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

The first term of an arithmetic progression is 1 and the sum of the first nine terms equal to 369 . The first and the ninth term of a geometric progression coincide with the first and the ninth term of the arithmetic progression. Find the seventh term of the geometric progression.

Take any Arithmetic Progression.

If the pth term of an arithmetic progression is q and the qth term is p, show that its (p+q)th term is 0.

The sum of n terms of two arithmetic progressions are in the ratio (3n+8):(7n+15). Find the ratio of their 12^th terms.

The sum of n terms of two arithmetic progressions are in the ratio (3n + 8) : (7n + 15). Find the ratio of their 12^("th") terms.

The sums of n terms of two arithmetic progressions are in the ratio 5n + 4 : 9n + 6. Find the ratio of their 18^(th) terms.

The sum of n terms of two arithmetic progressions are in the ratio 5n+4:9n+6. Find the ratio of their 18th terms.

The sum of first three terms of an arithmetic progression with n terms is x and the sum of last three terms is y.Show that the sum of n terms is n/6(x+y)

If P-th term of an arithmetic progression be Q and Q-th term be P.then show that (P+Q)thterm is O.

The third term of a geometric progression is 4. Then the product of the first five terms is a. 4^3 b. 4^5 c. 4^4 d. none of these