The expected number of 2s each time you throw the die is 1/6. Therefore the expected number in two tosses is 1/3, i.e. \operatorname E(Y) = 1/3. The expected outcome when a die is thrown is (1+2+3+4+5+6)/6 = 7/2 = 3.5; ...

The way I remember this is that after an \exists there's always a "such that" giving the property that the existing thing satisfies. So for your first question, since each "such that" comes right ...

Every permutation of X that leaves Y invariant as a set is really composed of two distinct, independent and non-overlapping permutations: one is a permutation of Y, and the other is a ...

If X is countably infinite, let \varphi:X\to\mathbb{Z} be any bijection. Then \sigma:X\to X:x\mapsto \varphi^{-1}(\varphi(x)+1) does the trick. More generally, let X be any infinite set. ...

Let's denote two most general linearly independent solutions of Mathieu equation with characteristic a as \operatorname{C}(a,q,x) and \operatorname{S}(a,q,x). Now if we want the solution to be 2\pi n ...

If B acts on X regularly then given any x\in X there is a bijection B\to X given by b\mapsto bx, which can be used to define an isomorphism \mathrm{Sym}(X)\to\mathrm{Sym}(B). The image of ...