\displaystyle\frac{{25}}{{21}} Explanation: The numerator and denominator need to be simplified. Identify the separate terms first. \displaystyle\frac{{{\left({10}^{{2}}\right)}-{\left({2}\times{3}^{{3}}\right)}-{\left({4}\right)}}}{{{\left({2}\times{5}\right)}+{\left({8}\times{2}^{{2}}\right)}}} ...

\displaystyle{15}\cdot{10}^{{6}} Explanation: First of all, since the multiplication is commutative, you can deal with numbers and powers of ten separately: \displaystyle{5}\times{10}^{{7}}{\frac{{{9}\times{10}^{{-{3}}}}}{{{3}\times{10}^{{-{2}}}}}}={5}\cdot\frac{{9}}{{3}}\times{10}^{{7}}{\frac{{{10}^{{-{3}}}}}{{{10}^{{-{2}}}}}} ...

See a solution process below: Explanation: First, rewrite this expression as: \displaystyle{\left(\frac{{1.032}}{{8.6}}\right)}\times{\left(\frac{{10}^{{-{{4}}}}}{{10}^{{-{{5}}}}}\right)}\Rightarrow{0.12}\times{\left(\frac{{10}^{{-{{4}}}}}{{10}^{{-{{5}}}}}\right)} ...

You're double counting the degenacy in E_{k} by multiplying by 2 and summing from -4 to 4. Either you sum from 0 to 4 2E_{k} or you sum from -4 to 4 E_{k} but not both

It says it's not in the ground state. You can only get the lowest bound in the Heisenberg Uncertainty Principal when the harmonic oscillator is in the ground state. Since we are not in the ground ...

The paper by Briel et al uses the formulae in Henry & Henriksen (1986) : they start with the spatial electron number density (eq. (2) in Henry & Henriksen) n_e(r) = n_0\left(1 + \left(\frac{r}{a}\right)^2\right)^{-3\beta/2}. ...