As one solution : First check that the probability mass function (pmf) is valid. That is, check the following holds: \sum_{n=0}^\infty {p(n)}=1 Now \sum_{n=0}^\infty {\frac{3}{4}\left(\frac{1}{4}\right)^n}=\frac{3}{4}\sum_{n=0}^\infty {\left(\frac{1}{4}\right)^n} ...

\displaystyle{2}-{2}\sqrt{{{2}}} Explanation: We have: \displaystyle{u}={<}{2},{2}{>} \displaystyle\Rightarrow{2}-{\left|{{u}}\right|}={2}-{\left|{{<}{2},{2}{>}}\right|} \displaystyle\Rightarrow{2}-{\left|{{u}}\right|}={2}-\sqrt{{{2}^{{{2}}}+{2}^{{{2}}}}} ...

I tried this: Explanation: We have: \displaystyle{\left({a}+{b}\right)}^{{2}}={189} \displaystyle{a}^{{2}}+{2}{a}{b}+{b}^{{2}}={189} let us multiply and divide by \displaystyle{3} : \displaystyle{\left(\frac{{3}}{{3}}\right)}{\left({a}^{{2}}+{2}{a}{b}+{b}^{{2}}\right)}={189} ...

\displaystyle{a}_{{3}}={0} Explanation: In an arithmetic sequence if \displaystyle{a}_{{1}} is the first term and common difference between a term \displaystyle{a}_{{{n}+{1}}} and the ...

By Tayor's Theorem f(x) = f(n) + f'(n)(x-n) + \frac{f''(n)}{2!}(x-n)^2 + \cdots + \frac{f^{(k)}(n)}{k!}(x-n)^k + h_k(x)(x-n)^k Now take k big enough so that h_k(x)=0 (possible since f is a ...

Let m be a positive odd integer. Then g(m)\in\mathbb{N}. As f is surjective, there exists n\in \mathbb{N} such that f(n)=g(m). But this implies that g(m)=g(2n), with m\ne 2n. So g is ...