A G.P. consists of 2n terms. If the sum of the terms occupying the odd places is `S_(1)`, and that of the terms in the even places is `S_(2)`, then `S_(2)/S_(1)`, is

A G.P consists of 2n terms . If the sum of the terms . If the sum of the terms occupying the odd place is S_(1), and that of the terms in the even places is S_(2) then find the common ratio of the progression

A G.P. consist of 2n terms. If the sum of the terms occupying the odd places is S, and that of the terms occupying the even places is S_(2) then find the common ratio of the progression.

A G.P. consists of 2n terms . If the sum of the terms occupying the odd places in S_1 and that of the terms in the even places is S_2 then find the common ratio in progression.

A geometric progression consists of 500 terms. Sum of the terms occupying the odd places is P_1 and the sum of the terms occupying the even places is P_2 . Find the common ratio.

A G.P consists of an even number of terms. If the sum of all the terms is five times the sum of those terms occuping the odd places, then common ratio is

A G.P.consists of an even number of terms.If the sum of all the terms is 5 xx the sum of terms occupying odd places,then find its common ratio.

A. G.P. consists of an even number of terms. If the sum of all the terms is 5 times the sum of the terms occupying he odd places. Find the common ratio of the G.P.