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 meta-predicate `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.