I wanted to try and learn lisp, but I very quickly gave up. I figured I'd try again. I'm looking at Problem 2 on Project Euler - finding the sum of all the even Fibbonacci numbers under 4 Million.
I wrote the following code which works, but is all kinds of ugly. Chief among them is the fact that it's so slow - because it's doing naive recursion all the time.
When I wrote this program in python I built up a list as I calculated and never recalculated numbers. I know I could do that here (somehow) but that doesn't seem to be true to the spirit of lisp, of functional programming. I gave up after #3, when I hit a recursion depth limit and had to rewrite my code to use a loop instead of recursion.
So I suppose my questions are:
- What's the 'right, lispy way' to solve this problem?
- How do you reconcile recursion and the notion of 'just calculating everything' with the practical limit of calculating everything?
- Any recommendations for learning lisp besides The Little Schemer, and Project Euler?
And here's my code:
(defun fib(i) (if (= i 1) ;Could rewrite this as a case statement 1 (if (= i 2) 1 (+ (fib (- i 1)) (fib (- i 2)))))) (defun solve(i) (let ((f (fib i))) ;Store result in local variable (print f) ;For debugging (if (< 4000000 f) 0 ;return (if (= 0 (mod f 2)) (+ f (solve (+ i 1))) ;add number (solve (+ i 1)))))) ;don't (print (solve 1))