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| The least square (Posted on 2005-11-05) |
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Positive integers a and b are such that (15a+16b) and (16a-15b) are perfect squares. Find the least possible value of the smaller of these two squares.
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Submitted by pcbouhid
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Rating: 4.0000 (3 votes)
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Solution:
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Let (15a + 16b) = r^2 and (16a - 15b) = s^2, where r, s belongs to N. We obtain:
r^4 + s^4 = (15a + 16b)^2 + (16a - 15b)^2 = (15^2 + 16^2)*(a^2 + b^2) = 481*(a^2 + b^2).
481 = 13 x 37.
We now use the fact that -1 is not a fourth power either mod 13 or mod 37 (to see why this holds, note that the congruence -1 (congr) x^4 (mod 13) for some x (of N) leads via Fermatīs theorem to (-1)^3 congr 1 (mod 13), which is false. Likewise, -1 congr x^4 (mod 39) leads to (-1)^9 congr 1 (mod 37), which is false too.
Since r^4 + s^4 congr 0 (mod 13), either r congr s congr 0 (mod 13), or r and s not congr 0 (mod 13).
The latter possibility cannot occur because -1 is not a fourth power mod 13; therefore r congr 0 and s congr 0 (mod 13), and similarly, r congr 0 and s congr 0 (mod 37). Therefore, r and s are multiples of 481, and so r >= 481, s >= 481. It is easy to check that r = s = 481 is realizable.
We obtain a = 481*31 and b = 481, that leads to r^2 (or s^2) = 481^2.
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