You're referring to a transformation from a pair of independent variates (X,Y) to the polar representation (R,\theta) (radius and angle), and then looking at the marginal distribution of \theta. ...

More generally, for any A\subseteq Y_1 and B\subseteq Y_2, we have f^{-1}[A\times B]=f_1^{-1}[A]\cap f_2^{-1}[B]\;. The reason is that in order for f(x) to be in A\times B, two things must ...

That is almost the definition of the product topology (i. e. the product is defined such that the above holds). Hints : (1) If f is continuous, note that the projections \pi_i \colon Y_1\times Y_2 \to Y_i ...

Since f(x,y) is continuous on D=[0,1]\times [0,1], so f(x,y) is uniformly continuous on D,so for a given \varepsilon>0,there exsits \delta>0, s.t. |f(x_{1},y_{1})-f(x_{2},y_{2})|<\frac{\varepsilon}{2} ...

It means the square made of points (x,y) such that -1 \le x \le 1 and -1 \le y \le 1

Let f:X\times Y-A\times B\rightarrow \{0,1\} be a continuous function. Consider x\in X-A, the restriction of f to x\times Y is constant since Y is connected. Suppose that this restriction is ...