In an arithmetic progression, thrice the second term is equivalent to eighth term and the sum of fourth term and the seventh term is 9 greater than the ninth term. Find the AP.

In an arithmetic progression sixth term is one more than twice the thrid term. Tha sum of the fourth and fifth terms is five times the secon term. Find the tenth term of the arithmatic progression.

Find four numbers forming a geometric progression in which the third term is greater than the first term by 9 and the second terms is greater than the 4th by 18.

If 29th term of an A.P is twice its 19th term, then the 9th term is

Find four numbers forming a geometric progression in which the third term is greater than the first term by 9, and the second term is greater than the 4^("th") by 18.

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.

The seventh term of an arithmetic progression is four times itss second term and twelth term is 2 more than three times of its fourth term. Find the progression.

Soppose that all the terms of an arithmetic progression (AP) are natural numbers. If the ratio of the sum of the first seven terms to the sum of the first eleven terms is 6:11 and the seventh term lies between 130 and 140, then the common difference of this AP is

In an arithmetic progression of 50 terms, the sum of first ten terms is 210 and the sum of last fifteen terms is 2565. Find the arithmetic progression.

In an arithmetic progression of 50 terms, the sum of first ten terms is 210 and the sum of last fifteen terms is 2565. Find the arithmetic progression.

In and AP, the sum of the first 10 terms is -150 and sum of the next ten terms is -550. Find the AP.