Programming language, User's manual – Toshiba T2N User Manual
Page 244
User's manual
231
5. Programming Language
(A) +1· (A) F+(B)+1·(B)
→
(C) +1·(C)
(A) +1· (A) F-(B)+1·(B)
→
(C) +1·(C)
(A) +1· (A) F*(B)+1·(B)
→
(C) +1·(C)
(A) +1·(A) F/(B)+1·(B)
→
(C) +1·(C)
(A) AND (B)
→
(C)
(A) +1· DAND (B)+1·(B)
→
(C) +1·(C)
(A) OR (B)
→
(C)
(A) +1·(A) DOR (B)+1·(B)
→
(C)+1·(C)
(A) EOR (B)
→
(C)
(A)+1·(A) DEOR (B)+1·(B)
→
(C)+1·(C)
(A) ENR (B)
→
(C)
(A)+1·(A) DENR (B)+1·(B)
→
(C)+1·(C)
Ladder Diagram Instructions (Function Instructions)
Group
FUN
No.
Name
Representation
Summary
Number of
steps
required
Execution
time
required
(
µ
s)
Remarks
Arithmetic
operations
208
Floating point addition
Adds the floating point data of (A)+1 • (A) and (B)+1
•(B), and stores the result in (C)+1 • (C).
4
107
396
µ
s
(max)
209
Floating point subtraction
Subtracts the floating point data of (B)+1•(B)from
(A)+1 • (A) ,and stores the result in (C)+1 • (C).
4
108
399
µ
s
(max)
210
Floating point multiplication
Multiplies the floating point data of (A)+1 • (A) by
(B)+1•(B), and stores the result in (C)+1 • (C).
4
132
533
µ
s
(max)
211
Floating point division
Divides the floating point data of (A)+1 • (A) by
(B)+1•(B), and stores the result in (C)+1 • (C).
4
133
728
µ
s
(max)
Logical
operations
48
AN D
Finds the logical AND of (A) and (B) and stores it in
(C).
4~6
67
49
Double-length AND
Finds the logical AND of (A)+1 and (A) and (B)+1
•(B) and stores it in (C)+1 and (C).
4~8
100
50
OR
Finds the logical OR of (A) and (B) and stores in (C).
4~6
66
51
Double-length OR
Finds the logical OR of (A)+1 and (A) and (B)+1•(B)
and stores it in (C)+1 and (C).
4~8
100
52
Exclusive OR
Finds the exclusive logical OR of (A) and (B) and
stores it in (C).
4~6
66
53
Double-length exclusive
OR
Finds the exclusive logical OR of (A)+1• (A) and
(B)+1 and (B) and stores it in (C)+1•(C).
4~8
100
54
Not exclusive OR
Fins the negative exclusive logical OR of (A) and (B)
and stores it in (C).
4~6
66
55
Double-length
Notexclusive OR
Finds the negative exclusive logical OR of (A)+1•(A)
and (B)+1 and (B) and stores it in (C)+1•(C).
4~8
101