This is made quite easy with the following observations:
5/9 = 0.5555...
7/9 = 0.7777...
12/99 = 0.121212...
23/99 = 0.232323...
456/999 = 0.456456456...
78/999 = 078/999 = 0.078078078...
So we can see that fractions with a denominator of 9, 99, 999, 9999, ... are pretty useful for making repeating decimals. All we have to do is to reduce the fraction to its lowest terms. For example, let's take the repeating decimal 0.027027027...
Clearly this is 27/999 = 1/37 (having divided top and bottom of the fraction by 27)
Now let's try something more tricky. Take a look at 0.4588888888...
This isn't simply something divided by 99.. since the 45 bit doesn't repeat. What we need to do is move the decimal point over to the start of the repeating bit. In this case we multiply by 100 to get 45.888888...
Now we know the fraction part is 8/9. In total we have 45 + 8/9 = 413/9 (changing into a top-heavy fraction will make things easier for us).
So 45.88888... = 413/9
Now just divide both sides by 100 to get:
0.458888... = 413/900
It is a repeating decimal.
decimal and repeating bar
0.2 a repeating decimal into a fraction = 2/9
repeating decimal 1.1 as a fraction = 10/9
Fractions don't repeat, decimals do. 4/9 = 4 divided by 9 = 0.4444 repeating
you don't it just keeps recurring
The fraction of the repeating decimal 0.7... is 7/9
It is a repeating decimal.
decimal and repeating bar
0.2 a repeating decimal into a fraction = 2/9
repeating decimal 1.1 as a fraction = 10/9
Fractions don't repeat, decimals do. 4/9 = 4 divided by 9 = 0.4444 repeating
If the decimal is terminating or repeating then it can be written as a fraction. Decimal representations which are non-terminating and non-repeating cannot be expressed as a fraction.
A decimal number is like a mixed fraction: it has an integer part and a fractional part. If the fractional part is a repeating fraction then the whole number is represented by a repeating decimal.
Any rational number is either a repeating decimal, or a terminating decimal.
It is a fraction in decimal form.
It is not possible to have a terminating decimal which repeats or a repeating decimal which terminates. The two types are mutually exclusive.