The middle term of an Arithmetic series consisting of 25 terms is 20. Find the sum of the series.

The sum of an arithmetic series with 15 terms is 180. Then the 8^(th) term 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 .

If the sum of first 8 terms of an Arithmetic progression is 136 and that of first 15 terms is 465, then find the sum of first 25 terms. OR Ths sum of the 5th and 9th terms of an A.P. is 40 and the sum of the 8th and 14th term is 64. Find the sum of the first 20 terms.

The sum o the fourth and eighth terms of arithmetic progression is 24 and the sum of the sixth and tenth terms is 44. Find the first three terms of the Arithmetic progression:

Find the arithmetic progression consisting of 10 terms , if sum of the terms occupying the even places is equal to 15 and the sum of those occupying the odd places is equal to 25/2

Find three consecutive terms in an arithmetic progression whose sum is 18 and sum of their square is 140.

The 4th term of a geometic progression is 2/3 and the seventh term is 16/81 . Find the geometic series.