if H1,H2...hm are n H.M between a and b then prove that ` [(H1+a)/(H1-a) +(Hn+b)/(Hn-b)]=2n`

If H_1,H_2,H_3,.......H_n be n harmonic means between a and b then (H_1+a)/(H_1-a)+(H_n+b)/(H_n-b)=

If H_1. H_2...., H_n are n harmonic means between a and b (!=a) , then the value of (H_1+a)/(H_1-a)+(H_n+b)/(H_n-b) =

If H_1. H_2...., H_n are n harmonic means between a and b (!=a) , then the value of (H_1+a)/(H_1-a)+(H_n+b)/(H_n-b) =

A_1, A_2,...., A_n are n A.M’s, and H_1, H_2,....., H_n are n H.M’s inserted between a and b . Prove that (A_1 +A_n)/(H_1+H_n)lt (A^2)/(G^2) , where A is the arithmetic mean and G is the geometric mean of a and b .

If H be the H.M. between a and b, then the value of (H)/(a)+(H)/(b) is

If H be the H.M. between a and b, then the value of (H)/(a)+(H)/(b) is

If H_(1), H_(2), ….. H_(n) are n harmonic means between a and b ( ne a), then the value of (H_(1) + a)/(H_(1) - a) + (H_(n) + b)/(H_(n) - b)

If H_(1).H_(2)....,H_(n) are n harmonic means between a and b(!=a), then the value of (H_(1)+a)/(H_(1)-a)+(H_(n)+b)/(H_(n)-b)=

If the harmonic mean between a and b be H, then the value of (1)/(H-a)+(1)/(H-b) is-