Let *l* an *r* be the given range.

We know that number of numbers within *l* and *r* such that it can be represented as x^p is given by

`floor(powl((long double)r,1.0/(long double)p) - ceil(powl((long double)l,1.0/(long double)p)`

Now the real problem,

I need all the numbers between *l* and *r*, *x*, such that only ** pth root of x exists** and nothing else.

**For example**, within a range

*1 - 20*and

**p=2**the valid numbers are {4,9}

The reason why 16 didn't occur in the set is because 16 can be represented as 2^4.

Now I want to perform a repeated inclusion-exclusion principle on the range and find numbers such that they can be represented as to the power p only!

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