`int(px^(p+2q-1)-qx^(q-1))/(x^(2p+2q)+2x^(p+q)+1)dx` is equal to

5pq(p^2 - q^2) -: 2p(p+q)

If (sqrt(p+2q)+sqrt(p-2q))/(sqrt(p+2q)-sqrt(p-2q)) , then show that qx^2-px+q=0

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

Point P lie on hyperbola 2xy=1 . A triangle is contructed by P, S and S' (where S and S' are foci). The locus of ex-centre opposite S (S and P lie in first quandrant) is (x+py)^(2)=(sqrt(2)-1)^(2)(x-y)^(2)+q , then the value of p+q is

ABCD is a trapezium such that AB and CD are parallel and BC bot CD . If angleADB = theta, BC = p and CD = q , then AB is equal to (a) ((p^(2)+q^(2))sin theta)/(p cos theta +q sin theta) (b) (p ^(2) + q ^(2)cos theta)/(p cos theta +q sin theta) (c) (p ^(2)+ q^(2))/(p^(2)cos theta +q^(2) sin theta) (d) ((p^(2) +q^(2))sin theta)/((p cos theta + sin theta)^(2))

Let z =x-iy and z^(1/3)= p+iq .Then (x/p+y/q)//(p^2+q^2) is equal to:

If the distance from the point P(1, 1, 1) to the line passing through the points Q(0, 6, 8) andR(-1, 4, 7) is expressed in the form sqrt((p)/(q)) , where p and q are co-prime, then the value of ((q+p)(p+q-1))/(2) is equal to

If x^(p) y^(q) = (x + y)^((p + q)) " then " (dy)/(dx)= ?

In the expansion of (1+x)^n , the coefficient of x^(p-1) and of x^(q-1) are equal. Show that p+q=n+2, p ne q .