Analytically determine all possible integer pairs (p, s) such that:
4p⁴+ 4p³+ 4p² + 4p +1 = s².

From the equation, we know that sē must be odd, since the term (4p⁴+ 4p³+ 4p² + 4p) is even.  Therefore, s must also be odd.

We also know that for every odd s:       (s+1)(s-1) is evenly divisible by 4.

The obvious solutions are:

{(0,-1), (0,1), (2,-11), (2,11)}

However, as p increases, something ppeculiar happens.

√(4p⁴+ 4p³+ 4p² + 4p) = i + r

where i = an integer & r = the remainder.  The solution of course is to find a p where r = 0.  However, as p→∞, it appears that r→0.75.  If this holds true, then there are no more solutions for this equation.

Posted by hoodat on 2007-05-14 13:25:19