Final Answer:
C. x < 0 interpret the graph accurately to deduce the domain correctly, ensuring precision in defining the valid inputs f
Explanation:
The graphed function indicates all the x-values are less than zero. This means that the function is defined only for x-values that are negative, implying that the domain of the function is x < 0.
The graph visually demonstrates that the function exists solely in the region where x-values are less than zero on the x-axis. There are no restrictions on the upper limit of the x-values, so long as they remain negative. Therefore, the domain of the graphed function is all real numbers less than zero, denoted as x < 0.
Understanding the domain of a function is crucial as it determines the set of valid input values for the function. In this case, the graph's behavior confirms that the function exists only for negative values of x, and any value greater than or equal to zero is not within its domain.
It's important to interpret the graph accurately to deduce the domain correctly, ensuring precision in defining the valid inputs for the function.