If $x = 0$ or $y = 0$, then the claim clearly holds with equality, so assume that $x \neq 0 \neq y$. Then $2 \sqrt{x y} > 0$, so that \begin{equation} x + y < x + 2 \sqrt{x y} + y \end{equation} Applying result R4261: Real binomial theorem for exponent two to the expression $x + 2 \sqrt{x y} + y$ with $a : = \sqrt{x}$ and $b : = \sqrt{y}$, we have \begin{equation} x + 2 \sqrt{x y} + y = (\sqrt{x} + \sqrt{y})^2 \end{equation} Thus, applying R4260: Real square root function is strictly isotone, we conclude \begin{equation} \sqrt{x + y} < \sqrt{x + 2 \sqrt{x y} + y} = \sqrt{(\sqrt{x} + \sqrt{y})^2} = (\sqrt{x} + \sqrt{y})^{\frac{1}{2} \cdot 2} = \sqrt{x} + \sqrt{y} \end{equation} $\square$