C / D C L P X L P B 3 L P X L P B 4 L P X L P B 5 L P X L P B 6 L P X L P B 8

8 5 . . . 1 4 0 V A C L P X L P E 3 L P X L P E 4 L P X L P E 5 L P X L P E 6 L P X L P E 8

1 8 5 . . . 2 6 5 V A C L P X L P M 3 L P X L P M 4 L P X L P M 5 L P X L P M 6 L P X L P M 8

1 2 . . . 3 0 V A C / D C L P X L E B 3 L P X L E B 4 L P X L E B 5 L P X L E B 6 L P X L E B 8

8 5 . . . 1 4 0 V A C L P X L E E 3 L P X L E E 4 L P X L E E 5 L P X L E E 6 L P X L E E 8

1 8 5 . . . 2 6 5 V A C L P X L E M 3 L P X L E M 4 L P X L E M 5 L P X L E M 6 L P X L E M 8

S t e a d y l i g h t , s c r e w t e r m i n a t i o n . S u p p l i e d w i t h o u t m o u n t i n g a d a p t e r . S i m p l e p r o t e c t i o n

1 2 . . . 3 0 V A C / D C L P X L F B 3 L P X L F B 4 L P X L F B 5 L P X L F B 6 L P X L F B 8

8 5 . . . 1 4 0 V A C L P X L F E 3 L P X L F E 4 L P X L F E 5 L P X L F E 6 L P X L F E 8

1 8 5 . . . 2 6 5 V A C L P X L F M 3 L P X L F M 4 L P X L F M 5 L P X L F M 6 L P X L F M 8

F l a s h i n g l i g h t , s c r e w t e r m i n a t i o n . S u p p l i e d w i t h o u t m o u n t i n g a d a p t e r . T o t a l p r o t e c t i o n

L P X L E . . .

L P X L P . . .

L E D

E l e m e n t s S t e a d y l i g h t , s c r e w t e r m i n a t i o n . S u p p l i e d w i t h o u t m o u n t i n g a d a p t e r . T o t a l p r o t e c t i o n

C o n t a c t E l e m e n t s ,

B a s e M o u n t o n

L P Z P P l a s t i c

C o n t r o l S t a t i o n s

L E D E l e m e n t s

B a s e M o u n t o n

L P Z P P l a s t i c

C o n t r o l S t a t i o n s

S t e a d y l i g h t . S c r e w t e r m i n a t i o n . D i r e c t s n a p - o n m o u n t i n g o n L P Z . . . c o n t r o l s t a t i o n

b a s e

F o r u s e L P Z P . . . P l a s t i c c o n t r o l s t a t i o n s o n l y

F o r u s e L P Z P . . . P l a s t i c c o n t r o l s t a t i o n s o n l y


2 6

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L P Z M 4 C A 8 L P Z M 1 2 C A 8

F o r 1 a c t u a t o r L P Z P 1 A 5 L P Z P 1 A 8 7 2 x 7 2 x 5 6

F o r 2 a c t u a t o r s L P Z P 2 A 5 L P Z P 2 A 8 1 1 7 x 7 2 x 5 6

F o r 3 a c t u a t o r s - L P Z P 3 A 8 1 5 1 x 7 2 x 5 6




D e s c r i p t i o n Y e l l o w o r d e r c o d e G r e y o r d e r c o d e D i m e n s i o n s

F o r 1 a c t u a t o r L P Z M 1 A 5 L P Z M 1 A 8 8 0 x 8 0 x 7 3

F o r 1 a c t u a t o r w i t h

s h r o u d

L P Z M 1 A 5 P - 8 0 x 8 0 x 1 0 8

F o r 2 a c t u a t o r s L P Z M 2 A 5 L P Z M 2 A 8 8 0 x 1 3 0 x 7 3

F o r 3 a c t u a t o r s - L P Z M 3 A 8 8 0 x 1 7 0 x 7 3


F o r 4 a c t u a t o r s - L P Z M 4 C A 8 8 0 x 1 3 0 x 7 3





F o r 1 2 a c t u a t o r s - L P Z M 1 2 C A 8 1 7 0 x 1 9 0 x 9 0

F o r 1 6 a c t u a t o r s - L P Z M 1 6 C A 8 1 9 0 x 2 5 0 x 9 0


L P Z P 1 A 5 L P Z P 2 A 8

L P Z M 1 A 5 P L P Z M 1 A 8

F o r 1 a c t u a t o r L P Z M 1 E 5 L P Z M 1 E 8 8 0 x 8 0 x 7 3

F o r 2 a c t u a t o r s - L P Z M 2 E 8 8 0 x 1 3 0 x 7 3



F o r 8 a c t u a t o r s - L P Z M 5 E 8 1 6 0 x 1 6 0 x 9 0

F o r 1 2 a c t u a t o r s - L P Z M 6 E 8 1 7 0 x 1 9 0 x 9 0

F o r 1 6 a c t u a t o r s - L P Z M 7 E 8 1 9 0 x 2 5 0 x 9 0


P l a s t i c C o n t r o l

S t a t i o n s

M e t a l C o n t r o l

S t a t i o n s

M e t a l

E n c l o s u r e s

U s e L P X C B … a n d L P X L P B . . . b a s e m o u n t e l e m e n t s

U s e L P X A U 1 2 0 f r o n t m o u n t e d c o n t a c t a n d L E D e l e m e n t s

L P Z M 1 E 5 L P Z M 4 E 8

C o n t r o l S t a t i o n s & E n c l o s u r e s

E m p t y

E n c l o s u r e s M 0 N M o u l d e d d i n r a i l 1 8 4 x 8 8 x 1 1 9 . 5

M 1 N M o u l d e d d i n r a i l 2 0 2 x 8 8 x 1 3 4 . 5

M 2 N M o u l d e d d i n r a i l 2 3 4 x 1 1 0 x 1 4 8 . 5

M 2 4 N S t e e l m o u n t i n g p l a t e ( i n c . ) 2 1 0 x 1 7 5 x 9 8 . 5

M 2 5 N S t e e l m o u n t i n g p l a t e ( i n c . ) 2 1 0 x 1 7 5 x 1 5 8 . 5

M 3 N S t e e l m o u n t i n g p l a t e 2 8 0 x 2 2 0 x 1 7 0

O r d e r c o d e I n t e r n a l m o u n t i n g D i m e n s i o n s

[ m m ]

M X 3 0 - 1 8 5 W x 2 4 0 H

M e t a l m o u n t i n g p l a t e f o r M 3 N e n c l o s u r e

M 0 N M 3 N

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1 4

8 L T 4 K 0 2 B G G r e e n , r e d , 2 4 V D C

8 L T 4 K 0 3 B G G r e e n , r e d w i t h c o n t i n u o u s o r p u l s e d s o u n d , 2 4 V D C

8 L T 4 K 0 4 B G G r e e n , o r a n g e , r e d , 2 4 V D C

8 L T 4 K 0 5 B G G r e e n , o r a n g e , r e d w i t h c o n t i n u o u s o r p u l s e d s o u n d ,

S t e a d y l i g h t a n d p u l s e d o r c o n t i n u o u s s o u n d l i g h t m o d u l e s . B u i l t - i n L E D

l a m p s


8 L T 7 3 B 9 A G r e e n , o r a n g e , r e d , 2 4 V D C

8 L T 7 3 S 2 B 9 A G r e e n , r e d w i t h c o n t i n u o u s o r p u l s e d s o u n d , 2 4 V D C

8 L T 7 3 B 9 B B l u e , o r a n g e , r e d , 2 4 V D C

8 L T 7 3 S 2 B 9 B B l u e , r e d w i t h c o n t i n u o u s o r p u l s e d s o u n d , 2 4 V D C


S t e a d y l i g h t a n d p u l s e d o r c o n t i n u o u s s o u n d m u l t i c o l o u r e d l i g h t m o d u l e s .

B u i l t - i n L E D l a m p s

8 L T 7 B P 0 1 G

( P l a s t i c )

8 L T 7 T M …

( M e t a l )

8 L T 7 B M 0 1

( M e t a l )

8 L T 7 B M 0 2

( M e t a l )

8 L T 7 B P 0 2 G

( P l a s t i c )

8 L T 7 C M 0 1 … ( M e t a l )

8 L T 7 C P 0 1 … ( P l a s t i c )

C o m b i n a t i o n s

S m a l l e r D i m e n s i o n s

T h a n k s t o t h e s m a l l e r d i m e n s i o n o f j u s t

4 5 m m c o m p a r e d t o t h e a l r e a d y a v a i l a b l e

8 L T 7 s e r i e s 7 0 m m s i g n a l t o w e r s , t h e y a r e

p a r t i c u l a r l y s u i t a b l e f o r f i t t i n g o n s m a l l

m a c h i n e r i e s , o f f e r i n g b e t t e r p r o p o r t i o n

w i t h t h e s i z e o f t h e m a c h i n e .

M u l t i c o l o u r e d S i g n a l T o w e r s

I n c o r p o r a t e t h e p o s s i b i l i t y o f u p t o

t h r e e d i f f e r e n t c o l o u r s i n a s i n g l e

m o d u l e . I n t h e e v e n t o f t w o o r m o r e

a l a r m s , t h e m u l t i - c o l o u r e d m o d u l e

l i g h t s u p i n a l t e r n a t i n g c o l o u r s

c o r r e s p o n d i n g t o t h e e v e n t .

8 L T 7 3 S . . . 8 L T 7 3 B . . .

4 5 m m s i g n a l t o w e r s

s u p p l i e d a l r e a d y f i t t e d

w i t h L E D l a m p s

8 L T 4 K 0 2 B G 8 L T 4 K 0 5 B G

8 L T 7 3 S . . . 8 L T 7 3 B . . .

S i g n a l T o w e r s

Ø 4 5 m m

M u l t i c o l o u r e d


Ø 7 0 m m

A c c e s s o r i e s a n d s p a r e p a r t s

8 L T 7 B P 0 1 G H o r i z o n t a l s u r f a c e m o u n t , p l a s t i c g r e y c o l o u r w i t h

1 0 0 m m e x t e n s i o n . A v a i l a b l e i n b l a c k

8 L T 7 B P 0 2 G V e r t i c a l w a l l m o u n t , p l a s t i c , g r e y . A v a i l a b l e i n b l a c k

8 L T 7 T M … E x t e n s i o n t u b e f o r m e t a l b a s e . A v a i l a b l e i n s i z e s

1 2 0 m m / 2 2 0 m m / 3 2 0 m m / 4 2 0 m m / 5 2 0 m m / 1 0 2 0 m m

8 L T 7 B M 0 1 H o r i z o n t a l s u r f a c e m o u n t , m e t a l , b l a c k

8 L T 7 B M 0 2 W a l l m o u n t , m e t a l

A c c e s s o r i e s a n d s p a r e p a r t s

8 L T 7 B P 0 1 G H o r i z o n t a l s u r f a c e m o u n t , p l a s t i c g r e y c o l o u r w i t h

1 0 0 m m e x t e n s i o n . A v a i l a b l e i n b l a c k

8 L T 7 B P 0 2 G V e r t i c a l w a l l m o u n t , p l a s t i c , g r e y . A v a i l a b l e i n b l a c k

8 L T 7 T M … E x t e n s i o n t u b e f o r m e t a l b a s e . A v a i l a b l e i n s i z e s

1 2 0 m m / 2 2 0 m m / 3 2 0 m m / 4 2 0 m m / 5 2 0 m m / 1 0 2 0 m m

8 L T 7 B M 0 1 H o r i z o n t a l s u r f a c e m o u n t , m e t a l , b l a c k

8 L T 7 B M 0 2 W a l l m o u n t , m e t a l

S i g n a l T o w e r s & B e a c o n s

2 8

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1 5

8 L T 7 E L 1 O r a n g e

8 L T 7 E L 3 G r e e n

8 L T 7 E L 4 R e d

8 L T 7 E L 5 Y e l l o w

8 L T 7 E L 6 B l u e

8 L T 7 E L 8 W h i t e

O r d e r c o d e D e s c r i p t i o n S i g n a l T o w e r s

Ø 7 0 m m S t e a d y l i g h t m o d u l e s . B A 1 5 d f i t t i n g . B u l b ( 8 L T 7 A L B … . a n d 8 L T 7 A L L … )

n o t i n c l u d e d

L T 7 L . . .

C o n n e c t i o n m o d u l e

L T 7 C M 0 1 ( M E T A L )

L T 7 C P 0 1 ( P L A S T I C )

S o u n d m o d u l e

L T 7 S . . .

C o v e r

( s u p p l i e d w i t h

L T 7 C M 0 1 a n d

L T 7 C P 0 1

m o d u l e )

L T 7 B P 0 1

( P L A S T I C )

L T 7 T M

( M E T A L )

L T 7 B M 0 1

( M E T A L )

L T 7 B M 0 2

( M E T A L )

L T 7 B P 0 2

( P L A S T I C )

L T 7 A L B …

( i n c a n d e s c e n t

b u l b )

L T 7 A L L …

( L E D b u l b )

8 L T 7 B P 0 1 G P l a s t i c S u r f a c e m o u n t 1 0 0 m m h i g h f i x i n g b a s e , g r e y

8 L T 7 B P 0 2 G V e r t i c a l w a l l m o u n t , p l a s t i c , g r e y

8 L T 7 T P 0 1 0 0 G 1 0 0 m m , g r e y e x t e n s i o n t u b e

8 L T 7 B P 0 1 P l a s t i c S u r f a c e m o u n t 1 0 0 m m h i g h f i x i n g b a s e , b l a c k

8 L T 7 B P 0 2 V e r t i c a l w a l l m o u n t , p l a s t i c , b l a c k c o l o u r

8 L T 7 T P 0 1 0 0 1 0 0 m m , b l a c k e x t e n s i o n t u b e

A c c e s s o r i e s *

8 L B 6 E L 1 O r a n g e

8 L B 6 E L 3 G r e e n

8 L B 6 E L 4 R e d

8 L B 6 E L 5 Y e l l o w

8 L B 6 E L 6 B l u e

8 L B 6 E L 8 W h i t e


S t e a d y l i g h t m o d u l e s . B A 1 5 d f i t t i n g . B u l b ( 8 L T 7 A L B … & 8 L T 7 A L L … )

n o t i n c l u d e d

S i g n a l B e a c o n s

Ø 6 2 m m

8 L B 6 B P 0 3 F o r h o r i z o n t a l m o u n t , p l a s t i c , b l a c k

8 L B 6 B P 0 5 F o r h o l e Ø 2 2 m m , p l a s t i c , b l a c k

8 L B 6 B P 0 7 E x t e n s i o n c o n n e c t i o n . U s e w i t h 8 L P 7 B P 0 1 a n d 8 L P 7 B P 0 2

F i x i n g B a s e s f o r l i g h t m o d u l e s


o r d e r c o d e

R e d

o r d e r c o d e

Y e l l o w /

O r a n g e

o r d e r c o d e

B l u e

o r d e r c o d e

W h i t e

o r d e r c o d e

2 4 V A C / D C 8 L T 7 A L L B 3 8 L T 7 A L L B 4 8 L T 7 A L L B 5 8 L T 7 A L L B 6 8 L T 7 A L L B 8

1 1 0 . . . 1 2 0 V A C 8 L T 7 A L L E 3 8 L T 7 A L L E 4 8 L T 7 A L L E 5 8 L T 7 A L L E 6 8 L T 7 A L L E 8

2 3 0 . . . 2 4 0 V A C 8 L T 7 A L L M 3 8 L T 7 A L L M 4 8 L T 7 A L L M 5 8 L T 7 A L L M 6 8 L T 7 A L L M 8

L E D b u l b s , B A 1 5 d f i t t i n g

L E D B u l b s f o r


a n d B e a c o n s

L T 7 A L L …

8 L B 6 E L . . .

8 L T 7 A L B . . . i n c a n d e s c e n t b u l b s a l s o a v a i l a b l e . P l e a s e s e e g e n e r a l c a t a l o g u e

8 L B 6 B P 0 3 8 L B 6 B P 0 5

8 L T 7 C P 0 1 G F o r p l a s t i c t u b e s , g r e y

8 L T 7 C P 0 1 F o r p l a s t i c t u b e s , b l a c k

C o n n e c t i o n m o d u l e s a n d c o v e r ( b o t t o m e n t r y )

* A c c e s s o r i e s a l s o a v a i l a b l e i n m e t a l v e r s i o n . P l e a s e s e e g e n e r a l c a t a l o g u e

E x t e n d e d r a n g e i n t h e G e n e r a l C a t a l o g u e i n c l u d i n g :

S o u n d e r m o d u l e s

“ B l i n k i n g ” & “ f l a s h i n g ” l i g h t m o d u l e s

W i d e r r a n g e o f m o u n t i n g a c c e s s o r i e s

S i g n a l T o w e r s & B e a c o n s


Sig

na

l T

ow

ers

& B

ea

co

ns

1 6

K X A A 1 M e t a l T o p p u s h r o d p l u n g e r

K X A B 1 P l a s t i c t o p r o l l e r p u s h p l u n g e r

K X A B 2 M e t a l t o p r o l l e r p u s h p l u n g e r

K X A C 1 P l a s t i c r o l l e r c e n t r e p u s h l e v e r

K X A C 2 M e t a l r o l l e r c e n t r e p u s h l e v e r

K X A D 1 P l a s t i c r o l l e r s i d e p u s h l e v e r

K X A D 2 M e t a l r o l l e r s i d e p u s h l e v e r

K X A E 1 P l a s t i c r o l l e r l e v e r p l u n g e r

K X A E 2 M e t a l r o l l e r l e v e r p l u n g e r

K X A E 3 R u b b e r Ø 5 0 x 1 0 m m r o l l e r l e v e r p l u n g e r

K X A F 1 A d j u s t a b l e p l a s t i c r o l l e r l e v e r Ø 1 9 x 5 m m

K X A F 2 A d j u s t a b l e m e t a l r o l l e r l e v e r Ø 1 9 x 5 m m

K X A F 3 A d j u s t a b l e r u b b e r Ø 5 0 x 1 0 m m r o l l e r

K X A F 4 A d j u s t a b l e o f f s e t r u b b e r Ø 5 0 x 1 0 m m r o l l e r

K X A H 1 C e r a m i c r o d l e v e r

K X A L 1 A d j u s t a b l e p l a s t i c r o d l e v e r

K X A L 2 A d j u s t a b l e s t a i n l e s s s t e e l r o d l e v e r

K X A M 1 F l e x i b l e w o b b l e s t i c k

K X A M 2 S e m i - r i g i d w o b b l e s t i c k


O p e r a t i n g h e a d s t o f i t K X . . . L i m i t s w i t c h b o d i e s

L i m i t s w i t c h b o d y

K X C B S 1 1 P l a s t i c b o d y c o m p l e t e w i t h 1 N O + 1 N C s n a p a c t i o n

a u x i l i a r y c o n t a c t s . O n e b o t t o m c a b l e e n t r y

K X C M S 1 1 M e t a l b o d y c o m p l e t e w i t h 1 N O + 1 N C s n a p a c t i o n

a u x i l i a r y c o n t a c t s . O n e b o t t o m c a b l e e n t r y

K X C C S 1 1 P l a s t i c b o d y c o m p l e t e w i t h 1 N O + 1 N C s n a p a c t i o n

a u x i l i a r y c o n t a c t s . T w o s i d e c a b l e e n t r i e s

K X C N S 1 1 M e t a l b o d y c o m p l e t e w i t h 1 N O + 1 N C s n a p a c t i o n

a u x i l i a r y c o n t a c t s . T w o s i d e c a b l e e n t r i e s

K X C C S 1 1

K X C N S 1 1

K X C B S 1 1

K X C M S 1 1

K X A A 1 K X A B . . . K X A C . . .

