Your teacher has left out some justification, which is probably why you are confused. In general, we have the following identity for all real x: \sqrt{x^2}=|x|.\tag{1} Also, for nonnegative ...

Multiply the original equation (x-x^{-1})^{1/2}+(1-x^{-1})^{1/2}=x\tag{1} by (x-x^{-1})^{1/2}-(1-x^{-1})^{1/2} to get x-1=x((x-x^{-1})^{1/2}-(1-x^{-1})^{1/2}) That is (x-x^{-1})^{1/2}-(1-x^{-1})^{1/2}=1-x^{-1}\tag{2} ...

Sure, \lim_{x\to\infty}\frac{\displaystyle\sum_{n=1}^xn}{\displaystyle\sum_{n=1}^xn}=1. However, \displaystyle\sum_{n=1}^\infty n is defined to be \displaystyle\lim_{x\to\infty}\sum_{n=1}^x n, ...

It's easy, write in a matrix form: \begin{array}{l}\left( {x - 1} \right)a + \left( {x - \frac{1}{2}} \right)b + xc = 0\\ya + \left( {y - \frac{{\sqrt 3 }}{2}} \right)b + yc = 0\\76a + 150b + 29c = 255z\end{array} ...

Given that \lim_{x\to0}\left(\frac{e^x-1}{x}\right)^{1/x}=\lim_{x\to0}\exp\left[{\frac{1}{x}\;\log\left(\frac{e^x-1}{x}\right)}\right] and that \lim_{x\to0}\frac{1}{x}\;\log\left[1+\left(\frac{e^x-1}{x}-1\right)\right] =\lim_{x\to0}\frac{1}{x}\left(\frac{e^x-1}{x}-1\right)=\lim_{x\to0}\left(\frac{e^x-1-x}{x^2}\right) ...

Using Newton's negative binomial series more generally (1+z)^n=\sum_{0\le r<\infty}\frac{n(n-1)\cdots (n-r+1)}{r!}z^r\text{ for } |z|<1 (1-a)^{-1}=\sum_{0\le r<\infty}\frac{(-1)(-1-1)\cdots (-1-r+1)}{r!}(-a)^r ...