Let S be the sum, P be the product and R be the sum of the reciprocals of 3 terms of G.P. Then `P^(2) R^(3) : S^(3)` is equal to `:`

Let S be the sum, P the product and R the sum of reciprocals of n terms in a G.P. Prove that P^(2)R^(n) = S^n .

Let S_(n) denote the sum of the first n terms of an A.P. If S_(2n) = 3S_(n) , then S_(3n) : S_(n) is equal to :

If the sum of first p terms of an A.P is equal to the sum of the first q terms , then find the first (p+q) terms .

Fifth term of a G.P. is 2, then the product of its 9 terms is :

Let S_(n) denote the sum of first n terms of an A.P. If S_(2n) = 3S_(n) , then the ratio ( S_(3n))/( S_(n)) is equal to :

Let S_(n) denote the sum of the cubes of the first n natural numbers and s_(n) denote the sum of the first n natural numbers. Then sum_(r=1)^(n)(S_(r))/( S_(r )) equals :

How many products are formed by sum of P,Q,R,S ?

If S_(1),S_(2),S_(3) be respectively the sum of n, 2n and 3n terms of a GP, then (S_(1)(S_(3)-S_(2)))/((S_(2)-S_(1))^(2)) is equal to

If 2 is the sum to infinity of a G.P, whose first element is 1, then the sum of the first n terms is

If x ,2x+2 and 3x+3 are the first three terms of a G.P., then the fourth term is