The sum of squares of three distinct real numbers which form an increasing GP is `S^2` (common ratio is r). If sum of numbers is `alpha S`, then if `r=3` then `alpha^2` cannot lie in

The sum of squares of three distinct real numbers which form an increasing GP is S^2 (common ratio is r). If sum of numbers is alphaS , then If r=2 then the value of alpha^2 is (a)/(b) (where a and b are coprime ) then a+b is

The sum of squares of three distinct real numbers which form an increasing GP is S^2 (common ratio is r). If sum of numbers is alphaS , then If alpha^2=2 , then the value of common ratio r is greater than

The sum of the squares of three distinct real numbers which are in GP is S^(2) , if their sum is alpha S , then

The sum of the squares of three distinct real numbers which are in GP is S^(2) , if their sum is alpha S , then

The sum of the squares of three distinct real numbers which are in G.P. is S^(2) . If their sum is kS, then :

The sum of the squares of three distinct real numbers, which are in GP is S^2 . If their sum is alphaS , show that alpha ^2in(1/3,1)uu(1,3) .

The sum of the squares of three distinct real numbers, which are in GP, is S^(2) . If their sum is a S , then show that a^(2) in ((1)/(3), 1) uu (1,3)

The sum of the squares of three distinct real numbers, which are in GP, is S^(2) . If their sum is a S , then show that a^(2) in ((1)/(3), 1) uu (1,3)

Sum of the square of three different terms, which are in GP is s^2 . If the sum of the three terms is alpha s, show that 1/3< alpha^2 <3.

The sum of the first three terms of a strictly increasing G.P. is alphas and sum of their squares is s^2