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Apply the formula: $\ln\left(a\right)=b$$\to e^{\ln\left(a\right)}=e^b$, where $a=\sqrt{x}$ and $b=-211111$
Learn how to solve equations logarithmiques problems step by step online.
$e^{\ln\left(\sqrt{x}\right)}=e^{-211111}$
Learn how to solve equations logarithmiques problems step by step online. ln(x^(1/2))=-211111. Apply the formula: \ln\left(a\right)=b\to e^{\ln\left(a\right)}=e^b, where a=\sqrt{x} and b=-211111. Apply the formula: e^{\ln\left(x\right)}=x, where x=\sqrt{x}. Apply the formula: x^a=b\to \left(x^a\right)^{inverse\left(a\right)}=b^{inverse\left(a\right)}, where a=\frac{1}{2}, b=e^{-211111}, x^a=b=\sqrt{x}=e^{-211111} and x^a=\sqrt{x}. Apply the formula: \left(x^a\right)^b=x, where a=\frac{1}{2}, b=2, x^a^b=\left(\sqrt{x}\right)^2 and x^a=\sqrt{x}.