Your question as stated is somewhat misleading, because in summing things up you forgot to mention an important related question elsewhere in the examination text. Also, your integral on [0,1] ...

Hint. (a)R_k is transitive for k=1 , so we only need to check for k=2 . If x+y is even, either both x,y are even or they are both odd. If y is even, so is z because y+z is ...

You should start with: \left|X\right|\leq\left|Y\right|+\left|X-Y\right|\leq\left|Y\right|+M almost surely, and consequently \mathbb{E}\left|X\right|\leq\mathbb{E}\left|Y\right|+M<\infty. In your ...

There is nothing wrong with your calculations, but they are special: For X (and therefore X') to be invertible, it must be a square matrix (and full rank of course). If it is a square matrix then ...

\frac{d}{dt} \exp(-2t)m(t)=-2\exp(-2t)m(t)+\exp(-2t)m'(t) Evaluate at t=0, notice m(0)=1 and m'(0)=E[Y], hence E[X]=-2+E[Y]

Generally, \mathsf {Cov}(X,Y)= \mathsf E(XY)-\mathsf E(X)\mathsf E(Y) However here, \mathsf E(X) =0, so that reduces to \mathsf {Cov}(X,Y)=\mathsf E(XY). \mathsf {E}(X)=\int_{-1}^1 \frac{x}2\mathrm d x=0 ...