For a real number $\alpha 0 $ call $\displaystyle \binom{\alpha}{n}:=\frac{\alpha(\alpha-1)(\alpha-2)...(\alpha+1-n)}{n!}$ the generalized binomial coeeficient. The products in the denominator and the numerator have $n$ factors for each. Assume that $\alpha
otin \mathbb{N}$
b) Calculate Radius of convergence of the binomial series $\sum_{n=0}^{\infty}\binom{\alpha}{n}x^{n}$

Question

For a real number $\alpha > 0 $ call $\displaystyle \binom{\alpha}{n}:=\frac{\alpha(\alpha-1)(\alpha-2)...(\alpha+1-n)}{n!}$ the generalized binomial coeeficient. The products in the denominator and the numerator have $n$ factors for each. Assume that $\alpha 
otin \mathbb{N}$
b) Calculate Radius of convergence of the binomial series $\sum_{n=0}^{\infty}\binom{\alpha}{n}x^{n}$

anonymous · Answer

Unfortunately $$ method does not work on this site's tex renderer, you have to use escaped parentheses for in-line equations.

anonymous · Answer

Sorry my english is not well, can you show me escaped parantheses, i could not figure out which is that? { [ one of this?

anonymous · Answer

Backslash \ followed by paren (. To end, backslash \ followed by close paren )

anonymous · Answer

ok is it possible to renew my question with changes $  to \( ? or its better to do it next time?

anonymous · Answer

thanks it works