Ordering Rational Numbers
Ordering and Operating with Rational Numbers
Rational numbers include integers, fractions, and decimalsโboth positive and negative. Understanding how to place these numbers on a number line makes comparing and ordering them much easier.
The Number Line and Opposites
On a horizontal number line, zero is the center. Positive numbers are to the right of zero, and negative numbers are to the left.
Every rational number has an opposite. Opposites are numbers that are the exact same distance from zero but on opposite sides. For any number a, its opposite is โa.
- The opposite of 5 is โ5.
- The opposite of โ32โ is 32โ.
Comparing and Ordering Rational Numbers
When comparing negative numbers, remember that the number further to the left on the number line is always smaller. For example, โ5 is less than โ2 because it is further left.
To order a mix of fractions and decimals, it is usually easiest to convert them all to the same format (like decimals) first.
Example: Order โ2.5, โ43โ, 0.5, and โ1.2 from least to greatest.
- Convert to decimals: โ43โ=โ0.75. Now we are comparing โ2.5, โ0.75, 0.5, and โ1.2.
- Visualize on the number line:
- โ2.5 is the furthest to the left (the smallest).
- โ1.2 comes next.
- โ0.75 is closer to zero.
- 0.5 is positive, so it is the largest.
- Write in order: โ2.5, โ1.2, โ43โ, 0.5.
Plotting Rational Numbers
When plotting fractions like โ23โ and 45โ, converting them to mixed numbers or decimals helps you find their exact location between integers.
- Plotting โ23โ: Since โ23โ=โ1.5, you will place this point exactly halfway between โ1 and โ2 on the number line.
- Plotting 45โ: Since 45โ=1.25, you will place this point slightly to the right of 1, exactly one-quarter of the way toward 2.