Three non-zero real numbers from an A.P. and the squares of these numbers taken in same order from a G.P. Then, the number of all possible value of common ratio of the G.P. is

Three distinct non-zero real numbers form an A.P. and the squares of these numbers taken in same order form a G.P.If possible common ratio of G.P. are 3 pm sqrtn, n in N then n = ____________.

Three distinct non-zero real numbers form an A.P. and the squares of these numbers taken in same order form a G.P.If possible common ratio of G.P. are 3 pm sqrtn, n in N then n =

Three non-zero real numbers form a AP and the squares of these numbers taken in same order form a GP. If the possible common ratios are (2pm sqrt(k)) where k in N , then the value of [k)/(8)-(8)/(k)) is (where [] denites the greatest integer function).

Three non-zero real numbers form a AP and the squares of these numbers taken in same order form a GP. If the possible common ratios are (3pm sqrt(k)) where k in N , then the value of [(k)/(8)-(8)/(k)] is (where [] denotes the greatest integer function).

Three non-zero real numbers form a AP and the squares of these numbers taken in same order form a GP. If the possible common ratios are (3pm sqrt(k)) where k in N , then the value of [(k)/(8)-(8)/(k)] is (where [] denotes the greatest integer function).

Three non-zero real numbers form a AP and the squares of these numbers taken in same order form a GP. If the possible common ratios are (3pm sqrt(k)) where k in N , then the value of [(k)/(8)-(8)/(k)] is (where [] denotes the greatest integer function).

If three non-zero distinct real numbers form an arithmatic progression and the squares of these numbers taken in the same order constitute a geometric progression. Find the sum of all possible common ratios of the geometric progression.