Learn on PengiEureka Math, Grade 4Chapter 23: Fraction Comparison

Lesson 1: Reason using benchmarks to compare two fractions on the number line.

Property.

Section 1

Placing Fractions on a Number Line Using Benchmarks

Property

To estimate a fraction's position on a number line, first compare it to the benchmark 12\frac{1}{2}.
If the numerator is less than half the denominator, the fraction is less than 12\frac{1}{2} and belongs between 0 and 12\frac{1}{2}.
If the numerator is more than half the denominator, the fraction is greater than 12\frac{1}{2} and belongs between 12\frac{1}{2} and 1.

Examples

Section 2

Compare Fractions by Proximity to a Benchmark

Property

When comparing two fractions on the same side of a benchmark, determine their distance from that benchmark.
The fraction with the smaller distance is closer.
A larger denominator creates a smaller unit fraction, which represents a smaller distance (e.g., a distance of 112\frac{1}{12} is smaller than a distance of 18\frac{1}{8}).

Examples

Lesson overview

Expand to review the lesson summary and core properties.

Expand

Section 1

Placing Fractions on a Number Line Using Benchmarks

Property

To estimate a fraction's position on a number line, first compare it to the benchmark 12\frac{1}{2}.
If the numerator is less than half the denominator, the fraction is less than 12\frac{1}{2} and belongs between 0 and 12\frac{1}{2}.
If the numerator is more than half the denominator, the fraction is greater than 12\frac{1}{2} and belongs between 12\frac{1}{2} and 1.

Examples

Section 2

Compare Fractions by Proximity to a Benchmark

Property

When comparing two fractions on the same side of a benchmark, determine their distance from that benchmark.
The fraction with the smaller distance is closer.
A larger denominator creates a smaller unit fraction, which represents a smaller distance (e.g., a distance of 112\frac{1}{12} is smaller than a distance of 18\frac{1}{8}).

Examples