Let a and b be roots of x^2-3x+p=0 and ...

Let `a and b` be roots of `x^2-3x+p=0 ` and let `c and d` be the roots of `x^2 -12x+q=0` where `a, b, c, d` form an increasing G.P. Then the ratio of `(q + p) : (q-p)` is equal to

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If a and b are the roots of x^2-3 x+p=0 and c and d are roots of x^2-12 x+q=0 where a, b, c, d form a G.P. Prove that (q+mathfrakp):(q-p)=17: 15

If a and b are the roots of x^2-3x+p=0 and c,d are the roots of x^2-12x+q=0 where a,b,c,d form a G.P. prove that (q+p):(q-p)=17:15 .

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If a and b are the roots of x^2 -3x + p= 0 and c, d are roots of x^2 -12x + q= 0 , where a, b, c, d form a GP. Prove that (q + p) : (q -p)= 17:15.

If a and b are the roots of x^(2)-3x+p=0 and c,d are the roots x^(2)-12x+q=0 where a,b,c,d form a G.P. Prove that (q+p):(q-p)=17:15.

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Let `a and b` be roots of `x^2-3x+p=0 ` and let `c and d` be the roots of `x^2 -12x+q=0` where `a, b, c, d` form an increasing G.P. Then the ratio of `(q + p) : (q-p)` is equal to

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