A sequence a1, a2, a2,…,an of non-zero numbers is called a Harmonic progression if the sequence 1/a1,1,a2,..,1/an,.. is an A.P.
Example: The sequence 1,1/4,1/7,1/10,… is a H.P. because the sequence 1,4,7,10,… is in A.P.
d of the corresponding AP = 1/a2 -1/a1
an of H.P. 1/[a+(n-1)d] where a = 1/a1
Insertion of n harmonic means between two give numbers a and b
a,H1,H2,…,Hn,b are in H.P.
=> 1/a, 1/H1,1/H2,…,1/Hn,1/b are in A.P.
Let d be common difference of this A.P.
The last term in AP 1/b is the (n+2)th term.
So 1/b = 1/a +(n+1)d
=> d = (1/b -1/a)/(n+1) = (a-b)/ab(n+1)
=> 1/H1 = (1/a) +d
1/H2 = (1/a)+2d
1/Hn = (1/a)+nd
Harmonic mean of n numers
If a1, a2, ..., an are n non-zero numbers, then the harmonic mean H of these numbers is given by
1/H = [1/a1 +1/a2+…+1/an]/n
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