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 is equal to

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 two terms.Then the common ratio of this progression equals (1) (1)/(2)(1-sqrt(5))(2)(1)/(2)sqrt(5)(3)sqrt(5)(4)(1)/(2)(sqrt(5)-1)

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,for a fixed n,the nth term is equal to sum of the next two terms. Then the common ratio of the G.P.is

In a GP.of positive terms,for a fixed n,the nth term is eqol to 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 GP of positive terms, any term is equal to one-third of the sum of next two terms. What is the common ratio of the GP?

If the fourth term of a geometric progression exceeds the second term by 24 and the sum of the second and the third term is 6, then the common ratio of the progression is