See a solution process below: Explanation: Using the rules from PEDMAS we first execute the Exponent operation: \displaystyle\frac{{1}}{{2}}\times{72}\times{10}^{{{2}}}\Rightarrow\frac{{1}}{{2}}\times{72}\times{100} ...

These batons represent the flip permutation group F_n on n elements that contain two permutations. The cycle indices are Z(F_n) = \frac{1}{2}(a_1^n + a_2^{n/2}) for n even and Z(F_n) = \frac{1}{2}(a_1^n + a_1 a_2^{(n-1)/2}) ...

For any complex numbers z and a, the term z^a is defined as z^a=e^{a\log(z)}. Then, with z=-1 and a=\pi we have \begin{align} (-1)^\pi&=e^{\pi\log(-1)} \tag 1\\\\ &=e^{\pi(i\pi +i2n\pi)} \tag 2\\\\ &=e^{i\pi^2 (2n+1)}\\\\ &=\cos(\pi^2 (2n+1))+i\sin(\pi^2 (2n+1)) \end{align} ...

If a person A buys some (any) 10 of the 1000 items, then the probability that some other person B buys the same set of 10 items is \frac{1}{\binom{1000}{10}}. For N = 10^6 people, and ...

The canonical decomposition that you're asking about is intrinsically dependent on an integration-by-parts argument that is calculated in full in this previous answer of mine . I'll refer you to that ...

As indicated in my now erased comments \begin{align*}\mathbb{E}[B^ab]&=\mathbb{E}[B^a]/2\\&=\frac{1}{2}\int_0^1 B^a \text{d}a\\&=\frac{1}{2}\int_0^1 e^{\log(B)a} \text{d}a\\ ...