\subsection{Introduction}
\shortex $f'(x) = f(x)$ has only solution $f(x) = ae^x$ for any $a \in \R$;
$f' - a = 0$ has only solution $f(x) = \int_{x_0}^{x} a(t) \dx t$

\setcounter{all}{6}
\shorttheorem Let $F: \R^2 \rightarrow \R$ be a differential function of two variables. Let $x_0 \in \R$ and $y_0 \in \R^2$.
The Ordinary Differential Equation (ODE) $y' = F(x, y)$ has a unique solution $f$ defined on a ``largest'' interval $I$ that contains $x_0$ such that $y_0 = f(x_0)$