Is There a Closed Form for the Sum of the Reciprocals of Squares?

AI Thread Summary
The discussion centers on finding a closed form for the sum of the reciprocals of the squares of the first n integers. Participants mention the Riemann zeta function, noting that for infinite n, the sum converges to π²/6, approximately 1.6449. One user shares their approach of observing patterns in groups of ten integers, leading to a similar result. The conversation highlights the complexity of deriving proofs, with references to Euler's elegant method involving infinite products. Overall, the thread emphasizes the beauty and creativity of mathematical proofs related to this series.
mesa
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Hey guy's, trying to figure out another closed form formula but this time for the sum of 1/squares of the first n consecutive integers.

Or in other words:

1/(1^2) + 1/(2^2) + 1/(3^2) + 1/(4^2) +1/(...=

I tried using the same technique as last time by setting up the formula based on several values for n and then replacing any whole number values with an equation using n but this time the formula gets too complicated since the n value is in the denominator.

Any ideas?
 
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Look for the Riemann zeta function.
en.wikipedia.org/wiki/Riemann_zeta_function
 
If I remember correctly, I don't know how to prove it, but the result's something crazy like \displaystyle\dfrac{\sqrt\pi}{6}
 
There are 3 proofs here.

None of them is anything like I'd think up on my own.
Crazy! :smile:
 
oleador said:
Look for the Riemann zeta function.
en.wikipedia.org/wiki/Riemann_zeta_function

Hah, neat! Basically it states that for an infinite value for n we get (∏^2)/6 or 1.6449...

I had come up with 1.64... after noticing a pattern with exponents for each group of 10 integers of n.

Basically each group of 10 integers percentage value over the previous would be the value for those ten integers to the power of 1.346756779 then that quantity multiplied by 10. At the point it broke down it left me at 164% or 1.64... with it showing that the value in the hundreths column never exceeding 4. Neat!
 
I like Serena said:
There are 3 proofs here.

None of them is anything like I'd think up on my own.
Crazy! :smile:

Nice!

How would you go about tackling this problem?
 
mesa said:
Nice!

How would you go about tackling this problem?

Google it, which I did! :wink:
(And I was already aware that it is a standard series with a crazy result.)

I'm way too lazy too think up crazy proofs that are already out there.

(But yes, I did think about it for a little while.
I tried to write it as Ʃx^n/n^2 to be evaluated at x=1, then differentiate it, multiply by x, and differentiate again.
But it became too complex to integrate the result, although that may still be possible.)
 
The great thing about the way Euler solved it (with the infinite product) is that it readily generalizes to find the value of the zeta function at any even integer, not just 2. Give it a try!
 
The Euler's proof is just beautiful! Proofs like these make me love mathematics.
 
  • #10
It's also one of my favorites. The idea to use an infinite product of a seemingly unrelated function sin(x)/x is just so remarkably creative and unexpected.
 

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