# Finding solution set of a Linear equation?

I need to find all possible solutions for this equation:

`x+2y = N`, `x<100000` and `y<100000`.

given `N=10`, say.

I'm doing it like this in python:

``````for x in range(1,100000):
for y in range(1,100000):
if x + 2*y == 10:
print x, y
``````

How should I optimize this for speed? What should I do?

Essentially this is a Language-Agnostic question. A C/C++ answer would also help.

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Do you require that the answer is a natural number? –  Erik Apr 8 at 14:36
Yes, natural number. –  user2256798 Apr 8 at 14:37
"Optimize" against what measure? Correctness? Readability? Re-usability? –  Robᵩ Apr 8 at 14:37
Optimize for Speed. –  user2256798 Apr 8 at 14:38

if `x+2y = N`, then `y = (N-x)/2` (supposing `N-x` is even). You don't need to iterate all over `range(1,100000)`

like this (for a given N)

``````if (N % 2): x0 = 1
else: x0 = 0
for x in range(x0, min(x,100000), 2):
print x, (N-x)/2
``````

EDIT: you have to take care that N-x does not turn negative. That's what `min` is supposed to do

The answer of Leftris is actually better than mine because these special cases are taken care of in an elegant way

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Could you please update this answer with a little bit extra explanation? Kind of didn't get the point completely. Sorry for trouble. –  user2256798 Apr 8 at 14:42

we can iterate over the domain of y and calculate x. Also taking into account that x also has a limited range, we further limit the domain of y as [1, N/2] (as anything over N/2 for y will give negative value for x)

``````x=N;
for y in range(1,N/2-1):
x = x-2
print x, y
``````
• This just loops N/2 times (instead of 50000)
• It doesn't even do those expensive multiplications and divisions
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I think this is the quickest existing solution and still elegant. –  Erik Apr 8 at 14:47
+1. more elegant than my solution –  gefei Apr 8 at 14:56
Is it possible to do any further optimization? :) –  user2256798 Apr 8 at 15:09
Shouldn't y be in the range [1,N/2]? –  user2256798 Apr 8 at 15:18
I don't know about Python, but in C++, using bit shifting will only serve to obfuscate; it won't make the program any faster. (I'd actually be surprised if it makes a measurable difference in speed in Python, either.) –  James Kanze Apr 8 at 15:40
show 1 more comment

This runs in quadratic time. You can reduce it to linear time by rearranging your equation to the form `y = ...`. This allows you to loop over `x` only, calculate `y`, and check whether it's an integer.

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You may try to only examine even numbers for `x` given `N =10`; the reason is that: `2y` must be even, therefore, `x` must be even. This should reduce the total running time to half of examining all `x`.

If you also require that the answer is natural number, so negative numbers are ruled out. you can then only need to examine numbers that are even between `[0,10]` for `x`, since both `x` and `2y` must be not larger than `10` alone.

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Calculate `y` by `x`. For integer positive `x` and real `y`:

``````for x in range(1,N):
print (x, (N-x)/2)
``````
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Lefteris E 's answer is the way to go,

but I do feel `y` should be in the range `[1,N/2]` instead of `[1,2*N]`

Explanation:

``````x+2*y = N

//replace x with N-2*y
N-2*(y) + 2*y = N
N-2*(N/2) + 2*y = N
2*y = N

//therefore, when x=0, y is maximum, and y = N/2
y = N/2
``````

So now you can do:

``````for y in range(1,int(N/2)):
x = N - (y<<1)
print x, y
``````
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