Algorithm to compute solution set of single simple equation with two variables

Suppose I have a simple equation of the form:

``````7x + 4y = n
``````

where n is chosen by us and x, y and n are all positive integers. This is the only equation which is given to us. Among the possible solutions we need the solution (x,y) in which x is the smallest. e.g.

``````7x + 4y = 14, then (2, 0) is the solution
7x + 4y = 15, then (1, 2) is the solution
7x + 4y = 32, then (4, 1) and (0, 8) are the possible solutions,
of which (0, 8) is the correct solution
``````

I would like to design an algorithm to calculate it in the least possible running time. The current algorithm which I have in mind goes something like this:

``````Given an input n
Calculate max(x) = n/7
for i = 0 to max(x)
If the equation 7*i + 4*y = n holds
return value of i and y
else
continue
``````

This algorithm, I presume, can have a running time of upto O(n) in worst case behaviour. Is there some better algorithm to compute the solution?

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You say `If the equation 7*i + 4*y = n holds` i you get from the loop but what is y? – msam May 3 '12 at 13:44
Is there an upper bound on X and Y? If so, binary search your way to success. – Tony Ennis May 3 '12 at 13:44
You might want to read about linear integer programming. Your problem is definetly a specific instance of the generalized problem, but I am curious if there is an efficient solution for the simplified problem you are facing. – amit May 3 '12 at 13:46
This asks for solution for CodeChef May 2012 contest problem DIVPAIR :-( – Betlista May 3 '12 at 14:03
@Betlista I've raised the issue on meta should you want to comment further – AakashM May 4 '12 at 8:04

Let us consider the more general problem

• For two coprime positive integers `a` and `b`, given a positive integer `n`, find the pair `(x,y)` of nonnegative integers such that `a*x + b*y = n` with minimal `x`. (If there is one. There need not be, e.g. `7*x + 4*y = 5` has no solution with nonnegative `x` and `y`.)

Disregarding the nonnegativity for the moment, given any solution

``````a*x0 + b*y0 = n
``````

all solutions have the form `(x0 - k*b, y0 + k*a)` for some integer `k`. So the remainder of `x` modulo `b` and of `y` modulo `a` is an invariant of the solutions, and we have

``````a*x ≡ n (mod b), and b*y ≡ n (mod a)
``````

So we need to solve the equation `a*x ≡ n (mod b)` - the other one follows.

Let `0 < c` be an integer with `a*c ≡ 1 (mod b)`. You find it for example by the extended Euclidean algorithm, or (equivalently) the continued fraction expansion of `a/b` in O(log b) steps. Both algorithms naturally yield the unique `c < b` with that property.

Then the minimal candidate for `x` is the remainder `x0` of `n*c` modulo `b`.

The problem has a solution with nonnegative `x` and `y` if and only if `x0*a <= n`, and then `x0` is the minimal nonnegative `x` appearing in any solution with nonnegtaive `x` and `y`.

Of course, for small `a` and `b` like 7 and 4, the brute force is no slower than calculating the inverse of `a` modulo `b`.

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excelent answer – Perroloco May 3 '12 at 14:18

We have

``````7(x-4)+4(y+7)=7x+4y
``````

So if (x, y) is a solution, then (x-4,y+7) is also a solution. Hence if there is a solution then there is one with x<4. That's why you only need to test x=0..3 which runs in constant time.

This can be extended to any equation of the form ax+by=n, you only need to test x=0..b-1.

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I think the equation can be changed. What's there is just a sample. – Tony Ennis May 3 '12 at 13:48
If the equation is of the form ax+by=n then if there is a solution, then there is one with x < b. – Thomash May 3 '12 at 13:51
Your idea is good and true (I think), but the answer is not informative enough. If I were you, I'd edit the answer and add more information and explanation. If you do so, some downvoters will probably un-downvote you. I +1ed it anyway, for leading the way. – amit May 3 '12 at 14:06
Thanks for the advice, I will do it. – Thomash May 3 '12 at 14:08

I would recommend checking out the Simplex method in the Numerical Recipes in C book. You can easily treat the C code like pseudo-code and make a java version. The version of the simplex you want is the "constrained-simplex" which deals in positive values only. The book is available online for free. Start with section 10.8 and read forward.

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The Simplex method is awesome. – Tony Ennis May 3 '12 at 23:18

O(n) :

``````y=n/4;
while((n-4y)%7!=0 && y!=0){
y--;
}
x=(n-4y)/7;
``````
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why call floor on an integer? If n is an int, so is n/4. Also, for efficiency you should start with x because its upper bound is smaller. – Marko Topolnik May 3 '12 at 14:00
i made it generic...there are some programming languages that convert divisions to float when the result is not an integer. – Perroloco May 3 '12 at 14:01
So you decided to make your code Java-specific in all aspects except the floor call. – Marko Topolnik May 3 '12 at 14:03
ok you got me there.. I was not sure about the java behavior in this case because I use to develop in other languages too. Why are we discussing that instead of the algorithm? Why don't you write an answer yourself instead of criticizing other people's code? – Perroloco May 3 '12 at 14:04
Because what I would write is too close to what you already have there. I'm trying to motivate you to clean it up. – Marko Topolnik May 3 '12 at 14:05