How do you convert 0.789 (789 repeating) to a fraction?

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How do you convert 0.789 (789 repeating) to a fraction?

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Answer 1 · 2016-06-24T15:46:38

$0.789 ¯ ¯¯¯¯ ¯ 789 = \frac{789}{999}$ $0.789bar789 = 789/999$

Explanation:

This is written as $0.789 ¯ ¯¯¯¯ ¯ 789$ $0.789bar789$

Let $x = 0.789 ¯ ¯¯¯¯ ¯ 789$ $x=0.789bar789$ ...............................Equation (1)

Then $1000 x = 789.789 ¯ ¯¯¯¯ ¯ 789$ $1000x = 789.789bar789$ ............Equation (2)

'~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~

So $1000 x - x = 789$ $1000x-x=789$

$\Rightarrow 999 x = 789$ $=>999x=789$

Thus $x = \frac{789}{999}$ $x= 789/999$

Answer 2 · 2016-06-24T15:50:44

Do some algebra and reasoning to find $. ¯ ¯¯¯¯ ¯ 789 = \frac{263}{333}$ $.bar(789)=263/333$ .

Explanation:

The process for converting repeating decimals to fractions is confusing at first, but with practice it's pretty easy.

You begin by setting $x$ $x$ equal to $.789789...$ :
$x=.bar(789)$

Then, multiply the equation by $1000$ :
$1000x=789.bar(789)$

We do this so we can move one chunk of the repeating part to the left of the decimal point. This sets us up for the next, most important step: subtracting $x$ from both sides.
$1000x-x=789.bar(789)-x$

On the left side of the equation, this is simply $999x$ . On the right side, change $x$ back to $.bar(789)$ :
$789.bar(789)-.bar(789)$

And take a good look at this subtraction problem:
$789.bar(789)$
$ul(-color(white)(L).bar(789))$
$?$

The $.bar(789)$ cancels!
$789cancel(.bar(789))$
$ul(-color(white)(L)cancel(.bar(789)))$
$789$

The right side of the equation becomes $789$ , so we have:
$999x=789$

To solve for $x$ , we divide $789$ by $999$ and simplify:
$x=789/999=263/333$

Therefore, $263/333=.bar(789)$ .

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How do you convert 0.789 (789 repeating) to a fraction?

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