Prove that in a G.P. of finite number of terms the product of any terms equidistant from the beginning and the end is constant and is equal to the product of the first and last terms.

Prove that in an A.P. of finite number of terms the sum of any two terms equidistant from the beginning and the end is equal to the sum of the first and last terms.

If the 5th term of a G.P. is x, then the product of its first nine terms is-

If the number of terms in the expansion of (a+x)^(n) is finite then n is a -

Fifth term of G.P. is 2, then the product of its firs 9 terms is-

In a G.P., the sum of the first and the last term is 66, the product of the second and the last but one is 128 and the sum of terms is 126. In any case, the difference of the least and the greatest term is -

The sum of 2n terms of a series in G.P. is 2R and the sum of the reciprocals of those terms is R , find the continued product of the terms.

Find the number of terms of a G.P. whose first term is ¾, common ratio is 2 and the last term is 384.

The second term of a G.P. is b and the common ratio is r. If the product of the first three terms of this G.P. is 64, find b.

If the nth term of a G.P. be p, then show that the product of its first (2n-1) terms is p^(2n-1) .

Find a G.P. for which sum of the first two terms is – 4 and the fifth term is 4 times the third term.