\displaystyle\frac{{11}}{{2.}} Explanation: \displaystyle\sqrt{{\frac{{a}}{{b}}}}=\frac{\sqrt{{{a}}}}{\sqrt{{{b}}}}, so \displaystyle\sqrt{{\frac{{121}}{{4}}}}=\frac{\sqrt{{121}}}{\sqrt{{4}}}=\frac{{11}}{{2}}

Don't Memorise May 13, 2015 \displaystyle\sqrt{{\frac{{12}}{{147}}}}=\sqrt{{\frac{{\cancel{{{3}}}\cdot{4}}}{{\cancel{{{3}}}\cdot{49}}}}} \displaystyle=\sqrt{{\frac{{4}}{{49}}}} ...

Elvan Burcu K. May 29, 2015 \displaystyle\sqrt{{\frac{{11}}{{132}}}}=\sqrt{{\frac{{11}}{{{11}\cdot{12}}}}}=\sqrt{{\frac{\cancel{{11}}}{{\cancel{{11}}\cdot{12}}}}}=\sqrt{{\frac{{1}}{{12}}}}=\frac{{1}}{\sqrt{{12}}}=\frac{{1}}{{{2}\sqrt{{3}}}}=\frac{\sqrt{{3}}}{{{2}\cdot\sqrt{{3}}\cdot\sqrt{{3}}}}=\frac{\sqrt{{3}}}{{{2}\cdot{3}}}=\frac{\sqrt{{3}}}{{6}}

\begin{align}\frac{1}{2}.\frac{3}{4}. ... .\frac{2n-1}{2n}.\frac{2n+2-1}{2n+2} &<\frac{2n+1}{\sqrt{2n+1}(2n+2)}\\~\\&=\frac{\sqrt{2n+1}}{(2n+2)}\\~\\&=\frac{\sqrt{(2n+1)(2n+3)}}{(2n+2)\sqrt{2n+3}}\\~\\&=\frac{\sqrt{4n^2+8n+3}}{(2n+2)\sqrt{2n+3}}\\~\\&\lt \frac{\sqrt{4n^2+8n+3+\color{blue}{1}}}{(2n+2)\sqrt{2n+3}}\\~\\&= \frac{\sqrt{(2n+2)^2}}{(2n+2)\sqrt{2n+3}}\\~\\&=\frac{1}{\sqrt{2n+3}}\end{align} ...

The x-derivative of f gets large when x = 1 and y is large. Thus, I would try a sequence like v_k = (1,k) and z_k = (1+1/k,k). We see \|v_k - z_k\| = \frac{1}{k} \to 0 but f(v_k) - f(z_k) = \frac{k}{2} - \frac{k}{2 + \frac 2 k + \frac 2 {k^2}} = \frac{2k + 2 + \frac 2 k - 2k}{2(2 + \frac 2 k + \frac{2}{k^2})} = \frac{2 + \frac{2}{k}}{4 + \frac{4}{k} + \frac 4{k^2}} \to \frac 1 2 \,\,\,\, \text{as } k \to\infty. ...

Instead of dividing the numerator and denominator by x^2, it may be easier to factor out the appropriate factors from the radical expressions: \begin{align} ...