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Jaume Oliver Lafont
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$137$ is $(2n+1)^3+3n^2$ for $n=2$

The simplest rearrangements of the cancelling harmonic series converge to the logarithms of positive rationals.

$$ \log\left(\frac{p}{q}\right)=\sum_{i=0}^\infty \left(\sum_{j=pi+1}^{p(i+1)}\frac{1}{j}-\sum_{k=qi+1}^{q(i+1)}\frac{1}{k}\right) $$

$\pi^2$ is so close to $10$ because $$\sum_{k=0}^\infty\frac{1}{((k+1)(k+2))^3}$$ is small.

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22
Interpretation of $\frac{22}{7}-\pi$
Feb 19, 2016
15
A series to prove $\frac{22}{7}-\pi>0$
Feb 13, 2016
13
Is $\pi^k$ any closer to its nearest integer than expected?
Feb 11, 2016
12
Simplest way to get the lower bound $\pi > 3.14$
Oct 23, 2017
12
Intuitively, why is the Euler-Mascheroni constant near $\sqrt{1/3}$?
Jan 15, 2016
12
A series to prove $\frac{22}{7}-\pi>0$
Feb 15, 2016
11
Asymptotic quality of rational approximations to $\pi$
Apr 11, 2017
10
355/113 and small odd cubes
Feb 7, 2021
10
Is there an integral that proves $\pi > 333/106$?
Dec 29, 2015
9
Rational series representation of $e^\pi$
Jan 8, 2016
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19
Source and context of $\frac{22}{7} - \pi = \int_0^1 (x-x^2)^4 dx/(1+x^2)$?
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How does ChatGPT respond to novel prompts and commands?
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Proving a series for $\pi$ by Plouffe
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