[VA] SRC#002- Almost integers and other beasties

[Gerson W. Barbosa]

(12-13-2018 10:30 PM)Valentin Albillo Wrote:  Go ahead, check them, and I'd love to see any and all comments you would have on the matter, as well as your own uncanny expressions of a similar nature (Gerson, I'm looking at you ), please post your very best, original ones discovered by you (no 3rd-party ones harvested on the Internet, please) as replies in this thread.

Hello, Valentin,

More or less in the same vein,

• if x = \(\pi \sqrt{2}\)                   then  \(\left ( 12^{2}-5\times 10^{-5} \right )\)x+x\(^{-1}\) = 640.00000003

Here are a few more original near-integers and near-identities:

\[2\left ( \pi + e - \psi \right ) = 4.9999776\]

\[2\left ( e-\tan^{-1}\left ( e \right ) \right )=2.9999978\]

\[\ln \left ( \frac{16\ln 878}{\ln \left ( 16\ln 878 \right )}\right )=3.14159265377\]

\[\frac{e^{\frac{23}{4}}}{100+\frac{1}{100+\frac{1}{\sqrt{100\sqrt{5}}}}}=3.141592​65354\]

\[3.141593-\frac{\sqrt{3}}{5\times 10^{6}}=3.1415926535898\]

\[\frac{\ln \left ( \sqrt{8} \cdot 10^{8}\right )}{\ln \pi }=16.999994\]

\[\frac{\ln \left (2\cdot \varphi ^{39}\right )}{\ln \pi }=17.00000026\]

Best regards,

Gerson