If` S_(1), S_(2)`, and `S_(3)` are, respectively, the sum of n, 2n and 3n terms of a G.P., then `(S_(1)(S_(3)-S_(2)))/((S_(2)-S_(1)^(2))` is equal to

If S_1,S_2 and S_3 are respectively the sums of n, 2n and 3n terms of an AP.Prove that S_3=3(S_2-S_1)

If S_(n) , denotes the sum of first n terms of a A.P. then (S_(3n)-S_(n-1))/(S_(2n)-S_(2n-1)) is always equal to

If S_1,S_2 and S_3 are respectively the sums of n, 2n and 3n terms of an A.P, whose first term is a and common difference d, then find S_1,S_2 and S_3

As_(2)S_(3) sol is

Let S_(n) denote the sum of first n terms of an AP and S_(2n) = 3S_(n) . If S_(3n) = k S_(n) , then the value of k is equal to

Let S_(n) denote the sum of first n terms of an A.P . If S_(2n) = 3S_(n) then find the ratio S_(3n)//S_(n) .

Let S_(1), S_(2),…, S_(101) be consecutive terms of an AP. If (1)/(S_(1)S_(2)) + (1)/(S_(2)S_(3)) +...+ (1)/(S_(100)S_(101)) = (1)/(6) and S_(1) + S_(101) = 50 , then |S_(1) - S_(101)| is equal to a)10 b)20 c)30 d)40

Let S_(1) , S_(2), S_(3) , be the respective sums of first n, 2n and 3n. terms of the same arithmetic progression with a as the first term and d as the common difference. If R= S_(3)-S_(2)-S_(1) then R depends on

If S_(n) denotes the sum of first n terms of an A.P whose first term is a and (S_(nx))/(S_(x)) is independent of x then S_(p)=

If S_1, S_2, S_3 are the sum of first n natural numbers, their squares and their cubes, respectively, show that 9 S_2^(2)= S_3(1+8 S_1)