Let $x$ be a non-zero vector of $E$. Show that there exists a strictly positive integer $p$ such that the family $\left(x, f(x), f^2(x), \ldots, f^{p-1}(x)\right)$ is free and that there exists $\left(\alpha_0, \alpha_1, \ldots, \alpha_{p-1}\right) \in \mathbb{K}^p$ such that:
$$\alpha_0 x + \alpha_1 f(x) + \cdots + \alpha_{p-1} f^{p-1}(x) + f^p(x) = 0.$$