" he equation "p(q-r)x^(2)+q(r-p)x+r(p-q...

" he equation "p(q-r)x^(2)+q(r-p)x+r(p-q)=0" has equal roots show that "

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If p(q-r)x^2+q(r-p)x+r(p-q)=0 has equal roots, then;

If p(q-r)x^(2) + q(r-p)x+ r(p-q) = 0 has equal roots, then show that p, q, r are in H.P.

If p(q-r) x^2 +q(r-p) x+r(p-q) =0 has equal roots then 2/q =

If the roots of the equation (q-r)x^(2)+(r-p)x+p-q=0 are equal, then show that p, q and r are in A.P.

If the roots of the equation p(q-r)x^2+q(r-p)x+r(p-q)=0 be equal, show that 1/p+1/r=2/q .

If the roots of the equation p(q-r)x^2+q(r-p)x+r(p-q)=0 be equal ,show that 1/p+1/r=2/q

If p(q-r)x^(2)+q(r-p)x+r(p-q)=0 has equal roots,then prove that (2)/(q)=(1)/(p)+(1)/(r)

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