We have F(1)=\begin{pmatrix}{1}\\{1}\end{pmatrix}=1\begin{pmatrix}{1}\\{0}\end{pmatrix}+1\begin{pmatrix}{0}\\{1}\end{pmatrix} F(t)=\begin{pmatrix}{0}\\{1}\end{pmatrix}=0\begin{pmatrix}{1}\\{0}\end{pmatrix}+1\begin{pmatrix}{0}\\{1}\end{pmatrix} ...

Presumably, we have |t|<1. Else, the intersection is either empty, or a single point (namely 0,\ldots,0,t)). Once that is true, we are left with the inequality x_1^2+\cdots+x_{n-1}^2\leq1-t^2 ...

Your A has eigenvalues -2,-1,1, so it is diagonalizable with eigenvectors x_1,x_2,x_3, each of which is a 3 \times 1 column vector. Note also that A^T has eigenvectors y_1,y_2,y_3. Show ...

The Galois group of x^3 - px + q is cyclic if and only if the discriminant D = 4p^3 - 27q^2 = x^2 is a square. This is equivalent to p^3 = \frac{x^2 + 27q^2}4 = \alpha \alpha', \quad \text{where} \quad \alpha = \frac{x + 3q\sqrt{-3}}2. ...

The proof consists of two steps. Let M be the convex set (equipped with the weak *-topology) of Borel probability measures on X. The transformation acts on M and the main thing is to show that ...

You don't need a production scheme for all pythagorean triples to solves this problem. From a^2=c^2-b^2=(c+b)(c-b) it follows that any prime factor of c+b>1 must occur in a.