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...
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To convert 0.580 repeating to a fraction, we can set x = 0.580580580... and multiply by 1000 to shift the decimal: 1000x = 580.580580... Subtracting x from 1000x gives 999x = 580, so x = 580/999. Simplifying the fraction by dividing both the numerator and denominator by their greatest common divisor, we get 20/37 as the final fraction representation of 0.580 repeating.
Oh, dude, you're hitting me with the math questions now? Alright, so 0.580 repeating is the same as 0.58, because the 0.58 part repeats infinitely. That's like saying "I'm going to eat Pizza forever, but it's just one slice." So, to turn 0.58 into a fraction, it's 58/100, which simplifies to 29/50. Math, man, it's like magic but with numbers.
Oh honey, that's just 58/99. It's like having a never-ending party that just can't stop repeating itself. So go ahead and embrace the chaos, it's all just math being extra.
what is 0.194 as a repeating fraction
If you mean: 0.151515.....repeating then as a fraction it is 5/33
0.13333333 repeating in fraction = 12/90 or 2/15
The fraction of the repeating decimal 0.7... is 7/9
It is: 53/99It is: 0.5333 ... repeating = 8/15 as a fraction