7.RP.A.1
7th Grade
Ratios & Proportional Relationships
Unit Rates
Compute unit rates associated with ratios of fractions, including ratios of lengths, areas, and other quantities measured in like or different units.
How to explain it
The anchor students hold onto: Divide the first quantity by the second so the second becomes 1, then label the unit. To divide by a fraction, multiply by its reciprocal. To compare, find each unit rate.
A unit rate is the slope of a proportional relationship: the amount per one unit is exactly the constant of proportionality k in y = kx, which leads directly into 7.RP.A.2.
Worked examples
Example 1
Whole-Number Rate
180 miles in 4 hours: mph?
Step 1Set up the rate: 180 miles over 4 hours.
Step 2Divide: 180 ÷ 4 = 45.
Answer45 miles per hour
Example 2
Fraction Ratio
1/2 mile in 1/4 hour: mph?
Step 1Divide the fractions: 1/2 ÷ 1/4.
Step 2Multiply by the reciprocal: 1/2 × 4 = 2.
Answer2 miles per hour
Example 3
Compare Rates
60 mi/3 hr vs 80 mi/5 hr?
Step 1First rate: 60 ÷ 3 = 20.
Step 2Second rate: 80 ÷ 5 = 16.
AnswerFirst is faster (20 > 16)
Common mistakes
What students write
Divides the second quantity by the first, inverting the rate.
The fix
Divide first ÷ second: 180 miles ÷ 4 hours = 45 mph, not 4 ÷ 180.
What students write
Stops at the ratio without simplifying to a per-ONE rate.
The fix
Divide all the way: 180:4 becomes 45:1, so the unit rate is 45.
Teacher tip
Head off the two predictable errors before they happen. First: Divide first ÷ second: 180 miles ÷ 4 hours = 45 mph, not 4 ÷ 180. Second: Divide all the way: 180:4 becomes 45:1, so the unit rate is 45.