Ok, let's go through the steps of evaluating (cons res v)
with normal-order evaluation:
v
has been defined as (cons a (cons b ’()))
, so we have cons res (cons a (cons b ’()))
. res
is defined as (foo ...)
, so we have
(cons (foo (begin (set! a (+ a 1)) a)
(begin (set! b (* b 2)) b))
(cons a (cons b ’())))
Lastly foo x y
is defined as (+ x y y)
, so by substituting (begin (set! a (+ a 1)) a)
for x
and (begin (set! b (* b 2)) b)
for y
, we get:
(cons (+ (begin (set! a (+ a 1)) a)
(begin (set! b (* b 2)) b)
(begin (set! b (* b 2)) b))
(cons a (cons b ’())))
So now let's evaluate this: To get the result of cons, we first need to evaluate its first argument, (+ ...)
. So we first need to evaluate the first argument of +
which is (begin (set! a (+ a 1)) a)
. This evaluates to 2, so the value of a
is now 2 and the first argument to +
is also 2. Now we do the same thing with the second argument. This also evaluates to 2 and sets b to 2. The third argument is (begin (set! b (* b 2)) b)
again, so the value of b
is now 4 and the third argument is 4. So the first argument to cons
is the result (+ 2 2 4)
, which is 8 and the values of a
and b
are 2 and 4.
Now we need to evaluate the second argument, (cons a (cons b ’()))
. So since the value of a
and b
are 2 and 4, the end result is (8 2 4)
.