Prolog factorial recursion

I'm having trouble understanding the following factorial program

``````fact1(0,Result) :-
Result is 1.
fact1(N,Result) :-
N > 0,
N1 is N-1,
fact1(N1,Result1),
Result is Result1*N.
``````

When `fact1` is called nested within the second `fact1`, doesn't that mean that the the last line, `Result is Result1*N.`, is never called? Or in Prolog does the last line get executed before the recursive call?

• a call is made, and when it finishes the control returns to continue with the following goal, if present. the call being to itself or not, is immaterial. a call is a call. Sep 15, 2020 at 13:18

BTW once you got the basic recursion understood, try to achieve tail recursion whenever possible, here it'd be:

``````factorial(N, R) :- factorial(N, 1, R).
factorial(0, R, R) :- !.
factorial(N, Acc, R) :-
NewN is N - 1,
NewAcc is Acc * N,
factorial(NewN, NewAcc, R).
``````

Tail recursion, unlike the recursion you used previously, allows interpreter/compiler to flush context when going on to the next step of recursion. So let's say you calculate `factorial(1000)`, your version will maintain 1000 contexts while mine will only maintain 1. That means that your version will eventually not calculate the desired result but just crash on an `Out of call stack memory` error.

You can read more about it on wikipedia.

• The goal `factorial(0,0)` should fail---it does not. Jul 23, 2015 at 6:38

No, the recursive call happens first! It has to, or else that last clause is meaningless. The algorithm breaks down to:

``````factorial(0) => 1
factorial(n) => factorial(n-1) * n;
``````

As you can see, you need to calculate the result of the recursion before multiplying in order to return a correct value!

Your prolog implementation probably has a way to enable tracing, which would let you see the whole algorithm running. That might help you out.

• I hope you mean `factorial(0) => 1` :) Mar 2, 2015 at 17:42
• What about `factorial(-1)`? With above definition, the query `?- fact1(-1,_).` rightly fails; `factorial`, as it is, doesn't. Jul 23, 2015 at 6:36

Generally speaking, @m09's answer is basically right about the importance of tail-recursion.

For big `N`, calculating the product differently wins! Think "binary tree", not "linear list"...

Let's try both ways and compare the runtimes. First, @m09's `factorial/2`:

```?- time((factorial(100000,_),false)).
% 200,004 inferences, 1.606 CPU in 1.606 seconds (100% CPU, 124513 Lips)
false.
```

Next, we do it tree-style—using `reduce/3` together with lambda expressions:

```?- time((numlist(1,100000,Xs),reduce(\X^Y^XY^(XY is X*Y),Xs,_),false)).
% 1,300,042 inferences, 0.264 CPU in 0.264 seconds (100% CPU, 4922402 Lips)
false.
```

Last, let's define and use dedicated auxiliary predicate `x_y_product/3`:

``````x_y_product(X, Y, XY) :- XY is X*Y.
``````

What's to gain? Let's ask the stopwatch!

```?- time((numlist(1,100000,Xs),reduce(x_y_product,Xs,_),false)).
% 500,050 inferences, 0.094 CPU in 0.094 seconds (100% CPU, 5325635 Lips)
false.
```
``````factorial(1, 1).
factorial(N, Result) :- M is N - 1,
factorial(M, NextResult), Result is NextResult * N.
``````
• You should add an explanation to your answer. Code-only posts are not enough. Read here about the details. Dec 2, 2016 at 13:49

Base case is declared. The conditions that N must be positive and multiply with previous term.

`````` factorial(0, 1).
factorial(N, F) :-
N > 0,
Prev is N -1,
factorial(Prev, R),
F is R * N.
``````

To run:

factorial(-1,X).

A simple way :

`````` factorial(N, F):- N<2, F=1.

factorial(N, F) :-
M is N-1,
factorial(M,T),
F is N*T.
``````

I would do something like:

``````fact(0, 1).
fact(N, Result):-
Next is N - 1,
fact(Next, Recursion),
Result is N * Recursion.
``````

And a tail version would be like:

``````tail_fact(0, 1, 0).         /* when trying to calc factorial of zero */
tail_fact(0, Acc, Res):-    /* Base case of recursion, when reaches zero return Acc */
Res is Acc.
tail_fact(N, Acc, Res):-    /* calculated value so far always goes to Acc */
NewAcc is N * Acc,
NewN is N - 1,
tail_fact(NewN, NewAcc, Res).
``````

So for you to call the:

non-tail recursive method: fact(3, Result).

tail recursive method: tail_fact(3, 1, Result).

This might help ;)

• `?- fact(0,1), false.` doesn't terminate. It should. Same for `?- tail_fact(0,1,0), false.` Sep 23, 2015 at 17:07
• Your are right! `fact(0,0).` `fact(N, R):- fact_aux(N, R).` `fact_aux(0, 1).` `fact_aux(N, R):- N > 0, NewN is N - 1, fact_aux(NewN, Rec), R is N * Rec. ` Sep 23, 2015 at 22:46
• Somewhat better. But `?- fact(0,0).` should fail. It succeeds. Sep 24, 2015 at 5:20
• btw. this looks suspiciously similar to this previous answer: stackoverflow.com/a/28799827/4609915 Sep 24, 2015 at 5:23

non-tailer recursion :

`````` fact(0,1):-!.
fact(X,Y):- Z=X-1,
fact(Z,NZ),Y=NZ*X.
``````

tailer recursion:

``````fact(X,F):- X>=0,fact_aux(X,F,1).
fact_aux(0,F,F):-!.
fact_aux(X,F,Acc):-
NAcc=Acc*X, NX=X-1,
fact_aux(NX,F,NAcc).
``````
• Are you using visual-prolog? Jan 4, 2016 at 3:29
• Which Prolog system are you using? Jan 4, 2016 at 3:36
• With SWI-Prolog, `?- fact(10,F).` loops and does not give an answer. Jan 4, 2016 at 3:36
• it was a problem in the stopping condition in visual prolog in get output right but doesn`t stop after 0 so makes stack overflow Jan 23, 2016 at 23:03