How to find the repeating decimal 0.82 with 82 repeated as a fraction?

Maggie Black

Maggie Black

Answered question

2023-02-21

How to find the repeating decimal 0.82 with 82 repeated as a fraction?

Answer & Explanation

Rhys Murphy

Rhys Murphy

Beginner2023-02-22Added 3 answers

Let me introduce you to some notation in case you've never seen it:
A bar over the repeating pattern of decimals can be used to represent a repeating decimal.
So instead of writing 0.828282 ... , you can write 0 . 82 ¯
If we multiply 0 . 82 ¯ by ( 100 - 1 ) we get an integer:

( 100 - 1 ) 0 . 82 ¯ = 100 0 . 82 ¯ - 1 0 . 82 ¯
( 100 - 1 ) 0 . 82 ¯ = 82 . 82 ¯ - 0 . 82 ¯
( 100 - 1 ) 0 . 82 ¯ = 82

Notice that the 100 shifts the number two places to the left - the length of the repeating pattern. Then the - 1 cancels out the repeating tail.
Next divide both ends by ( 100 - 1 ) and simplify:

0 . 82 ¯ = 82 100 - 1 = 82 99

82 and 99 have no common factor, so this is in simplest terms.

Alternative method
An alternative method recognises that:

0 . 82 ¯ = 0.82 + 0.0082 + 0.000082 + ...

is a geometric series, with initial term a = 0.82 and common ratio r = 1 100 .
This has sum given by the formula:

s = a 1 - r = 0.82 1 - 1 100 = 0.82 99 100 = 0.82 100 99 = 82 99

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