$(\Rightarrow):$ $\mathcal{B}_1, \ \tau_1$ için baz; $\mathcal{B}_2, \ \tau_2$ için baz; $\tau_1\subseteq\tau_2$; $B_1\in\mathcal{B}_1$ ve $x\in B_1$ olsun.
$\left.\begin{array}{r} x\in B_1\in\mathcal{B}_1 \\ \\ \mathcal{B}_1, \tau_1 \text{ için baz} \Rightarrow \mathcal{B}_1\subseteq \tau_1 \end{array}\right\}\Rightarrow \begin{array}{c}\mbox{} \\ \mbox{} \\ \left.\begin{array}{r} x\in B_1\in\tau_1 \\ \mbox{} \\ \tau_1\subseteq \tau_2\end{array}\right\}\Rightarrow \!\!\!\!\!\end{array}$
$\left.\begin{array}{rr} \Rightarrow x\in B_1\in\tau_2\\ \\ \mathcal{B}_2, \tau_2 \text{ için baz}\end{array}\right\}\Rightarrow (\exists B_2\in \mathcal{B}_2)(x\in B_2\subseteq B_1).$
$(\Leftarrow):$ $\mathcal{B}_1, \ \tau_1$ için baz; $\mathcal{B}_2, \ \tau_2$ için baz ve $x\in A\in\tau_1$ olsun.
$\left.\begin{array}{r} x\in A\in\tau_1 \\ \\ \mathcal{B}_1, \tau_1 \text{ için baz} \end{array}\right\}\Rightarrow \begin{array}{c}\mbox{} \\ \mbox{} \\ \left.\begin{array}{r} (\exists B_1\in\mathcal{B}_1)(x\in B_1\subseteq A) \\ \mbox{} \\ \text{Hipotez}\end{array}\right\}\Rightarrow \!\!\!\!\!\end{array}$
$\left.\begin{array}{rr} \Rightarrow (\exists B_2\in\mathcal{B}_2)(x\in B_2\subseteq B_1\subseteq A) \\ \\ \mathcal{A}:=\{B_2|(\forall x\in A)(\exists B_2\in\mathcal{B}_2)(x\in B_2\subseteq A)\}\\ \\ \mathcal{B}_2, \tau_2 \text{ için baz}\Rightarrow \mathcal{B}_2\subseteq\tau_2\end{array}\right\}\Rightarrow $
$\Rightarrow (\mathcal{A}\subseteq \tau_2)(A=\cup\mathcal{A})$
$\Rightarrow A\in\tau_2.$