# Multiplying integers the long way

I'm trying to create long int multiplication function. In math for multiplying 2 numbers for example 123 X 456, I do:

``````(12 * 10^1 + 3)( 45 * 10^1 + 6) =
(540 * 10^2) + (72 * 10^1) + (135 * 10^1) + 18 = 15129
``````

I created a small program for this algorithm but it didn't work right.

I don't know where my problem is. Can you help me to understand and correct that?

Tnx

``````int digits(int n) {
int digit = 0;
while (n>0){
n/=10;
digit++;
}
return digit;
}

long int longMult(long int a, long int b) {
long int x,y,w,z;
int digitA = digits(a);
int digitB = digits(b);

if((a==0) || (b==0)) {
return 0;
} else if (digitA < 2 || digitB < 2) {
return a*b;
} else {
int powA = digitA / 2;
int powB = digitB / 2;

//for first number
x = a/(10^powA);
y = a%(10^powA);

//for second number
w = b/(10^powB);
z = b%(10^powB);

return ( longMult(x,w)*(10^(powA*powB)) + longMult(x,z) +
longMult(w,y)*(10^(powA*powB)) + longMult(y,z));
}
}

int main()
{
cout << digits(23) << endl; // for test
cout << longMult(24,24); // must be 576 but output is 96
return 0;
}
``````
-
It seems to defeat the purpose of the long multiplication to store the values in a long int. If instead you used a vector<int>, with one element for each digit, you could have arbitrary precision multiplication. – sj0h Mar 4 '14 at 6:24

The expression

``````10^powA
``````

does a bitwise exclusive or, and doesn't raise 10 to the power of powA, as you appear to expect.

You may want to define something like

``````long powli(int b, long e) {return e?b*powli(b,e-1):1;}
``````

``````powli(10,powA)
``````

Edit: There is also a problem with the way the values are combined:

``````    return ( longMult(x,w)*(10^(powA*powB)) + longMult(x,z) +
longMult(w,y)*(10^(powA*powB)) + longMult(y,z));
``````

Look into the maths, because multiplying the exponents makes little sense.

Also the combinations of adjustments to values is wrong, eg (10*a + b)(10*c + d) = 10*10*a*c + 10*a*d + 10*b*d +b*d. So check on your algebra.

-
using a lookup table for powers of 10 is better, except for the case of arbitrary precision – Lưu Vĩnh Phúc Mar 4 '14 at 7:32
Yes, a lookup table would be faster, but I thought the recursive style would better suit the style of the rest of the code, which is about doing things in a slow, but conceptually interesting way. – sj0h Mar 4 '14 at 22:40