Final answer:
Without the specific function or the given function value, we cannot find exact values of x in the interval [0,360). The general approach would be to set the function equal to the value given and solve within the specified range. For a horizontal line function, all x values in the function's domain would have the same y-value.
Step-by-step explanation:
To find all values of x in the interval [0,360) that satisfy a given function value, we must understand the nature of the function. Without the specific function value or the function itself, we cannot provide an exact answer.
However, the process generally requires solving an equation or set of equations, where the value provided is set equal to the function, and the solutions for x are found within the specified range.
For example, if the function is a simple linear or trigonometric function, we would set the function equal to the given value and solve for x, making sure our solutions fall within the interval [0,360).
For a horizontal line, which is described in the context, if f(x) equals a constant value, the x-values extend along the entire line within the given interval as its domain. However, since this description is partial, we are missing the actual function value to solve for x.
For the case mentioned where f(x) is a horizontal line in a certain interval, if we are given a specific y-value that f(x) equals, then all x values in the interval would be valid solutions since a horizontal line has the same y-value for all x.