To understand the problem,let us consider these examples first:

**4 ^{6} = (2^{2})^{6} = 2^{12} = (2^{3})^{4} = 8^{4} = 16^{3} = 4096**.

Thus,we can say that **4 ^{6},2^{12},8^{4} and 16^{3}** are same.

**27 ^{3} = 3^{9} = 19683**

so, both **27 ^{3} and 3^{9}** are identical.

Now the problem is, for any given pair of **a ^{b}** how to compute all others possible (if any)

**x**where,

^{y}**a**=

^{b}**x**.I am interested in an

^{y}**algorithm that can be efficiently implemented in C/C++.**

For example:

If the inputs are like this:

`4,6`

desired output :`(2,12),(8,4)`

`8,4`

desired output :`(2,12),(2,6)`

`27,3`

desired output :`(3,9)`

`12,6`

desired output :`(144,3),(1728,2)`

`7,5`

desired output : `No duplicate possible`

`a`

always a prime power? All your examples are. Or could it be, say,`6`

? – AakashM Jan 28 '10 at 8:06