# Input an integer, find the two closest integers which, when multiplied, equal the input

Ok my problem is of mathematical nature. I have an array of bytes whose length is X, i need to find the two closest numbers which multiplied together equal X. I need to do this because i am bulding a bitmap from an array of bytes and i need to make the bitmap look like a square as much as possible. I am coding this in C# but don' t worry about syntax, any algorithm or pseudo-code will do. Thanks in advance for your help

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There's probably a better algorithm for this, but off the top of my head:

``````1) Take the square root of the number X; we'll call it N.
2) Set N equal to the ceiling of N (round up to the nearest integer).
3) Test for (X % N). If N divides evenly into X, we found our first number.
if 0, divide X by N to get M. M and N are our numbers
if not 0, increment N by 1 and start step 3 over.
``````
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It would be faster to get floor(sqrt(x)) and decrease it. –  Egor Skriptunoff Apr 28 '13 at 19:46
Yes ! exactly what i was looking for. many thanks. –  user1909612 Apr 28 '13 at 19:47
@Egor Skriptunoff: why would it be faster? –  someguy Apr 28 '13 at 19:49
@someguy - Because of `x-sqrt(x) > sqrt(x)`. –  Egor Skriptunoff Apr 28 '13 at 19:52
Egor's right; counting down would be faster. –  Anthony DeSimone Apr 28 '13 at 21:04

Note that if X is at all large, then starting from sqrt(X) and working downwards one step at a time will be a miserable task. This may take a huge amount of time.

If you can find the factors of the number however, then simply compute all divisors of X that are less than sqrt(X).

Consider the number X = 123456789012345678901234567890. The smallest integer less than sqrt(X) is 351364182882014, so simply decrementing that value to test for a divisor may be problematic.

Factoring X, we get this list of prime factors:

``````{2, 3, 3, 3, 5, 7, 13, 31, 37, 211, 241, 2161, 3607, 3803, 2906161}
``````

It is a fairly quick operation to compute the divisors less then sqrt(N) given the prime factors, which yields a divisor 349788919693221, so we have

``````349788919693221 * 352946540218090 = 123456789012345678901234567890
``````

These are the closest pair of divisors of the number N. But, how many times would we have needed to decrement, starting at sqrt(N)? That difference is: 1575263188793, so over 1.5e12 steps.

A simple scheme to determine the indicated factors (in MATLAB)

``````Dmax = 351364182882014;
F = [2, 3, 3, 3, 5, 7, 13, 31, 37, 211, 241, 2161, 3607, 3803, 2906161];
D = 1;
for i = 1:numel(F)
D = kron(D,[1,F(i)]);
D = unique(D);
D(D > Dmax) = [];
end

D(end)
ans =
349788919693221
``````

The other factor is obtained simply enough. If the numbers are too large to exceed the dynamic range of a flint as a double, then you will need to use some variation of higher precision arithmetic.

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Something that i didn' t specify was that the factors found this way must be smaller than 32768 because bitmaps can' t exceed 32768 pixels in length or height. Your solution is surely intresting but since i am working with relatively small numbers i still prefeire to work my way down from the square root. –  user1909612 Apr 29 '13 at 13:14

A perfect square would have a side of SQRT(X) so start from there and work downward.

``````int X = ...
for(int i=sqrt(x);i>0;i--) {
int j = X/i;
if( j*i == X ) {
// closest pair is (i,j)
return (i,j);
}
}
return NULL;
``````

Note this will only work if `X` is actually divisible by two integers (ie a prime `X` is going to end up with `(1,X)`). Depending on what you're doing you might better off picking slightly larger dimensions and just making it square ... ie have the sides be `CEILING(SQRT(X))`.

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sry but Anthony answered first, i am going to validate his answer –  user1909612 Apr 28 '13 at 19:50

One alternative is to set up this optimization problem

Minimize the difference of the factors X and Y the difference of the product X × Y and P. You have thus an objective function that is weighted some of two objective:

``````       min c × |X × Y - P|  +  d × |X – Y|
subject to X, Y ∈ ℤ
X, Y ≥ 0
``````

where c, d are non-negative numbers that define which objective you value how much.

Like the `sqrt` solution a lot however : )

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I have rewritten the MATLAB answer proposed above by user85109 in a detailed function with sufficient comments and some simpler terms. Certainly quite efficient, works for large numbers and hopefully easy to write in any language which provides a library function for getting prime factorization of an integer.

``````        function [a, b] =  findIntegerFactorsCloseToSquarRoot(n)
% a cannot be greater than the square root of n
% b cannot be smaller than the square root of n
% we get the maximum allowed value of a
amax = floor(sqrt(n));
if 0 == rem(n, amax)
% special case where n is a square number
a = amax;
b = n / a;
return;
end
% Get its prime factors of n
primeFactors  = factor(n);
% Start with a factor 1 in the list of candidates for a
candidates = [1];
for i=1:numel(primeFactors)
% get the next prime factr
f = primeFactors(i);
% Add new candidates which are obtained by multiplying
% existing candidates with the new prime factor f
% Set union ensures that duplicate candidates are removed
candidates  = union(candidates, f .* candidates);
% throw out candidates which are larger than amax
candidates(candidates > amax) = [];
end
% Take the largest factor in the list d
a = candidates(end);
b = n / a;
end
``````
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