In Exercises 17-32, use the graph of y = f(x) to graph each function g. g(x) = f(x+1)

Function transformation refers to the changes made to the graph of a function based on modifications to its equation. In this case, g(x) = f(x + 1) represents a horizontal shift of the function f(x) to the left by 1 unit. Understanding how transformations affect the graph is crucial for accurately sketching the new function.

Horizontal shifts occur when the input variable of a function is altered, resulting in a movement of the graph along the x-axis. For g(x) = f(x + 1), the '+1' indicates that every point on the graph of f(x) will move left by 1 unit. This concept is essential for predicting how the graph of g will relate to the original function f.

Graph interpretation involves analyzing the visual representation of a function to understand its behavior and characteristics. When graphing g(x) based on f(x), one must accurately reflect the transformation and maintain the shape of the original graph. This skill is vital for effectively communicating mathematical ideas through visual means.