Answer:
124/999
Explanation:
A recurring decimal fraction can be expressed as a rational number by using the recurring digits in the numerator and an equal number of 9s in the denominator:
This fraction cannot be reduced.
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Additional comment
If the recurring digits don't start at the decimal point, then you can determine the fraction by ...
- Multiply the number by 10^n, where n is the number of recurring digits
- Subtract the original number. This will cancel the recurring part of the number so the difference is a finite decimal.
- Divide by (10^n -1) and simplify the fraction.
In this case, you would get ...
