1. The problem asks to write the domain of the given graph as an inequality. 2. The domain of a function is the set of all possible input values (x-values) for which the function is defined. 3. From the graph description, the curve starts at approximately $x=1$ with an open circle and continues to the right, increasing in $x$ values. 4. An open circle at $x=1$ means the function is not defined at $x=1$, so $x=1$ is not included in the domain. 5. The arrow pointing to the right near $x=6$ indicates the function continues indefinitely for $x > 1$. 6. Therefore, the domain is all $x$ such that $x > 1$. 7. Writing this as an inequality: $$x > 1$$ This means the function is defined for all $x$ values greater than 1, but not including 1 itself.