If `S=(a)/(1-r^(3))`, then expres r in terms of S and a.

If S_(r) denotes the sum of the first r terms of an A.P.then show that (S_(3r)-S_(r-1))/(S_(2r)-S_(2r-1)) is equals

If S_r denotes the sum of the first r terms of an A.P. Then, S_(3n)\ :(S_(2n)-S_n) is n (b) 3n (c) 3 (d) none of these

If S_r denotes the sum of r terms of an A.P. and S_a/a^2=S_b/b^2=c . Then S_c= (A) c^3 (B) c/ab (C) abc (D) a+b+c

If S_(n) denotes the sum fo n terms of a G.P. whose first term and common ratio are a and r respectively then show that: S_(1)+S_(3)+S_(5)+……..+S_(2n)-1=(an)/(1-r)-(ar(1-r^(2n)))/((1-r^(2))

S_(r) denotes the sum of the first r terms of an AP.Then S_(3d):(S_(2n)-S_(n)) is -

If S_(n) denotes sum of first n terms of a G.P. of real numbers with common ratio r ,where first term is independent of r ,then ((r-1))(d(S_(n)))/(dr) is equal to

If (r+1)^(th) term is (3.5...(2r-1))/(r!) (1/5)^(r) , then this is the term of binomial expansion-