K X A F . . .

K X A E 3 K X A E . . .

K X A M . . . K X A H . . . K X A L . . .

K X A D . . .

L i m i t S w i t c h e s

L i m i t , M i c r o & F o o t S w i t c h e s


P l a s t i c b o d y f o o t s w i t c h M 2 0 c a b l e e n t r y

K G 1 0 0 S 1 1 O p e n s t y l e w i t h 1 N O + 1 N C s n a p a c t i o n a u x i l i a r y c o n t a c t s

K G 2 0 0 S 1 1 1 N O + 1 N C s n a p a c t i o n a u x i l i a r y c o n t a c t s w i t h c o v e r


w i t h s a f e t y l e v e r

K G 2 1 0 S 1 1 W i t h 1 N O + 1 N C s n a p a c t i o n a u x i l i a r y c o n t a c t s w i t h c o v e r

a n d s a f e t y l e v e r


w i t h p e d a l a c t u a t o r l o c k

K G 2 2 0 S 1 1 W i t h 1 N O + 1 N C s n a p a c t i o n a u x i l i a r y c o n t a c t s w i t h c o v e r

a n d p e d a l a c t u a t o r l o c k

K R 1 0 0 S 1 1 O p e n w i t h 1 N O + 1 N C s n a p a c t i o n a u x i l i a r y c o n t a c t s

K R 2 0 0 S 1 1 1 N O + 1 N C s n a p a c t i o n a u x i l i a r y c o n t a c t s . W i t h c o v e r

K R 1 1 0 S 1 1 O p e n w i t h 1 N O + 1 N C s n a p a c t i o n a u x i l i a r y c o n t a c t s .

W i t h s a f e t y l e v e r

K R 2 1 0 S 1 1 W i t h 1 N O + 1 N C s n a p a c t i o n a u x i l i a r y c o n t a c t s . W i t h c o v e r

a n d s a f e t y l e v e r

K R 1 2 0 S 1 1 O p e n w i t h 1 N O + 1 N C s n a p a c t i o n a u x i l i a r y c o n t a c t s .

W i t h p e d a l a c t u a t o r l o c k

K R 2 2 0 S 1 1 W i t h 1 N O + 1 N C s n a p a c t i o n a u x i l i a r y c o n t a c t s . W i t h

c o v e r a n d p e d a l a c t u a t o r l o c k

M e t a l b o d y f o o t s w i t c h M 2 0 c a b l e e n t r y

K G 1 0 0 S 1 1

K G 2 1 0 S 1 1

K R 2 1 0 S 1 1

F o o t S w i t c h e s

Lim

it,

Mic

ro &

Fo

ot

Sw

itc

he

s


O r d e r C o d e I E C c u r r e n t A C 1

[ A ]

S w i t c h p o s i t i o n s F r o n t p l a t e

[ m m ]

O n e - p o l e - 1 w a f e r - s c h e m e 9 0 . F r o n t m o u n t

G X 1 6 9 0 U 1 6 4 8

G X 2 0 9 0 U 2 0 4 8

G X 3 2 9 0 U 3 2 6 5

G X 4 0 9 0 U 4 0 6 5

0 1

T w o - p o l e - 1 w a f e r - s c h e m e 9 1 . F r o n t m o u n t

G X 1 6 9 1 U 1 6 4 8

G X 2 0 9 1 U 2 0 4 8

G X 3 2 9 1 U 3 2 6 5

G X 4 0 9 1 U 4 0 6 5

0 1

T h r e e - p o l e - 2 w a f e r s - s c h e m e 1 0 . F r o n t m o u n t

G X 1 6 1 0 U 1 6 4 8

G X 2 0 1 0 U 2 0 4 8

G X 3 2 1 0 U 3 2 6 5

G X 4 0 1 0 U 4 0 6 5

0 1

F o u r - p o l e - 2 w a f e r s - s c h e m e 9 2 . F r o n t m o u n t

G X 1 6 9 2 U 1 6 4 8

G X 2 0 9 2 U 2 0 4 8

G X 3 2 9 2 U 3 2 6 5

G X 4 0 9 2 U 4 0 6 5

0 1

C h a n g e o v e r G X . . .


[ A ]


[ m m ]

T w o - p o l e - 2 w a f e r s - s c h e m e 5 2 . F r o n t m o u n t

G X 1 6 5 2 U 1 6 4 8

G X 2 0 5 2 U 2 0 4 8

G X 3 2 5 2 U 3 2 6 5

G X 4 0 5 2 U 4 0 6 5

T h r e e - p o l e - 3 w a f e r s - s c h e m e 5 3 . F r o n t m o u n t

G X 1 6 5 3 U 1 6 4 8

G X 2 0 5 3 U 2 0 4 8

G X 3 2 5 3 U 3 2 6 5

G X 4 0 5 3 U 4 0 6 5

F o u r - p o l e - 4 w a f e r s - s c h e m e 7 5 . F r o n t m o u n t

G X 1 6 7 5 U 1 6 4 8

G X 2 0 7 5 U 2 0 4 8

G X 3 2 7 5 U 3 2 6 5

G X 4 0 7 5 U 4 0 6 5

2 0

1

2 0

1

2 0

1

O n / O f f G X . . .

G X . . . S e r i e s

O N / O F F S w i t c h e s

G X . . . S e r i e s

C h a n g e o v e r

S w i t c h e s w i t h 0

p o s i t i o n

R o t a r y C a m S w i t c h e s


[ A ]


[ m m ]

V o l t m e t e r s w i t c h - F o r 1 p h a s e v o l t a g e a n d 3 p h a s e t o p h a s e v o l t a g e

r e a d i n g s 3 w a f e r s - s c h e m e 6 0 . F r o n t m o u n t

G X 1 6 6 0 U 1 6 4 8

F o r L 1 - L 2 - L 3 r e a d i n g s v i a 3 C T s - 4 w a f e r s - s c h e m e 9 8 . F r o n t m o u n t

G X 1 6 9 8 U 1 6 4 8

0 L1-L2

L2-L3

L3-L1

L1N

0

L1

L2

L3

A m m e t e r G X . . .

G X . . . S e r i e s

V o l t m e t e r / A m m e t e r

S w i t c h e s

Ro

tary

Ca

m S

wit

ch

es


2

I E C c o n v e n t i o n a l f r e e

a i r t h e r m a l c u r r e n t l t h

A C 2 1 A ( ≤ 6 9 0 V )

[ A ]

T h r e e - p o l e

w i t h r e d / y e l l o w

h a n d l e

o r d e r c o d e

F o u r - p o l e

w i t h r e d / y e l l o w

h a n d l e

o r d e r c o d e

D i m e n s i o n s

H x W x D

( i n c l u d i n g h a n d l e )

[ m m ]

1 6 G A Z 0 1 6 G A Z 0 1 6 T 4

1 5 9 x 1 0 0 x 1 2 0

2 5 G A Z 0 2 5 G A Z 0 2 5 T 4

3 2 G A Z 0 3 2 G A Z 0 3 2 T 4

4 0 G A Z 0 4 0 G A Z 0 4 0 T 4

6 3 G A Z 0 6 3 S A G A Z 0 6 3 S A T 4

2 1 0 x 1 7 5 x 1 2 1

6 3 G A Z 0 6 3 C G A Z 0 6 3 C T 4

8 0 G A Z 0 8 0 C G A Z 0 8 0 C T 4

1 0 0 G A Z 1 0 0 C G A Z 1 0 0 C T 4

1 2 5 G A Z 1 2 5 G A Z 1 2 5 T 4

2 8 0 x 2 2 0 x 1 9 3 1 6 0 G A Z 1 6 0 G A Z 1 6 0 T 4

I P 6 5 p l a s t i c e n c l o s u r e s , a d d s u f f i x “ B ” t o e n d o f c o d e f o r b l a c k h a n d l e

G A Z 0 1 6 . . . G A Z 0 4 0 . . . G A Z 0 6 3 . . . 1 0 0 C

G A Z 1 2 5 … . G A Z 1 6 0 . . .

E n c l o s e d

S w i t c h D i s c o n n e c t o r s

1 6 G A Z S 0 1 6 G A Z S 0 1 6 T 4

2 0 0 x 1 5 0 x 1 4 3

2 5 G A Z S 0 2 5 G A Z S 0 2 5 T 4

3 2 G A Z S 0 3 2 G A Z S 0 3 2 T 4

4 0 G A Z S 0 4 0 G A Z S 0 4 0 T 4

6 3 G A Z S 0 6 3 G A Z S 0 6 3 T 4

8 0 G A Z S 0 8 0 G A Z S 0 8 0 T 4

1 0 0 G A Z S 1 0 0 G A Z S 1 0 0 T 4

S t a i n l e s s s t e e l e n c l o s u r e , a d d s u f f i x “ B ” t o e n d o f c o d e f o r b l a c k h a n d l e

S w i t c h D i s c o n n e c t o r s - E n c l o s e d


Sw

itc

h D

isc

on

ne

cto

rs

1 6 G A Z M 0 1 6 G A Z M 0 1 6 T 4

2 0 0 x 1 5 0 x 1 4 3

2 5 G A Z M 0 2 5 G A Z M 0 2 5 T 4

3 2 G A Z M 0 3 2 G A Z M 0 3 2 T 4

4 0 G A Z M 0 4 0 G A Z M 0 4 0 T 4

6 3 G A Z M 0 6 3 S A G A Z M 0 6 3 S A T 4

6 3 G A Z M 0 6 3 G A Z M 0 6 3 T 4

8 0 G A Z M 0 8 0 G A Z M 0 8 0 T 4

1 0 0 G A Z M 1 0 0 G A Z M 1 0 0 T 4

1 2 5 G A Z M 1 2 5 G A Z M 1 2 5 T 4

3 0 0 x 2 0 0 x 1 4 3 1 6 0 G A Z M 1 6 0 G A Z M 1 6 0 T 4

1 6 0 G L Z M 0 1 6 0 G L Z M 0 1 6 0 T 4

4 0 0 x 3 0 0 x 2 9 6 2 0 0 G L Z M 0 2 0 0 G L Z M 0 2 0 0 T 4

2 5 0 G L Z M 0 2 5 0 G L Z M 0 2 5 0 T 4

3 1 5 G L Z M 0 3 1 5 G L Z M 0 3 1 5 T 4

I P 6 5 M e t a l l i c e n c l o s u r e s , a d d s u f f i x “ B ” t o e n d o f c o d e f o r b l a c k h a n d l e

G A Z M 0 1 6 . . . G A Z M 1 0 0

G A Z S 0 1 6 … G A Z S 1 2 5

G A Z M 1 2 5 . . . G A Z M 1 6 0

G L Z M 0 1 6 0 . . . G L Z M 0 3 1 5

G A Z 0 2 5 D T 2 B 2 5 1 5 9 x 1 0 0 x 1 2 0

G A Z 0 3 2 D T 3 B 3 2 1 5 9 x 1 0 0 x 1 2 0

G A Z 0 4 0 D T 4 B 4 0 1 5 9 x 1 0 0 x 1 2 0

I P 6 5 P l a s t i c e n c l o s u r e D C i s o l a t o r f o r p h o t o v o l t a i c a p p l i c a t i o n s

G A Z 0 2 5 D T 2 B

3

O r d e r C o d e I E C c u r r e n t l t h

A C 2 1 A ( ≤ 6 9 0 V )

[ A ]

I E C c u r r e n t l e

A C 2 3 B A C 2 3 B

( ≤ 4 0 0 V ) ( ≤ 5 0 0 V )

[ A ] [ A ]

D i m e n s i o n s

H x W x D

( i n c h a n d l e )

[ m m ]

2 1 0 x 1 7 5 x 1 8 3

G A Z 0 4 0 E T 8 4 0 4 0 2 5

G A Z 0 6 3 S A E T 8 6 3 4 5 2 5

G A Z 0 8 0 E T 8 8 0 8 0 6 3

2 2 0 x 2 8 0 x 2 0 8 G A Z 1 2 5 E T 8 1 2 5 1 2 5 1 0 0

G A Z 1 6 0 E T 8 1 6 0 1 2 5 1 0 0

I P 6 5 P l a s t i c e n c l o s u r e 4 - p o l e l i n e c h a n g e o v e r s w i t c h e s I - 0 - I I

G A Z 0 2 5 E …

G A Z 0 6 3 S A E . . .

G A Z 0 8 0 E …

G A Z 1 6 0 E . . .

E n c l o s e d

C h a n g e o v e r S w i t c h e s

S w i t c h D i s c o n n e c t o r s - E n c l o s e d

Sw

itc

h D

isc

on

ne

cto

rs


S w i t c h f u s e O r d e r C o d e C u r r e n t r a t i n g

[ A ]

D i m e n s i o n s

H x W x D ( i n c l u d i n g h a n d l e )

[ m m ]

G A Z 0 2 0 F 2 0

2 3 4 x 1 1 0 x 9 7 G A Z 0 3 2 F 3 2

I P 6 5 s w i t c h f u s e i s o l a t o r s u p p l i e d w i t h 1 0 x 3 8 m m g G f u s e s

G A Z … F

2 1 0 x 1 7 5 x 1 8 3

G A Z 0 4 0 E T 6 4 0 4 0 2 5

G A Z 0 6 3 S A E T 6 6 3 4 5 2 5

G A Z 0 8 0 E T 6 8 0 8 0 6 3

2 2 0 x 2 8 0 x 2 0 8 G A Z 1 2 5 E T 6 1 2 5 1 2 5 1 0 0

G A Z 1 6 0 E T 6 1 6 0 1 2 5 1 0 0

I P 6 5 P l a s t i c e n c l o s u r e 3 - p o l e l i n e c h a n g e o v e r s w i t c h e s I - 0 - I I

G A Z M 0 4 0 E T 8 4 0 4 0 2 5

2 0 0 x 1 5 0 x 1 5 5 G A Z M 0 6 3 S A E T 8 6 3 4 5 2 5

G A Z M 0 8 0 E T 8 8 0 8 0 6 3

2 0 0 x 3 0 0 x 1 5 5 G A Z M 1 2 5 E T 8 1 2 5 1 2 5 1 0 0

G A Z M 1 6 0 E T 8 1 6 0 1 2 5 1 0 0

G L Z M 0 1 6 0 E T 8 1 6 0 1 6 0 1 6 0

4 0 0 x 3 0 0 x 2 9 6 G L Z M 0 2 0 0 E T 8 2 0 0 2 0 0 2 0 0

G L Z M 0 2 5 0 E T 8 2 5 0 2 5 0 2 5 0

G L Z M 0 3 1 5 E T 8 3 1 5 2 5 0 2 5 0

4 - p o l e M e t a l i c e n c l o s u r e l i n e c h a n g e o v e r s w i t c h e s I - 0 - I I

G A Z M 0 4 0 E T 6 4 0 4 0 2 5

2 0 0 x 1 5 0 x 1 5 5 G A Z M 0 6 3 S A E T 6 6 3 4 5 2 5

G A Z M 0 8 0 E T 6 8 0 8 0 6 3

2 0 0 x 3 0 0 x 1 5 5 G A Z M 1 2 5 E T 6 1 2 5 1 2 5 1 0 0

G A Z M 1 6 0 E T 6 1 6 0 1 2 5 1 0 0

G L Z M 0 1 6 0 E T 6 1 6 0 1 6 0 1 6 0

4 0 0 x 3 0 0 x 2 9 6 G L Z M 0 2 0 0 E T 6 2 0 0 2 0 0 2 0 0

G L Z M 0 2 5 0 E T 6 2 5 0 2 5 0 2 5 0

G L Z M 0 3 1 5 E T 6 3 1 5 2 5 0 2 5 0

I P 6 5 M e t a l l i c e n c l o s u r e 3 - p o l e l i n e c h a n g e o v e r s w i t c h e s I - 0 - I I

G A Z M . . E T 6

G A Z M . . E T 8

4

G A 0 1 6 A 1 6 1 6 G A K I T 1 6

G A 0 2 5 A 2 5 2 5 G A K I T 2 5

G A 0 3 2 A 3 2 3 2 G A K I T 3 2

G A 0 4 0 A 4 0 4 0 G A K I T 4 0

G A 0 6 3 S A 6 3 4 5 G A K I T 6 3 S A

G A 0 6 3 A 6 3 6 3 G A K I T 6 3

G A 0 8 0 A 8 0 8 0 G A K I T 8 0

G A 1 0 0 A 1 0 0 1 0 0 G A K I T 1 0 0

G A 1 2 5 A 1 2 5 1 2 5 G A K I T 1 2 5

G A 1 6 0 A 1 6 0 1 2 5 G A K I T 1 6 0

D i r e c t o p e r a t i n g v e r s i o n , c o m p l e t e w i t h b l a c k h a n d l e . F o r d o o r c o u p l i n g

v e r s i o n , s e p a r a t e l y p u r c h a s e t h e h a n d l e a n d s h a f t e x t e n s i o n

