# Length function in “ The Seasoned Schemer”

I have been reading The Seasoned Schemer and i came across this definition of the length function

``````(define length
(let ((h (lambda (l) 0)))
(set! h (L (lambda (arg) (h arg))))
h))
``````

Later they say :

What is the value of (L (lambda (arg) (h arg)))? It is the function

``````(lambda (l)
(cond ((null? l) 0)
(else (add1 ((lambda (arg) (h arg)) (cdr l))))))
``````

I don't think I comprehend this fully. I guess we are supposed to define L ourselves as an excercise. I wrote a definition of L within the definition of length using letrec. Here is what I wrote:

``````(define length
(let ((h (lambda (l) 0)))
(letrec ((L
(lambda (f)
(letrec ((LR
(lambda (l)
(cond ((null? l) 0)
(else
(+ 1 (LR (cdr l))))))))
LR))))
(set! h (L (lambda (arg) (h arg))))
h)))
``````

So, L takes a function as its argument and returns as value another function that takes a list as its argument and performs a recursion on a list. Am i correct or hopelessly wrong in my interpretation? Anyway the definition works

`````` (length (list 1 2 3 4))  => 4
``````
-

In "The Seasoned Schemer" `length` is initially defined like this:

``````(define length
(let ((h (lambda (l) 0)))
(set! h (lambda (l)
(if (null? l)
0
h))
``````

Later on in the book, the previous result is generalized and `length` is redefined in terms of `Y!` (the applicative-order, imperative Y combinator) like this:

``````(define Y!
(lambda (L)
(let ((h (lambda (l) 0)))
(set! h (L (lambda (arg) (h arg))))
h)))

(define L
(lambda (length)
(lambda (l)
(if (null? l)
0
The first definition of `length` shown in the question is just an intermediate step - with the `L` procedure exactly as defined above, you're not supposed to redefine it. The aim of this part of the chapter is to reach the second definition shown in my answer.