The exact value of \sum_{n=1}^\infty\frac{1}{n \binom{3n}{n}} We have already found that \sum_{n=1}^\infty\frac{1}{n \binom{3n}{n}}=\int_0^\infty\frac{2xdx}{(x+1)(x^3+3x^2+2x+1)} if we can ...

The situation here is closely related to the following situation: say you have some real function f(x) and you want to shift its graph to the right by a positive constant a. Then the correct thing ...

As there are n terms as the multipliers, \displaystyle f(n)=\frac1n\Big\{(2n+1)(2n+2)\cdots(2n+n)\Big\}^{1/n}=\left(\prod_{1\le r\le n}\frac{2n+r}n\right)^{\frac1n} hence \ln f(n)=\frac1n\sum_{1\le r\le n}\ln\left(2+\frac rn\right) ...

If T(i)=(1,1) and T(j)=(2,-1) and e_1=i-j=(1,-1) and e_2=3i+j=(3,1), then T(e_1)=T(i-j)=T(i)-T(j)=(-1,2)=a_1e_1+b_1e_2 \,\text{(say)} and T(e_2)=T(3i+j)=3(1,1)+(2,-1)=(5,2)=a_2e_1+b_2e_2\,\text{(say)}. ...

Take a closer look at what your calculations for the second problem represent. You’re computing the orthogonal projection onto the normal to the plane—pretty much the same thing that you did for the ...

T = \begin{pmatrix}5/6 & 1/6\\ 2/6 & 4/6\end{pmatrix} is a right stochastic matrix (see the Wikipedia entry , for example). So you need to right -multiply the state vector (which is a row vector ...