# How would you calculate j in this function?

consider the function below which converts the result of a * b in a couple of numbers i and j, where:

1. a, b, x, y are int (Suppose they are always => 32bit-long)
2. a and b are <= n*m, where n = 10^3 and m=10^5. n*m = BASE.
3. a * b can be written as i*BASE + j

How would you calculate j without using any types larger than int (in case be careful about overflows with int's which are UB):

``````#include <iostream>
#include <cstdlib>

using namespace std;

int n = 1000, m = 100000;

struct N {
int i, j;
};

N f(int a, int b) {
N x;
int a0, a1, b0, b1, o;
a1 = a / n;
a0 = a - (a1 * n); // a0 = a % n
b1 = b / m;
b0 = b - (b1 * m);  // b0 = b % m
o = a1 * b1 + (a0 * b1) / n + (b0 * a1) / m;
x.i = o;
x.j = 0; // CALCULATE J WITH INTs MATH
return x;
}

int main(int, char* argv[]) {
int a = atoi(argv[1]),
b = atoi(argv[2]);
N x = f(a, b);
cout << a << " * " << b << " = " << x.i << "*" << n*m
<< " + " << x.j << endl;
cout << "which is: " << (long long)a * b << endl;
return 0;
}
``````
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Is this homework? It's ok if it is - just good to let us know. :) –  Taryn East Jun 21 '11 at 11:00
@taryn, looks more like an interview question –  Suraj Chandran Jun 21 '11 at 11:01
LOL, edit frenzy :-D –  Let_Me_Be Jun 21 '11 at 11:01
Why is BASE split into `n` and `m`? I see nothing in the question that specifies any constraint based on either variable. –  vhallac Jun 21 '11 at 11:04
@Suraj - I tend to always ask... just in case. But you're right, it does look like more an interview question. –  Taryn East Jun 21 '11 at 11:07
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You started correctly, but lost the plot around calculation of `o`. First, my assumptions: you don't want to deal with any integer greater than `n*m`, so taking `mod n*m` is cheating. I am saying this, because given `m > 2^16`, I have to assume int is 32-bit long, which is capable of dealing with your numbers without overflowing.

In any case. You have correctly (I guess, since purpose of `n` and `m` are not specified) written:

``````a=a0 + a1*n (a0<n)
b=b0 + b1*m (b0<m)
``````

So, if we do the math:

``````a*b = a0*b0 + a0*b1*m + a1*b0*n + a1*b1*n*m
``````

Here, `a0*b0 < n*m`, so it is part of `j`, and `a1*b1*n*m > n*m`, so it is part of `i`. It is the other two terms that you need to split into two again. But you cannot calculate each and take the `mod n*m`, since that would be cheating (as per my rule above). If you write:

``````a0*b1 = a0b1_0 + a0b1_1*n
``````

You get:

``````a0*b1*m = a0b1_0*m + a0b1_1*n*m
``````

Since `a0b1_0 < n`, `a0b1_0*m < n*m`, which means this part goes to `j`. Obviously, `a0b1_1` goes to `i.`

Repeat a similar logic for a1*b0, and you've got three terms to add up for `j`, and three more to add up for `i`.

EDIT: Forgot to mention a few things:

• You need the constraints `a < n^2` and `b < m^2` for this to work. Otherwise, you need more ai "words". e.g.: `a = a0 + a1*n + a2*n^2, ai < n`.

• The final sum of `j` may be greater than `n*m`. You need to watch for overflow ( `n*m - o < addend`, or a similar logic, and add `1` to `i` when this happens - while calculating `j + addend - n*m` without overflow).

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hmm i think this logic requires an algorithm. –  m0nst3r Jun 21 '11 at 14:48
Not really. The math for identifying components are there. Just add `a0*b0`, `a0b1_0` and `a1b0_0` carefully (watching out for overflows as I've suggested at the end of the answer), and you've got `j`. –  vhallac Jun 21 '11 at 15:41

I think answer will be j = a0 * b0

``````(a*b)/(n*m) = (a/n) * (b/m)
= (a1 + a0/n) * (b1 + b0/m)
= a1*b1 + a1*b0/m + a0*b1/n + (a0*b0)/(n*m)
``````

now

``````o = a1*b1 + a1*b0/m + a0*b1/n
``````

multiply both side with n*m

``````a * b  = o * n*m  +  a0*b0
``````

n*m is base

``````a * b  = o * BASE  +  a0*b0

j = a0*b0
``````

QED

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Hello CantGetANick, try to compile the program I had given which should obey to same math operations you told. Try to set x.j = a0*b0 in the code and then run it ./program 1234578 8754321 . Why is a0*b0 31397538 instead of 92111538 ? I miss something.. –  m0nst3r Jun 21 '11 at 14:26
well..it's because of loosing precision during divisions.. the math is ok, but we are working with integers when calculating a0, b0 –  m0nst3r Jun 21 '11 at 14:46
This answer is wrong because `o` is not necessarily an integer. (Try your algorithm with n = 1, m = 7, a = 3, b = 3, for instance.) –  Nemo Jun 21 '11 at 14:48
Te problem is, a1*b0 is not necessarily divisible by m, and neither a0*b1 by n. j will have the parts from the remainders of these. –  vhallac Jun 21 '11 at 14:49
Yes, as Dysaster says, the problem is a1*b0 /m and a0*b1/n –  m0nst3r Jun 21 '11 at 14:55
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