I get that; $$\sqrt[e\cdot\log\left(x\right)]{x} = 2.332810391$$ For $x ≠ 1,0,-1,-2,...$. Why is this and does this hold any significance?
2026-03-25 09:38:03.1774431483
Is there any significance for $\sqrt[e\cdot\log\left(x\right)]{x}$?
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Yes, if $\log(x) = \log_{10}(x)$, we have that is $x^{\frac{1}{e \log(x)}} = e^{\frac{1}{e \log(x)} \ln(x)} = e^{\frac{\ln(10)}{e}} = 10^{\frac{1}{e}}$
Thanks to the comments