In a Progression if `T_n=2n-1` the fourth term is :

In an arithmetic Progression T_n=3n-1 , then common difference is:

If the nth term of an Arithmetic progression is 4n^(2)-1 , then the 8^(th) term is.

The sum of n terms of an Arithmetic progression is S_n=2n^2+6n . Find the first term and the common difference.

If the n-th term of an arithmetic progression a_(n) = 24 - 3n then its 2nd term is

If the n^(th) term of an arithmetic progression a_(n)=24-3n , then it's 2^(nd) term is

If the n-th term of an arithmetic progression a_(n) = 24 - 3n, then its 2nd term is

In an arithmetic progression, if a = 2n +1, then the common difference of the given progression is

Write the formula to find the sum of first n terms of an Arithmetic progression, whose first term is a and the last term is a_n .

Write the formula to find the sum of first n terms of an Arithmetic progression, whose first term is a and the last term is a_n .

There are five terms in an arrithmetic progression. the Sum of these terms is 55, and the fourth term is five more than the sum of the first two terms.Find the terms of the Arithmaetic progression.