# Algorithm optimization [closed]

Say you wanted to find which input causes function x to output value y, and you know the (finite) range of possible inputs.

The input and output are both numbers, and positively correlated.

What would be the best way to optimize that?

I'm currently just looping through all of the possible inputs.

Thanks.

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It's hard to make a guess with this little information. Are you looking for a specific output? If you've got a derivative for your function x, Newton's Method is fast. If you don't have a derivative, the secant method is a reasonable second choice. If the function is monotonically increasing or decreasing with respect to the input variable, a binary search might be just the tool. –  sarnold Jun 1 '11 at 2:31

## closed as not a real question by Mitch Wheat, yoda, Ken White, dmckee, GravitonJun 2 '11 at 3:47

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One solution would be a binary search over the possible inputs.

Flow:

``````find the median input x
get the output from function(x)
if the output is less than the desired y
start over using the smaller half of the possible inputs
else
start over using the larger half of the possible inputs
``````
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Perfect, thanks! –  senak Jun 1 '11 at 2:43

If the range is finite and small, a precomputed lookup table might be the fastest way

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if you have some sets of know "x" data that yield "y" you can divied between training and test sets and use neural networks.

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