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/rdot`

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

If one root of the equation x^(2)+p x+12=0 is 4, while the equation x^(2)+p x+q=0 has equal roots then the value of q is

If p,q,r are in G.P. and the equations, px^(2) + 2qx + r = 0 and dx^2+2ex + f = 0 have a common root, then show that d/p , e/q, f/r are in A.P.

If p and q are the roots of the equation x^2-p x+q=0 , then

If p^(th), q^(th), r^(th) and s^(th) terms of an A.P. are in G.P, then show that (p – q), (q – r), (r – s) are also in G.P.

If the roots of the equation 1/ (x+p) + 1/ (x+q) = 1/r are equal in magnitude but opposite in sign, show that p+q = 2r & that the product of roots is equal to (-1/2)(p^2+q^2) .

If, p,q,r are negative distinct real numbers , then the determinant Delta=|(p,q,r),(q,r,p),(r,p,q)| is :

If p and q are the roots of the equation x^(2)+p x+q=0 then

If p, q, r are real numbers then:

If cos^(-1) p+ cos^(-1) q + cos^(-1) r =pi , then : p^2+q^2+r^2+ 2pqr is :