We have $2^x = y^2- 1 = (y+1)(y-1)$
As product of y+1 and y-1 is a power of 2 so both are power of 2.
y+1 and y-1 one of them is divisible by and another by 2.
If y-1 is divisible by 4 then $y+1 = 4k+2( k \ge 1)$ for some k and it has an odd factor 2k+1. this is a contradiction as it should not have any factor other than 2
If y +1 is divisible by 4 then y+1 has to be 4 as any other factor will be power of 2 or odd or combination and this is contradiction
So y+1 = 4 and hence putting in given equation x = 3.
So we have $x=3,y=3$
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