Dismiss
Announcing Stack Overflow Documentation

We started with Q&A. Technical documentation is next, and we need your help.

Whether you're a beginner or an experienced developer, you can contribute.

# Assembly MASM Dealing with Negative Integers

I was instructed to write a program in assembly that will carry out the following arithmetic:

((A + B) / C) * ((D - A) + E)

I've succeeded in doing this when no negative values come into to play, but suppose A = 5, B = 4, C = 3, D = 2, and E = 1. This gives us ((5 + 4) / 3) * ((2 - 5) + 1) or -6.

this is where I need help. I've done some research, and have found 2's compliment to be a solution, but I'm not sure to implement it into my code.

If someone could help me, I'd be very grateful!

INCLUDE Irvine32.inc
; ((A + B) / C) * ((D - A) + E)
.data
valA dword 1
valB dword 2
valC dword 3
valD dword 4
valE dword 5

.code
main PROC

mov ecx, valA
mov edx, valC
call Divide
mov ecx, eax
mov edx, valD
sub edx, valA
call Multiply

exit

main ENDP

*Divide and Multiply Procedures divide and multiply respectively.

-
You don't need to implement 2's complement. The processor already handle's negative numbers that way. Did you check the final result? Was it 0xFFFFFFFA? If so that IS -6. – Jim Rhodes Nov 10 '13 at 5:07

On a twos complement machine, add and sub operations are actually the same for signed and unsigned quantities, so those parts of your program don't need to change. There are specific instructions for signed division and multiplication, so make sure the functions use those (or just use them directly).

-
I would concur. DIV and MUL are not that complicated of instructions, nor IDIV and IMUL (the signed counterparts), and will save you from the (ambiguous, I feel) calls to mystery code. Perhaps Divide and Multiply are using DIV and MUL instead of IDIV and IMUL. en.wikipedia.org/wiki/X86_instruction_listings – rdtsc May 11 '15 at 23:19

Irvines's WriteDec should be replaced by WriteInt which handles the argument EAX as signed number.

Inside the CPU, the negative "-2" and the positive "4294967294" are transformed to the same value: 0xFFFFFFFE. DIV performs the division 6/-2 positively (6/4294967294) and gets the result 0 = 0x00000000, with IDIV the result is correct: -3 = 0xFFFFFFFD.

MUL and IMUL differ in the high part of the result (EDX). Since the high part is not needed in this case, it is not mandatory to use IMUL.

There are no different versions of ADD and SUB for signed and unsigned numbers. This was the main reason for introducing the 2's complement coding. It's just a thing of interpretation: if the programmer decides that this should be a signed number, then it is a signed number. If he/she/it decides that this is an unsigned number, then it is an unsigned number. The CPU doesn't care about such things - the results will be always the same.

Here's an example with WriteInt, IDIV and IMUL:

; ((A + B) / C) * ((D - A) + E)
INCLUDE Irvine32.inc

.DATA
valA dword 5
valB dword 4
valC dword 3
valD dword 2
valE dword 1

.CODE
main PROC
mov ecx, valA
mov edx, valC
call Divide

mov ecx, eax
mov edx, valD
sub edx, valA
call Multiply

call WriteInt           ; Write a positive or negative number

exit
main ENDP

Divide PROC USES ECX EDX    ; EAX = ECX / EDX
mov eax, ecx
mov ecx, edx
xor edx, edx
idiv ecx                ; Signed division, e.g 6/-3 = -2
ret
Divide ENDP

Multiply PROC USES ECX EDX  ; EAX = ECX * EDX
mov eax, edx
imul ecx                ; Signed multiplication
ret
Multiply ENDP

END main

A 2's complement calculation is needed to get the absolute value of the number. E.g. the representation of -2 has two parts: a sign ('-') and an absolute value ('2'). A simple way to get the absolute value is to look at the sign bit, the leftmost bit of the number, and to jump appropriate. The calculation itself is performed just by NEG.

Example with WriteDec, IDIV and IMUL:

; ((A + B) / C) * ((D - A) + E)
INCLUDE Irvine32.inc

.DATA
valA dword 5
valB dword 4
valC dword 3
valD dword 2
valE dword 1

.CODE
main PROC
mov ecx, valA
mov edx, valC
call Divide

mov ecx, eax
mov edx, valD
sub edx, valA
call Multiply

test eax, eax           ; Set the flags according to (EAX AND EAX)
jns J1                  ; Skip the next block if EAX is positive (no sign)

; EAX is negative
push eax            ; Preserve EAX
mov al, '-'         ; Write the letter '-'
call WriteChar      ; http://programming.msjc.edu/asm/help/index.html?page=source%2Firvinelib%2Fwritechar.htm
pop eax             ; Restore EAX
neg eax             ; 2's complement

J1:
call WriteDec           ; Write EAX as positive number

exit
main ENDP

Divide PROC USES ECX EDX    ; EAX = ECX / EDX
mov eax, ecx
mov ecx, edx
xor edx, edx
idiv ecx                ; signed division, e.g 6/-3 = -2
ret
Divide ENDP

Multiply PROC USES ECX EDX  ; EAX = ECX * EDX
mov eax, edx
imul ecx                ; signed multiplication
ret
Multiply ENDP

END main

Here is an algorithm to get the absolute value of EAX without jump:

cdq
xor eax, edx
sub eax, edx
-