After the join, the new sum is \begin{align*} &(40)(40) + mn\\[6pt] =\; &1600 + mn\\[6pt] =\; &1600 + m(50-m) \end{align*} and the new average is f(m) = \frac{1600 + m(50-m)}{40 + m} We want to ...

We first find a recursive formula for S(n, m) \begin{align} S(n, m) =&\color{red}{ \sum_{i=0}^n \frac{1}{2^{m+i+1}}\binom{m+i}{i}} + \color{blue}{\sum_{i=0}^m \frac{1}{2^{n+i+1}}\binom{n+i}{i}} \\ ...

The first key idea is that if a set of real numbers is bounded above (below, resp.), then it has a least upper bound (greatest lower bound, resp.); it is this that ensures that the one-sided limits ...

The correct formula is x^{\underline{m+n}}=x^{\underline m}(x-m)^{\underline n}\;; when x=0 you have 0^{\underline{m+n}}=0^{\underline m}(-m)^{\underline n}\;. For negative m and n=-m ...

I cannot understand what g(n) actually is That's a typo, and it should read s(n) instead of g(n)\,. From the previous paragraph: \,D_n (p, q) = s(n−1)\,p^n + s(n)\,q^{n−1}\, Writing it for \,p=0\, ...

Almost correct, except that "Frobenius" is not sufficient. In order that D(A)\otimes - is isomorphic to the identity functor (as functors from left A-modules to left A-modules) you need not only ...