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Title: Irrational or Zero Post by THUDandBLUNDER on Jan 18th, 2005, 2:35am Given that a,b are rational numbers and that p,q are integers which are not perfect squares, prove that a[smiley=surd.gif]p + b[smiley=surd.gif]q is either irrational or equal to zero. |
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Title: Re: Irrational or Zero Post by Sir Col on Jan 18th, 2005, 7:38am ::[hide] Let us assume that the sum is rational. So multiplying through by 1/a we get: sqrt(p)+c*sqrt(q)=r [c,r are rational] c*sqrt(q)=r-sqrt(p) c2q=r2+p-2r*sqrt(p) As LHS is rational, RHS is rational iff b is a perfect square. As b is not a perfect square, the sum cannot be rational as we first assumed. Similarly by multiplying through by 1/b we can show the same result. Hence the sum is either irrational or zero. [/hide]:: |
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