How can boolean algebra represent all of math? How can computers

>>9152931
what is a Goedel number?

>How can boolean algebra represent all of math?
Everything in math is logical, and therefor can be represented with all those qt logical symbols and "operations".

>How can computers process functions, graphs, advanced mathematics using only boolean algebra?
They can do analytically all the simple things, but most of the times they a p p r o x i m a t e the results, or "numerical solutions" as they say.

For example, let's say the pc can't calculate the derivative of f(x)=x^2 at x=3, so what it'll do? Do the secant between very close points, like 3 and 2.9999995.
Now I exaggerated a little bit on the example, but boolean algebra can easily deal with those approximations.