\mathrm{erfc}(x) = 1-\mathrm{erf}(x)= \frac{2}{\sqrt\pi}\int_x^{\infty}\mathrm e^{-t^2}dt. Using the Leibniz's rule for differentiation under the integral sign we have \Big(\mathrm{erfc}(\sqrt{ax})\Big)'=-\frac{2}{\sqrt\pi}\mathrm e^{-(\sqrt{ax})^2}\Big(\sqrt{ax}\Big)'=-\frac{2}{\sqrt\pi}\mathrm e^{-ax}\frac{\sqrt{a}}{2\sqrt{x}}=-\Big(\frac{a}{\pi x}\Big)^{1/2}\mathrm e^{-ax}

This is an exercise in the delta method . Since dY/dX=1/(2\sqrt{X}), \operatorname{Var}Y\approx\frac{\lambda}{(2\sqrt{\lambda})^2}=\frac{1}{4}. Then E(Y)=\sqrt{\lambda}\sqrt{1-\frac{1}{4\lambda}} ...

Setting x^{1/2} = 1 + u (the content of Octania's comment) gives, for x > 0, g(x) = x + 2x^{-1/2} - 3 = \frac{x^{3/2} - 3x^{1/2} + 2}{x^{1/2}} = \frac{(1 + u)^{3} - 3(1 + u) + 2}{1 + u} = \frac{u^{2} (3 + u)}{1 + u}. ...

Here https://en.wikipedia.org/wiki/Diophantine_approximation it is shown that every irrational number \alpha satisfies |\alpha-\frac{p}{q}|<\frac{1}{q^2} for infinite many pairs (p,q). If you ...

We have this: x^2<0.5 Thus, taking the square root of both sides: |x|=\sqrt{x^2}<\sqrt{0.5} |x|<\sqrt{0.5} So, either x is positive or x is negative: \begin{cases}+x<\sqrt{0.5}\\-x<\sqrt{0.5}\end{cases}\implies\begin{cases}x<+\sqrt{0.5}\\x>-\sqrt{0.5}\end{cases} ...

If you want to go that route, then do \begin{align}\| a_n x_n - ax\| &\le \|a_n x_n - a x_n\| + \|a x_n - a x\| \\ &\le |a_n-a| \|x_n\| + |a| \|x_n-x\|\\ &\le |a_n-a| (\|x_n-x\|+\|x\|) + |a|\|x_n-x\| ...