Relationship of the form $xy=k$ or $y=\frac{k}{x}$ where $x,y\ne 0$ for some nonzero constant $k$ is known as inverse variation i.e., $y$ varies inversely as $x$.

Since $y$ varies inversely as $x$ an inverse variation equation is given by $xy=k$ so, substitute 2 for $y$, 5 for $x$ into the equation $xy=k$, and solve for $k$.

$$\begin{gathered} xy=k \\ 2\times 5=k \\ 10=k \end{gathered}$$

The constant of variation is $k=10$. So, the equation that relates $x$ and $y$ is $xy=10$.

Create the table of values satisfying $y=\frac{10}{x}$. Choose values for $x$ and $y$ that have a product of 10.

Plot each point and draw a smooth curve that connects these points. 

The graph obtained is: