You're computing a rational, not an integer, so you should install the Solver Foundation:
and use Rational rather than BigInteger:
You can then call ToDouble if you want to get the rational as the nearest double.
I need it accurate to 56 decimal places
OK, that is a ridiculous amount of precision, but I'll take you at your word.
Since a double has only 15 decimal places of precision and a decimal only 29, you can't use double or decimal. You're going to have to write the code yourself to do the division.
Here are two ways to do it:
First, write an algorithm that emulates doing long division. You can do it by hand, so you can write a computer program to do it. Keep going until you generate the required number of bits of precision.
Second: WOLOG assume that the rational in question is positive and is of the form
y are big integers. Let
b be 10p for a desired precision
p. You wish to find the big integer
a with the property that:
a * y < b * x
b * x < (a + 1) * y
(a+1)/b is the decimal fraction with p digits closest to
You can find the value of
a by doing a binary search over the set of non-negative BigIntegers.
To do the binary search, first you have to find upper and lower bounds. Lower is easy enough; you know that 0 is a lower bound because by assumption the fraction
x/y is positive. To find the upper bound, try
100/b ... and so on until you find a value that is larger than
x/y. Now you have an upper and lower bound, and you can binary search the resulting space to find the exact value of
a that makes the inequalities true.