Step 5: Reduce the fraction generated in Step 4. Step 4: Sum the two fractions generated in Step 2 and 3 respectively (as per the rules for adding fractions, make sure you give them a common denominator). Next, divide this fraction by the power of 10 applied in Step 2. For instance, as 0708 consists of four numbers, it is represented as 0708/9999. Step 3: Record the repetend over as many nines as there are numbers in that repetend (again, including any zeros). For instance, as 321 consists of three numbers, we represent the fraction as 321/1000. Step 2: Record the non-repeating part of the decimal over a power of 10 that incorporates as many zeros as there are numbers in the non-repeating part of the decimal (including any zeros). As such, you should separate 321 from 0708. The bar is positioned above the non-repeating part of the decimal. For instance, let's say you wanted to convert the following to a fraction: Step 1: Separate the non-repeating part of the decimal from the repeating part. However, if you want to make life a little easier, use our decimal to fraction conversion calculator instead. You can revert a decimal to its original fraction by following the steps described below. However, it is common to encounter a repeating decimal in practical math when you convert fractions to percentages or decimals, and this reduces the accuracy of the calculation. You may wish to convert a fraction to a decimal to make adding and subtracting quantities more straightforward. The bar depicted above is presented above the repeating element of the numerical string. When a fraction is represented as a decimal, it can take the form of a terminating decimal for example: How to Convert Repeating Decimals to Fractions
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