How do you convert 0.16 (6 repeating) to a fraction?

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How do you convert 0.16 (6 repeating) to a fraction?

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Answer 1 · 2016-03-26T03:34:27

$1/6$

Explanation:

y = 0.16666.
Multiply by 10: 10y = 1.66666.. = 1 + 0.6666...= $1 + 2/3=5/3$ .
Divide by 10: $y=5/3xx1/10= 5/30=1/6$ .

Answer 2 · 2016-05-02T09:34:41

$0.1bar(6) = 1/6$

Explanation:

First multiply by $10(10-1) = (100-10)$ to get an integer.

The first multiplier of $10$ is to shift the decimal representation one place to the left, so the repeating section begins just after the decimal point. Then the $(10-1)$ multiplier is used to shift the digits one more place to the left (the length of the repeating pattern) and subtract the original to cancel the repeating tail.

$(100-10) * 0.1bar(6) = 16.bar(6) - 1.bar(6) = 15$

Then divide both ends by $(100-10)$ and simplify:

$0.1bar(6) = 15/(100-10) = 15/90 = (1*color(red)(cancel(color(black)(15))))/(6*color(red)(cancel(color(black)(15)))) = 1/6$

Answer 3 · 2016-05-02T10:06:09

A $underline("very slightly")$ different way of writing the solution

$0.16bar6" "->" " 1/6$

Explanation:

Note: if the 6 is repeating then a way of showing this is to put a bar over the last 6 you write: $->" "0.16bar6$
'~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
Let $x=0.16bar6$

Then $10x=1.6bar6$
Also $100x=16.6bar6$

$100x-10x->" "16.6bar6$
$color(white)(ggggggg2222222)underline(color(white)(.m)1.6bar6)" Subtract"$
$color(white)(222vvvvvvvvv22)underline(" "15.00" ")" "$

So $90x =15$

Divide both sides by 90
$" "x=15/90$

But $15/90->(15-:15)/(90-:15) = 1/6$

$=>x=0.16bar6" "->" " 1/6$

Answer 4 · 2017-06-09T13:14:06

Short cut methods for finding the fraction:

Explanation:

The details of how to convert a recurring decimal into a fraction are shown in the other answers.

However, sometimes you just want a quick method.
Here is the short cut.

If all the digits after the decimal point recur:

Write down the digits (without repeating) as the numerator.

Write a $color(magenta)(9)$ for each digit in the denominator. Simplify if possible.

$0.77777.. = 0.barcolor(magenta)(7) = color(magenta)(7/9)" "(larr"one digit recurs")/(larr"one 9")$

$0.613613613... = 0.bar(color(magenta)(613)) = color(magenta)(613/999)" "(larr"three digits recur")/(larr"three 9s")$

$6.412941294129.... = 6.bar(4129) = 6 4129/9999$

If only some digits recur

Numerator: write down all the digits - non-recurring digits
Denominator: a $9$ for each recurring and a $0$ for each non-recurring digit

In $0color(red)(.524)color(blue)(666...)$ , only the $color(blue)(6)$ recurs while the $color(red)(524)$ do not.

$0color(red)(.524)color(blue)(666...) = 0color(red)(.524)color(blue)(bar6) = (5246-color(red)(524))/(color(blue)(9)color(red)(000)) = 4722/(color(blue)(9)color(red)(000))$

$0.1353535... = 0.1bar(35) = (135-1)/990 = 134/990$

$4.23861861861.. = 4.23bar(861) = 4 (23861-23)/99900 =23838/99900$

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How do you convert 0.16 (6 repeating) to a fraction?

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