We have that |x|^2=x^2 and \lfloor \:x\rfloor \leq x \leq |x| Thus \frac{\sqrt{\left|x\right|-\lfloor \:x\rfloor }}{x^2}\leq \frac{\sqrt{|x|+|x|}}{x^2}\leq \sqrt{2} \frac{\sqrt{|x|}}{|x|^2} \leq \frac{2}{|x|^{\frac{3}{2}}} ...

It sure is \frac12....Try multiplying numerator and denominator by {\sqrt{x^2+y^2-4y+5}+1} which gives \frac{(\sqrt{x^2+y^2-4y+5}-1)({\sqrt{x^2+y^2-4y+5}+1})}{(x^2+y^2-4y+4)({\sqrt{x^2+y^2-4y+5}+1})}\ \ \ \ \ \ \ \ \ \ (a-b)(a+b)=a^2-b^2 ...

Noah G Feb 1, 2017 Take the natural logarithm of both sides. \displaystyle{\ln{{y}}}={\ln{{\left(\frac{{{\left({x}^{{2}}+{1}\right)}{\left(\sqrt{{{3}{x}+{4}}}\right)}}}{{{\left({2}{x}-{3}\right)}\sqrt{{{x}^{{2}}-{4}}}}}\right)}}} ...

Why not just write |1/z| < 1 \quad\iff\quad |z| > 1 \quad\iff\quad x^2+y^2 > 1.

Your work is correct. I can't think of a slicker way to solve the problem, but another way to solve it is to show that F has nonzero curl. The curl of F will equal \frac{1}{\sqrt{x^2 + y^2}}\bf{k} ...

Let \ell_m be the line with slope m that passes through the point (-1,0). Let P_m=(x_m,y_m) be the second meeting point of \ell_m with the unit circle. It is reasonably clear by continuity ...