What is the sum of the series 1/1, 1/2, 1/3, ... 1/n and 1/1, 1/4, 1/9....1/n^2 where n is finite?

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Answer 1 · 2017-07-04T15:01:06

I won't go into a full explanation as it too complex. But essentially:

Sum of the reciprocals

# sum_(r=1)^n \ 1/r = H_n#

Where #H_n# is the #nth# harmonic number .

Sum of the reciprocals of the squares

# sum_(r=1)^n \ 1/r^2 = pi^2/6 - sum_(r=1)^n \ (beta(k,n+1))/k#

Where #beta(x,y)# is the Beta Function .