You have: 2^x +3*2^y+9*2^z =53 Now take 2^z common and you get: 2^z*(2^(x-z) + 3 * 2^(y-z) + 9) =53 But 53 is not divisible by 2, so on the L.H.S. z must be equal to 0. So, z=0. So, now equation becomes: ...

Your proof works. One remark: At the point where you talk about the balls B(\epsilon_x,x), you should always make clear if you are referring to the ball relative to X or to X\cup Y. One could ...

You have found that f_{X,Y}(x,y)=3\cdot\mathbf 1_{0<x<1, 0<y<x^2} . \checkmark From there use the Jacobian Transformation Theorem. \begin{align}f_{X,Z}(x,z) &= \begin{Vmatrix}\dfrac{\partial[x,z/x]}{\partial[x,z]}\end{Vmatrix}~f_{X,Y}(x,z/x)\\[1ex] &= \dfrac 1{\lvert x\rvert}\cdot 3\cdot\mathbf 1_{0< x< 1~,~ 0< z/x< x^2}\\[1ex] &= \dfrac 3{x}\cdot\mathbf 1_{0< z< 1~,~ \sqrt[3]z< x< 1}\end{align} ...

Step 1: integrate wrt y. I=\int_1^2\int_1^2\frac{x}{x^2+y^2}\,dy\,dx=\int_1^2\left[\arctan\left(\frac yx\right)\right]_1^2\,dx=\int_1^2\arctan\left(\frac2x\right)-\arctan\left(\frac1x \right)\,dx ...

Updated 20140607: After another day of inspecting the problem and "fiddling with inequalities", I recommend the following scheme: \hat{B}(x,y;a,b) = \begin{cases} B(y;a,b) - B(x;a,b) &, 0 \leq x < y \leq \frac{a-1}{a+b-2} \\ B(1-x;b,a) - B(1-y;b,a) &, \frac{a-1}{a+b-2} \leq x < y \leq 1 \\ B(a,b) - B(x;a,b) - B(1-y;b,a) &, \text{otherwise} \end{cases} ...

The operation \times has to be bilinear. Recall the universal property of the tensor product of two spaces V and W. The vector space V \otimes W equipped with a bilinear map \otimes : V \times V \to V \otimes W ...