if a,a1,a2,a3,.........,a(2n),b are in A...

if `a,a_1,a_2,a_3,.........,a_(2n),b` are in `A.P.` and `a,g_1,g_2,............g_(2n) ,b` are in `G.P.` and `h` is `H.M.` of `a,b` then `(a_1+a_(2n))/(g_1g_(2n))+(a_2+a_(2n-1))/(g_2g_(2n-1))+............+(a_n+a_(n+1))/(g_n*g_(n+1))` is equal

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If a ,a_1, a_2, a_3, a_(2n),b are in A.P. and a ,g_1,g_2,g_3, ,g_(2n),b . are in G.P. and h s the H.M. of aa n db , then prove that (a_1+a_(2n))/(g_1g_(2n))+(a_2+a_(2n-1))/(g_1g_(2n-1))++(a_n+a_(n+1))/(g_ng_(n+1))=(2n)/h

If a , a_(1) , a_(2) ,a_(3) , cdots a_(2n), b are in A.P. and a, g_(1) , g_(2) , g_(3) , cdots , g_(2n), b are in G.P. and h is the H.M of a and b then prove that (a_(1)+a_(2n))/(g_(1)g_(2n))+(a_(2)+a_(2n-1))/(g_(2)g_(2n-1))+cdots+ (a_(n)+a_(n+1))/(g_(n)g_(n+1))=(2n)/(h)

The sequence, a, a1,a 2. b is an A.P; the sequence a,g1,g2 .... g2n,b is a GP. h is the H.M of a, b. The series (a_1 +a_2n)/(g_1g_2n) + .......+(a_n+a_(n+1))/(g_n*g_(n+1))

If a_1, a_2, a_3,.....a_n are in H.P. and a_1 a_2+a_2 a_3+a_3 a_4+.......a_(n-1) a_n=ka_1 a_n , then k is equal to

if `a,a_1,a_2,a_3,.........,a_(2n),b` are in `A.P.` and `a,g_1,g_2,............g_(2n) ,b` are in `G.P.` and `h` is `H.M.` of `a,b` then `(a_1+a_(2n))/(g_1*g_(2n))+(a_2+a_(2n-1))/(g_2*g_(2n-1))+............+(a_n+a_(n+1))/(g_n*g_(n+1))` is equal

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if `a,a_1,a_2,a_3,.........,a_(2n),b` are in `A.P.` and `a,g_1,g_2,............g_(2n) ,b` are in `G.P.` and `h` is `H.M.` of `a,b` then `(a_1+a_(2n))/(g_1g_(2n))+(a_2+a_(2n-1))/(g_2g_(2n-1))+............+(a_n+a_(n+1))/(g_n*g_(n+1))` is equal