The reciprocals of all the terms of a series in geometric progression form a ________ progression.

A series whose terms are in Geometric progression is called …….

All the multiples of 3 form a geometric progression. [True/False]

The first, second and seventh terms of an arithmetic progression (all the terms are distinct) are in geometric progression and the sum of these three terms is 93. Then, the fourth term of this geometric progression is

The first, second and seventh terms of an arithmetic progression (all the terms are distinct) are in geometric progression and the sum of these three terms is 93. Then, the fourth term of this geometric progression is

The sum of the terms of an infinite geometric progression is 3 and the sum of the squares of the terms is 81. Find the first term of the series.

The second, third and sixth terms of an A.P. are consecutive terms of a geometric progression. Find the common ratio of the geometric progression.

The first three terms of a geometric progression are 3, -1 and 1/3 . The next term of the progression is

The first three terms of a geometric progression are 3, -1 and 1/3 . The next term of the progression is

If the fourth term of a series in geometric progression is 24 and the seventh term is 192, find the sum of its first ten terms.

The sum of first three terms of a geometric progression is 13/12 and their product is -1 Find geometric progression.