O r d e r C o d e

R e a r M o u n t

S w i t c h O n l y

I E C c o n v e n t i o n a l

t h e r m a l c u r r e n t l t h

A C 2 1 A ( ≤ 6 9 0 V )

[ A ]

I E C r a t e d o p e r a t i o n a l

c u r r e n t l e

A C 2 3 A ( ≤ 4 1 5 V )

[ A ]

O r d e r C o d e

S w i t c h K i t

c / w G A X 6 1

h a n d l e , 2 0 0 m m

G A 0 1 6 A . . . G A 0 4 0 A

G A 0 6 3 S A

3 6 m m w i d t h

G A 0 6 3 A . . . G A 1 6 0 A

7 0 m m w i d t h

G A X 1 0 1 1 A 1 N O + 1 N C f o r G A . . . A , G A 0 6 3 S A a n d G A 0 4 0 D

A u x i l i a r y c o n t a c t s , s i m u l t a n e o u s c l o s i n g a s p o l e s o f s w i t c h d i s c o n n e c t o r s


G A X 1 1 1 0 E A 1 E B ( N O ) f o r G A 0 1 6 A . . . G A 0 4 0 A , G A 0 6 3 S A a n d

G A X 1 2 1 0 E A 1 E B ( N O ) f o r G A 0 6 3 A … G A 1 6 0 A

A u x i l i a r y c o n t a c t s , e a r l y - b r e a k o p e r a t i o n i n r e s p e c t t o p o l e s o f s w i t c h

d i s c o n n e c t o r

G A X 3 1 A F o r G A 0 1 6 A . . . G A 0 4 0 A , G A 0 6 3 S A a n d G A 0 4 0 D

G A X 3 2 A F o r G A 0 6 3 A . . . G A 1 6 0 A

N e u t r a l t e r m i n a l

G A X 3 3 A F o r G A 0 1 6 A . . . G A 0 4 0 A , G A 0 6 3 S A a n d G A . . . D

G A X 3 4 A F o r G A 0 6 3 A . . . G A 1 6 0 A

E a r t h / g r o u n d t e r m i n a l

G A X 4 2 0 4 0 A 4 0 4 0 G A 0 1 6 A . . . G A 0 4 0 A

G A X 4 2 0 6 3 S A 6 3 4 5 G A 0 6 3 S A

G A X 4 2 0 6 3 A 6 3 6 3 G A 0 6 3 A

G A X 4 2 0 8 0 A 8 0 8 0 G A 0 8 0 A

G A X 4 2 1 0 0 A 1 0 0 1 0 0 G A 1 0 0 A

G A X 4 2 1 2 5 A 1 2 5 1 2 5 G A 1 2 5 A

G A X 4 2 1 6 0 A 1 6 0 1 2 5 G A 1 6 0 A

S i m u l t a n e o u s c l o s i n g o p e r a t i o n a s s w i t c h d i s c o n n e c t o r p o l e s . F o r G A . . . A

O r d e r C o d e I E C c o n v e n t i o n a l

f r e e a i r t h e r m a l

c u r r e n t l t h

A C 2 1 A ( ≤ 6 9 0 V )

I E C r a t e d

o p e r a t i o n a l

c u r r e n t l e

A C 2 2 A ( ≤ 6 9 0 V )

A C 2 3 A ( ≤ 4 1 5 V )

C o m p a t i b l e

s w i t c h


G A X 4 1 0 4 0 A 4 0 4 0

G A X 4 1 0 6 3 S A 6 3 4 5

G A X 4 1 1 2 5 A 1 2 5 1 2 5

E a r l y m a k e c l o s i n g o p e r a t i o n w i t h r e s p e c t t o s w i t c h d i s c o n n e c t o r p o l e s .

F o r G A . . . A v e r s i o n

G A X 4 2 . . . A

G A X 4 1 . . . A

G A X 4 2 0 6 3 S A

G A X 4 1 0 6 3 S A

G A X 1 0 1 1 A G A X 1 1 1 0 E A

G A X 1 2 1 0 E A

G A X 3 . . . A

T h r e e - p o l e S w i t c h

D i s c o n n e c t o r s -

R e a r M o u n t

F o u r t h P o l e

A d d - o n F o r G A . . . A

A d d - o n B l o c k s F o r

G A . . . A

S w i t c h D i s c o n n e c t o r - P a n e l 1 6 A - 1 6 0 A

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rs


5

G A X 5 0 0 0 F o r G A 0 1 6 A . . . G A 0 4 0 A , G A 0 6 3 S A , G A 0 4 0 D a n d

G A X 5 0 0 1 F o r G A 0 6 3 A . . . G A 1 6 0 A a n d G A X 6 7 B ; □ 5 m m

M e c h a n i c a l i n t e r l o c k f o r l i n e c h a n g e o v e r ( I - 0 - I I )

G A X 6 0 0 0 F o r G A 0 1 6 A . . . G A 0 4 0 A , G A 0 6 3 S A , G A 0 4 0 D ; □ 5 m m

G A X 6 0 0 1 F o r G A 0 6 3 A . . . G A 1 2 5 A , □ 7 m m

M e c h a n i c a l c o u p l i n g s y s t e m f o r 6 - 8 p o l e s w i t c h d i s c o n n e c t o r s

G A X 5 0 …

G A X 6 0 . . .

O r d e r C o d e D e s c r i p t i o n M e c h a n i c a l

C o u p l i n g

G A 0 1 6 C 1 6 1 6

G A 0 2 5 C 2 5 2 5

G A 0 3 2 C 3 2 3 2

G A 0 4 0 C 4 0 4 0

G A 0 6 3 C 6 3 4 5

G A 0 8 0 C 8 0 8 0

G A 1 0 0 C 1 0 0 1 0 0

G A 1 2 5 C 1 2 5 1 2 5

D o o r m o u n t v e r s i o n , c o m p l e t e w i t h s h a f t e x t e n s i o n

O r d e r C o d e I E C c o n v e n t i o n a l f r e e a i r


A C 2 1 A ( ≤ 6 9 0 V )

[ A ]


c u r r e n t l e

A C 2 2 A ( ≤ 6 9 0 V )

A C 2 3 A ( ≤ 4 1 5 V )

[ A ]

A d d - o n B l o c k s F o r

G A . . . C G A X 1 0 1 1 C 1 N O + 1 N C f o r G A . . . C

A u x i l i a r y c o n t a c t s , s i m u l t a n e o u s c l o s i n g a s p o l e s o f s w i t c h d i s c o n n e c t o r s


G A X 3 1 C F o r G A 0 1 6 C . . . G A 0 4 0 C

G A X 3 2 C F o r G A 0 6 3 C . . . G A 1 2 5 C


G A X 3 3 C F o r G A 0 1 6 C . . . G A 0 4 0 C

G A X 3 4 C F o r G A 0 6 3 C . . . G A 1 2 5 C


G A X 4 2 0 4 0 C 4 0 4 0 G A 0 1 6 C . . . G A 0 4 0 C

G A X 4 2 0 6 3 C 6 3 4 5 G A 0 6 3 C

G A X 4 2 0 8 0 C 8 0 8 0 G A 0 8 0 C

G A X 4 2 1 0 0 C 1 0 0 1 0 0 G A 1 0 0 C

G A X 4 2 1 2 5 C 1 2 5 1 2 5 G A 1 2 5 C

S i m u l t a n e o u s c l o s i n g o p e r a t i o n a s s w i t c h d i s c o n n e c t o r p o l e s . F o r G A . . . C

O r d e r C o d e I E C c o n v e n t i o n a l

f r e e a i r t h e r m a l

c u r r e n t l t h

A C 2 1 A ( ≤ 6 9 0 V )

I E C r a t e d

o p e r a t i o n a l

c u r r e n t l e

A C 2 2 A ( ≤ 6 9 0 V )

A C 2 3 A ( ≤ 4 1 5 V )

C o m p a t i b l e

s w i t c h


G A X 4 1 0 4 0 C 4 0 4 0

G A X 4 1 1 2 5 C 1 2 5 1 2 5

E a r l y m a k e c l o s i n g o p e r a t i o n w i t h r e s p e c t t o s w i t c h d i s c o n n e c t o r p o l e s .

F o r G A . . . C

F o u r t h P o l e

A d d - o n f o r G A . . . C

T h r e e - p o l e S w i t c h

D i s c o n n e c t o r s -

D o o r M o u n t

V e r s i o n

G A 0 1 6 C …

G A 0 4 0 C

G A 0 6 3 C …

G A 1 2 5 C

G A X 4 2 0 4 0 C

G A X 4 1 0 4 0 C

G A X 1 0 1 1 A G A X 3 . . . C

S w i t c h D i s c o n n e c t o r s - P a n e l 1 6 A - 1 6 0 A


Sw

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cto

rs

6

D e s c r i p t i o n D o o r c o u p l i n g v e r s i o n

p a d l o c k a b l e , I P 6 5

F o r G A . . . A , G A 0 6 3 S A , G A . . . C , G A 0 4 0 D a n d

G D . . . S c r e w f i x i n g . H a n d l e w i t h s e l e c t o r

f l u s h - m o u n t e d □ 5 m m

G A X 6 1 G A X 6 1 B

F o r G A . . . A , G A 0 6 3 S A , G A 0 1 6 C , G A 0 4 0 C ,

G A 0 4 0 D a n d G D . . . R i n g f i x i n g . H a n d l e w i t h

2 2 m m s e l e c t o r p r o t r u d i n g □ 5 m m

G A X 6 3 G A X 6 3 B

F o r G A . . . A , G A 0 6 3 S A , G A 0 4 0 D a n d G D …

R i n g f i x i n g . H a n d l e w i t h s e l e c t o r p r o t r u d i n g -

d e f e a t a b l e ( r e q . U L 5 0 8 A ) □ 5 m m

G A X 6 4 G A X 6 4 B

F o r G A 0 6 3 A . . . G A 1 6 0 A a n d G A X 6 0 0 1 . S c r e w

f i x i n g . P i s t o l h a n d l e - d e f e a t a b l e

( r e q . U L 5 0 8 A ) □ 7 m m

G A X 6 6 N G A X 6 6 N B

* U s e w i t h G A X 6 0 B a d a p t e r *

F o r m e c h a n i c a l i n t e r l o c k G A X 5 0 … ( I - 0 - I I )

□ 5 m m

- G A X 6 7 B

F o r G A 0 1 6 A . . . G A 0 6 3 S A , G A 0 4 0 D , G A 0 1 6

C . . . G A 0 4 0 C a n d G D … S c r e w f i x i n g . H a n d l e

w i t h s e l e c t o r l o w e r e d . □ 5 m m

G A X 6 8 G A X 6 8 B

R e d / Y e l l o w

o r d e r c o d e

B l a c k

o r d e r c o d e

G A X 6 0 B A d a p t e r □ 7 m m p e r G A 0 6 3 A . . . G A 1 6 0 A

G A X 6 0 B


G A X 7 1 5 0 1 5 0 m m l o n g □ 5 m m

G A X 7 2 0 0 2 0 0 m m l o n g □ 5 m m

G A X 7 3 0 0 3 0 0 m m l o n g □ 5 m m

G A X 7 4 0 0 4 0 0 m m l o n g □ 5 m m

G A X 7 5 0 0 5 0 0 m m l o n g □ 5 m m

S h a f t e x t e n s i o n f o r d o o r c o u p l i n g h a n d l e s G A X 6 1 . . . G A X 6 4 , G A X 6 8 ,

G A X 6 1 B , G A X 6 7 B , G A X 6 8 B a n d m e c h a n i c a l i n t e r l o c k t y p e G A X 5 0 0 0 ,

G A X 5 0 0 1 a n d m e c h a n i c a l c o u p l i n g G A X 6 0 0 0

G A X 7 1 5 0 A N 1 5 0 m m l o n g □ 7 m m

G A X 7 2 0 0 A N 2 0 0 m m l o n g □ 7 m m

G A X 7 3 0 0 A N 3 0 0 m m l o n g □ 7 m m

S h a f t e x t e n s i o n f o r d o o r c o u p l i n g h a n d l e s G A X 6 6 N , G A X 6 6 N B a n d

m e c h a n i c a l c o u p l i n g s y s t e m G A X 6 0 0 1

G A X 8 1 F o r G A X 4 2 0 4 0 A , G A X 4 2 0 6 3 S A , G A X 4 2 0 4 0 C , G A X 4 2

G A X 8 2 F o r G A X 4 2 0 6 3 A . . . G A X 4 2 1 6 0 A

S e t o f 2 o n e - p o l e t e r m i n a l c o v e r s f o r f o r t h p o l e

G A X 8 3 F o r G A 0 1 6 A . . . G A 0 4 0 A , G A 0 6 3 S A , G A 0 1 6 C …

G A X 8 4 F o r G A 0 6 3 A . . . G A 1 6 0 A , G A 0 6 3 C . . . G A 1 2 5 C

S e t o f 2 t h r e e - p o l e t e r m i n a l c o v e r s

G A X 3 9 1 F o r G A 0 1 6 A . . . G A 0 3 2 A . S u i t a b l e f o r 1 0 . 3 x 3 8 f u s e s

F u s e h o l d e r f o r s w i t c h d i s c o n n e c t o r s


G A X 7 . . .

G A X 6 1 G A X 6 6 N

G A X 6 3 B

G A X 7 . . . A N

G A X 8 . . .

G A X 3 9 1

H a n d l e s

A c c e s s o r i e s f o r

D o o r C o u p l i n g

C o n t r o l

F o r G A X 6 6 N a n d G A X 6 6 N B h a n d l e s


A l w a y s u s e w i t h G A X 6 6 N h a n d l e s t o c o n v e r t 5 m m t o 7 m m s h a f t

S w i t c h D i s c o n n e c t o r s - P a n e l 1 6 A - 1 6 0 A

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7

S w i t c h D i s c o n n e c t o r s - P a n e l 1 6 0 A - 3 1 5 A

G L 0 1 6 0 C 1 1 6 0 1 6 0

G L 0 2 0 0 C 1 2 0 0 2 0 0

G L 0 2 5 0 C 1 2 5 0 2 5 0

G L 0 3 1 5 C 1 3 1 5 2 5 0

S u p p l i e d w i t h o u t h a n d l e . C o m p l e t e w i t h s h a f t e x t e n s i o n a n d h a n d l e f o r

d o o r c o u p l i n g v e r s i o n o r w i t h h a n d l e f o r d i r e c t o p e r a t i n g v e r s i o n



A C 2 1 A ( ≤ 6 9 0 V )

[ A ]


c u r r e n t l e

A C 2 2 A ( ≤ 6 9 0 V )

A C 2 3 A ( ≤ 4 1 5 V )

[ A ]

I E C / E N T h r e e - p o l e

S w i t c h D i s c o n n e c t o r s

G L X 4 2 0 3 1 5 3 1 5 2 5 0

S i m u l t a n e o u s c l o s i n g o p e r a t i o n a s s w i t c h d i s c o n n e c t o r p o l e s . F o r

G L 0 1 6 0 C 1 . . . G L 0 3 1 5 C 1 v e r s i o n s



A C 2 1 A ( ≤ 6 9 0 V )

[ A ]


c u r r e n t l e

A C 2 2 A ( ≤ 6 9 0 V )

A C 2 3 A ( ≤ 4 1 5 V )

[ A ]

I E C / E N F o u r t h - p o l e

A d d - o n

G L C 0 1 6 0 C 1 1 6 0 1 6 0

G L C 0 2 0 0 C 1 2 0 0 2 0 0

G L C 0 2 5 0 C 1 2 5 0 2 5 0

G L C 0 3 1 5 C 1 3 1 5 2 5 0





A C 2 1 A ( ≤ 6 9 0 V )

[ A ]


c u r r e n t l e

A C 2 2 A ( ≤ 6 9 0 V )

A C 2 3 A ( ≤ 4 1 5 V )

[ A ]

I E C / E N T h r e e - p o l e

C h a n g e o v e r

S w i t c h e s

G L C 0 1 6 0 T 4 C 1 1 6 0 1 6 0

G L C 0 2 0 0 T 4 C 1 2 0 0 2 0 0

G L C 0 2 5 0 T 4 C 1 2 5 0 2 5 0

G L C 0 3 1 5 T 4 C 1 3 1 5 2 5 0





A C 2 1 A ( ≤ 6 9 0 V )

[ A ]


c u r r e n t l e

A C 2 2 A ( ≤ 6 9 0 V )

A C 2 3 A ( ≤ 4 1 5 V )

[ A ]

I E C F o u r - p o l e

C h a n g e o v e r

S w i t c h e s


G L . . .

G L X 4 2 0 3 1 5

G L C . . . C 1

G L C . . . T 4 C 1

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rs

A c c e s s o r i e s . . .

8

S w i t c h D i s c o n n e c t o r s - P a n e l 1 6 0 A - 3 1 5 A


G L X 1 0 1 0 E A 1 E B w i t h s c r e w t e r m i n a l s

G L X 1 0 0 1 1 N C w i t h s c r e w t e r m i n a l s

A u x i l i a r y c o n t a c t s

O r d e r C o d e D e s c r i p t i o n A d d - o n B l o c k s

G L X 3 0 0 F o r G L 0 1 6 0 . . . G L 0 3 1 5


G L X 3 0 1 F o r G L 0 1 6 0 . . . G L 0 3 1 5


G L X 8 0 0 3 - p i e c e s e t , e a c h c o v e r s 1 p o l e


O n e - p o l e t e r m i n a l c o v e r s



T e r m i n a l c l a m p s e t s f o r r i g i d a n d f l e x i b l e c a b l e s



O n e - p o l e b r i d g i n g b a r s f o r c h a n g e o v e r p a r a l l e l c o n n e c t i o n

G L C 0 1 6 0 . . . G L C 0 3 1 5

G L X 6 1 D F o r G L 0 1 6 0 . . . G L 0 3 1 5 a n d G L C 0 1 6 0 . . . G L C 0 3 1 5 .

