The maximum is \displaystyle{\sqrt[{{6}}]{{\frac{{4}}{{3}}}}}{e}^{{-\frac{{1}}{{6}}}}\approx{0.888} (it occurs at \displaystyle{x}=\sqrt{{\frac{{4}}{{3}}}} ) and the minimum is \displaystyle-{e}^{{-\frac{{1}}{{8}}}}\approx-{0.882} ...

\int x^2e^{\frac{-x^2}{2}}=\int x\cdot xe^{\frac{-x^2}{2}}=-x\cdot e^{\frac{-x^2}{2}}+\int e^{\frac{-x^2}{2}} \int xe^{\frac{-x^2}{2}}=-e^{\frac{-x^2}{2}} \therefore \int (x^2-x)e^{\frac{-x^2}{2}}=-(x-1)\cdot e^{\frac{-x^2}{2}}+\int e^{\frac{-x^2}{2}}

This is a functions question, where \theta x represents we are taking x as an input to the function theta. Think of it as f(x)=x^{-3}(2x)(\dfrac{x}{2})(2) instead. You cannot "solve" for theta ...

Express the log function as \log (x) = \int_1^x \frac{du}{u}, and note that this is the inverse of the exponential function e^x. Inasmuch as the integrand is an increasing function, it is ...

Energy is not a Lorentz invariant quantity, it is the zero-th component of the four-vector. Only proper orthochronous Lorentz transformations preserve the sign of the zeroth component, so if the ...

When we assume hydrostatic equilibrium, the pressure gradient is taken. Maybe the pressure should be 0 when \xi>\xi_0, so that constraint should be explicitly applied. This is generally understood ...