\displaystyle\text{vertical asymptotes at }\ {x}--{3}\ \text{ and }\ {x}={2} \displaystyle\text{horizontal asymptote at }\ {y}={0} Explanation: \displaystyle\text{let }\ {f{{\left({x}\right)}}}=\frac{{x}}{{{x}^{{2}}+{x}-{6}}} ...

If you ask yourself: “What could possibly make a function of this form discontinuous?”, then, without delving into mathematical definitions, because the numerator is always going to have a defined ...

\displaystyle\frac{{{6}+{5}{x}}}{{x}^{{2}}} Explanation: \displaystyle\frac{{3}}{{x}^{{2}}}+\frac{{5}}{{{2}{x}}} \displaystyle\therefore=\frac{{{3}\times{2}{x}+{5}{x}^{{2}}}}{{{\left({2}{x}\right)}{\left({x}^{{2}}\right)}}} ...

Let f be a nice function on \Bbb R, and let g(x)=f(x+1). Then \sqrt{2\pi}\,\hat g(s)=\int_{-\infty}^\infty g(x)e^{isx}\,dx =\int_{-\infty}^\infty f(x+1)e^{isx}\,dx =\int_{-\infty}^\infty f(x)e^{is(x-1)}\,dx=e^{-isx}\sqrt{2\pi}\,\hat f(s). ...

\displaystyle\frac{{1}}{{5}}{\left({x}-{1}\right)}-\frac{{1}}{{5}}{\left({x}+{4}\right)} Explanation: first step is to factor the denominator : \displaystyle{x}^{{2}}+{3}{x}-{4}{)}={\left({x}+{4}\right)}{\left({x}-{1}\right)} ...

\displaystyle\int\frac{{3}}{{{x}^{{2}}+{2}{x}+{4}}}{\left.{d}{x}\right.}=\sqrt{{{3}}}{\arctan{{\left(\frac{{{x}+{1}}}{\sqrt{{{3}}}}\right)}}}+{C} Explanation: Rather than partial fractions I ...