0.354 repeating as a fraction (ie 0.354354354...) cen be solved using basic algebra. The numerator features the 3 significant figures expressed and must be done so as an integer (ie. the numerator must be 354). The denominator on the other hand is unknown and can be expressed as x. Therefore you get the equation 0.354(recurring) = 354/x Solving for x gives you 354/0.354(recurring). By doing long division you should get 999 as x Therefore your fraction is 354/999. This can be simplified to 118/333 As a rule of thumb when a recurring number is converted into a fraction, it's denominator is always 1 less than the denominator is if the number was not recurring. For example the non-recurring fraction of 0.354 is 354/1000, however its recurring counterpart is 354/999 as solved before.

118/333 possibly if that doest work try 69

Wrong section but George McDonald is correct.

I got done for 0.319 once, thank goodness I never repeated that and haven't had a drink for almost 10 years.

0.354 is blind drunk, I was 0.192 once, only lost my licence for 12 months, so I think you'd be well over at that limit, not fraction over but well over.

Now that's an interesting word.... reapeting...... I'll have to look it up in mt Funkenwagnal ! Answer to your Q is 35435435435435435435435435435435435435... forever OVER 10000000000000000000000000000000000000... forever

0.354 reapeting Have a kebab or sovilaki with extra garlic shorse