To start with, let's redefine your predicates so they don't do any unnecessary I/O:
takeout(X,[F |R],[F|S]) :- takeout(X,R,S).
perm([X|Y],Z) :- perm(Y,W), takeout(X,Z,W).
Now you have what could be considered a "pure" permutation function:
?- perm([1,2,3], X).
X = [1, 2, 3] ;
X = [2, 1, 3] ;
X = [2, 3, 1] ;
X = [1, 3, 2] ;
X = [3, 1, 2] ;
X = [3, 2, 1] ;
So, suppose you have a max_heap function that takes a list of values and produces a tree. I'll let you worry about that, so let's just posit that it exists and is called
max_heap/2 and let's further posit that you have a way to display this attractively called
display_heap/1. To "take" the permutation and "send" it as a parameter to these functions, you're really saying in math-ese: suppose P is a permutation of X, let's make a max_heap with it and display it. Or, suppose P is a permutation of X, H is a max heap made from X, let's display H:
show_heaps(List) :- perm(List, P), max_heap(P, H), display_heap(H).
This says the same thing as my English sentence: suppose P is a permutation of the list, then H is a heap representation of it, then display it. Technically,
display_heap/1 is still a predicate which could be true or false for a given heap. In practice, it will always be true, and if you run this you'll still have to hit
; repeatedly to say, give me another solution, unless you use a failure-driven loop or an extralogical predicate like
findall/3 to cause all the solutions to be found.
Edit: Let's discuss failure-driven loops and
findall/3. First let me add some new predicates, because I don't know exactly what you're doing, but it doesn't matter for our purposes.
double([X|Xs], [Y|Ys]) :- Y is X*2, double(Xs, Ys).
showlist(Xs) :- print(Xs).
So now I have a predicate
double/2 which doubles the values in the list and a predicate
showlist/1 that prints the list on standard output. We can try it out like so:
?- perm([1,2,3], X), double(X, Y), showlist(Y).
X = [1, 2, 3],
Y = [2, 4, 6] ;
X = [2, 1, 3],
Y = [4, 2, 6] ;
X = [2, 3, 1],
Y = [4, 6, 2] ;
X = [1, 3, 2],
Y = [2, 6, 4] ;
X = [3, 1, 2],
Y = [6, 2, 4] ;
X = [3, 2, 1],
Y = [6, 4, 2] ;
When you type
; you're saying, "or?" to Prolog. In other words, you're saying "what else?" You're telling Prolog, in effect, this isn't the answer I want, try and find me another answer I like better. You can formalize this process with a failure-driven loop:
?- perm([1,2,3], X), double(X, Y), showlist(Y), fail.
So now you see the output from each permutation having gone through
double/2 there, and then Prolog reported false. That's what one means by something like this:
show_all_heaps(List) :- perm(List, X), double(X, Y), showlist(Y), nl, fail.
Look at how that works:
The other option is using
findall/3, which looks more like this:
?- findall(Y, (perm([1,2,3], X), double(X, Y)), Ys).
Ys = [[2, 4, 6], [4, 2, 6], [4, 6, 2], [2, 6, 4], [6, 2, 4], [6, 4, 2]].
Using this to solve your problem is probably beyond the scope of whatever homework it is you're working on though.