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 ...

b_1 = 2+x = a_{11} c_1 + a_{21} c_2\\ 2+x = a_{11}(1+x) + a_{21}(1-x)\\ a_{11}+a_{21} = 2\\ a_{11}-a_{21} = 1\\ a_{11} = \frac 32, a_{21} = \frac 12 and b_2 = 1+2x = a_{12} c_1 + a_{22} c_2\\ a_{12} + a_{22} = 1\\ a_{12} - a_{22} = 2\\ a_{12} = \frac 32, a_{22} = - \frac 12 ...

No, it is not true. Consider the game with payoff matrices A=\begin{pmatrix}0&0&1/5\\0&1&0\\1/5&0&0\\\end{pmatrix} \quad \text{ vs } \quad B=A^T=\begin{pmatrix}0&0&1/5\\0&1&0\\1/5&0&0\\\end{pmatrix} ...

If s is 000, then the function is a bijection. Otherwise, the function is two-to-one. This is the given condition in Simon's problem. The function you give does not satisfy this condition.

A quantum state is a quantum state is a quantum state. Regardless of what kind of state \lvert \psi \rangle is, the expectation value of any operator \mathcal{O} is \langle \psi \rvert \mathcal{O} \lvert \psi \rangle ...

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 ...