Lesson 1: Representing Proportional Relationships with Tables

Property

Two variables are said to be proportional if their ratio is constant, or always the same. This means one variable is a constant multiple of the other. To check if two variables are proportional, you can identify several pairs of corresponding values for the variables, and then compute their ratios to see if they are equal.

Examples

• A baker uses 3 cups of sugar for every 2 dozen muffins. The amount of sugar is proportional to the number of dozens of muffins because the ratio $\frac{3}{2}$ is constant.
• A taxi fare includes a 3 dollars flat fee plus 2 dollars per mile. The total cost is not proportional to the miles driven because the ratio of cost to miles changes. For 2 miles, the ratio is $\frac{2 \times 2 + 3}{2} = 3.5$, but for 5 miles it is $\frac{2 \times 5 + 3}{5} = 2.6$.
• The perimeter of a regular octagon is given by the formula $P = 8s$, where $s$ is the side length. The perimeter is proportional to the side length because the ratio $\frac{P}{s} = 8$ is always constant.

Explanation

Think of it like this: if two variables are proportional, they are partners that always move together at a steady pace. If you double one variable, the other one doubles too. Their relationship is perfectly predictable and consistent.

Property

Two quantities are in a proportional relationship if the ratio between them is constant. This can be verified using a table by testing for equivalent ratios.
For any pair of corresponding quantities $(x, y)$, the ratio $\frac{y}{x}$ must be the same for all non-zero pairs in the table.

Examples