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| Getting Squared With 1 And 16 (Posted on 2007-09-01) |
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Determine all possible integer pairs (p, q) that satisfy:
(p2 – q2)2 = 1+ 16q
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Submitted by K Sengupta
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Rating: 3.6667 (3 votes)
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Solution:
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We observe from the given equation that q cannot be negative, for that will yield negative values for RHS of the given equation, which is a contradiction.
Again, if (p, q) is a solution, then (-p, q) is also a valid solution………(#).
q=0 gives p = +/- 1, while p=0 gives q^4 = 1+ 16q, which do not yield integer solutions.
In terms of (#), we can consider both p and q to be positive. From the given equation, we obtain:
EITHER, p^2 = q^2 + V(1+16q)
OR, p^2 = q^2 - V(1+16q)
In the former situation, p> q.
Now, (q+1)^2 > q^2 + V(1+16q) iff (2q+1)^2 > 1+ 16q
Or, q> 3. But, for q> 3, it follows that :
q^2< p^2< (q+1)^2, so that p is not an integer. This is a contradiction.
For q = 1, 2, the expression (1+16q) is not a perfect square, while q = 3 gives p = 4
In the latter situation, p< q.
Now, (q-1)^2 > q^2 - V(1+16q) iff:
(2q-1)^2 > 1- 16q, so that q > 5
But, for q> 5, it follows that (q-1)^2< p^2< q^2, so that p is not an integer. This is a contradiction.
For q = 1, 2, 4 we observe that the expression (1+16q) is not a perfect square, while q = 3 gives p^2 = 2, a contradiction. However, q = 5 in the latter expression gives p = 4
Thus, in terms of (#), we obtain: (p, q) = (+/- 1, 0); (+/-4, 3); (+/-4, 5) as all possible solutions to the given problem.
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