Let `A_1 , G_1, H_1`denote the arithmetic, geometric and harmonic means respectively, of two distinct positive numbers. For `n >2,`let `A_(n-1),G_(n-1)` and `H_(n-1)` has arithmetic, geometric and harmonic means as `A_n, G_N, H_N,` respectively.

Let A_(1),G_(1),H_(1) denote the arithmetic, geometric and harmonic means respectively, of two distinct positive numbers. For nge2 , let A_(n-1),G_(n-1)" and "H_(n-1) has arithmetic,geometric and harmonic means as A_(n),G_(n),H_(n) respectively. Which of the following statement is correct?

Let A_(1),G_(1),H_(1) denote the arithmetic, geometric and harmonic means respectively, of two distinct positive numbers. For nge2 , let A_(n-1),G_(n-1)" and "H_(n-1) has arithmetic,geometric and harmonic means as A_(n),G_(n),H_(n) respectively. Which of the following statement is correct?

a,g,h are arithmetic mean, geometric mean and harmonic mean between two positive number x and y respectively. Then identify the correct statement among the following

If m is the A.M of two distinct real number l and n (l,n gt 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) equal :

For what value of n, (a^(n+1)+b^(n+1))/(a^n+b^n) is the arithmetic mean of a and b?

Let alpha and beta be two positive real numbers. Suppose A_1, A_2 are two arithmetic means; G_1 ,G_2 are two geometric means and H_1 H_2 are two harmonic means between alpha and beta , then

Let n in N ,n > 25. Let A ,G ,H deonote te arithmetic mean, geometric man, and harmonic mean of 25 and ndot The least value of n for which A ,G ,H in {25 , 26 , n} is a. 49 b. 81 c.169 d. 225

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

The geometric mean G of two positive numbers is 6 . Their arithmetic mean A and harmonic mean H satisfy the equation 90A+5H=918 , then A may be equal to: