traditional recursive factorial and tail-recursive factorial

``````(define factorial
( lambda (n )
(if( = n 0 )
1
( * n (factorial (- n 1 ) )))))
(factorial 5
``````

)

``````(define factorial-tail
( lambda (n acc)
(if( = n 0 )
acc
(factorial-tail (- n 1)  (* acc n )))))

(factorial-tail 5 1)
``````

Hi, Let's say that you have two functions as I'm showing up. I'm asking for you to show me performance stack ( stack frame) in both cases. Greetings ;)

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1 Answer

You could use `trace`.

``````#lang racket

(require racket/trace)

(define factorial
(lambda (n)
(if (= n 0)
1
(* n (factorial (- n 1))))))
(trace factorial)
(factorial 5)
;; Output:
;; >(factorial 5)
;; > (factorial 4)
;; > >(factorial 3)
;; > > (factorial 2)
;; > > >(factorial 1)
;; > > > (factorial 0)
;; < < < 1
;; < < <1
;; < < 2
;; < <6
;; < 24
;; <120
;; 120

(define factorial-tail
(lambda (n acc)
(if (= n 0)
acc
(factorial-tail (- n 1)  (* acc n )))))
(trace factorial-tail)
(factorial-tail 5 1)
;; Output:
;; >(factorial-tail 5 1)
;; >(factorial-tail 4 5)
;; >(factorial-tail 3 20)
;; >(factorial-tail 2 60)
;; >(factorial-tail 1 120)
;; >(factorial-tail 0 120)
;; <120
;; 120
``````
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