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For example, the rational number can be written in decimal notation as and similarly, the decimal number 0,25 can be written as a rational number as .
A decimal number has an integer part and a fractional part. For example has an integer part of 10 and a fractional part of because . The fractional part can be written as a rational number, i.e. with a numerator and a denominator that are integers.
Each digit after the decimal point is a fraction with a denominator in increasing powers of ten. For example:
This means that:
When the decimal is a repeating decimal, a bit more work is needed to write the fractional part of the decimal number as a fraction. We will explain by means of an example.
If we wish to write in the form (where and are integers) then we would proceed as follows
And another example would be to write as a rational fraction.
For the first example, the decimal was multiplied by 10 and for the second example, the decimal was multiplied by 1000. This is because for the first example there was only one digit (i.e. 3) recurring, while for the second example there were three digits (i.e. 432) recurring.
In general, if you have one digit recurring, then multiply by 10. If you have two digits recurring, then multiply by 100. If you have three digits recurring, then multiply by 1000. Can you spot the pattern yet?
The number of zeros is the same as the number of recurring digits.
Not all decimal numbers can be written as rational numbers. Why? Irrational decimal numbers like cannot be written with an integer numerator and denominator, because they do not have a pattern of recurring digits. However, when possible, you should try to use rational numbers or fractions instead of decimals.
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