Konstantinos Michailidis Feb 27, 2016 Multiply the denominator with \displaystyle\sqrt{{3}}-\sqrt{{2}} to get \displaystyle\frac{{\sqrt{{3}}-\sqrt{{2}}}}{{{\left(\sqrt{{3}}+\sqrt{{2}}\right)}\cdot{\left(\sqrt{{3}}-\sqrt{{2}}\right)}}}=\frac{{\sqrt{{3}}-\sqrt{{2}}}}{{{\left(\sqrt{{3}}\right)}^{{2}}-{\left(\sqrt{{2}}\right)}^{{2}}}}=\frac{{\sqrt{{3}}-\sqrt{{2}}}}{{{1}}}=\sqrt{{3}}-\sqrt{{2}}

We may exploit an integral representation for \gamma and some trivial bounds. Since: \begin{eqnarray*}\gamma&=&\lim_{n\to +\infty}(H_n-\log n) = \lim_{n\to +\infty}\left(\int_{0}^{1}\frac{x^n-1}{x-1}\,dx-\int_{1}^{n}\frac{dt}{t}\right)\\&=&\lim_{n\to +\infty}\left(\int_{0}^{+\infty}\frac{1-e^{-nx}}{e^x-1}\,dx-\int_{1}^{n}\int_{0}^{+\infty}e^{-tx}\,dx\,dt\right)\\&=&\lim_{n\to +\infty}\left(\int_{0}^{+\infty}\left(\frac{1}{1-e^{-x}}-\frac{1}{x}\right)e^{-x}\,dx+\int_{0}^{+\infty}\left(\frac{1}{x}-\frac{1}{e^x-1}\right)e^{-nx}\,dx\right)\end{eqnarray*} ...

\displaystyle\sqrt{{3}}+\sqrt{{\frac{{1}}{{3}}}}=\frac{{4}}{\sqrt{{3}}} Explanation: \displaystyle\sqrt{{3}}+\sqrt{{\frac{{1}}{{3}}}} \displaystyle\sqrt{{3}}=\frac{{3}}{\sqrt{{3}}}= \displaystyle\sqrt{{\frac{{1}}{{3}}}}=\frac{{1}}{\sqrt{{3}}} ...

Alan P. Mar 24, 2015 \displaystyle\frac{{{10}\sqrt{{{3}}}}}{\sqrt{{{3}}}} is of the same form as \displaystyle\frac{{{10}\times{R}}}{{R}} or \displaystyle{10}\times\frac{{R}}{{R}} ...

The series: \displaystyle{\sum_{{{n}={1}}}^{\infty}}\frac{{1}}{\sqrt{{{n}!}}} is convergent. Explanation: Evaluate the ratio: \displaystyle{\left|{\frac{{a}_{{{n}+{1}}}}{{a}_{{n}}}}\right|}={\left|{\frac{{\frac{{1}}{\sqrt{{{\left({n}+{1}\right)}!}}}}}{{\frac{{1}}{\sqrt{{{n}!}}}}}}\right|}=\sqrt{{\frac{{{n}!}}{{{\left({n}+{1}\right)}!}}}}=\frac{{1}}{\sqrt{{{n}+{1}}}} ...

Multiplying the both sides of \frac{2}{3}t^2+\frac 43t=\frac 15 by 15 gives us 10t^2+20t=3\Rightarrow 10t^2+20t-3=0\Rightarrow t=\frac{-10\pm\sqrt{130}}{10}. Here, note that ax^2+\color{red}{2}bx+c=0\Rightarrow x=\frac{-b\pm\sqrt{b^2-ac}}{a}.