The `4^(th)` and `7^(th)` term of an arithmetic progression are `11` and `-4`, respectively. What is the `15^(th)` term?

The 3rd and 8th terms of an arithmetic progression are - 14 and 1, respectively. What is the 11th term?

The 5^("th") and the 31^("th") terms of an arithmetic progression are, respectively 1 and -77 . If the K^("th") term of the given arithmetic progression is -17 , then the value of K is

If the sum of 'n' terms of an arithmetic progression is n^(2)-2n , then what is the n^(th) term?

Find the 15th term of the arithmetic progression 10, 4, -2, ….

If the n^(th) term of an arithmetic progression is (2n-1). Find the 7^(th) term.

If the 2^(nd),5^(th) and 9^(th) terms of a non-constant arithmetic progression are in geometric progession, then the common ratio of this geometric progression is

If p^("th"), 2p^("th") and 4p^("th") terms of an arithmetic progression are in geometric progression, then the common ratio of the geometric progression is

If the sum of the first 100 terms of an arithmetic progression is -1 and the sum of the even terms is 1, then the 100^("th") term of the arithmetic progression is