\displaystyle{2}-\sqrt{{2}}\le{x}\le{2}+\sqrt{{2}} Explanation: We have \displaystyle{x}^{{2}}\le{4}{x}-{2} i.e. \displaystyle{x}^{{2}}-{4}{x}+{2}\le{0} and using the quadratic formula ...

\displaystyle{x}\ge{5} or \displaystyle{x}\le{4} Explanation: \displaystyle{9}{x}-{x}^{{2}}\le{20} is equivalent to \displaystyle{\left(\text{XXXX}\right)} \displaystyle{0}\le{x}^{{2}}+{9}{x}+{20} ...

We have \forall x\in[0,a],\qquad|f_n(x)|\le n^2 a^n\xrightarrow{n\to\infty}0 so the sequence (f_n) is uniformly convergent to the zero function.

First of all X_{n+1} is not a sequence, it's a number. In particular it is the (n+1)'st term of the sequence (X_n) (assuing that (X_n)=(X_n)_{n=1}^\infty). The sequence (X_{n+1}) is ...

When you substitute \sigma=\sigma_1 into the formula Sd_n(\sigma)=\sigma_\#(Sd_n(\delta^n)) you get Sd_n(\sigma_1)=(\sigma_1)_\#(Sd_n(\delta^n)) not Sd_n(\sigma_1)=\sigma_\#(Sd_n(\delta^n))

A minor error in your solution is that you've determined the derivative when x=0. This function is not differentiable at this point. Suppose x^\star>0. Then, as you've shown, then x^\star=z-1. ...