Let x = (-2 \sqrt 2)^{2 \over 3}. x^3 = (-2\sqrt{2})^2 = 8. Let \omega \neq 1 be a root of x^3 = 1. Then, the roots of x^3 = 8 are 2, 2\omega, 2\omega^2. Let's compute \omega. x^3 - 1 = (x - 1)(x^2 + x + 1) ...

From x^3-11-6\sqrt2=0 , you get that (x^3-11)^2=72 ; in other words, x^6-22x^3+49=0 . But the only possyble rational roots of this polynomial are \pm1 , \pm7 , and \pm49 . However, ...

\displaystyle=\frac{{{7}\cdot\text{3rd root}{25}}}{{5}} Explanation: \displaystyle\frac{{7}}{{\text{3rd root}{5}}} Multiply be \displaystyle\frac{{1}}{{1}} as \displaystyle\frac{{\text{3rd root}{25}}}{{\text{3rd root}{25}}} ...

Use the rule \displaystyle\sqrt{{\frac{{x}}{{y}}}}=\frac{\sqrt{{x}}}{\sqrt{{y}}} Explanation: \displaystyle=\frac{\sqrt{{a}}^{{2}}}{\sqrt{{b}}^{{2}}}=\frac{{\left|{a}\right|}}{{\left|{b}\right|}} ...

Edit: modifying to fit with changes to Q. The answer is still no. Note that if n=1 we can just drop n. If we try calculating Z/\sqrt{Z^2} for a few values of Z, what do we find? Let's try ...

I don't believe you're going to find widely accepted terminology to distinguish between the two formulas, as they are both used to calculate the standard error of the mean. In my experience, you'll ...