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In rational form it is 17/15.

Q: What is 1.13 (3 being repeated) repeating converting decimals into a fraction?

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If you mean its equivalent as a fraction then it is 83/99

The answer depends on what string is repeating. It is not clear from the question whether the recurring fraction is meant to be 0.575757... or 0.577777... .

The answer depends on what string is repeating. It is not clear from the question whether the recurring fraction is meant to be 2.541541541... or 2.5414141... or 2.5411111...

The answer depends on the length of the string which is repeating: eg 1.142857777... or 14.142575757... and so on. As long as that is not specified, the question remains ambiguous and we cannot answer it without making guesses which cannot be justified.

The answer is repeating

Related questions

-0.5555 repeating -0.25 -0.125 0.1 0.16 0.2222 repeating 0.33

89 is an integer, not a fraction. The repeated decimal equivalents are 89.000....(repeating) or 88.999... (repeating).

If you mean its equivalent as a fraction then it is 83/99

The answer depends on what string is repeating. It is not clear from the question whether the recurring fraction is meant to be 0.575757... or 0.577777... .

1.2 repeating as a fraction = 11/9

The answer depends on what string is repeating. It is not clear from the question whether the recurring fraction is meant to be 2.541541541... or 2.5414141... or 2.5411111...

1/3(.3 repeated), 2/3(.6 repeated), 1/9(.1repeated), 2/9(.2 repeated), etc. There are billions of repeating decimals.

A repeating fraction is a decimal representation of a number in which a string of numbers repeats itself endlessly. The repeating string may start after a finite number of non-repeating digits. For example, 29/132 = 0.21969696... repeating. The repeated sequence is [96] which starts after two digits.

The answer depends on what string is repeating. It is not clear from the question whether the recurring fraction is meant to be 0.580580580... or 0.5808080...

If you're asking how to write such a fraction, simply take it to the third repitition and place a short horizontal line (bar) over the repeated digits to note that in fact it is repeating. exp. ____ 3.9999

The answer depends on what string is repeating. It is not clear from the question whether the recurring fraction is meant to be 0.580580580... or 0.5808080...

It is not possible to answer the question because it is ambiguous: the answer depends on what string is repeating. It is not clear from the question whether the fraction is meant to be 0.090909... or 0.09999... .