From the graph of the function, determine the domain and the range.
O Domain: (-2, 0) (0,00) Range: (-0, 0]
O Domain: (-2, 0) (0, -00) Range: (-00, 0) (0, -2]
Domain: (-2, 0) (0, 0) Range: (-00, -2) (-2, 0]
Domain: (-2, 0) (0, 0) Range: (-60, 0) (0, -2]

Domain is the set of x-values that can be plugged in to get an output in a graph. In this case, no number lower than -2 can be used, so your domain has to be x ≥ -2. We also have a hole at our y-intercept that can't be used, so we have to include that in our answer as well using a union.

Range is the set of y-values that can be outputted by x in the graph. Since x ≥ -2, we know the output of -2 is 0, so no value goes above 0 as the graph is infinitely decreasing. We also have to address the hole issue in the range just like in the domain.

From the graph of the function, determine the domain and the range. O Domain: (-2, 0) (0,00) Range: (-0, 0] O Domain: (-2, 0) (0, -00) Range: (-00, 0) (0, -2] Domain: (-2, 0) (0, 0) Range: (-00, -2) (-2, 0] Domain: (-2, 0) (0, 0) Range: (-60, 0) (0, -2]

Answer :

Other Questions

From the graph of the function, determine the domain and the range.
O Domain: (-2, 0) (0,00) Range: (-0, 0]
O Domain: (-2, 0) (0, -00) Range: (-00, 0) (0, -2]
Domain: (-2, 0) (0, 0) Range: (-00, -2) (-2, 0]
Domain: (-2, 0) (0, 0) Range: (-60, 0) (0, -2]