![]() ![]() In our example: 2/3 – 1/3 = 1/3 Step 7: Write the decompositionĬombine the unit fractions found in the process to represent the original fraction. Step 6: Repeat steps 3-5Ĭontinue to subtract the largest unit fraction, simplify (if necessary), and repeat until the remaining fraction is a unit fraction. In our example, 4/6 can be simplified to 2/3. Simplify the remaining fraction if possible. In our example: 5/6 – 1/6 = 4/6 Step 5: Simplify the remaining fraction (if necessary) Subtract the largest unit fraction from the original fraction to find the remaining fraction. Step 4: Subtract the largest unit fraction In our example, the largest unit fraction is 1/6, as the denominator of the original fraction is 6. Step 3: Identify the largest unit fractionįind the largest unit fraction with the same denominator as the original fraction. In our example, 5/6 is already in its simplest form, so we can move on to the next step. ![]() If the fraction can be simplified, it’s helpful to do so before decomposing it. Step 2: Simplify the fraction (if necessary) Select the fraction you want to decompose. Here’s a step-by-step guide to decomposing fractions into unit fractions: Step 1: Choose the fraction to decompose Note: A fraction where the numerator is constantly \(1\) is known as a unit fraction.ĭecomposing fractions into unit fractions involves breaking down a given fraction into a sum of smaller fractions with a numerator of 1. The top fundamental method of decomposing fractions is to split them into unit fractions, which is whenever the numerator (the number on top) is \(1\). ![]() In order to decompose fractions, it merely involves taking them apart. + Ratio, Proportion & Percentages PuzzlesĪ Step-by-step guide to decomposing fractions into unit fractions. ![]()
0 Comments
Leave a Reply. |
AuthorWrite something about yourself. No need to be fancy, just an overview. ArchivesCategories |