Can we find solutions of Diophantine equations of the form :
$$(2^n)^x + p^y = z^2 $$
where $k, x, y, z$ and $n$ are positive integers.
-Richard Simson
Can we find solutions of Diophantine equations of the form :
$$(2^n)^x + p^y = z^2 $$
where $k, x, y, z$ and $n$ are positive integers.
-Richard Simson