# How to find “the first survivor” after a given position in the Josephus puzzle?

I want to find the next survivor after a given position and number of people.

``````(define renumber
(lambda (position n)
(if (< position 3)
(+ position (- n 3))
(- position 3))))

(define survives?
(lambda (position n)
(if (< n 3)
#t
(if (= position 3)
#f
(survives? (renumber position n) (- n 1))))))

(define first-survivor-after
(lambda (position n)
(cond ((and (<= n 3)(<= position 3)) null)
((or (>= n 3)(>= position 3))(survives? position n)
(if = #f survives?)
(survives? (+ 1 position) n)
"Surviving position"))))
``````

I just need to replace the last bit there with the exact number of the surviving position. The program will run until it finds the survivor, I just don't know how to give the position as an answer since now everything is in terms of true and false. Thank you!

-
The algorithm, and the syntax are incorrect. For example, this condition is plain wrong: `(if = #f survives?)`. That's not how you write an `if` expression in Scheme (maybe you meant `(if (equal? (survives? position n) #f) ...)`). Start by getting the basics right – Óscar López Sep 21 '13 at 13:22

Your algorithm doesn't seem correct, and there are syntax errors. For example, this condition is plain wrong: `(if = #f survives?)`. That's not how you write an `if` expression in Scheme - perhaps you meant `(if (equal? (survives? position n) #f) ...)`. Start by getting the basics right!

In Wikipedia you'll find a fine explanation of the solution, together with a couple of implementations, which should be easy to write in Scheme. Just for fun, here's my take on an efficient tail-recursive solution, using a named `let`:

``````(define (first-survivor-after position n)
(let loop ([i   1]
[acc 0])
(if (> i n)
(modulo (+ acc position) i)))))
``````

Or equivalently, a non-tail-recursive version using a helper procedure:

``````(define (first-survivor-after position n)
(define (loop i)
(if (= i 1)
0
(modulo (+ (loop (sub1 i)) position) i)))
``````
-

I discuss this problem at my blog, with three solutions. Here is a solution that uses a cyclical list:

``````(define (cycle xs)
(set-cdr! (last-pair xs) xs) xs)

(define (josephus3 n m)
(let loop ((k (- m 1)) (alive (cycle (range 0 n))) (dead '()))
(cond ((= (car alive) (cadr alive))
``````> (josephus 41 3)