In Exercises 107-118, begin by graphing the cube root function, f(x) = ∛x. Then use transformations of this graph to graph the given function. ∛(-x+2)

The cube root function, denoted as f(x) = ∛x, is a fundamental mathematical function that returns the number which, when cubed, gives the input value x. This function is defined for all real numbers and has a characteristic S-shaped curve that passes through the origin (0,0). Understanding its basic shape and properties is essential for applying transformations.

Graph transformations involve altering the position or shape of a function's graph through operations such as translations, reflections, and dilations. For instance, the function g(x) = ∛(-x + 2) involves a horizontal reflection and a horizontal shift. Recognizing how these transformations affect the original graph of f(x) = ∛x is crucial for accurately graphing the new function.

Horizontal shifts occur when a function is modified by adding or subtracting a constant to the input variable. In the function g(x) = ∛(-x + 2), the term -x indicates a reflection across the y-axis, while the +2 indicates a shift to the right by 2 units. Understanding how these shifts impact the graph's position helps in visualizing and sketching the transformed function.