If the n-th term of an arithmetic progression is `5n+3`, then `3rd` term of the arithmetic progression is

If 2nd, 8th, 44th term of an non-cosntant arithmetic progression is same as 1st, 2nd & 3rd term of Geometric progression respectively and first term of arithmetic progression is , then sum of first 20 terms of that arithmetic progression is

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

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

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

The nth term of an arithmetic progression is 3n-1. Find the progression.

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

If T_(54) is an fifty fourth term of an Arithmetic Progression is 61 and T_(4) is fourth term of an same Arithmetic progression is 64, then T_(10) of that series will be : ( T_(n)=n^("th ") term of an A.P.)

If T_(54) is an fifty fourth term of an Arithmetic Progression is -61 and T_(4) is fourth term of an same Arithmetic progression is 64, then T_(10) of that series will be ( T_(n) = n^("th ") term of an A.P.)

Let a_n be the n^(th) term of an arithmetic progression. Let S_(n) be the sum of the first n terms of the arithmetic progression with a_1=1 and a_3=3_(a_8) . Find the largest possible value of S_n .

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