Tough task

chris2108 · 2011-10-02 08:02:03

I'd be grateful for a solution

Find all pairs of positive itegers (x,y); x>0; y>0;

2^x + 5^y = c^2

c is integer

Bob · 2011-10-02 11:26:10

hi chris2108

Ouch, that is tough! I take it you've found x = 2, y = 1.

After that it gets a lot harder.

Powers of 2 end in 2 or 4 or 8 or 6.

Powers of 5 end in 5.

So you can deduce that any possible c must end in 1 or 9.

Using that I tested all one or two digit possibilities for c and found no more solutions.

I'm leaning towards the idea that there is only the one solution but don't have an inkling of an idea how to prove it.

Hopefully, wiser heads may jump in at this point with a number theory type answer.

Bob

later edit:

I have now tested power of 2 up to 4398046511104 and power of 5 up to 1220703125.

No new solutions!

Last edited by Bob (2011-10-02 12:11:05)

TMorgan · 2011-10-03 06:55:55

I got logic slightly different from Bob, though I don't have another answer either:

2^x ends in 2, 4, 6 or 8

5^y ends in 5

c^2 ends in 0, 1, 4, 5, 6 or 9

2^x + 5^y ends in 1, 3, 7 or 9

c^2 can't end in 3 or 7 so c^2 ends in 1 or 9

So c ends in 1, 3, 7 or 9.

Bob · 2011-10-03 08:04:16

hi TMorgan

You said what I meant to say. We are as one on this.

Bob

bobbym · 2011-10-03 18:44:11

Hi;

Tested all numbers to

and

This could be extended but for one reason, there is what appears to be a good reason why there will not be any more solutions.

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