Let's say we have 0.33, we need to output "1/3". If we have "0.4", we
need to output "2/5".

It's wrong in common case, because of 1/3 = 0.3333333 = 0.(3)
Moreover, it's impossible to find out from suggested above solutions is decimal can be converted to fraction with defined precision, because output is always fraction.

BUT, i suggest my comprehensive function with many options based on idea of Infinite geometric series, specifically on formula:

At first this function is trying to find period of fraction in string representation. After that described above formula is applied.

Rational numbers code is borrowed from Stephen M. McKamey rational numbers implementation in C#. I hope there is not very hard to port my code on other languages.

```
/// <summary>
/// Convert decimal to fraction
/// </summary>
/// <param name="value">decimal value to convert</param>
/// <param name="result">result fraction if conversation is succsess</param>
/// <param name="decimalPlaces">precision of considereation frac part of value</param>
/// <param name="trimZeroes">trim zeroes on the right part of the value or not</param>
/// <param name="minPeriodRepeat">minimum period repeating</param>
/// <param name="digitsForReal">precision for determination value to real if period has not been founded</param>
/// <returns></returns>
public static bool FromDecimal(decimal value, out Rational<T> result,
int decimalPlaces = 28, bool trimZeroes = false, decimal minPeriodRepeat = 2, int digitsForReal = 9)
{
var valueStr = value.ToString("0.0000000000000000000000000000", CultureInfo.InvariantCulture);
var strs = valueStr.Split('.');
long intPart = long.Parse(strs[0]);
string fracPartTrimEnd = strs[1].TrimEnd(new char[] { '0' });
string fracPart;
if (trimZeroes)
{
fracPart = fracPartTrimEnd;
decimalPlaces = Math.Min(decimalPlaces, fracPart.Length);
}
else
fracPart = strs[1];
result = new Rational<T>();
try
{
string periodPart;
bool periodFound = false;
int i;
for (i = 0; i < fracPart.Length; i++)
{
if (fracPart[i] == '0' && i != 0)
continue;
for (int j = i + 1; j < fracPart.Length; j++)
{
periodPart = fracPart.Substring(i, j - i);
periodFound = true;
decimal periodRepeat = 1;
decimal periodStep = 1.0m / periodPart.Length;
var upperBound = Math.Min(fracPart.Length, decimalPlaces);
int k;
for (k = i + periodPart.Length; k < upperBound; k += 1)
{
if (periodPart[(k - i) % periodPart.Length] != fracPart[k])
{
periodFound = false;
break;
}
periodRepeat += periodStep;
}
if (!periodFound && upperBound - k <= periodPart.Length && periodPart[(upperBound - i) % periodPart.Length] > '5')
{
var ind = (k - i) % periodPart.Length;
var regroupedPeriod = (periodPart.Substring(ind) + periodPart.Remove(ind)).Substring(0, upperBound - k);
ulong periodTailPlusOne = ulong.Parse(regroupedPeriod) + 1;
ulong fracTail = ulong.Parse(fracPart.Substring(k, regroupedPeriod.Length));
if (periodTailPlusOne == fracTail)
periodFound = true;
}
if (periodFound && periodRepeat >= minPeriodRepeat)
{
result = FromDecimal(strs[0], fracPart.Substring(0, i), periodPart);
break;
}
else
periodFound = false;
}
if (periodFound)
break;
}
if (!periodFound)
{
if (fracPartTrimEnd.Length >= digitsForReal)
return false;
else
{
result = new Rational<T>(long.Parse(strs[0]), 1, false);
if (fracPartTrimEnd.Length != 0)
result = new Rational<T>(ulong.Parse(fracPartTrimEnd), TenInPower(fracPartTrimEnd.Length));
return true;
}
}
return true;
}
catch
{
return false;
}
}
public static Rational<T> FromDecimal(string intPart, string fracPart, string periodPart)
{
Rational<T> firstFracPart;
if (fracPart != null && fracPart.Length != 0)
{
ulong denominator = TenInPower(fracPart.Length);
firstFracPart = new Rational<T>(ulong.Parse(fracPart), denominator);
}
else
firstFracPart = new Rational<T>(0, 1, false);
Rational<T> secondFracPart;
if (periodPart != null && periodPart.Length != 0)
secondFracPart =
new Rational<T>(ulong.Parse(periodPart), TenInPower(fracPart.Length)) *
new Rational<T>(1, Nines((ulong)periodPart.Length), false);
else
secondFracPart = new Rational<T>(0, 1, false);
var result = firstFracPart + secondFracPart;
if (intPart != null && intPart.Length != 0)
{
long intPartLong = long.Parse(intPart);
result = new Rational<T>(intPartLong, 1, false) + (intPartLong == 0 ? 1 : Math.Sign(intPartLong)) * result;
}
return result;
}
private static ulong TenInPower(int power)
{
ulong result = 1;
for (int l = 0; l < power; l++)
result *= 10;
return result;
}
private static decimal TenInNegPower(int power)
{
decimal result = 1;
for (int l = 0; l > power; l--)
result /= 10.0m;
return result;
}
private static ulong Nines(ulong power)
{
ulong result = 9;
if (power >= 0)
for (ulong l = 0; l < power - 1; l++)
result = result * 10 + 9;
return result;
}
```

There are some examples of usings:

```
Rational<long>.FromDecimal(0.33333333m, out r, 8, false);
// then r == 1 / 3;
Rational<long>.FromDecimal(0.33333333m, out r, 9, false);
// then r == 33333333 / 100000000;
```

Your case with right part zero part trimming:

```
Rational<long>.FromDecimal(0.33m, out r, 28, true);
// then r == 1 / 3;
Rational<long>.FromDecimal(0.33m, out r, 28, true);
// then r == 33 / 100;
```

Min period demostration:

```
Rational<long>.FromDecimal(0.123412m, out r, 28, true, 1.5m));
// then r == 1234 / 9999;
Rational<long>.FromDecimal(0.123412m, out r, 28, true, 1.6m));
// then r == 123412 / 1000000; because of minimu repeating of period is 0.1234123 in this case.
```

Rounding at the end:

```
Rational<long>.FromDecimal(0.8888888888888888888888888889m, out r));
// then r == 8 == 9;
```

The most interesting case:

```
Rational<long>.FromDecimal(0.12345678m, out r, 28, true, 2, 9);
// then r == 12345678 / 100000000;
Rational<long>.FromDecimal(0.12345678m, out r, 28, true, 2, 8);
// Conversation failed, because of period has not been founded and there are too many digits in fraction part of input value.
Rational<long>.FromDecimal(0.12121212121212121m, out r, 28, true, 2, 9));
// then r == 4 / 33; Despite of too many digits in input value, period has been founded. Thus it's possible to convert value to fraction.
```

Other tests and code everyone can find in my MathFunctions library on github.

`.33`

=>`"1/3"`

example concerns me; I would expect`.33`

=>`"33/100"`

. I assume you meant`.33...`

of course, but it exposes an issue with the question - before we can settle on an algorithm we need to decide on expected behavior. @Debilski's Python answer uses`.limit_denominator()`

which defaults to a max denominator of 10^7; probably a good default in practice, but this can still introduce bugs if you're not careful, anddoesreturn`"33/100"`

in the`.33`

case.specifcfeatures are available. Unclear what you're asking, if indeed it isn't a mere contradiction in terms.