Box 1 : A relative maximum or a relative minimum or a non-extreme horizontal tangent or no horizontal tangent lineBox 2: an inflection point or no inflection pointBox3: positive or negative or zero (positive to negative) or zero (negative to positive) or zero (no sign change)Box4: A relative maximum or a relative minimum or no relative extremeBox 5: positive or negative or zero (positive to negative) or zero (negative to positive)

The twice-differentiable function f is shown below on the domain (-9, 9). The graph of f has points of inflection at x = -3, x = 3, x = 6, x = 10, indicated by small green circles. What inferences can be made about the graphs of f, f', and f" when x = -3? Graph of f -10 -9 /8 -7 -6 -5 -4- Based on the graph above, when a = -3, the graph of f has and We can also infer that f' when a = -3 is ( and has Furthermore, we can state that f" is 5 when x = -3