lf `r, s, t` are prime numbers and `p, q` are the positive integers such that their LCM of `p,q` is `r^2 t^4 s^2,` then the numbers of ordered pair of `(p, q)` is

If the normals at two points P and Q of a parabola y^2 = 4ax intersect at a third point R on the curve, then the product of ordinates of P and Q is

P(vec p) and Q(vec q) are the position vectors of two fixed points and R(vec r) is the position vectorvariable point. If R moves such that (vec r-vec p)xx(vec r -vec q)=0 then the locus of R is

If n(A) = p and n (B) = q then numbers of non void relations from A to B are (2^(p+q)-1) .

Express the following number in the (p)/(q) form. Where p and q are integers and q ne 0, 2. bar (8)

Express the following number in the (p)/(q) form. Where p and q are integers and q ne 0, 2. bar (576)

If p, q are positive integers, f is a function defined for positive numbers and attains only positive values such that f(xf(y))=x^p y^q , then prove that p^2=q .

Express the following number in the (p)/(q) form. Where p and q are integers and q ne 0, 4. bar ( 05)

Express the following number in the (p)/(q) form. Where p and q are integers and q ne 0, 1. bar( 34)

Express the following number in the (p)/(q) form. Where p and q are integers and q ne 0, 1. bar (27)