But if it is to be summed for infinity ita answer will be infinity because the given series is diverging in nature.

\text{coefficient of x^m in }\frac{k^2}{\left(k^2+\frac{1}{2}\right)^{n+2}}=\text{coefficient of x^{m-2} in }\left(k^2+\frac{1}{2}\right)^{-(n+2)}=\begin{cases}2^{n+2+(m-2)/2}\;^{-(n+2)}{\rm C}_{(m-2)/2}&\text{m%2==0}\\0&\text{m%2!=0}\end{cases} ...

You can show using the Analytic Continuation Principle that the only holomorphic function that satisfy that condition is f(z) = \frac{1}{1+z^2} . Knowing that you only need to derivate.

There is a typo in one of your steps, it should be as follows (look at the red {\color{red} + }) : \frac{3(k+2)! + 2k(k+2)! -3k(k{\color{red}+}1)! - 2k(k-1)(k+1)!}{6k!} \,\,(*) And then, I do ...

Induction is a 3 step process. The first step will always be the base case. So, assuming induction on the natural numbers or some subset of the natural numbers, there will always be a least element ...

The lengh of projection vector is equal to \langle u, v \rangle for |u|=1 and in this case \mbox{Pro}^{v}_{U}= \langle v, u \rangle u and \langle v,u \rangle = \sqrt{\langle \mbox{Pro}^{v}_{U}, \mbox{Pro}^{v}_{U}\rangle} = \sqrt{\langle \langle v,u \rangle u,\langle v,u \rangle u \rangle}