# algorithm to simulate multiplication by addition

How to design an algorithm to simulate multiplication by addition. input two integers. they may be zero, positive or negative..

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def multiply(a, b):
if (a == 1):
return b
elif (a == 0):
return 0
elif (a < 0):
return -multiply(-a, b)
else:
return b + multiply(a - 1, b)
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question is about simulating multiplication without using multiply function... you may only use addition.. – KawaiKx Jul 5 '11 at 4:16
Technically you don't need to check the case where a==1. – Mikola Jul 5 '11 at 7:27
@enjay: Since no actual multiplication is used, the early bail out for a == 1 is not needed. In case a == 1 the else would be called and b + multiply( 0, b ) -> b + 0 would be returned and all is fine. Ergo the case a==1 is not needed. – LiKao Jul 5 '11 at 10:50
@Saurabh: The multiplication at the "-" signs can easily be dropped by writing 0-... instead. – LiKao Jul 5 '11 at 10:52
@Saurabh Here are my guidelines for thinking recursively: 1. Consider all your base cases. 2. Recursive calls must be made on a smaller element or subset. 3. Believe in the correctness of the recursive call. If you know you've considered all of your base cases, and you have considered exactly what you are trying to do for the recursive step, then recursion will do the rest. Recursion is a tricky thing to wrap your head around initially. Once you understand it and use it more, though, it makes conceptualizing your problem a lot easier, because you can consider each part individually. – Dr. Acula Jul 8 '11 at 4:08

some pseudocode:

function multiply(x, y)
if abs(x) = x and abs(y) = y or abs(x) <> x and abs(y) <> y then sign = 'plus'
if abs(x) = x and abs(y) <> y or abs(x) <> x and abs(y) = y then sign = 'minus'

res = 0
for i = 0 to abs(y)
res = res + abs(x)
end

if sign = 'plus' return res
else return -1 * res

end function
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This is a very simple solution.. matching my solution.. pretty straightforward – KawaiKx Jul 6 '11 at 13:03
according to the KISS principle (Keep It Stupid Simple) :)) – Tudor Constantin Jul 6 '11 at 13:57
val:= 0
bothNegative:=false

if(input1 < 0) && if(input2 < 0)
bothNegative=true
if(bothNegative)
smaller_number:=absolute_value_of(smaller_number)
for [i:=absolute_value_of(bigger_number);i!=0;i--]
do val+=smaller_number

return val;
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mul(a,b)
{
sign1=sign2=1;
if(a==0 || b==0)
return 0;
if(a<0){
sign1=-1;
a=-a;
}
if(b<0){
sign2=-1;
b=-b;
}
s=a;
for(i=1;i<b;i++)
s+=a;
if(sign1==sign2)
return s;
else
return -s;
}
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