The condition gives xyz=2+x+y+z or xyz=2+\frac{(x+y+z)(xy+xz+yz)}{12} or 12xyz=24+\sum_{cyc}(x^2y+x^2z+xyz) or 3xyz=24+\sum_{cyc}(x^2y+x^2z-2xyz), which gives 3xyz-24=\sum_{cyc}(x^2y+x^2z-2xyz)=\sum_{cyc}z(x-y)^2\geq0. ...

Yes, your code generates the correct results, but as you can see from the calculations below, it's hard to understand. I suggest sticking with the linked lecture notes and use runif(1,0,1) , which ...

By hypothesis the map \varphi:[0,1]\to\mathcal{H}:a\mapsto f_a is a bijection, so every g\in\mathcal{H} is \varphi(a)=f_a for some a\in[0,1]. In particular, the map g defined in the question ...

Consider the problem to be \left\{ \begin{array}{c} f_1=x+2y-3 \\ f_2=3x+2y-5 \\ f_3=x+y-2.09 \\ \end{array} \right. and define \Phi=f_1^2+f_2^2+f_3^2 and say that you want this norm to be ...

This is to establish the following for Borel set B\subseteq [0,1], \begin{align} \mathsf P(Y\in B) & = \iint_{Y^{-1}(B)} f_{X,Y}(x,y) \mathrm dx\mathrm dy \\ & = \iint_{[0;1]\times B} f_{X,Y}(x,y) \mathrm dx\mathrm dy \\ & = \int_B \int_0^1 (x+y) \mathrm dx\mathrm dy \\ & =\int_B (y + \frac 1 2 ) \mathrm dy. \end{align} ...

A function is surjective if each point of its range has a preimage. In our case the range is \mathbb{R}. So take 4\in\mathbb{R} it has no pre image. As far as continuity is concerned take the ...