R e d / y e l l o w

G L X 6 1 D B F o r G L 0 1 6 0 . . . G L 0 3 1 5 a n d G L C 0 1 6 0 . . . G L C 0 3 1 5 . B l a c k

D i r e c t o p e r a t i n g h a n d l e s

O r d e r C o d e D e s c r i p t i o n H a n d l e s & S h a f t s

G L X 6 1 F o r G L 0 1 6 0 . . . G L 0 3 1 5 . S c r e w f i x i n g . 1 2 5 m m l e v e r

l e n g t h p i s t o l h a n d l e - d e f e a t a b l e ( r e q . U L 5 0 8 A ) .

R e d / y e l l o w □ 1 0 m m

G L X 6 1 B F o r G L 0 1 6 0 . . . G L 0 3 1 5 . S c r e w f i x i n g . 1 2 5 m m l e v e r


B l a c k □ 1 0 m m

G L X 6 1 C B F o r G L C 0 1 6 0 . . . G L C 0 3 1 5 . S c r e w f i x i n g . 1 2 5 m m l e v e r


B l a c k □ 1 0 m m

D o o r c o u p l i n g h a n d l e s

G L X 0 0 S h a f t a l i g n m e n t r i n g

A c c e s s o r i e s f o r d o o r c o u p l i n g h a n d l e s

G L X 7 1 5 0 S 1 0 1 5 0 m m l o n g . □ 1 0 m m

G L X 7 2 0 0 S 1 0 2 0 0 m m l o n g . □ 1 0 m m

G L X 7 3 0 0 S 1 0 3 0 0 m m l o n g . □ 1 0 m m

G L X 7 4 0 0 S 1 0 4 0 0 m m l o n g . □ 1 0 m m

G L X 7 5 0 0 S 1 0 5 0 0 m m l o n g . □ 1 0 m m

S h a f t e x t e n s i o n s f o r d o o r c o u p l i n g h a n d l e s G L X 6 1 , G L X 6 1 B , G L X 6 1 C B

t y p e

G L X 3 0 0 G L X 8 0 0

G L X 5 0 0 G L X 2 0 1

G L X 6 1

G L X 6 1 D

G L X 0 0

G L X 7 . . . S 1 0

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rs

9

O r d e r C o d e P o l e

a r r a n g e m e n t

S t a t u s

i n d i c a t o r

D I N s i z e

F B 0 1 F 1 P 1 P - 1

F B 0 1 F 1 N 1 P + N - 2

F B 0 1 F 2 P 2 P - 2

F B 0 1 F 3 P 3 P - 3

F B 0 1 F 3 N 3 P + N - 4

F o r 1 0 x 3 8 m m f u s e s . I E C 3 2 A r a t e d c u r r e n t a t 6 9 0 V A C

F B 0 2 A 1 P 1 P - 1

F B 0 2 A 2 P 2 P - 2

F B 0 2 A 3 P 3 P - 3

F B 0 2 A 3 N 3 P + N - 4


F B 0 3 A 1 P 1 P - 1

F B 0 3 A 2 P 2 P - 2

F B 0 3 A 3 P 3 P - 3

F B 0 3 A 3 N 3 P + N - 4

F o r 2 2 x 5 8 m m f u s e s . I E C 1 0 0 A r a t e d c u r r e n t a t 6 9 0 V A C



S t a t u s

i n d i c a t o r

D I N s i z e

F B 0 1 B 1 P 1 P - 1

F B 0 1 B 2 P 2 P - 2

F B 0 1 B 3 P 3 P - 3

F B 0 1 B 3 N 3 P + N - 4




S t a t u s

i n d i c a t o r

D I N s i z e

F B 0 1 G 1 P 1 P - 1

F B 0 1 G 2 P 2 P - 2

F B 0 1 G 3 P 3 P - 3

F o r 1 0 x 3 8 m m C l a s s C C f u s e s . I E C 3 0 A r a t e d c u r r e n t

F B X 0 0 C o u p l i n g c l i p f o r 1 0 x 3 8 , 1 4 x 5 1 a n d 2 2 x 5 8 m m s i z e s

F B X 0 1 C o u p l i n g p i n f o r 1 0 x 3 8 m m s i z e t y p e F B 0 1 A 1 M ,

F B 0 1 B 1 P a n d F B 0 1 B 1 P L o n l y

F B X 0 2 C o u p l i n g p i n f o r 1 4 x 5 1 a n d 2 2 x 5 8 m m s i z e s

F B X 0 3 C o u p l i n g p i n f o r 1 0 x 3 8 m m s i z e t y p e s F B 0 1 F , F B 0 1 G ,

F B 0 1 D o n l y


F B 0 1 F . . . F B 0 2 A . . . F B 0 3 A . . .

F B 0 1 B . . .

F B 0 1 G . . .

F B X 0 0 F B X 0 2 F B X 0 1

F B X 0 3

U L R e c o g n i s e d &

C S A c e r t i f i e d

F u s e H o l d e r s



U L / C S A / C l a s s C C




Fu

se

Ho

lde

rs

1 0

I E C I n

[ A ]

O n e - P o l e

o r d e r c o d e

T h r e e - p o l e

o r d e r c o d e

T w o - p o l e

o r d e r c o d e

F o u r - p o l e

o r d e r c o d e

O n e - p o l e + N e u t r a l

o r d e r c o d e

1 P 1 M B 1 P B 0 1 P 1 M B 2 P B 0 1 P 1 M B 3 P B 0 1 P 1 M B 4 P B 0 1 -


3 P 1 M B 1 P B 0 3 P 1 M B 2 P B 0 3 P 1 M B 3 P B 0 3 P 1 M B 4 P B 0 3


6 P 1 M B 1 P B 0 6 P 1 M B 2 P B 0 6 P 1 M B 3 P B 0 6 P 1 M B 4 P B 0 6 P 1 M B 1 M B 0 6

1 0 P 1 M B 1 P B 1 0 P 1 M B 2 P B 1 0 P 1 M B 3 P B 1 0 P 1 M B 4 P B 1 0 P 1 M B 1 M B 1 0

1 3 P 1 M B 1 P B 1 3 P 1 M B 2 P B 1 3 P 1 M B 3 P B 1 3 P 1 M B 4 P B 1 3 -








B - c u r v e

P 1 M B 4 P . . .

1 P 1 M B 1 P C 0 1 P 1 M B 2 P C 0 1 P 1 M B 3 P C 0 1 P 1 M B 4 P C 0 1 P 1 M B 1 M C 0 2

2 P 1 M B 1 P C 0 2 P 1 M B 2 P C 0 2 P 1 M B 3 P C 0 2 P 1 M B 4 P C 0 2 -

3 P 1 M B 1 P C 0 3 P 1 M B 2 P C 0 3 P 1 M B 3 P C 0 3 P 1 M B 4 P C 0 3



1 0 P 1 M B 1 P C 1 0 P 1 M B 2 P C 1 0 P 1 M B 3 P C 1 0 P 1 M B 4 P C 1 0 P 1 M B 1 M C 1 0







5 0 P 1 M B 1 P C 5 0 P 1 M B 2 P C 5 0 P 1 M B 3 P C 5 0 P 1 M B 4 P C 5 0 -

6 3 P 1 M B 1 P C 6 3 P 1 M B 2 P C 6 3 P 1 M B 3 P C 6 3 P 1 M B 4 P C 6 3 -

8 0 P 2 M B 1 P C 0 8 0 P 2 M B 2 P C 0 8 0 P 2 M B 3 P C 0 8 0 P 2 M B 4 P C 0 8 0 -

1 0 0 P 2 M B 1 P C 1 0 0 P 2 M B 2 P C 1 0 0 P 2 M B 3 P C 1 0 0 P 2 M B 4 P C 1 0 0 -

1 2 5 P 2 M B 1 P C 1 2 5 P 2 M B 2 P C 1 2 5 P 2 M B 3 P C 1 2 5 P 2 M B 4 P C 1 2 5 -

C - c u r v e

1 P 1 M B 1 P D 0 1 P 1 M B 2 P D 0 1 P 1 M B 3 P D 0 1 P 1 M B 4 P D 0 1 -


3 P 1 M B 1 P D 0 3 P 1 M B 2 P D 0 3 P 1 M B 3 P D 0 3 P 1 M B 4 P D 0 3



1 0 P 1 M B 1 P D 1 0 P 1 M B 2 P D 1 0 P 1 M B 3 P D 1 0 P 1 M B 4 P D 1 0 -









8 0 - - P 2 M B 3 P D 0 8 0 P 2 M B 4 P D 0 8 0 -

1 0 0 - - P 2 M B 3 P D 1 0 0 P 2 M B 4 P D 1 0 0 -

1 2 5 - - P 2 M B 3 P D 1 2 5 P 2 M B 4 P D 1 2 5 -

D - c u r v e

P 1 M B 1 P . . .

P 1 M B 3 P . . .

P 1 M B 2 P . . .

P 2 M B 3 P . . .

M i n i a t u r e

C i r c u i t

B r e a k e r s

1 A > > 1 2 5 A 1 0 k A

T h e r m a l &

M a g n e t i c T r i p

M C B a n d R C D D e v i c e s

MC

B &

RC

D D

ev

ice

s


1 1

P 1 X 1 0 1 1 1 c h a n g e o v e r c o n t a c t

A u x i l i a r y c o n t a c t



I n d i c a t o r c o n t a c t f o r t h e r m a l - m a g n e t i c

P 1 X 1 4 2 3 0 2 3 0 V 5 0 / 6 0 H z

U n d e r v o l t a g e t r i p r e l e a s e

P 1 X 1 6 2 3 0 1 1 0 . . . 4 1 5 V 5 0 / 6 0 H z

S h u n t t r i p r e l e a s e


A u x i l i a r y c o n t a c t



I n d i c a t o r c o n t a c t f o r t h e r m a l - m a g n e t i c

P 2 X 1 6 2 3 0 1 1 0 . . . 4 1 5 V 5 0 / 6 0 H z

U n d e r v o l t a g e t r i p r e l e a s e

P 1 X 9 0 3 1 S i n g l e - p o l e s u p p l y b u s b a r

P 1 X 9 0 3 2 T w o - p o l e s u p p l y b u s b a r

P 1 X 9 0 3 3 T h r e e - p o l e s u p p l y b u s b a r

P 1 X 9 0 3 4 F o u r - p o l e s u p p l y b u s b a r

P 1 X 9 1 3 0 K i t o f 5 i s o l a t i n g c o v e r s f o r u n u s e d b u s b a r t e r m i n a l s

P 1 X 9 1 3 1 E n d c a p f o r P 1 X 9 0 3 1

P 1 X 9 1 3 2 E n d c a p f o r P 1 X 9 0 3 2

P 1 X 9 1 3 3 E n d c a p f o r P 1 X 9 1 3 3

P 1 X 9 1 3 4 E n d c a p f o r P 1 X 9 0 3 4

P 1 X 9 2 0 1 S i n g l e - p o l e t e r m i n a l b u s b a r s u p p l y ; c o n d u c t o r c r o s s

s e c t i o n 2 5 m m 2 m a x .

P 1 X 9 2 1 0 1 - p o l e t e r m i n a l f o r s u p p l y i n g b u s b a r ; c o n d u c t o r c r o s s

s e c t i o n 2 5 m m 2 m a x . ; l e f t e n t r y

P 1 X 9 2 0 2 S i n g l e - p o l e t e r m i n a l f o r b u s b a r s u p p l y ; c o n d u c t o r

c r o s s s e c t i o n 5 0 m m 2 m a x .

P 1 X 1 8 1 0 P a d l o c k a b l e a t t a c h m e n t f o r b r e a k e r P 1 M B …

P 2 X 1 8 1 0 P a d l o c k a b l e a t t a c h m e n t f o r b r e a k e r P 2 M B …


P 1 X 1 0 1 1 P 1 X 1 6 2 3 0

P 2 X 1 3 1 1

P 1 X 9 0 3 3

P 1 X 9 1 3 3

P 1 X 9 2 0 2 P 1 X 9 2 1 0

P 2 X 1 8 1 0

A d d - o n B l o c k s f o r

M i n i a t u r e C i r c u i t

B r e a k e r s 1 . . . 6 3 A

A d d - o n B l o c k s f o r


B r e a k e r s 8 0 . . . 1 2 5 A

A c c e s s o r i e s f o r


B r e a k e r s



MC

B &

RC

D D

ev

ice

s

1 2

O r d e r c o d e I E C I n

[ A ]

I E C l ∆ n

[ m A ]

C - c u r v e . S i n g l e - p o l e + n e u t r a l R C B O t y p e A C . 1 0 k A

P 1 R B 1 N C 0 6 A C 0 3 0 6 3 0

P 1 R B 1 N C 0 6 A C 3 0 0 6 3 0 0

P 1 R B 1 N C 1 0 A C 0 3 0 1 0 3 0

P 1 R B 1 N C 1 0 A C 3 0 0 1 0 3 0 0

P 1 R B 1 N C 1 3 A C 0 3 0 1 3 3 0

P 1 R B 1 N C 1 3 A C 3 0 0 1 3 3 0 0

P 1 R B 1 N C 1 6 A C 0 3 0 1 6 3 0

P 1 R B 1 N C 1 6 A C 3 0 0 1 6 3 0 0

P 1 R B 1 N C 2 0 A C 0 3 0 2 0 3 0

P 1 R B 1 N C 2 0 A C 3 0 0 2 0 3 0 0

P 1 R B 1 N C 2 5 A C 0 3 0 2 5 3 0

P 1 R B 1 N C 2 5 A C 3 0 0 2 5 3 0 0

P 1 R B 1 N C 3 2 A C 0 3 0 3 2 3 0

P 1 R B 1 N C 3 2 A C 3 0 0 3 2 3 0 0

P 1 R B 1 N C 4 0 A C 0 3 0 4 0 3 0

P 1 R B 1 N C 4 0 A C 3 0 0 4 0 3 0 0

P 1 R B 1 N . . .

T y p e A a l s o a v a i l a b l e . P l e a s e s e e t h e g e n e r a l c a t a l o g u e

O r d e r c o d e I E C I n

[ A ]

I E C l ∆ n

[ m A ]

N o o f D I N

m o d u l e

T w o - p o l e R C C B t y p e A C

P 1 R C 2 P 2 5 A C 0 3 0 2 5 3 0 2

P 1 R C 2 P 2 5 A C 3 0 0 2 5 3 0 0 2

P 1 R C 2 P 4 0 A C 0 3 0 4 0 3 0 2

P 1 R C 2 P 4 0 A C 3 0 0 4 0 3 0 0 2

P 1 R C 2 P 6 3 A C 0 3 0 6 3 3 0 2

P 1 R C 2 P 6 3 A C 3 0 0 6 3 3 0 0 2

P 1 R C 4 P 2 5 A C 0 3 0 2 5 3 0 4

P 1 R C 4 P 2 5 A C 3 0 0 2 5 3 0 0 4

P 1 R C 4 P 4 0 A C 0 3 0 4 0 3 0 4

P 1 R C 4 P 4 0 A C 3 0 0 4 0 3 0 0 4

P 1 R C 4 P 6 3 A C 0 3 0 6 3 3 0 4

P 1 R C 4 P 6 3 A C 3 0 0 6 3 3 0 0 4

F o u r - p o l e R C C B t y p e A C

T y p e A a n d B a l s o a v a i l a b l e . P l e a s e s e e t h e g e n e r a l c a t a l o g u e

P 1 R C 2 P . . .

R e s i d u a l C u r r e n t

O p e r a t e d C i r c u i t

B r e a k e r s w i t h

O v e r c u r r e n t

P r o t e c t i o n -

2 M o d u l e s

R e s i d u a l C u r r e n t

O p e r a t e d C i r c u i t

B r e a k e r s

R e s i d u a l A d d - o n B l o c k s & E a r t h L e a k a g e R e l a y s a r e a l s o a v a i l a b l e

w i t h i n t h e G e n e r a l C a t a l o g u e



MC

B &

RC

D D

ev

ice

s

1 3

S A 1 B 1 P A 3 2 0 R 1 P Y E S 2

S A 1 B 1 N A 3 2 0 R 1 P + N Y E S 4

S A 1 B 2 P A 3 2 0 R 2 P Y E S 4

S A 1 B 3 P A 3 2 0 R 3 P Y E S 6

S A 1 B 3 N A 3 2 0 R 3 P + N Y E S 8

S A 1 B 4 P A 3 2 0 R 4 P Y E S 8

O r d e r c o d e P o l e


R e l a y o u t p u t

( S P D T )

N o o f D I N

m o d u l e s

I E C i m p u l s e c u r r e n t l i m p ( 1 0 / 3 5 0 µ s ) 2 5 k A p e r p o l e

S A 0 1 P A 3 2 0 R 1 P Y E S 1

S A 0 1 N A 3 2 0 R 1 P + N Y E S 2

S A 0 2 P A 3 2 0 R 2 P Y E S 2

S A 0 3 P A 3 2 0 R 3 P Y E S 3

S A 0 3 N A 3 2 0 R 3 P + N Y E S 4

S A 0 4 P A 3 2 0 R 4 P Y E S 4




( S P D T )

N o o f D I N

m o d u l e s

I E C i m p u l s e c u r r e n t l i m p ( 1 0 / 3 5 0 µ s ) 1 2 . 5 k A p e r p o l e

S G 2 1 P A 3 0 0 1 P N O 1

S G 2 1 P A 3 0 0 R 1 P Y E S 1

S G 2 1 N A 3 0 0 1 P + N N O 2

S G 2 1 N A 3 0 0 R 1 P + N Y E S 2

S G 2 2 P A 3 0 0 2 P N O 2

S G 2 2 P A 3 0 0 R 2 P Y E S 2

S G 2 3 P A 3 0 0 3 P N O 3

S G 2 3 P A 3 0 0 R 3 P Y E S 3

S G 2 3 N A 3 0 0 3 P + N N O 4

S G 2 3 N A 3 0 0 R 3 P + N Y E S 4

S G 2 4 P A 3 0 0 4 P N O 4

S G 2 4 P A 3 0 0 R 4 P Y E S 4




( S P D T )

