# Fibonacci in Scheme

I am trying to understand recursion in scheme and i have a hard time doing the dry run for it, for example a simple fibonacci number problem can someone breakdown the steps in which the additions take place ?

``````(define (fib n)
(if (<= n 2)
1
(+ (fib (- n 1)) (fib (- n 2)))))
``````
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If you're using Racket, as your tags indicate, then you have a built-in stepper.

Enter the program into DrRacket, and click Step in the top-right menu:

Then a stepper window will open up. Click Step over and over, and you can walk through the execution of the program.

If you want the number of steps to be a bit more manageable, pick a number lower than 10 for the execution to trace.

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In pseudocode, `fib n | n<= 2 = 1 |else = fib(n-1) + fib(n-2)` => (1 1 2 3 5 ...).

For example, `fib(5)` is reduced as:

``````fib(5)
fib(4) + fib(3)
(fib(3) + fib(2)) + fib(3)
((fib(2) + fib(1)) + fib(2)) + fib(3)
((1 + 1) + fib(2)) + fib(3)
(2 + fib(2)) + fib(3)
(2 + 1) + fib(3)
3 + fib(3)
3 + (fib(2) + fib(1))
3 + (1 + 1)
3 + 2
5
``````
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