Consider an A.P. with first term 'a' and common difference 'd'. Let `S_(k)` denote the sum of first k terms. If `(S_(kx))/(S_(x))` is independent of x, then `:`

Consider an AP with a as the first term and d is the common difference such that S_(n) denotes the sum to n terms and a_(n) denotes the nth term of the AP. Given that for some m, n inN,(S_(m))/(S_(n))=(m^(2))/(n^(2))(nen) . Statement 1 d=2a because Statement 2 (a_(m))/(a_(n))=(2m+1)/(2n+1) .

In an AP, the seventh term is 4 and the common difference is -4. Which is the first term?

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 :

For ths A.P. 1/4, -1/4, -3/4, -5/4 …………, write the first term a and the common difference d. And find the 7th term.

7th term of an A.P. is 40. then the sum of the first 13 terms is

The sum of the n terms of an AP is 2n^(2)+5n and its common difference is 6, then its first term is

Consider an infinite geometric series with first term 'a' and common ratio 'r'. If the sum is 4 and the second term is 3/4 then

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 :

The first term of an A.P is 2 and last term is 59. Find the common difference if sum of all terms is 610 .

Write first four terms of the A.P, when the first term a and the common difference d are given as follows : a = -1, d = (1)/(2)