HINT: You can make the basic idea work by arranging matters a bit differently. Start with x_ny_n-x_my_m=(x_ny_n-x_ny_m)+(x_ny_m-x_my_m)\;, supply and manipulate absolute values appropriately, and ...

In practice, the apparatus measuring the spin should be localized somewhere in space (it cannot fill the whole universe!) and this fact implies that you always make a measurement of position (actually ...

You can try some post-processing after calculating of x: compute the null space of E, then solve \min \|x + v \| subject to Ev=0 and x+v\ge 0.

{\partial(x,y)\over\partial(z,w)}=\begin{bmatrix}w&z\\0&1\end{bmatrix} {f_Z(z)}=\int_{0}^\infty f_X(x)f_Y(y)\Big{|}{\partial(x,y)\over\partial(z,w)}\Big{|}dw=\lambda^2\int_{0}^\infty we^{-(z+1)\lambda w}dw={1\over(z+1)^2}

Now, use \sqrt{x(y+z)}-\sqrt{y(x+z)}=\frac{x(y+z)-y(x+z)}{\sqrt{x(y+z)}+\sqrt{y(x+z)}}=\frac{z(x-y)}{\sqrt{x(y+z)}+\sqrt{y(x+z)}}.

To give a motivation as to my answer, let me first write out the proof that Y\subseteq conv(x_1/t_1,\ldots,x_K/t_K). In this case, there exist x\in\mathbb R^n,t>0 and non-negative numbers \lambda_1,\ldots,\lambda_K ...