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, ...

\begin{align*} \frac32\cdot\frac{x+1}{3-x}&=\frac12\cdot\frac{x+1}{1-\frac{x}3}\\ &=\frac12\left(x\sum_{n\ge 0}\left(\frac13\right)^nx^n+\sum_{n\ge 0}\left(\frac13\right)^nx^n\right)\\ &=\frac12\left(\sum_{n\ge 0}\left(\frac13\right)^nx^{n+1}+\sum_{n\ge 0}\left(\frac13\right)^nx^n\right)\\ &=\frac12\left(\sum_{n\ge 1}\left(\frac13\right)^{n-1}x^n+\sum_{n\ge 1}\left(\frac13\right)^nx^n+1\right)\\ &=\frac12\left(\sum_{n\ge 1}\left(\left(\frac13\right)^{n-1}+\left(\frac13\right)^n\right)x^n+1\right)\\ &=\frac12+\frac12\sum_{n\ge 1}\left(\frac43\right)\left(\frac13\right)^{n-1}x^n\\ &=\frac12+2\sum_{n\ge 1}\left(\frac13\right)^nx^n\;, \end{align*} ...

We have \frac{1}{(2x+1)(x+1)} \equiv \frac{A}{2x+1} + \frac{B}{x+1} So, multiply through by (2x+1)(x+1) to get 1 = A(x+1) + B(2x+1) Let x = -1 to get 1 = B \cdot -1 \iff B = -1 Let x = -\frac{1}{2} ...

The multiplicative inverse of a fraction a/b is b/a. ( Wikipedia ) Let us start with the properties: Division by a number or fraction is the same as multiplication by its inverse or reciprocal . ...

\frac { \frac { 1 }{ 1+x+h } -\frac { 1 }{ 1+x } }{ h }\cdot \frac{1/h}{1/h} = \frac{1}{h(1+x+h)} - \frac{1}{h(1+x)} = \frac{(1+x) - (1+x+h)}{h(1+x+h)(1+x)}=\frac{-h}{h(1+x+h)(1+x)} The h ...

Work with the limits! You cannot hope to transform \frac{f'(c)g(c) - f(c)g'(c)}{[g'(c)]^2} into \frac{\frac{f}{g}(x) - \frac{f}{g}(c)}{x-c} by simple algebraic manipulations, and if you substitute ...