If m is the AM of two distinct real numbers l and n `(l,ngt1)` and `G_(1),G_(2)" and "G_(3)` are three geometric means between l and n, then `G_(1)^(4),2G_(2)^(4),G_(3)^(4)` equals

If m is the A.M.of two distinct real numbers l and n(l,n>1) and G_(1),G_(2) and G_(3) are three geometric means between I and n then G_(1)^(4)+2G_(2)^(4)+G_(3)^(4) equals-

if m is the AM of two distinct real number l and n and G_(1),G_(2) and G_(3) are three geometric means between l and n, then (G_(1)^(4)+G_(2)^(4)+G_(3)^(4)) equals to

If m is the A.M. of two distinct real numbers l and n""(""l ,""n"">""1) and G_1, G_2 and G_3 are three geometric means between l and n, then G_1^4+2G_2^4+G_3^4 equals, (1) 4l^2 mn (2) 4l^m^2 mn (3) 4l m n^2 (4) 4l^2m^2n^2

If a be one A.M and G_(1) and G_(2) be then geometric means between b and c then G_(1)^(3)+G_(2)^(3)=

If G_(1) . G_(2) , g_(3) are three geometric means between two positive numbers a and b , then g_(1) g_(3) is equal to

If G_(1),G_(2),...,G_(n) are n numbers inserted between a,b of G.P then G_(1)*G_(2).G_(3)...G_(n)=

If A_(1),A_(2) be two A.M.'s and G_(1),G_(2) be two G.M.,s between a and b, then (A_(1)+A_(2))/(G_(1)G_(2)) is equal to

If A_(1) ,be the A.M.and G_(1),G_(2) be two G.M.'s between two positive numbers then (G_(1)^(3)+G_(2)^(3))/(G_(1)G_(2)A_(1)) is equal to: