In Exercises 55–59, use the graph of to graph each function g.
g(x) = -f(2x)

Function transformation refers to the process of altering the graph of a function through various operations, such as shifting, reflecting, stretching, or compressing. In this case, the function g(x) = -f(2x) involves a reflection across the x-axis and a horizontal compression by a factor of 2. Understanding these transformations is crucial for accurately graphing the new function based on the original function f.

Reflecting a function across the x-axis involves changing the sign of the output values. For the function g(x) = -f(2x), this means that for every point (x, f(x)) on the graph of f, the corresponding point on g will be (x, -f(x)). This transformation results in the graph of g being a mirror image of f with respect to the x-axis, which is essential for visualizing the new function.

Horizontal compression occurs when the input values of a function are scaled by a factor greater than 1, effectively 'squeezing' the graph towards the y-axis. In the function g(x) = -f(2x), the factor of 2 compresses the graph of f horizontally by half. This means that points on the graph of f will be reached more quickly in g, altering the overall shape and behavior of the graph.