Multiply 20527686 by its natural logarithm. The result differs from an #integer by less than 1/20527686(!)

#math #maths #logarithm #nearinteger

[Modified from OP birdsite 20131027]

AN ALMOST INTEGER:
\[\boxed{\boxed{\left(\dfrac{\pi^3(e!)^2\pi!\zeta(3)\ln(\pi)}{e\sqrt{e-\ln(2e)}}+\dfrac{\{\zeta(3)\}G^2}{\pi^2}\right)\approx2023.00033565}}\]
#AlmostInteger #NearInteger #HappyNewYear #HappyNewYear2023 #HNY2023 #HNY