Let $\mathrm{(}{X}_i\mathrm{,}{\varrho }_i\mathrm{)}$ be a metric space for each $i\mathrm{=}\mathrm{1}\mathrm{,}\mathrm{2}\mathrm{,}\mathrm{\dots }\mathrm{,}$ where the diameter of $X_i$ using ${\varrho }_i$ is less than $\mathrm{1}\mathrm{/}i$. Then the product topology for the space ${\mathrm{\prod }}_{i\mathrm{=}\mathrm{1}}^{\mathrm{\infty }}{X}_i$ is given by the metric

$$\varrho (x,y)=\sum _{i=1}^{\mathrm{\infty }}\frac{1}{2^i}{\varrho }_i(x_i,y_i).$$

Hence, a countable product of metrizable topological spaces is again metrizable.