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| A 2009 problem (Posted on 2006-08-27) |
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Find all integers p and q that satisfy p³+27pq+2009=q³.
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Submitted by K Sengupta
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Rating: 2.0000 (1 votes)
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Solution:
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Let q = p + r. Then the equation becomes
(27 – 3r)(p^2) + (27r – 3*r^2)p - r^3 + 2009 = 0
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As a quadratic equation in p, its discriminant is
(27r – (3*(r^2))^2 - 4(27 – 3r)(-r^3 + 2009)
= -3(r - 14)(r - 9)(r^2 + 41*r + 574)
Now,r^2 + 41r + 574 = ((2r+41)^2)/4 + 615/4; and so,
The factor r^2 + 41r + 574 is always positive for any integer value of r.
Therefore the equation has integer solution
in p only when:
r = 9, 10, 11, 12, 13, 14.
When r = 9, the equation becomes -3(p^2) – 30p + 1009 = 0 which has no integer solution in p.
Similarly for r = 10,11,12,13, the resulting quadratic equations do not give integer solution in p.
When r = 14, the equation becomes -15*(p+7)^2 = 0.
Thus p = -7; q = r+p = 14-7 = 7 is a solution to the given equation.
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