Work with linear, quadratic, polynomial, exponential, logarithmic, radical, and piecewise functions. | Functions | ACT Mathematics

Match a function family to its pattern of change and graph shape.

Core Idea

Each function family has a recognizable pattern. Linear functions change by equal differences, quadratics bend once, exponentials change by equal ratios, radicals begin at an endpoint, logarithms grow slowly after a restriction, and piecewise functions switch rules across intervals.

Understanding

Rule: On ACT, you do not need a long theory lecture for each function family. You need quick recognition. Ask what stays consistent: equal differences suggest linear behavior, equal multiplicative change suggests exponential behavior, and a defined starting point with a square-root shape suggests a radical function.

That recognition helps you choose the right model and avoid forcing the wrong form onto the situation. A quantity that grows by a fixed percent is not linear. A rule that changes at a cutoff point probably needs a piecewise definition. A curve with one turning point may be quadratic rather than exponential.

Step by Step

Look for the pattern in how outputs change as inputs increase.
Match the pattern to the function family before writing an equation.
Check whether the context describes additive change, multiplicative change, or a rule that switches by interval.
Use domain clues to help distinguish radical, logarithmic, and piecewise models.

Question

Worked Example

A bacteria culture starts with 200 cells and increases by 12% each hour. Which function could model the number of cells after $𝑡$ hours?

Select an answer to see the explanation