N o o f D I N

m o d u l e s

R e p l a c e m e n t p l u g - i n c a r t r i d g e s

S A X 0 0 P A 3 2 0 F o r S A 0 . . . t y p e s

S G X 0 2 P A 3 0 0 F o r S G 2 . . . t y p e s


S A 0 2 P A 3 2 0 R

S A 1 B 1 P A 3 2 0 R

S A 0 1 P A 3 2 0 R

S G 2 2 P A 3 0 0 R S G 2 3 N A 3 0 0 R

S G X 0 2 P A 3 0 0 S A X 0 0 P A 3 2 0

S u r g e P r o t e c t i o n

T y p e 1 a n d 2

M o n o b l o c k


T y p e 1 a n d 2 w i t h

P l u g - i n C a r t r i d g e


T y p e 2 w i t h P l u g - i n

C a r t r i d g e

A c c e s s o r i e s a n d

S p a r e P a r t s

I E C m a x i m u m d i s c h a r g e c u r r e n t I m a x ( 8 / 2 0 µ s ) 4 0 k A p e r p o l e

S u r g e P r o t e c t i o n D e v i c e s


Su

rge

Pro

tec

tio

n D

ev

ice

s

1 4

C o n f i g u r a t i o n o f c o n t a c t s R a t e d a u x i l i a r y s u p p l y v o l t a g e

[ V ]

2 4 V A C / D C 2 2 0 . . . 2 3 0 V A C

1 N O + 1 N C C N 2 0 1 1 0 2 4 C N 2 0 1 1 2 2 0

2 N O C N 2 0 2 0 0 2 4 C N 2 0 2 0 2 2 0

O n e - p o l e o r t w o - p o l e . 1 m o d u l e . I t h 2 0 A

1 N O + 1 N C C N 3 2 1 1 0 2 4 C N 3 2 1 1 2 2 0

2 N O C N 3 2 2 0 0 2 4 C N 3 2 2 0 2 2 0


4 N O C N 2 5 1 0 0 2 4 C N 2 5 1 0 2 2 0

3 N O + 1 N C C N 2 5 0 1 0 2 4 C N 2 5 0 1 2 2 0

T h r e e - p o l e o r f o u r - p o l e . 2 m o d u l e s . I t h 2 5 A

4 N O C N 3 2 1 0 0 2 4 C N 3 2 1 0 2 2 0

3 N O + 1 N C C N 3 2 0 1 0 2 4 C N 3 2 0 1 2 2 0


4 N O C N 4 0 1 0 0 2 4 C N 4 0 1 0 2 2 0

3 N O + 1 N C C N 4 0 0 1 0 2 4 C N 4 0 0 1 2 2 0


4 N O C N 6 3 1 0 0 2 4 C N 6 3 1 0 2 2 0

3 N O + 1 N C C N 6 3 0 1 0 2 4 C N 6 3 0 1 2 2 0


C o n f i g u r a t i o n o f c o n t a c t s R a t e d a u x i l i a r y s u p p l y v o l t a g e

[ V ]

2 4 V A C / D C 2 2 0 . . . 2 3 0 V A C

1 N O + 1 N C C N M 2 0 1 1 0 2 4 C N M 2 0 1 1 2 2 0

2 N O C N M 2 0 2 0 0 2 4 C N M 2 0 2 0 2 2 0


2 N O C N M 3 2 2 0 0 2 4 C N M 3 2 2 0 2 2 0


C N M 3 2 1 0 . . .

4 N O C N M 3 2 1 0 0 2 4 C N M 3 2 1 0 2 2 0


O r d e r c o d e C h a r a c t e r i s t i c s M a x . q t y p e r c o n t a c t o r

C N H 1 1 * 1 N O + 1 N C 1

C N H 2 0 * 2 N O 1

A u x i l i a r y c o n t a c t s

C N X 8 0 1 / 2 m o d . w i d e 1

S p a c e r

C N 2 5 …

C N 3 2 1 0 … C N 3 2 0 1 …

C N 2 0 …

C N 3 2 1 1 … C N 3 2 2 0 …

C N 6 3 . . .

C N M 2 0 . . . C N M 3 2

2 0 . . .

C N H . . .

C N 4 0 . . .

M o d u l a r C o n t a c t o r s

w i t h M a n u a l C o n t r o l



O r d e r c o d e C h a r a c t e r i s t i c s M a x . q t y p e r c o n t a c t o r

* N o t s u i t a b l e f o r C N 2 0 … , C N 3 2 1 1 … , C N 3 2 2 0 … , C N M 2 0 … a n d C N M 3 2 . . .



Mo

du

lar

Co

nta

cto

rs

1 5

O r d e r C o d e T i m e o f S c a l e R a n g e R a t e d a u x i l i a r y

s u p p l y v o l t a g e

[ V ]

T M P 0 . 1 . . . 1 s , 1 . . . 1 0 s , 6 . . . 6 0 s ,

1 . . . 1 0 m i n , 6 m i n . . . 1 h r , 1 . . . 1 0 h r ,

0 . 1 … . 1 d a y , 1 . . . 1 0 d a y s

O N o n l y , O F F o n l y

2 4 . . . 4 8 V D C

2 4 . . . 2 4 0 V A C

T M P A 4 4 0 0 . 1 . . . 1 s , 1 . . . 1 0 s , 6 . . . 6 0 s ,

1 . . . 1 0 m i n

3 8 0 . . . 4 4 0 V A C

O n d e l a y t i m e r e l a y . M u l t i s c a l e . M u l t i v o l t a g e

T M D 0 . 0 6 . . . 0 . 6 s , 0 . 6 . . . 6 s , 6 . . . 6 0 s ,

1 8 . . . 1 8 0 s

2 4 . . . 2 4 0 V A C / D C

O f f d e l a y t i m e r e l a y . M u l t i s c a l e . M u l t i v o l t a g e

T M M 1 0 . 1 . . . 1 s , 1 . . . 1 0 s , 6 . . . 6 0 s ,

1 . . . 1 0 m i n , 6 m i n . . . 1 h r , 1 . . . 1 0 h r ,

0 . 1 … . 1 d a y , 1 . . . 1 0 d a y s


1 2 . . . 2 4 0 V A C / D C

T M M 1 N F C 4 0 F u n c t i o n s

N F C P r o g r a m m i n g

M u l t i f u n c t i o n t i m e r e l a y . M u l t i s c a l e . M u l t i v o l t a g e . 1 c h a n g e o v e r r e l a y o u t p u t .

1 0 f u n c t i o n s i n c l . o n d e l a y , o f f d e l a y , f l a s h e r , p u l s e g e n e r a t o r , l a t c h

T M M 2 0 . 1 . . . 1 s , 1 . . . 1 0 s , 6 . . . 6 0 s ,

1 . . . 1 0 m i n , 6 m i n . . . 1 h r , 1 . . . 1 0 h r ,

0 . 1 … . 1 d a y , 1 . . . 1 0 d a y s


1 2 . . . 2 4 0 V A C / D C

M u l t i f u n c t i o n t i m e r e l a y . M u l t i s c a l e . M u l t i v o l t a g e . 1 c h a n g e o v e r r e l a y

o u t p u t + 1 N / O c o n t a c t . 1 0 f u n c t i o n s i n c l . o n d e l a y , o f f d e l a y , f l a s h e r ,

p u l s e g e n e r a t o r , l a t c h

T M P L 0 . 1 . . . 1 s , 1 . . . 1 0 s , 6 . . . 6 0 s ,

1 . . . 1 0 m i n , 6 m i n . . . 1 h r , 1 . . . 1 0 h r ,

0 . 1 … . 1 d a y , 1 . . . 1 0 d a y s ,

3 . . . 3 0 d a y s , 1 0 . . . 1 0 0 d a y s

1 2 . . . 2 4 0 V A C / D C

R e c y c l e t i m e r e l a y , i n d e p e n d e n t t i m i n g s . M u l t i s c a l e . M u l t i v o l t a g e

T M S T 0 . 1 . . . 1 s , 1 . . . 1 0 s , 6 . . . 6 0 s ,

1 . . . 1 0 m i n

2 4 . . . 4 8 V D C

2 4 . . . 2 4 0 V A C

T M S T A 4 4 0 0 . 1 . . . 1 s , 1 . . . 1 0 s , 6 . . . 6 0 s ,

1 . . . 1 0 m i n

3 8 0 . . . 4 4 0 V A C

T i m e r e l a y f o r s t a r t i n g ( s t a r d e l t a s t a r t e r s ) . M u l t i s c a l e . M u l t i v o l t a g e

T M L S 0 . 5 . . . 2 0 m i n 2 2 0 . . . 2 4 0 V A C

T i m e r e l a y f o r s t a i r c a s e l i g h t i n g

T M P T M D

T M M 1 T M M 2

T M S T T M L S

M o d u l a r T i m e

R e l a y s

T i m e R e l a y s

Tim

e R

ela

ys


TMM1 NFC Multifunction Timer is now available with wireless NFC

programming via the free “LOVATO NFC” android app - even without power!

No front controls makes time settings 100% accurate, secure and may even be

password protected and made tamperproof!

40 FUNCTIONS now available due to the removal of mechanical adjustments.

Functions also include counter and hour run time - never before available on a

standard multifunction timer

Settings can be stored and shared across multiple devices for rapid

programming or file sharing via free LOVATO NFC app or email.

Setup of timers has never been easier! 40 Functions

1 6

P M V 1 0 A 4 4 0 P M V 2 0 A 2 4 0

P M V 2 0 A 5 7 5

P M V 3 0 A 2 4 0

P M V 3 0 A 5 7 5

P M V 4 0 A 2 4 0

P M V 4 0 A 5 7 5

P M V 5 0 A 2 4 0

P M V 5 0 A 5 7 5

P M V 7 0 A 2 4 0

P M V 7 0 A 5 7 5

M i n i m u m A C v o l t a g e ● ● ●

M a x i m u m A C v o l t a g e ● ●

P h a s e l o s s ● ● ● ● ● ●

I n c o r r e c t p h a s e s e q u e n c e ● ● ● ● ● ●

A s y m m e t r y ● ●

P M V 5 0 N A 2 4 0

P M V 5 0 N A 4 4 0

P M V 7 0 N A 2 4 0

P M V 7 0 N A 4 4 0

P M V 8 0 N A 2 4 0

P M V 8 0 N A 4 4 0

P M V 9 5 N A 2 4 0

P M V 9 5 N A 5 7 5

M i n i m u m A C v o l t a g e ● ● ● ●

M a x i m u m A C v o l t a g e ● ● ● ●

P h a s e l o s s ● ● ● ●

N e u t r a l l o s s ● ● ● ●

I n c o r r e c t p h a s e s e q u e n c e ● ● ● ●

A s y m m e t r y ● ●

M i n i m u m f r e q u e n c y ● ●

M a x i m u m f r e q u e n c y ● ●

P M V 5 5 A 2 4 0

P M V 5 5 A 4 4 0

M i n i m u m A C v o l t a g e ●

M a x i m u m A C v o l t a g e ●

V o l t a g e M o n i t o r i n g

R e l a y s f o r T h r e e

P h a s e S y s t e m s

W i t h o u t N e u t r a l


R e l a y s f o r T h r e e

P h a s e S y s t e m s W i t h

o r W i t h o u t N e u t r a l


R e l a y s f o r S i n g l e

P h a s e S y s t e m s

M o n i t o r i n g R e l a y s

Mo

nit

ori

ng

Re

lay

s


1 7

P M A 2 0 2 4 0 5 o r 1 6 A 2 4 . . . 2 4 0 V A C / D C

S i n g l e - p h a s e s y s t e m . A C / D C m a x i m u m c u r r e n t c o n t r o l . A u x i l i a r y A C / D C

p o w e r s u p p l y . A u t o m a t i c o r m a n u a l r e s e t .

O r d e r c o d e R a t e d c u r r e n t l e

[ A ]

A u x i l i a r y s u p p l y v o l t a g e

[ V ]

P M A 3 0 2 4 0 5 o r 1 6 A 2 4 . . . 2 4 0 V A C / D C

S i n g l e a n d t h r e e - p h a s e s y s t e m . A C / D C m i n i m u m o r m a x i m u m c u r r e n t

c o n t r o l . D e l a y e d t r i p . A u x i l i a r y A C / D C p o w e r s u p p l y . A u t o m a t i c o r m a n u a l

r e s e t .

P M A 4 0 2 4 0 0 . 0 2 - 0 . 0 5 - 0 . 2 5 - 1 - 5 - 1 6 A 2 4 . . . 2 4 0 V A C / D C

S i n g l e a n d t h r e e - p h a s e s y s t e m . A C / D C m i n i m u m a n d m a x i m u m c u r r e n t

c o n t r o l . D e l a y e d t r i p . A u x i l i a r y A C / D C p o w e r s u p p l y . A u t o m a t i c o r m a n u a l

r e s e t .

P M A 5 0 A 2 4 0 2 2 0 . . . 2 4 0 V A C

5 o r 1 6 A P M A 5 0 A 4 1 5 3 8 0 . . . 4 1 5 V A C

O r d e r c o d e R a t e d c u r r e n t l e

[ A ]


[ V ]

S i n g l e a n d t h r e e - p h a s e s y s t e m s . D r y r u n n i n g , u n d e r l o a d , o v e r c u r r e n t

p r o t e c t i o n . M a x i m u m A C c u r r e n t a n d m i n i m u m c o s ϕ. D e l a y e d t r i p . P h a s e

l o s s a n d i n c o r r e c t p h a s e s e q u e n c e . I n s t a n t a n e o u s t r i p . A u x i l i a r y A C p o w e r

s u p p l y . A u t o m a t i c o r m a n u a l r e s e t .

P M V F 7 0 2 3 0 V A C

4 0 0 V A C

1 0 0 . . . 2 4 0 V A C

1 1 0 . . . 2 5 0 V D C

S i n g l e a n d t h r e e - p h a s e s y s t e m s w i t h o r w i t h o u t n e u t r a l i n l o w a n d h i g h

v o l t a g e . D u a l t h r e s h o l d m i n i m u m a n d m a x i m u m v o l t a g e a n d f r e q u e n c y p r o -

t e c t i o n , R O C O F a n d v e c t o r s h i f t . M o d u l a r d i n r a i l m o u n t i n g .

C o m p l i a n t w i t h p r e v a i l i n g G 5 9 . . a n d G 9 9 . . s t a n d a r d s

O r d e r c o d e R a t e d V o l t a g e

[ V ]


[ V ]

P M F 2 0 A 2 4 0 2 2 0 . . . 2 4 0 V A C

P M F 2 0 A 4 1 5 3 8 0 . . . 4 1 5 V A C

O r d e r c o d e R a t e d v o l t a g e U e

[ V ] 5 0 / 6 0 H z

S i n g l e a n d t h r e e - p h a s e s y s t e m s . M i n i m u m a n d m a x i m u m f r e q u e n c y .

D e l a y e d t r i p . A u t o m a t i c r e s e t .

P M A 4 0 . . . P M A 2 0 / 3 0 . . .

P M A 5 0 . . .

P M V F 7 0

P M F 2 0 . . .

C u r r e n t M o n i t o r i n g

R e l a y s

P u m p P r o t e c t i o n

R e l a y s

G 5 9 / G 9 9 I n t e r f a c e

P r o t e c t i o n R e l a y

F r e q u e n c y



Mo

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s


D e s c r i p t i o n L V M 2 0 A 2 4 0 * L V M 3 0 A 2 4 0 * L V M 2 5 2 4 0

2 4 . . . 2 4 0 V A C / D C

L V M 4 0 A 2 4 0 *

M o d u l a r v e r s i o n ● ( 2 U ) ● ( 1 U ) ● ( 3 U ) ● ( 3 U )

3 d e t e c t i n g e l e c t r o d e s

( M I N , M A X a n d C O M ) ● ● ●

5 d e t e c t i n g e l e c t r o d e s

( M I N 1 , M A X 1 , M I N 2 , M A X 2 a n d

C O M )

●

S e n s i t i v i t y a d j u s t m e n t 2 . 5 . . . 5 0 k Ω ● ●

S e n s i t i v i t y a d j u s t m e n t

2 . 5 . . . 1 0 0 k Ω

●

S e n s i t i v i t y a d j u s t m e n t

2 . 5 . . . 2 0 0 k Ω

●

A d j u s t a b l e s e n s i t i v i t y f u l l - s c a l e

v a l u e 2 5 - 5 0 - 1 0 0 - 2 0 0 k Ω

●

S e p a r a t e s e n s i t i v i t y a d j u s t m e n t

f o r M A X p r o b e ( f o a m d e t e c t i o n )

●

E m p t y i n g f u n c t i o n ● ● ● ●

F i l l i n g f u n c t i o n ● ● ●

E m p t y i n g f u n c t i o n w i t h E x t r a - M I N

a n d / o r E x t r a - M A X a l a r m r e l a y s

●

F i l l i n g f u n c t i o n w i t h E x t r a - M I N

a n d / o r E x t r a - M A X a l a r m r e l a y s

●

E m p t y i n g f u n c t i o n w i t h s t a r t

c h a n g e c o n t r o l

●

F i l l i n g f u n c t i o n w i t h s t a r t

c h a n g e c o n t r o l

●

T a n k f i l l i n g , w e l l d r a w i n g

f u n c t i o n s a n d a l a r m

●

F i l l i n g - e m p t y i n g a d j u s t m e n t

s e l e c t o r

● ●

P r o g r a m m i n g s e l e c t o r f o r 5

d i f f e r e n t f u n c t i o n s

●

L e v e l C o n t r o l s

* 2 4 V A C , 1 1 0 V A C a n d 4 0 0 V A C v e r s i o n s a v a i l a b l e . P l e a s e s e e g e n e r a l c a t a l o g u e


Le

ve

l C

on

tro

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2

1 1 S N 1 Y E S 1 0 0

3 1 S C M 0 4 Y E S 4 3

3 1 S C M 5 0 Y E S 5 0 0

3 1 S C M 1 0 0 Y E S 1 0 0 0

3 1 C G L 1 2 5 3 Y E S 3 2 7

3 1 C G L 1 2 5 5 Y E S 5 0 0

3 1 C G L 1 2 5 7 Y E S 7 0 0

3 1 C G L 1 2 5 1 0 Y E S 1 0 0 0

S i n g l e p o l e e l e c t r o d e s

O r d e r c o d e P r o b e i n c l u d e d P r o b e l e n g t h [ m m ]

T h r e e p o l e e l e c t r o d e s

3 1 P S 3 1 Y E S 3 0 0 / 1 1 . 8

E l e c t r o d e h o l d e r ( f o r 3 r o d p r o b e s )

3 1 P S 3 S N O -

F o r S C M p r o b e s 3 1 A S T A 4 6 0 M M 4 3 1 A S T A 9 6 0 M M 4

F o r P S 3 S e l e c t r o d e h o l d e r 3 1 A S T A 4 6 0 M M 6 3 1 A S T A 9 6 0 M M 6

D e s c r i p t i o n 4 6 0 m m R o d p r o b e l e n g t h 9 6 0 m m R o d p r o b e l e n g t h

1 1 S N 1 3 1 S C M . . . 3 1 C G L 1 2 5 . . . 3 1 P S 3 1

3 1 P S 3 S

E l e c t r o d e s

P r o b e s a n d

E l e c t r o d e H o l d e r s

F o r g u i d a n c e o n p r o b e s e l e c t i o n r e f e r t o g e n e r a l c a t a l o g u e

3 1 A S T A . . .

