Non-Unit Fractions and Whole Numbers
Understanding Non-Unit Fractions and Whole Numbers
When you first learn about fractions, you usually start with unit fractionsโfractions that have a 1 on top, like 41โ or 31โ. But what happens when we have numbers larger than 1 on top? Let's explore how these fractions work and how they relate to whole numbers!
Building Fractions from Unit Fractions
A non-unit fraction is simply a fraction with a numerator (the top number) greater than 1. You can think of any fraction as being built out of smaller unit fractions.
For example, look at 43โ. The denominator (the bottom number) tells us the whole is cut into 4 equal pieces, so each piece is 41โ. The numerator (the top number) tells us we have 3 of those pieces.
Therefore, 43โ is just three copies of 41โ: 43โ=41โ+41โ+41โ
When Fractions Equal 1 Whole
What happens if you have all the pieces that make up a whole? If a pie is cut into 4 slices, and you have 4 slices, you have the whole pie!
Whenever the numerator and the denominator are the exact same number, the fraction equals exactly 1 whole. 44โ=1 33โ=1 88โ=1
Fractions Greater Than 1
Sometimes, the numerator is larger than the denominator. This means you have more pieces than it takes to make a single whole, so the overall fraction is greater than 1.
For example, consider 35โ. Since it takes 3 thirds to make a whole (33โ=1), having 5 thirds means you have one whole and 2 extra thirds left over.
Sometimes, these "top-heavy" fractions equal larger whole numbers. If you have 48โ, you can group the fourths to see how many wholes you have: 48โ=44โ+44โ=1+1=2
Example Problems
Example 1: Show that 43โ=41โ+41โ+41โ Think of counting items. Just like 3 apples is 1 apple + 1 apple + 1 apple, having 3 fourths is exactly 1 fourth + 1 fourth + 1 fourth.
Example 2: What whole number equals 48โ? Every 4 pieces of size 41โ makes 1 whole. Since we have 8 pieces total, we can make exactly two groups of 4. Therefore, 48โ=2.
Example 3: Place 35โ on the number line. To place 35โ on a number line, count by thirds. Start at 0, then jump to 31โ,32โ,33โ (which is exactly 1), 34โ, and finally land on 35โ. It will sit on the number line between the whole numbers 1 and 2.