The least positive term of an arithmetic progression whose first two term are `(5)/(2)` and `(23)/(12)` is

Find the largest positive term of the H.P.. Whose first two term are 2/5 and (12)/(23).

Determine the arithmetic progression whose 3rd term is 5 and 7th term is 9.

If the sum of the first n terms of an arithmetic progression, whose first term is the sum of the first n positive integers and whose common difference is n, is (8n^(2)-11n-20) , then the sum of all the possible values of n is

A geometrical progression of positive terms and an arithmetical progression have the same first term. The sum of their first terms is 1 , the sum of their second terms is (1)/(2) and the sum of their third terms is 2. Calculate the sum of their fourth terms.

If the sum of the first 4 terms of an arithmetic progression is p, the sum of the first 8 terms is q and the sum of the first 12 terms is r, express 3p+r in terms of q.

Introduction to Arithmetic Progressions and nth term

The 21st term of an AP whose first two terms are -3 and 4, is

If the numbers 3^(2a-1), 14, 3^(4-2a) (0 lt a lt 1) are the first three terms of an arithmetic progression, then its fifth term is equal to

Greatest positive term of a H.P. whose first two terms are 2/5 and 12/23 is (A) 6 (B) 5 (C) 1/6 (D) 37/7