L e v e l C o n t r o l s

L V F S N 1 B . . .

L V F S P 1 W 0 3 P V C 3 Y E S

L V F S P 1 W 0 5 P V C 5 Y E S

L V F S P 1 W 1 0 P V C 1 0 Y E S

L V F S P 1 W 1 5 P V C 1 5 Y E S

L V F S N 1 W 0 5 N e o p r e n e 5 Y E S

L V F S N 1 W 1 0 N e o p r e n e 1 0 Y E S



O r d e r c o d e C a b l e m a t e r i a l C a b l e l e n g t h

[ m m ]

C o u n t e r - w e i g h t

i n c l u d e d

L V F S . . .

F l o a t S w i t c h e s F o r

G r e y W a t e r

G r e y W a t e r : T h e s e f l o a t s w i t c h e s a r e d e s i g n e d f o r u s e i n g r e y w a t e r a p p l i c a t i o n s s u c h a s

r a i n w a t e r , g r o u n d w a t e r , d o m e s t i c w a s t e w a t e r a n d i n d u s t r i a l c o o l i n g w a t e r

L V F S N 1 B 0 5 N e o p r e n e 5 I N T E R N A L

L V F S N 1 B 1 0 N e o p r e n e 1 0 I N T E R N A L



O r d e r c o d e C a b l e m a t e r i a l C a b l e l e n g t h

[ m m ]

C o u n t e r - w e i g h t

i n c l u d e d

F l o a t S w i t c h e s

F o r D i r t y W a t e r

D i r t y W a t e r : T h e s e f l o a t s w i t c h e s a r e d e s i g n e d f o r u s e i n d i r t y w a t e r a p p l i c a t i o n s , o f t e n r e f e r r e d

t o a s b l a c k w a t e r a p p l i c a t i o n s , s u c h a s s e w a g e o r i n d u s t r i a l w a s t e w a t e r

Le

ve

l C

on

tro

ls


3

C o n t a c t T y p e 1 S o l i d S t a t e R e l a y 1 S t a n d a r d C h a n g e o v e r

C u r r e n t 2 A A C 4 A D C 6 A

1 2 V A C / D C H R 1 0 1 C E 0 1 2

2 4 V A C / D C H R 1 0 1 C E 0 2 4

2 4 V D C H R 2 0 1 A S 0 2 4 H R 2 0 1 D S 0 2 4

1 1 0 V A C / D C H R 1 0 1 C E 0 6 0

2 3 0 V A C / D C H R 1 0 1 C E 0 6 0

S l i m s o l i d s t a t e a n d s t a n d a r d r e l a y s

H R 1 0 S e r i e s a s s e m b l e d s l i m r e l a y w i t h s p r i n g t e r m i n a l

H R 1 0 S e r i e s

S l i m R e l a y s

C o n t a c t s a l e s f o r l a r g e v o l u m e e n q u i r i e s o r f u l l y a s s e m b l e d r e l a y s

G e n e r a l P u r p o s e R e l a y s


Ge

ne

ral

Pu

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s

S c r e w T e r m i n a l H R 1 X S 0 2 4 H R 1 X S 1 1 0 H R 1 X S 2 3 0

S p r i n g T e r m i n a l H R 1 X S 0 2 4 S H R 1 X S 1 1 0 S H R 1 X S 2 3 0 S

S o c k e t b a s e s

R e t a i n i n g C l i p s I n c l u d e d i n t h e s o c k e t

M a r k e r T a g S i n g l e H R 1 X 3 0

M a r k e r T a g ( 1 6 S t r i p ) H R 1 X 3 0 1 6

2 0 P o l e B u s b a r B l a c k H R 1 X 9 0 2 0

2 0 P o l e B u s b a r R e d H R 1 X 9 1 2 0


HR Series

H R 1 X S . .

H R 1 0 1 C . .

4

C o n t a c t T y p e 1

C h a n g e o v e r

2

C h a n g e o v e r

1 C h a n g e o v e r

M e c h A c t u a t o r +


M e c h A c t u a t o r

C u r r e n t 1 0 A 8 A 8 A 1 0 A

1 2 V D C H R 3 0 1 C D 0 1 2 H R 3 0 2 C D 0 1 2 H R 5 0 1 C D 0 1 2 H R 5 0 2 C D 0 1 2


2 4 V A C H R 3 0 1 C A 0 2 4 H R 3 0 2 C A 0 2 4 H R 5 0 1 C A 0 2 4 H R 5 0 2 C A 0 2 4

1 1 0 V A C H R 3 0 1 C A 1 1 0 H R 3 0 2 C A 1 1 0 H R 5 0 1 C A 1 1 0 H R 5 0 2 C A 1 1 0



G e n e r a l P u r p o s e R e l a y s


S c r e w t e r m i n a l -

T o p C o n t a c t s

H R 5 X S 2 1


T o p / b o t t o m c o n t a c t s

H R 5 X S 2 2

S p r i n g t e r m i n a l H R 5 X S 2 1 S

S o c k e t b a s e s *

R e t a i n i n g C l i p s H R 3 X 8 8 H R 5 X 8 7

M a r k e r T a g S i n g l e H R 5 X 3 0

8 P o l e b u s b a r b l a c k H R 5 X 9 0 0 8

S u r g e s u p p r e s s o r

R C 6 - 2 4 V A C / D C

H R 6 X 7 7 0 2 4


R C 1 1 0 - 2 3 0 V A C / D C

H R 6 X 7 7 2 3 0

D i o d e & L E D 6 - 2 4 V D C H R 6 X 7 8 0 2 4


H R 5 X S 2 2

H R 5 0 1 C . .

H R 3 0 S e r i e s

H R 5 0 S e r i e s

M i n i a t u r e

R e l a y s

Ge

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C o n t a c t T y p e 2

C h a n g e o v e r

4

C h a n g e o v e r


8 P i n


1 1 P i n

C u r r e n t 7 A 5 A 1 0 A 1 0 A

1 2 V D C H R 6 0 2 C D 0 1 2 H R 6 0 4 C D 0 1 2 - -


2 4 V A C H R 6 0 2 C A 0 2 4 H R 6 0 4 C A 0 2 4 H R 7 0 2 C A 0 2 4 H R 7 0 3 C A 0 2 4




T o p C o n t a c t s

H R 6 X S 2 1 H R 6 X S 4 1

8 P i n S c r e w

T e r m i n a l

H R 7 X S 1

1 1 P i n S c r e w

T e r m i n a l

H R 7 X S 2


T o p / b o t t o m c o n t a c t s

H R 6 X S 2 2 H R 6 X S 4 2

S p r i n g t e r m i n a l H R 6 X S 2 1 S H R 6 X S 4 1 S

S o c k e t b a s e s *

R e t a i n i n g C l i p s H R 6 X 8 8

M a r k e r T a g S i n g l e

H R 6 X 3 0

H R 5 X 3 0 ( o n l y s p r i n g t e r m i n a l b a s e s )


R C 6 - 2 4 V A C / D C

H R 6 X 7 7 0 2 4


R C 1 1 0 - 2 3 0 V A C / D C

H R 6 X 7 7 2 3 0

D i o d e & L E D 6 - 2 4 V D C H R 6 X 7 8 0 2 4


H R 7 X 8 7

H R 6 0 S e r i e s

H R 7 0 S e r i e s

I n d u s t r i a l

R e l a y s

H R 5 X S 2 1

H R 3 0 1 C . .

* A l l r e l a y s r e q u i r e b a s e s

* A l l r e l a y s r e q u i r e b a s e s


H R 6 0

A s s e m b l e d

H R 7 0 A s s e m b l e d

5

M i c r o P L C a n d H M I

F o r m o r e i n f o r m a t i o n o n t h e s e p r o d u c t s a n d o t h e r s w i t h i n t h e r a n g e , p l e a s e r e f e r t o t h e g e n e r a l c a t a l o g u e 5 2

L R D 1 2 R D 0 2 4 2 4 V D C 8 / 4 r e l a y

L R D 1 2 T D 0 2 4 2 4 V D C 8 / 4 t r a n s i s t o r

L R D 2 0 R D 0 2 4 2 4 V D C 1 2 / 8 r e l a y

L R D 1 2 R A 0 2 4 2 4 V A C 8 / 4 r e l a y

L R D 2 0 R A 0 2 4 2 4 V A C 1 2 / 8 r e l a y

L R D 1 0 R A 2 4 0 1 0 0 . . . 2 4 0 V A C 6 / 4 r e l a y

L R D 2 0 R A 2 4 0 1 0 0 . . . 2 4 0 V A C 1 2 / 8 r e l a y

L R D 2 0 R D 0 1 2 1 2 V D C 1 2 / 8 r e l a y

L R D 2 0 R D 0 2 4 P 1 2 4 V D C 1 2 / 8 R e l a y + R S 4 8 5

B a s e m o d u l e s

O r d e r C o d e A u x i l i a r y s u p p l y v o l t a g e I n p u t s / O u t p u t s

L R E 0 2 A D 0 2 4 2 4 V D C 2 a n a l o g o u t p u t s

L R E 0 4 A D 0 2 4 2 4 V D C 4 a n a l o g o u t p u t s

L R E 0 4 P D 0 2 4 2 4 V D C 4 P T 1 0 0 t e m p . s e n s o r i n p u t s

L R E 0 8 R D 0 2 4 2 4 V D C 4 / 4 r e l a y

L R E 0 8 T D 0 2 4 2 4 V D C 4 / 4 t r a n s i s t o r

L R E 0 8 R A 0 2 4 2 4 V A C 4 / 4 r e l a y

L R E 0 8 R A 2 4 0 1 0 0 . . . 2 4 0 V A C 4 / 4 r e l a y

L R E P 0 0 M o d b u s - R T U p r o t o c o l c o m m u n i c a t i o n u n i t

E x p a n s i o n a n d c o m m u n i c a t i o n m o d u l e s

L R X C 0 3 P C ( U S B ) - L R D p r o g r a m m i n g c a b l e a n d L R X P 0 1 ( R S 2 3 2 ) -

L R D d i r e c t c o n n e c t i o n

L R X S W P r o g r a m m i n g a n d s u p e r v i s i o n s o f t w a r e ( C D - R O M )

L R X 1 V 3 D 0 2 4 P o w e r s u p p l y u n i t , 1 0 0 . . . 2 4 0 V A C / 2 4 V D C , 1 . 3 A

L R X P 0 1 H M I o p e r a t o r p a n e l , 2 4 V D C , R S 2 3 2 , R S 4 8 5

( M o d b u s - R T U M a s t e r )

L R X C 0 2 P C - L R X P 0 1 p r o g r a m m i n g c a b l e

L R X S W P 0 1 L R X P 0 1 e d i t o r s o f t w a r e ( C D - R O M )

L R D D E M 1 2 R D 0 2 4 1 2 I / O T r a i n i n g K i t - a l s o a v a i l a b l e i n 2 0 I / O v e r s i o n


L R H A 0 4 4 . 3 ” T F T L C D D i s p l a y

L R H A 0 7 7 ” T F T L C D D i s p l a y

L R H A 1 0 1 0 ” T F T L C D D i s p l a y

L R H S W 0 1 U s e r L i c e n c e F o r L R H S W s o f t w a r e

E X C C A B 0 2 R S 4 8 5 C o n n e c t i o n c a b l e 3 m


B a s e M o d u l e s


H M I T o u c h s c r e e n s

L R D 1 0 …

L R D 1 2 …

L R D 2 0 R D 0 2 4

E x p a n s i o n M o d u l e s

L R E . . .

L R D D E M . .

T r a i n e r K i t

L R X P 0 1

M a x i m u m c o m b i n a t i o n s

B a s e u n i t

1 2 i n p u t s +

8 o u t p u t s

4 i n p u t s +

4 o u t p u t s

4 i n p u t s +

4 o u t p u t s

4 i n p u t s +

4 o u t p u t s

4 P T 1 0 0

t e m p e r a t u r e

s e n s o r i n p u t s

2 o u t p u t s ,

0 . . . 1 0 V o r

0 . . . 2 0 m A

2 o u t p u t s ,

0 . . . 1 0 V o r

0 . . . 2 0 m A

4 o u t p u t s ,

0 . . . 1 0 V o r

0 . . . 2 0 m A

R S 4 8 5

M o d b u s - R T U

( s l a v e )

Mic

ro P

LC

6

P S L 1 M 0 1 0 1 2

1 2 V D C

0 . 8 3 1 0

P S L 1 M 0 2 4 1 2 2 2 4

P S L 1 M 0 3 3 1 2 2 . 7 5 3 3

P S L 1 M 0 5 4 1 2 4 . 5 5 4

P S L 1 M 0 7 2 1 2 6 7 2

P S L 1 M 0 1 0 2 4 0 . 4 2 1 0

2 4 V D C

P S L 1 M 0 2 4 2 4 1 2 4

P S L 1 M 0 3 6 2 4 1 . 5 3 6

P S L 1 M 0 6 0 2 4 2 . 5 6 0

P S L 1 M 1 0 0 2 4 4 . 2 1 0 0

S i n g l e p h a s e . I n p u t v o l t a g e 1 0 0 . . . 2 4 0 V A C

O r d e r c o d e R a t e d o u t p u t

v o l t a g e

[ V ]

R a t e d o u t p u t

c u r r e n t

[ A ]

O u t p u t p o w e r

[ W ]

P S L 1 0 0 5 2 4

2 4 V D C

0 . 2 1 5

P S L 1 0 1 0 2 4 0 . 4 2 1 0

P S L 1 0 1 8 2 4 0 . 7 5 1 8

P S L 1 0 3 0 2 4 1 . 2 5 3 0

P S L 1 0 6 0 2 4 2 . 5 6 0

P S L 1 1 0 0 2 4 4 . 2 1 0 0

P S L 1 1 2 0 2 4 5 1 2 0 ●

P S L 1 2 4 0 2 4 1 0 2 4 0 ●

P S L 1 3 0 0 2 4 1 2 . 5 3 0 0 ●

P S L 1 4 8 0 2 4 2 0 4 8 0 ●

P S L 1 0 3 0 4 8 0 . 6 2 5 3 0

4 8 V D C

P S L 1 0 6 0 4 8 1 . 2 5 6 0

P S L 1 1 0 0 4 8 2 . 1 1 0 0

P S L 1 1 2 0 4 8 2 . 5 1 2 0 ●

P S L 1 2 4 0 4 8 5 2 4 0 ●

P S L 1 3 0 0 4 8 6 . 2 5 3 0 0 ●

P S L 1 4 8 0 4 8 1 0 4 8 0 ●

S i n g l e p h a s e . I n p u t v o l t a g e 1 0 0 . . . 2 4 0 V A C

O r d e r c o d e R a t e d o u t p u t

v o l t a g e

[ V ]

R a t e d o u t p u t

c u r r e n t

[ A ]

O u t p u t

p o w e r

[ W ]

P a r a l l e l

O p e r a t i o n ( R e d u n d a n t

p o w e r & h i g h e r

a v a i l a b l e p o w e r )

P S L 2 1 0 0 2 4 2 4 V D C 4 . 2 1 0 0 ●

P S L 2 1 0 0 4 8 4 8 V D C 2 . 1 1 0 0

P S L 3 1 2 0 2 4

2 4 V D C

5 1 2 0

P S L 3 2 4 0 2 4 4 0 2 4 0 ●

P S L 3 4 8 0 2 4 2 0 4 8 0 ●

P S L 3 9 6 0 2 4 4 0 9 6 0 ●

P S L 3 2 4 0 4 8 5 2 4 0

4 8 V D C

●

P S L 3 4 8 0 4 8 1 0 4 8 0 ●

P S L 3 9 6 0 4 8 2 0 9 6 0 ●

O r d e r c o d e R a t e d o u t p u t v o l t a g e

[ V ]

R a t e d o u t p u t c u r r e n t

[ A ]

P S L R M 1 0 2 4 1 2 . . . 2 4 V D C 1 0

P S L R 2 0 2 4 2 4 V D C 2 0

T w o p h a s e . I n p u t v o l t a g e 4 0 0 . . . 5 0 0 V A C

T h r e e p h a s e . I n p u t v o l t a g e 4 0 0 . . . 5 0 0 V A C ( T w o - p h a s e c o n n e c t i o n i s a d m i s s i b l e w i t h

a 2 5 % o u t p u t p o w e r d e r a t i n g )

P S L 1 M 0 1 0 . . . P S L 1 M 0 3 3 1 2

P S L 1 M 0 3 6 2 4

P S L 1 0 0 5 2 4

P S L 1 0 1 0 2 4

P S L 1 0 1 8 2 4

P S L 1 0 3 0 . . .

P S L 1 0 6 0 . . .

P S L 1 1 0 0 . . .

P S L 1 1 2 0 . . .

P S L 1 2 4 0 . . .

P S L 1 3 0 0 . . .

P S L 1 4 8 0 2 4

P S L 1 4 8 0 4 8

P S L 3 9 6 0 . . .

