If `3p^2 = 5p+2` and `3q^2 = 5q+2` where `p!=q, pq` is equal to

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 2+i sqrt(3) is a root of the equation x^(2)+p x+q=0 , where p, q are real, then (p, q)=

If p, q, are real and p ne q then the roots of the equation (p-q) x^(2)+5(p+q) x-2(p-q)=0 are

If the function f(x)=2x^(3)-9ax^(2)+12a^(2)x+1 , where a gt0 attains its maximum and minimum at p and q respectively such their p^(2)=q , then a equals :

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

Let P and Q be 3 xx3 matrices with P != Q . If P^(3) = Q^(3) and P^(2) Q = P^(2)Q = Q^(2) P , then determinant of (P^(2) + Q^(2)) is equal to :

If 80 = 2^(P) xx 5^(q) , then p + q =

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) .

Let p(x)=a^(2)+bx,q(x)=lx^(2)+mx+n . If p(1)-q(1)=0,p(2)-q(2)=1andp(3)-q(3)=4 , then p(4)-q(4) equals :

If omega is a complex cube root of unity then the value of (p++q omega+r omega^(2))/(r+p omega+q omega^(2))+(p+q omega+r omega^(2))/(q+r omega+p omega^(2))= (where p, q, r are real)