\frac{\left||x|^{1/2}-|y|^{1/2}\right|}{|x-y|^{1/2}}=\frac{||x|-|y||}{|x-y|^{1/2}\left(|x|^{1/2}+|y|^{1/2}\right)}\leq\frac{|x-y|^{1/2}}{|x|^{1/2}+|y|^{1/2}}=\sqrt{\frac{|x-y|}{|x|+|y|+2|x|^{1/2}|y|^{1/2}}}\leq\sqrt{\frac{|x|+|y|}{|x|+|y|}}=1. ...

Your answer is correct. You can also check the second derivative to confirm maximality.

Your approach looks good and the only missing piece is to bound the remainder of the Taylor polynomial to get an explict bound on N (the degree of the polynomial) such that the bound |\sqrt{x+\epsilon} - P(x)| < \frac{1}{200} ...

The question is interesting. Here are some developments. At the end of the answer, I found a closed-form expression for g in the case f(t)=t. Let us define the function h(t) = g^{-1}(f(t)), ...

You have a good question. The only answer that I can come up with at the moment is not very satisfying. I'll keep your question in the back of my head for a few days and update my answer if I come up ...

When we adjoin a number satisfying x^2 = -1 to the real numbers, the real numbers embed into the result (namely the complex numbers). In other words, the natural map \mathbb{R} \to \mathbb{C} is ...