P S L R M 1 0 2 4

M o d u l a r

D i n R a i l M o u n t

R e d u n d a n c y M o d u l e s

S w i t c h i n g P o w e r S u p p l i e s


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5 3

7

D M E D 1 2 0 T 1

O r d e r C o d e M I D A p p r o v e d

V e r s i o n

D e s c r i p t i o n

D M E D 1 0 0 T 1 4 0 A d i r e c t c o n n e c t i o n , 1 m o d u l e , 1 p u l s e o u t p u t , L C D s c r e e n w i t h k W h m e a s u r e m e n t

2 2 0 - 2 4 0 V A C

D M E D 1 0 0 T 1 M I D

D M E D 1 1 0 T 1 4 0 A d i r e c t c o n n e c t i o n , 1 m o d u l e , 1 p r o g r a m m a b l e s t a t i c o u t p u t , L C D s c r e e n w i t h d i s -

p l a y o f m u l t i p l e m e a s u r e m e n t s 2 2 0 - 2 4 0 V A C

D M E D 1 1 0 T 1 M I D

D M E D 1 2 0 T 1 6 3 A d i r e c t c o n n e c t i o n , 2 m o d u l e , 1 p r o g r a m m a b l e s t a t i c o u t p u t , b a c k l i t L C D s c r e e n

w i t h d i s p l a y o f m u l t i p l e m e a s u r e m e n t s 2 2 0 - 2 4 0 V A C

D M E D 1 2 0 T 1 M I D

D M E D 1 2 1 6 3 A d i r e c t c o n n e c t i o n , 2 m o d u l e , 1 p r o g r a m m a b l e s t a t i c o u t p u t , b a c k l i t L C D s c r e e n

w i t h d i s p l a y o f m u l t i p l e m e a s u r e m e n t s , R S 4 8 5 o u t p u t 2 2 0 - 2 4 0 V A C

D M E D 1 2 1 T 1 M I D

D M E D D 1 3 0 L M 6 3 A d i r e c t c o n n e c t i o n , 4 m o d u l e w i t h 2 i n p u t s a n d 2 r e l a y o u t p u t s a n d b a c k l i t L C D

d i s p l a y f o r l o a d m a n a g e m e n t o f a s i n g l e p h a s e s y s t e m . S c r e e n d i s p l a y m u l t i p l e

m e a s u r e m e n t s . 2 2 0 - 2 4 0 V A C

-

D M E D 1 1 0 T 1 D M E D 1 2 1 D M E D 3 0 1 D M E D 3 3 0

E n e r g y M e t e r s

M e t e r i n g I n s t r u m e n t s


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E X M 1 0 0 0

O r d e r c o d e D e s c r i p t i o n M e t e r E x p a n s i o n M o d u l e s

f o r E n e r g y M e t e r s E X M 1 0 0 0 2 d i g i t a l i n p u t s

2 s t a t i c o u t p u t s

D M E D 3 1 0 T 2

D M E D 3 1 0 T 2 M I D

D M E C D

E X M 1 0 0 1 2 o p t o - i s o l a t e d d i g i t a l

i n p u t s 2 r e l a y o u t p u t s 5 A

E X M 1 0 1 0 U S B I n t e r f a c e

E X M 1 0 1 2 R S 4 8 5

E X M 1 0 1 3 E t h e r n e t

E X M 1 0 2 0 R S 4 8 5 + 2 r e l a y O u t p u t s

E X M 1 0 3 0 D a t a s t o r a g e / l o g g i n g

D M E D 3 1 0 T 2

S i n g l e p h a s e e n e r g y m e t e r s

D M E D 3 0 1 F o r t h r e e p h a s e w i t h o r w i t h o u t n e u t r a l , 8 0 A d i r e c t c o n n e c t i o n , 4 m o d u l e , b a c k l i t L C D

s c r e e n w i t h d i s p l a y o f m u l t i p l e m e a s u r e m e n t s , R S 4 8 5 o u t p u t

D M E D 3 0 1 M I D

D M E D 3 3 0 F o r t h r e e p h a s e w i t h o r w i t h o u t n e u t r a l , c o n n e c t i o n v i a 5 A c u r r e n t t r a n s f o r m e r ,

4 m o d u l e , b a c k l i t L C D s c r e e n w i t h d i s p l a y o f m u l t i p l e m e a s u r e m e n t s , R S 4 8 5 o u t p u t

D M E D 3 3 0 M I D

D M E D 3 0 5 T 2 F o r t h r e e p h a s e w i t h o r w i t h o u t n e u t r a l , c o n n e c t i o n v i a 5 A c u r r e n t t r a n s f o r m e r ,

4 m o d u l e , 2 p r o g r a m m a b l e s t a t i c o u t p u t s , b a c k l i t L C D s c r e e n w i t h d i s p l a y o f m u l t i p l e

m e a s u r e m e n t s

D M E D 3 0 5 T 2 M I D

D M E D 3 1 0 T 2 F o r t h r e e p h a s e w i t h o r w i t h o u t n e u t r a l , c o n n e c t i o n v i a 5 A c u r r e n t t r a n s f o r m e r ,

4 m o d u l e , 2 p r o g r a m m a b l e s t a t i c o u t p u t s , b a c k l i t L C D s c r e e n w i t h d i s p l a y o f m u l t i p l e

m e a s u r e m e n t s , e x p a n d a b l e w i t h E X M … m o d u l e s

D M E D 3 1 0 T 2 M I D

D M E C D

( D a t a c o n c e n t r a t o r )

D a t a c o n c e n t r a t o r f o r g e n e r a l u s e . 8 p r o g r a m m a b l e d i g i t a l i n p u t s , e x p a n d a b l e f o r d a t a

c o l l e c t i o n . R S 4 8 5

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T h r e e p h a s e e n e r g y m e t e r s

8


D M G 1 0 0 M u l t i m e t e r f o r c o n n e c t i o n v i a 5 A c u r r e n t t r a n s f o r m e r , 4 m o d u l e d i n r a i l m o u n t , b a c k l i t i c o n L C D s c r e e n w i t h

d i s p l a y o f m u l t i p l e m e a s u r e m e n t s , n o n - e x p a n d a b l e . A u x s u p p l y 1 0 0 - 2 4 0 V A C , 1 2 0 - 2 5 0 V D C

D M G 1 1 0 M u l t i m e t e r f o r c o n n e c t i o n v i a 5 A c u r r e n t t r a n s f o r m e r , 4 m o d u l e d i n r a i l m o u n t , b a c k l i t i c o n L C D s c r e e n w i t h

d i s p l a y o f m u l t i p l e m e a s u r e m e n t s , R S 4 8 5 o u t p u t . A u x s u p p l y 1 0 0 - 2 4 0 V A C , 1 2 0 - 2 5 0 V D C

D M G 6 0 0 M u l t i m e t e r f o r c o n n e c t i o n v i a 5 A c u r r e n t t r a n s f o r m e r , 9 6 x 9 6 m m f l u s h m o u n t , b a c k l i t i c o n L C D s c r e e n w i t h

d i s p l a y o f m u l t i p l e m e a s u r e m e n t s , f r o n t o p t i c a l p o r t . E x p a n d a b l e w i t h E X P … m o d u l e s .

A u x s u p p l y 1 0 0 - 2 4 0 V A C , 1 2 0 - 2 5 0 V D C

D M G 6 1 0 M u l t i m e t e r f o r c o n n e c t i o n v i a 5 A c u r r e n t t r a n s f o r m e r , 9 6 x 9 6 m m f l u s h m o u n t , b a c k l i t i c o n L C D s c r e e n w i t h

d i s p l a y o f m u l t i p l e m e a s u r e m e n t s , f r o n t o p t i c a l p o r t . B u i l t i n R S 4 8 5 p o r t . E x p a n d a b l e w i t h E X P … m o d u l e s .


D M G 6 1 1 R 0 1 0 0

D M G 6 1 1 R 0 5 0 0

D M G 6 1 1 R 3 0 0 0

D M G 6 1 1 R 6 3 0 0

M u l t i m e t e r f o r c o n n e c t i o n v i a 3 R o g o w s k i c o i l s i n c l u d e d ( s u i t a b l e f o r r e t r o f i t ) w i t h m a x c u r r e n t o p t i o n s o f

1 0 0 A , 5 0 0 A , 3 0 0 0 A o r 6 3 0 0 A . 9 6 x 9 6 m m f l u s h m o u n t , b a c k l i t i c o n L C D s c r e e n w i t h d i s p l a y o f m u l t i p l e m e a s u r e -

m e n t s , f r o n t o p t i c a l p o r t . B u i l t i n R S 4 8 5 p o r t . E x p a n d a b l e w i t h E X P … m o d u l e s .


D M G 8 0 0 M u l t i m e t e r f o r c o n n e c t i o n v i a 5 A c u r r e n t t r a n s f o r m e r , 9 6 x 9 6 m m f l u s h m o u n t , b a c k l i t g r a p h i c d i s p l a y L C D

s c r e e n w i t h d i s p l a y o f m u l t i p l e m e a s u r e m e n t s , h a r m o n i c a n a l y s i s , e x p a n d a b l e w i t h E X P … m o d u l e s .


D M G 9 0 0 P o w e r a n a l y s e r f o r c o n n e c t i o n v i a 5 A c u r r e n t t r a n s f o r m e r , 9 6 x 9 6 m m f l u s h m o u n t , b a c k l i t g r a p h i c d i s p l a y L C D

t o u c h s c r e e n w i t h d i s p l a y o f m u l t i p l e m e a s u r e m e n t s , h a r m o n i c a n a l y s i s , e x p a n d a b l e w i t h E X P … m o d u l e s .


D M G 1 0 0 / D M G 1 1 0 D M G 6 0 0 / D M G 6 1 0 D M G 8 0 0

M u l t i m e t e r s

E X P 1 0 0 0 4 D i g i t a l o u t p u t s

D M G 6 0 0 / 6 1 0 / 8 0 0 / 9 0 0

E X P 1 0 0 1 4 s t a t i c O u t p u t s

E X P 1 0 0 2 2 d i g i t a l i n p u t s

2 s t a t i c o u t p u t s

E X P 1 0 0 3 2 r e l a y o u t p u t s 5 A

E X P 1 0 0 8 2 d i g i t a l i n p u t s

2 r e l a y o u t p u t s

E X P 1 0 1 0 U S B

E X P 1 0 1 1 R S 2 3 2

E X P 1 0 1 2 R S 4 8 5

E X P 1 0 1 3 E t h e r n e t

E X P 1 0 0 4 2 a n a l o g i n p u t s

D M G 8 0 0 / 9 0 0

E X P 1 0 0 5 2 a n a l o g o u t p u t s

E X P 1 0 1 4 P r o f i b u s i n t e r f a c e

E X P 1 0 3 0 D a t a s t o r a g e

E X P 1 0 3 1 D a t a s t o r a g e w i t h e n e r g y

q u a l i t y E N 5 0 1 6 0

D M G 9 0 0

O r d e r c o d e D e s c r i p t i o n M e t e r

E X P 1 0 . . .

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M o d u l e s f o r

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D M 0 T 0 0 5 0 5 0 - 1 . 2 5

D M 0 T 0 0 6 0 6 0 - 1 . 5

D M 0 T 0 0 8 0 8 0 - 1 . 5

D M 0 T 0 1 0 0 1 0 0 - 1 . 5

D M 0 T 0 1 5 0 1 5 0 - 2

O r d e r c o d e P r i m a r y c u r r e n t

I p n

/ 5 [ A ]

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c l . 0 . 5 c l . 1

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S o l i d - C o r e

C u r r e n t

T r a n s f o r m e r s f o r

D M E D a n d D M G

D e v i c e s

F o r Ø 2 2 m m c a b l e

D M 2 T 0 1 0 0 1 0 0 - 1

D M 2 T 0 1 5 0 1 5 0 - 1 . 5

D M 2 T 0 2 0 0 2 0 0 - 2

D M 2 T 0 2 5 0 2 5 0 - 2 . 5

D M 2 T 0 3 0 0 3 0 0 1 . 5 3

D M 2 T 0 4 0 0 4 0 0 2 3

F o r Ø 2 3 m m c a b l e . F o r 3 0 x 1 0 m m , 2 5 x 1 2 . 5 m m , 1 0 x 1 5 m m b u s b a r s

D M 3 T 0 2 0 0 2 0 0 - 5

D M 3 T 0 2 5 0 2 5 0 - 5

D M 3 T 0 3 0 0 3 0 0 2 . 5 5

D M 3 T 0 4 0 0 4 0 0 2 . 5 5

D M 3 T 0 5 0 0 5 0 0 2 . 5 5

D M 3 T 0 6 0 0 6 0 0 5 1 0

D M 3 T 0 8 0 0 8 0 0 5 1 0

F o r Ø 3 0 m m c a b l e . F o r 3 0 x 1 0 m m , 2 5 x 1 2 . 5 m m , 1 0 x 1 5 m m b u s b a r s

D M 0 T . . .

D M 2 T . . .

D M 3 T . . .

D M 1 T M A 0 1 0 0 1 0 0 - 1 . 2

D M 1 T M A 0 1 5 0 1 5 0 - 1 . 2

D M 1 T M A 0 2 0 0 2 0 0 - 1 . 2

D M 1 T M A 0 2 5 0 2 5 0 - 1 . 2

O r d e r c o d e P r i m a r y c u r r e n t

I p n

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c l . 0 . 5 c l . 1

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2 4 x 2 4 m m h o l e . C a b l e s u p p l i e d a s s t a n d a r d , 1 m l e n g t h

3 6 x 3 8 m m h o l e . C a b l e s u p p l i e d a s s t a n d a r d , 1 m l e n g t h

D M 2 T M A 0 2 5 0 2 5 0 - 1 . 5

D M 2 T M A 0 3 0 0 3 0 0 - 1 . 5

D M 2 T M A 0 4 0 0 4 0 0 - 1 . 5

D M 2 T M A 0 5 0 0 5 0 0 - 1 . 5

C o m p a c t P r e w i r e

S p l i t - C o r e

D M 1 T M A . . .

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D C T L A 4 0 0 0 0 7 5 M o d u l e f o r 7 . 5 k v a r s t e p , 4 0 0 V A C

D C T L A 4 0 0 0 1 5 0 M o d u l e f o r 1 5 k v a r s t e p , 4 0 0 V A C



D C T L A 4 0 0 1 0 0 0 M o d u l e f o r 1 0 0 k v a r s t e p , 4 0 0 V A C

C a p a c i t o r S w i t c h i n g

C o n t a c t o r s

O r d e r c o d e M a x i m u m I E C o p e r a t i o n a l p o w e r

2 4 0 V 4 0 0 V 4 4 0 V 6 9 0 V

[ k v a r ]

N . O . A u x

B F K 0 9 1 0 A 2 3 0 4 , 5 7 , 5 9 1 0 1

B F K 1 2 1 0 A 2 3 0 7 1 2 , 5 1 4 1 6 1

B F K 1 8 1 0 A 2 3 0 9 1 5 1 7 2 0 1

B F K 2 6 0 0 A 2 3 0 1 1 2 0 2 2 2 5 -

B F K 3 2 0 0 A 2 3 0 1 4 2 5 2 7 , 5 3 0 -

B F K 3 8 0 0 A 2 3 0 1 7 3 0 3 3 3 6 -

B F K 5 0 0 0 A 2 3 0 2 2 4 0 4 1 4 6 -

B F K 6 5 0 0 A 2 3 0 2 6 4 5 5 0 5 6 -

B F K 8 0 0 0 A 2 3 0 3 0 5 0 5 6 6 5 -

C a p a c i t o r s w i t c h i n g c o n t a c t o r s w i t h 2 3 0 V A C c o i l ( o t h e r c o i l v o l t a g e s a v a i l a b l e )

B F K . . .

A u t o m a t i c P o w e r F a c t o r C o n t r o l l e r s


D C T L . . . D C T L … T h y r i s t o r m o d u l e s a v a i l a b l e i n 4 8 0 V A C a n d 6 9 0 V A C v e r s i o n s

T h y r i s t o r M o d u l e s

D C T L . . .


D C R L 3 3 s t e p s , e x p a n d a b l e u p t o 6 s t e p s , 1 0 0 . . . 4 4 0 V A C

D C R L 5 5 s t e p s , e x p a n d a b l e u p t o 8 s t e p s , 1 0 0 . . . 4 4 0 V A C

D C R L 8 8 s t e p s , e x p a n d a b l e u p t o 1 4 s t e p s , 1 0 0 . . 4 4 0 V A C

S i n g l e a n d t h r e e - p h a s e l o w a n d m e d i u m - v o l t a g e s y s t e m s


D C R G 8 8 s t e p s , e x p a n d a b l e u p t o 2 4 s t e p s , 1 0 0 . . . 4 4 0 V A C

D C R G 8 I N D 8 s t e p s , e x p a n d a b l e u p t o 2 4 s t e p s , 1 0 0 . . . 4 4 0 V A C , f o r

c a p t i v e r e a c t i v e p o w e r f a c t o r c o r r e c t i o n

D C R G 8 F A u t o m a t i c d y n a m i c p o w e r f a c t o r c o n t r o l l e r , 8 s t a t i c

s t e p s , e x p a n d a b l e u p t o 2 4 s t e p s 1 1 0 . . . 4 1 5 V A C

N T C 0 1 R e m o t e t e m p e r a t u r e s e n s o r , l e n g t h 3 m / 3 . 3 y d


D C R L 8

A u t o P o w e r F a c t o r

C o n t r o l l e r - D C R G


I n p u t s a n d o u t p u t s

E X P 1 0 0 6 2 r e l a y o u t p u t s t o i n c r e a s e n u m b e r o f p o w e r f a c t o r

c o r r e c t i o n s t e p s

E X P 1 0 0 7 3 r e l a y o u t p u t s t o i n c r e a s e n u m b e r o f p o w e r f a c t o r

c o r r e c t i o n s t e p s

E X P 1 0 1 2 O p t o - i s o l a t e d R S 4 8 5 i n t e r f a c e

E X P 1 0 0 1 4 o p t o - i s o l a t e d s t a t i c o u t p u t s t o i n c r e a s e s t a t i c s t e p s

C o m m u n i c a t i o n p o r t s

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A T L 1 0 0 A u t o m a t i c t r a n s f e r s w i t c h c o n t r o l l e r f o r 2 p o w e r s o u r c e s w i t h s i n g l e

p h a s e c o n t r o l , m o d u l a r h o u s i n g , 1 1 0 . . . 2 3 0 V A C s u p p l y . D i n r a i l m o u n t

A T L 5 0 0 A u t o m a t i c t r a n s f e r s w i t c h c o n t r o l l e r w i t h o p t i c a l p o r t f o r 2 p o w e r

s o u r c e s u s i n g 3 p h a s e c o n t r o l , p o w e r s o u r c e s t a t u s d i s p l a y e d w i t h

L E D s 1 4 4 x 1 4 4 m m , p o w e r s u p p l y 1 1 0 - 4 4 0 V A C . F l u s h m o u n t


s o u r c e s w i t h 3 p h a s e c o n t r o l , g r a p h i c d i s p l a y s h o w i n g m e a s u r e m e n t s

a n d s t a t u s L E D s . 1 4 4 x 1 4 4 m m , p o w e r s u p p l y 1 1 0 - 4 4 0 V A C . F l u s h m o u n t



a n d s t a t u s L E D s . 1 4 4 x 1 4 4 m m , p o w e r s u p p l y 1 1 0 - 4 4 0 V A C a n d

1 2 / 2 4 V D C , e x p a n d a b l e w i t h E X P … e x p a n s i o n m o d u l e s . F l u s h m o u n t



a n d s t a t u s L E D s . T i e b r e a k e r m a n a g e m e n t , c l o s e d t r a n s i t i o n ,

c u s t o m i z a b l e c h a n g e o v e r d e v i c e l a y o u t , t r a n s f e r s t r a t e g y a n d P L C a n d

N F C t e c h n o l o g y . 1 8 0 x 2 4 0 m m , p o w e r s u p p l y 1 1 0 - 4 4 0 V A C a n d

1 2 / 2 4 / 4 8 V D C , e x p a n d a b l e w i t h E X P … e x p a n s i o n m o d u l e s , b u i l t - i n

R S 4 8 5 . F l u s h m o u n t


s o u r c e s , 3 c h a n g e o v e r d e v i c e s a n d 2 t i e b r e a k e r s . S u i t a b l e f o r L V a n d

M V s y s t e m s , g r a p h i c d i s p l a y s h o w i n g m e a s u r e m e n t s a n d s t a t u s L E D s .

