The find the n^{th} root of a, we want to solve x^n = a, or x^n-a = 0. Let f(x) = x^n-a. Then f'(x) =nx^{n-1} . Since Newton's iteration is x \leftarrow x-\frac{f(x)}{f'(x)} , this ...

Solving \frac{\alpha^2x}{(\alpha+1)x+1}=x\ \ for all x gives: \frac{\alpha^2x}{(\alpha+1)x+1}=x \iff \alpha^2x=(\alpha+1)x^2+x\iff (\alpha+1)x^2+x-\alpha^2x=0 \iff x\left((\alpha+1)x+1-\alpha^2\right)=0 \ \forall x \implies \left((\alpha+1)x+1-\alpha^2\right)=0 ...

I managed to solve this differential equation. Following from the last part of the question: -\ln{\frac{x+y}{x+3}} - \ln{\bigg|1-\ln{\frac{x+y}{x+3}} \bigg|=\ln{(x+3)}} +{C_1} Next is: -\bigg(\ln{\frac{x+y}{x+3}}+\ln{\bigg| 1- \ln{\frac{x+y}{x+3}}\bigg|}\bigg) = \ln{{(x+3)}}+\ln{C_2} ...

After a few minutes of posting the question I figured pretty much all I did was useless. I found that T(1,0)=\alpha T(1,1) + \beta T(1, -1) so I solved for \alpha and \beta . \begin{cases} \alpha+\beta=1 \\ \alpha-\beta=0 \end{cases} ...

Hint: Show that g(x) := f(x)x^{-\alpha} is constant.

Correct, except that the part For any \alpha\in\mathbb{R}, there exists \delta > 0 such that for any x\in (0,\delta) we have x > 0, x < \delta. is true, but meaningless. Substitute it with ...