If S be the sum, p the product and R the sum of the reciprocals of n terms of a G.P., then `(S/R)^n` is equal to

If S be the sum P the product and R be the sum of the reciprocals of n terms of a GP then p^(2) is equal to S/R b.R/S c.(R/S)^(n) d.(S/R)^(n)

If S be the sum P the product and R be the sum of the reciprocals of n terms of a GP then p^2 is equal to S//R b. R//S c. (R//S)^n d. (S//R)^n

Let S be the sum, P be the product and R be the sum of the reciprocals of 3 terms of a G.P. then P^2R^3: S^3 is equal to (a) 1:1 (b) (common ratio)^n :1 (c) (First term)^2(common ratio)^2 (d) None of these

Let S be the sum, P be the product and R be the sum of the reciprocals of 3 terms of a G.P. then P^2R^3: S^3 is equal to (a)1:1 (b) (common ratio)^n :1 (c)(First term)^2(common ratio)^2 (d) None of these

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

If S is the sum, P the product and R the sum of reciprocals of n terms of a G.P., then prove that P^2 = (S/R)^n .

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

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 :

If S be the sum, P the product and R the sum of the reciprocal of n terms in G.P., prove that, p^(2) = ((S)/(R ))^(n) .