``````12 ?- 3+4*5 = X+Y.
X = 3,
Y = 4*5.

13 ?- 3+4*5 = X*Y.
false.

16 ?- 3*4+5 = X*Y.
false.
``````

I was expecting

``````13 ?- 3+4*5 = X*Y.
X = 3+4, Y = 5.

16 ?- 3*4+5 = X*Y.
X = 3, Y = 4+5.
``````

Is there some "precedence" problem? I'm using the last swi-prolog release.

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So, you need some predicate to get '3+4' from '3+4*5' or it's just curious question? –  ДМИТРИЙ МАЛИКОВ Mar 16 '11 at 18:13
curious question but the predicate to get 3+4 would interesting though. –  dierre Mar 16 '11 at 18:15

Yes, there is a precedence issue that you need to take into account.

Prolog attaches a numeric precedence value to each operator defined, so that its parse can automatically treat, e.g., 3+4*5 the same as if parentheses had been used to state 3+(4*5).

So your first example worked as expected, but not the second or third. There was simply no way to unify the terms, so Prolog returned false.

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Got it! I thought since I was using unification that 3+4*5 = X*Y was just a pattern recognition or something but it makes sense. –  dierre Mar 17 '11 at 8:28
@dierre: It is a form of pattern recognition, but a purely syntactic one that runs in linear time. Unification doesn't know about the rules of arithmetic. Adding them completely would not be possible, since arithmetic equality is undecidable in general. –  larsmans Mar 17 '11 at 12:56
well, actually I thought it considers arithmetic because it basically evals * before + so the unification of 4*5 happens before 3+4 so Y gets 4*5 but than I have *Y and I can't unify 3+ because I'm missing the *. –  dierre Mar 17 '11 at 14:09
what I'm saying is +(3, *(4,5) ) = *(X,Y) I hope it's clear with prefix notation. That's why it can't unify. But I thought that since in prolog everything is a term, and that I can write X = 4+5 and the output of X would be 4+5 than writing my example would be a simple reading of chars but + is a predicate so that's why I was wrong. –  dierre Mar 17 '11 at 14:13
@dierre: @hardmath's comment is on-the-spot, the expression gets parsed. It doesn't get evaluated at all, which is what I meant by stating unification doesn't do arithmetic. –  larsmans Mar 17 '11 at 18:42