If `a(p+q)^2+2b p q+c=0` and `a(p+r)^2+2b p r+c=0 (a!=0)` , then which one is correct?

If 3p^(2) = 5p + 2 and 3q^(2) = 5q + 2, where p ne q , then the equation whose roots are 3p - 2q and 3q - 2p is :

If P = (0,1,2) and Q = (4,-2,1), O = (0,0,0) then P hat O Q =

If x = alpha,beta satisfy both the equations cos^(2)x + acosx + b = 0 and sin^(2)x + p""sinx + q = 0 , then the relation between a, b, p and q is :

If a, b, c, d and p are different real numbers such that (a^2 + b^2 + c^2)p^2 – 2(ab + bc + cd) p + (b^2 + c^2 + d^2) le 0 , then show that a, b, c and d are in GP.

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 G.P Prove that (q+q):(q-p) = 17 : 15

If P(x) = ax^(2) + bx + c and Q(x) = - ax^(2) + dx + c, where ac ne 0 , then P(x) . Q(x) = 0 has at least :

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.

Let V(r) denote the sum of the first r terms of an arithmetic progression (AP) whose first term is r and the common difference is (2r-1). Let T(r)=V(r+1)-V(r)-2 and Q(r) =T(r+1)-T(r) for r=1,2 Which one of the following is a correct statement? (A) Q_1, Q_2, Q_3………….., are in A.P. with common difference 5 (B) Q_1, Q_2, Q_3………….., are in A.P. with common difference 6 (C) Q_1, Q_2, Q_3………….., are in A.P. with common difference 11 (D) Q_1=Q_2=Q_3

If P and Q are the points of intersection of the circles x^2+y^2+3x+7y+2p-5=0 and x^2+y^2+2x+2y-p^2=0 , then there is a circle passing through P, Q and (1, 1) for :