In Exercises 95-106, begin by graphing the standard cubic function, f(x) = x³. Then use transformations of this graph to graph the given function. h(x) = -x³

A cubic function is a polynomial function of degree three, typically expressed in the form f(x) = ax³ + bx² + cx + d. The standard cubic function, f(x) = x³, has a characteristic S-shaped curve that passes through the origin and extends infinitely in both directions. Understanding the basic shape and properties of cubic functions is essential for analyzing transformations.

Graph transformations involve altering the position or shape of a graph through various operations, such as translations, reflections, stretches, and compressions. For instance, the function h(x) = -x³ represents a reflection of the standard cubic function across the x-axis. Recognizing how these transformations affect the graph is crucial for accurately sketching the new function.

Reflection across the x-axis occurs when every point (x, y) on a graph is transformed to (x, -y). This means that the y-values of the function are inverted while the x-values remain unchanged. In the context of the function h(x) = -x³, this reflection results in a graph that is a mirror image of the standard cubic function, which is vital for understanding the relationship between the two functions.