In an arithmetic progression the 1st term is 7 and the last term is 28, what is the second term?

What is the sum of the first 9 terms of an arithmetic progression if the first term is 7 and the last term is 55?

What is the sum of the first 12 terms of an arithmetic progression, if the first term is 3 and the last term is 47?

For an arithmetic progression, first term is -7 and the last tem is 53. If the sum of all the term is 483, then find the number of terms and the common difference.

In an arithmetic progression, the third term is 15 and the eleventh term is 55. An infinite geometric progression can be formed beginning with the eighth term of this A.P. and followed by the fourth and second term. Find the sum of this geometric progression upto n terms. Also compute S_(prop) if it exists.

What is the sum of the first 13 terms of an arithmetic progression, if the 5th term is 1 and the 8th term is - 17?

In an increasing geometric progression, the sum of the first and the last term is 99, the product of the second and the last but one term is 288 and the sum of all the terms is 189. Then, the number of terms in the progression is equal to

In an Arithmetic progression the sum of first four terms is 20 and the sum of first three terms is 12 then find the fourth term of the arithmetic