T r a n s f e r s t r a t e g y a n d P L C a n d N F C t e c h n o l o g y . 1 8 0 x 2 4 0 m m , p o w e r

s u p p l y 1 1 0 - 4 4 0 V A C a n d 1 2 / 2 4 / 4 8 V D C , e x p a n d a b l e w i t h E X P e x p a n s i o n

m o d u l e s , b u i l t - i n R S 4 8 5 . F l u s h m o u n t

A u t o m a t i c T r a n s f e r S w i t c h C o n t r o l l e r s

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A T L D P S 1 i s c a p a b l e o f m e a s u r i n g a n d c o n t r o l l i n g 2

a u x i l i a r y s u p p l y v o l t a g e s a t i t s i n p u t s d e s i g n a t i n g t h e m o s t

i d e a l t o c o n n e c t t o t h e o u t p u t . I t r e d u c e s t h e n u m b e r o f

c o m p o n e n t s a n d i m p r o v e s i n s t a l l a t i o n s a f e t y .


A T L D P S 1 F o r m e a s u r e m e n t a n d c o n t r o l o f v o l t a g e s p r e s e n t a t s u p p l y i n p u t s t o

p o w e r m o t o r i s e d c i r c u i t b r e a k e r s / c h a n g e o v e r s w i t c h e s , p o w e r s u p p l y

1 1 0 / 2 3 0 V A C c o n f i g u r a b l e . D i n r a i l m o u n t

A T L D P S 1

L O V A T O E l e c t r i c i s a l e a d i n g

m a n u f a c t u r e r o f a u t o m a t i c c o n t r o l l e r s

f o r p o w e r s o u r c e c h a n g e o v e r s y s t e m s .

A T L S e r i e s o f a u t o m a t i c t r a n s f e r

s w i t c h c o n t r o l l e r s r a n g e s f r o m a

m o d u l a r A T L 1 0 0 f o r d o m e s t i c o r s m a l l

c o m m e r c i a l i n s t a l l a t i o n s t h r o u g h t o

A T L 9 0 0 - a h i g h l y a d v a n c e d a n d

u n i q u e c o n t r o l l e r f o r c o n t r o l o f u p t o 3

i n d e p e n d e n t p o w e r s o u r c e s i n a d d i t i o n

t o 2 t i e b r e a k e r s . O u r d e v i c e s a r e

c o n t r o l l i n g c r i t i c a l p o w e r s o u r c e s s u c h

a s i n h o s p i t a l s a n d a i r p o r t s .

A T L 6 0 0

A T L 8 0 0

A T L 9 0 0

1 2

E X P 1 0 0 0 4 d i g i t a l i n p u t s , o p t o - i s o l a t e d

E X P 1 0 0 1 4 s t a t i c o u t p u t s , o p t o - i s o l a t e d

E X P 1 0 0 2 2 d i g i t a l i n p u t s a n d 2 s t a t i c o u t p u t s , o p t o - i s o l a t e d

E X P 1 0 0 3 2 r e l a y o u t p u t s , r a t e d 5 A 2 5 0 V A C

E X P 1 0 0 4 2 a n a l o g i n p u t s , o p t o - i s o l a t e d 0 / 4 . . . 2 0 m A , P T 1 0 0 ,

0 - 1 0 V o r 0 . . . ± 5 V

E X P 1 0 0 5 2 a n a l o g o u t p u t s , o p t o - i s o l a t e d 0 / 4 . . . 2 0 m A , 0 - 1 0 V o r

0 . . . ± 5 V

E X P 1 0 0 6 2 r e l a y o u t p u t s t o i n c r e a s e n u m b e r o f s t e p s

E X P 1 0 0 7 3 r e l a y o u t p u t s t o i n c r e a s e n u m b e r o f s t e p s

E X P 1 0 0 8 2 o p t o - i s o l a t e d d i g i t a l i n p u t s a n d 2 r e l a y o u t p u t s

r a t e d 5 A 2 5 0 V

E X P 1 0 4 0 2 d i g i t a l / r e s i s t i v e i n p u t s , 2 s t a t i c o u t p u t s

E X P 1 0 4 1 2 t h e r m o c o u p l e i n p u t s , 2 s t a t i c o u t p u t s



E X P 1 0 1 0 O p t o - i s o l a t e d U S B i n t e r f a c e



E X P 1 0 1 3 O p t o - i s o l a t e d E t h e r n e t i n t e r f a c e

w i t h W e b s e r v e r f u n c t i o n

E X P 1 0 1 4 O p t o - i s o l a t e d P r o f i b u s - D P i n t e r f a c e


E X P 1 0 1 5 G P R S / G S M m o d e m

E X P 1 0 1 6 C a p a c i t o r b a n k p r o t e c t i o n

E X P 1 0 3 0 D a t a s t o r a g e , c l o c k - c a l e n d a r

E X P 1 0 3 1 D a t a s t o r a g e , c l o c k - c a l e n d a r w i t h E n e r g y Q u a l i t y

( E N 5 0 1 )

V a r i o u s f u n c t i o n a l i t y


f o r F l u s h - M o u n t

P r o d u c t s

T y p e

E X P 1 0 0 0 ● ● ● ● ● ● ● ● ●

E X P 1 0 0 1 ● ● ● ● ● ● ● ● ●

E X P 1 0 0 2 ● ● ● ● ● ● ● ● ●

E X P 1 0 0 3 ● ● ● ● ● ● ● ● ● ●

E X P 1 0 0 4 ● ● ● ● ● ●

E X P 1 0 0 5 ● ● ● ● ● ●

E X P 1 0 0 6 ● ● ●

E X P 1 0 0 7 ● ● ● ●

E X P 1 0 0 8 ● ● ● ● ● ● ● ● ●

E X P 1 0 1 0 ● ● ● ● ● ● ● ● ● ● ●

E X P 1 0 1 1 ● ● ● ● ● ● ● ● ● ● ●

E X P 1 0 1 2 ● ● ● ● ● ● ● ● ● ● ●

E X P 1 0 1 3 ● ● ● ● ● ( D C R L 8 ) ● ● ● ● ●

E X P 1 0 1 4 ● ● ● ● ● ●

E X P 1 0 1 5 ● ● ● ● ●

E X P 1 0 1 6 ●

E X P 1 0 3 0 ● ● ● E X P 1 0 3 1 ● E X P 1 0 4 0 ● ● ●

E X P 1 0 4 1 ● ●

D i g i t a l m u l t i m e t e r s

D M G 6 0 0 / 6 1 0 D M G 7 0 0 D M G 8 0 0

D i g i t a l p o w e r

a n a l y s e r s

D M G 9 0 0 / 9 0 0 T

P o w e r f a c t o r c o n t r o l l e r s

D C R L 3 / 5 / 8 D C R G 8

A u t o m a t i c t r a n s f e r

s w i t c h c o n t r o l l e r s

A T L 6 1 0 A T L 8 0 0 / 9 0 0

E n g i n e a n d g e n e r a t o r c o n t r o l l e r s

R G K . . . 4 S A R G K 6 1 0 … R G K 8 0 0 … R G K 9 0 0 . . .

E X P C o m p a t i b i l i t y

w i t h L o v a t o P r o d u c t s

E X P 1 0 . . .



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E X M 1 0 0 1


f o r M o d u l a r D e v i c e s E X M 1 0 0 0 2 d i g i t a l i n p u t s , 2 s t a t i c o u t p u t s , o p t o - i s o l a t e d

E X M 1 0 0 1 2 d i g i t a l i n p u t s , o p t o - i s o l a t e d a n d 2 r e l a y o u t p u t s ,

r a t e d 5 A 2 5 0 V A C

E X M 1 0 0 2 4 o p t o - i s o l a t e d d i g i t a l i n p u t s a n d 2 r e l a y o u t p u t s r a t e d

5 A 2 5 0 V A C



E X M 1 0 1 0 O p t o - i s o l a t e d U S B i n t e r f a c e

E X M 1 0 1 1 O p t o - i s o l a t e d R S 2 3 2 i n t e r f a c e

E X M 1 0 1 2 O p t o - i s o l a t e d R S 4 8 5 i n t e r f a c e

E X M 1 0 1 3 O p t o - i s o l a t e d E t h e r n e t i n t e r f a c e w i t h w e b s e r v e r

f u n c t i o n

E X M 1 0 2 0 O p t o - i s o l a t e d R S 4 8 5 i n t e r f a c e a n d 2 r e l a y o u t p u t s ,

r a t e d 5 A 2 5 0 V A C

E X M 1 0 3 0 D a t a s t o r a g e , R T C w i t h b a c k u p r e s e r v e e n e r g y f o r

d a t a l o g g i n g


C X 0 1 P C ↔ L o v a t o p r o d u c t d o n g l e , w i t h U S B o p t i c

c o n n e c t o r f o r p r o g r a m m i n g , d a t a d o w n l o a d ,

d i a g n o s t i c s a n d f i r m w a r e u p g r a d e

C X 0 2 P C ↔ L o v a t o p r o d u c t W i - F i d o n g l e f o r p r o g r a m m i n g ,

d a t a d o w n l o a d , d i a g n o s t i c s a n d f i r m w a r e u p g r a d e

O r d e r c o d e D e s c r i p t i o n C o m m u n i c a t i o n

D e v i c e s

E X C R D U 1 R e m o t e d i s p l a y u n i t , g r a p h i c L C D t o u c h s c r e e n

1 2 8 x 1 1 2 p i x e l s f o r A D X L … , I P 6 5 p r o t e c t i o n

R G K R A R e m o t e d i s p l a y u n i t , g r a p h i c L C D t o u c h s c r e e n

1 2 8 x 1 1 2 p i x e l s f o r R G K … , I P 6 5 p r o t e c t i o n

O r d e r c o d e D e s c r i p t i o n R e m o t e D i s p l a y

U n i t

E X C C O N 0 1 R S 4 8 5 / E t h e r n e t c o n v e r t e r , 1 2 . . . 4 8 V D C , i n c l u d i n g D I N

r a i l f i x i n g k i t

4 P X 1 R S 2 3 2 / R S 4 8 5 c o n v e r t e r , o p t o - i s o l a t e d , 2 2 0 . . . 2 4 0 V A C

p o w e r s u p p l y ( 1 1 0 . . . 1 2 0 V A C o n r e q u e s t ) . R e p e a t e r

d r i v e f o r R S 4 8 5 b u s e x t e n s i o n

O r d e r c o d e D e s c r i p t i o n C o n v e r t e r s

E X C M 3 G 0 1 R S 4 8 5 g a t e w a y / 3 G m o d e m , 9 . 5 . . . 2 7 V A C / 9 . 5 . . . 3 5 V D C ,

i n c l u d i n g a n t e n n a a n d p r o g r a m m i n g c a b l e

O r d e r c o d e D e s c r i p t i o n G a t e w a y

C X 0 1 C X 0 2

R G K R A

E X C C O N 0 1

E X C M 3 G 0 1



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T y p i c a l F u l l - L o a d C u r r e n t V a l u e s o f

i S i n g l e a n d T h r e e P h a s e E l e c t r i c M o t o r s

1 5

T h e p r o d u c t s i l l u s t r a t e d i n t h i s p u b l i c a t i o n a r e s u b j e c t t o r e v i s i o n o r i m p r o v e m e n t a t a n y t i m e . C a t a l o g u e d e s c r i p t i o n s , t e c h n i c a l a n d o p e r a t i o n a l d a t a a s w e l l a s o t h e r

d e t a i l s h e r e i n s p e c i f i e d d o n o t h a v e a n y c o n t r a c t u a l v a l u e a n d m u s t b e c o n s i d e r e d o n l y a s a n i n d i c a t i o n . T h e p r o d u c t s m u s t b e i n s t a l l e d a n d u s e d o n l y b y q u a l i f i e d

p e r s o n n e l i n a c c o r d a n c e w i t h t h e r e l e v a n t r e g u l a t i o n s i n f o r c e f o r e l e c t r i c a l i n s t a l l a t i o n s a n d s y s t e m s i n o r d e r t o a v o i d d a m a g e o r s a f e t y h a z a r d s . E . & O . E .

F o r t h e f u l l r a n g e o f p r o d u c t s a n d t e c h n i c a l

i n f o r m a t i o n , p l e a s e r e f e r t o t h e G e n e r a l C a t a l o g u e

S a l e s , T e c h n i c a l S u p p o r t & C u s t o m e r C a r e

T e l : 0 1 3 8 4 8 9 9 7 0 0 F a x : 0 1 3 8 4 8 9 1 6 5 4 E m a i l : s a l e s @ l o v a t o . c o . u k

w w w . l o v a t o . c o . u k

L o v a t o E l e c t r i c L t d , L o v a t o H o u s e , P r o v i d e n c e D r i v e , S t o u r b r i d g e , D Y 9 8 H Q

P r o g r a m m i n g p a r a m e t e r s v i a t a b l e t a n d s m a r t p h o n e i s n o w p o s s i b l e v i a N F C w i r e -

l e s s t e c h n o l o g y . B r i n g i n g a s m a r t p h o n e o r t a b l e t w i t h N F C c o n n e c t i o n c l o s e t o t h e

d i s p l a y o f a L o v a t o e l e c t r i c p r o d u c t - s u c h a s o u r T M M 1 N F C t i m e r - a c t i v a t e s t h e

N F C A P P a n d t h e d e v i c e i s r e c o g n i s e d a u t o m a t i c a l l y . T h e a p p a l l o w s y o u t o s e t t h e

p a r a m e t e r s f o r t h e d e v i c e , s a v e t h e p a r a m e t e r s i n a f i l e a n d s e n d v i a e m a i l a n d / o r

l o a d p a r a m e t e r s s a v e d p r e v i o u s l y .

C o n f i g u r a t i o n a n d m a i n t e n a n c e o p e r a t i o n s a r e n o w e a s i e r f o r a l l L O V A T O E l e c t r i c

p r o d u c t s e q u i p p e d w i t h f r o n t c o m m u n i c a t i o n i n f r a r e d p o r t s c o m p a t i b l e w i t h C X 0 2

d e v i c e . T h e y c a n b e c o n n e c t e d t o S a m 1 , t h e a p p l i c a t i o n a v a i l a b l e f o r t a b l e t s a n d

s m a r t p h o n e s . T h e r e f o r e i t i s n o l o n g e r n e c e s s a r y t u r n o n t h e l a p t o p a n d c o n n e c t

c a b l e s t o c a r r y o u t c o n f i g u r a t i o n a n d p a r a m e t e r s s e t t i n g .

E f f i c i e n t e n e r g y m a n a g e m e n t i s e s s e n t i a l t o i n d u s t r y a s i t o f f e r s a w a y t o r e d u c e

e n e r g y u s a g e , i d e n t i f y p r o d u c t i o n c o s t i n g s a n d i m p r o v e s u s t a i n a b i l i t y .

I n t h e f i e l d o f e n e r g y m o n i t o r i n g a n d e n e r g y s a v i n g , L O V A T O E l e c t r i c o f f e r s e n e r g y

s e r v i c e s , e n e r g y m a n a g e r s , t e c h n i c a l o f f i c e s a n d m a i n t e n a n c e c o m p a n i e s a w i d e

r a n g e o f h a r d w a r e s o l u t i o n s ( m u l t i m e t e r s , e n e r g y m e t e r s , v a r i a b l e s p e e d d r i v e s ,

a u t o m a t i c p o w e r f a c t o r c o n t r o l l e r s , e t c . ) a n d S Y N E R G Y s o f t w a r e t o m o n i t o r e n e r g y

s u p p l i e s l i k e e l e c t r i c i t y , w a t e r , g a s a n d a i r i n a s i m p l e a n d e c o n o m i c a l m a n n e r .

C o n f i g u r a t i o n

S o f t w a r e

X p r e s s i s a n o t h e r f r e e s o f t w a r e t h a t a l l o w s y o u t o :

T r a n s f e r s e t u p p a r a m e t e r s f r o m a L o v a t o d e v i c e t o P C o r v i c e v e r s a

R e a d m e a s u r e m e n t s , s e e e v e n t s o r a l a r m s a n d s e n d c o m m a n d s

E n a b l e s t h e e a s i e s t s e t u p a n d c o n t r o l !

E n e r g y

M a n a g e m e n t

S o f t w a r e

A P P

C o n f i g u r a t i o n

& C o n t r o l

D i d Y o u K n o w ? . . .

[email protected] Lovato.co.uk Tel: 01384 899700

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