3 repeating as a fraction is a very simple concept that can be easily learned with a little bit of practice. This repeating decimal to fraction conversion can be extremely useful, and is often required for many different types of math problems.
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What is 3 repeating as a fraction?
If you see 3 repeating as a fraction, it means that there is a number before the 3 that is being divided by a number after the 3, and the 3 is the repeating decimal part of the answer.
For example, if you divide 7 by 3, the answer is 2 with a repeating decimal part of 3. So, 3 repeating as a fraction would be 2/3 with a repeating decimal part of 3.
What are the steps to convert 3 repeating to a fraction?
in order to convert 3 repeating to a fraction, you need to follow these steps:
1) take the number three and divide it by ten, which will give you the decimal .30
2) take that number and divide it by three, which will give you the fraction 10/3
3) To convert a decimal to a fraction, divide the decimal by 1. (For example, if someone plugs in the decimal .35 they should get 35/100).
How do you simplify 3 repeating as a fraction?
To simplify a fraction that has repeating decimals, you can use the long division method. In the fraction 3/10, the number 3 is called the numerator and 10 is called the denominator. The numerator is divided by the denominator to get 0.3, which is a decimal. To convert 0.3 to a fraction, we need to count how many digits are after the decimal point. In this case, there is one digit after the decimal point, so we multiply both sides of the equation by 10:
3/10 = 0.3
10 * 3/10 = 10 * 0.3
30/10 = 3
