If in a geometric progression consisting of positive terms, each term equals the sum of the next two terms, then the common ratio of this progression equals

In a geometric progression consisting of positive terms, each term equals the sum of the next terms. Then find the common ratio.

In a G.P of positive terms if any term is equal to the sum of the next two terms, then the common ratio of the G.P is

In a G.P. of positive terms if any terms is equal to the sum of next tow terms, find the common ratio of the G.P.

In a G.P. of positive terms if any terms is equal to the sum of next tow terms, find the common ratio of the G.P.

If every term of a G.P with positive terms is the sum of its two previous terms, then the common ratio of the G.P is

The sum of an infinite geometric series with positive terms is 3 and the sums of the cubes of its terms is (27)/(19) . Then the common ratio of this series is

Find the geometric progression with fourth term = 54 seventh term = 1458.

If the arithmetic progression whose common difference is nonzero the sum of first 3n terms is equal to the sum of next n terms. Then, find the ratio of the sum of the 2n terms to the sum of next 2n terms.

If the arithmetic progression whose common difference is nonzero the sum of first 3n terms is equal to the sum of next n terms. Then, find the ratio of the sum of the 2n terms to the sum of next 2n terms.

If the arithmetic progression whose common difference is nonzero the sum of first 3n terms is equal to the sum of next n terms. Then, find the ratio of the sum of the 2n terms to the sum of next 2n terms.