# How to implement bignum in Scheme given the following grammar?

I think Scheme has a built-in type Bignum for handling arbitrarily large numbers, but if I want to implement it myself how would I do it?

If I am not mistaken it has the following grammar: |n| = () when n=0 |n| = (r . |q|) where n=qN+r, 0<=r

``````N = base
r = remainder
q = quotient
``````

E.g. When base N=16, |33| = (1 2) wher 1 is a remainder, 2 is a quotient.

PS: Using bignum implementation how could I go to the next number (successor) and to the previous number (predecessor), such that `successor |n| = |n+1|` and `predecessor |n+1| = |n|`

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Your grammar is incorrect, though it points in the right direction. And a proper answer to your question requires a book, not a paragraph or three on Stack Overflow. The canonical description of big-integer arithmetic is in Knuth's AoCPv2. Or if you prefer, I did a seven-part series (with code in Scheme) at my blog last summer; see my profile for the url. –  user448810 Mar 1 '12 at 16:51