# Inverse function after sqare and multiplication [closed]

I'm trying to write two inverse functions. If we pass to function A value 10 it returns for example 4,86 and if we pass that number to function B it should give us back original 10.

I'm using something like this in function A:

output = sqrt(inputForA / range) * inputForA;

So is it possible to reverse it in function B and calculate inputForA only knowing output and range.

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## closed as off topic by Sylvain Defresne, Stefan H, Neolisk, Inder Kumar Rathore, Bohemian♦Jan 24 '13 at 3:39

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Should probably be moved to math.stackexchange.com – Sylvain Defresne Jan 23 '13 at 19:35

You just need to factor that equation to single out inputForA. Here are the algebraic steps:

output = sqrt(inputForA / range) * inputForA

output / inputForA = sqrt(inputForA / range)

sq(output) / sq(inputForA) = inputForA / range

range * sq(output) / sq(inputForA) = inputForA

range * sq(output) = cube(inputForA)

So the cube root of range times the output squared should give you your original input. I don't have a good way of showing that in here though...

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I ran through this with a simple example of input of 10 and range of 5 - it works great. – Stefan H Jan 23 '13 at 19:43
Thank you Stefan H and Sylvain Defresne. Both your methods work like a charm :) – Martin Jan 24 '13 at 9:29

You just have to use basic math. `output = pow(inputForA, 3. / 2.) * pow(range, 1. / 2.)` so `inputForA = pow(output * pow(range, 1. / 2.), 2. / 3.)`. This only works if `inputForA` and `scale` have the same sign, but the first function is only defined on that interval, so this is okay (since `sqrt` is only defined for positive values).

In Python:

``````scale = 7.

def f(x):
return math.sqrt(x / scale) * x

def g(y):
return math.pow(y * math.pow(scale, 1. / 2), 2. / 3)

print g(f(10))
10.0

print f(g(10))
10.0
``````

You could also have used Wolfram alpha to get the answer:

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