# How to convert logic rules to Prolog notation?

This is my assignment:

My attempt was:
a) If Fred is a father of Mike, then Fred is an ancestor of Mike.

``````father( X, Y ). /* X is father of Y */
ancestor( fred, mike ) :- father( fred, mike ).
``````

b) An animal is a mammal if it is a human or its parents were mammals.

``````parent( X, Y ). /* X is parent of Y */
human( X ).     /* X is human */
mammal( X ) :- human( X ).
mammal( X ) :- parent( P, X ), mammal( P ).
``````

c) You have attained the ultimate state if you are happy, healthy, and wise.

``````happy( X ).   /* X is happy */
healthy( X ). /* X is healthy */
wise( X ).    /* X is wise */
attain_ultimate_state( X ) :- happy( X ), healthy( X ), wise( X ).
``````

d) Every dog likes all people.

``````dog( X ).    /* X is a dog */
people( Y ). /* Y is human */
like( X, Y ) :- dog( X ), people( Y ).
``````

e) The Lakers will win games 2, 3, 5, and 7, but lose the other 3 games in the series with New Orleans.

``````game( one ).
game( two ).
game( three ).
game( four ).
game( five ).
game( six ).
game( seven ).

win( laker, new_orleans, game( two ) ).
win( laker, new_orleans, game( three ) ).
win( laker, new_orleans, game( five ) ).
win( laker, new_orleans, game( seven ) ).
lose( laker, new_orleans, game( one ) ).
lose( laker, new_orleans, game( four ) ).
lose( laker, new_orleans, game( six ) ).
``````

f) If P and Q, then R or S

``````and( X, Y ).     /* X and Y */
or( X, Y ).      /* X or Y */
imply( X, Y ).   /* X imply Y */
or( r, s ) :- and( p, q ).
``````

g) P implies Q is equivalent to the disjunction of not P with Q.

``````and( X, Y ).     /* X and Y */
or( X, Y ).      /* X or Y */
imply( X, Y ).   /* X imply Y */
imply( p, q ) == or( not( p ), q ).
``````

h) P exclusive_or Q is when P inclusive_or Q, but not (P and Q).

``````and( X, Y ).         /* X and Y */
or( X, Y ).          /* X or Y */
imply( X, Y ).       /* X imply Y */
imply( p, q ) == or( not( p ), q ).
exclusive_or( X, Y ). /* X exclusive or Y */
inclusive_or( X, Y ). /* X inclusive or Y */
exclusive_or( p, q ) :- inclusive_or( p, q ), not( and( p, q ) ).
``````

i) Jack is disappointed when it rains and any student misses class.

``````disappointed( X ). /* X is disappointed */
missed_class( X ). /* X missed class */
rain. /* it rains */
disappointed( jack ) :- rain, missed_class( _ ).
``````

j) To be or not to be, that is the question.

``````to_be( X ).
question( X ) :- to_be( X ).
question( X ) :- not( to_be( X ) ).
``````

We're using `Concepts of Programming Languages by Robert W. Sebesta` as our textbook for this course. Unfortunately, there are very few examples about how to convert from logic rules to Prolog notation in the book. Although I finished them all, most of my answer was guessing. So I wonder if someone could give me a hint, or suggestion on my work above. Any idea or feedback are welcome.

Thank you,

-
OMG, long post. Aren't you worried about the rest of your class seing your assignment verbatim online? –  missingno May 7 '11 at 22:54
@mssingno: It's fine, I don't mind. I paid for my class, so whatever I learned is more important. –  Chan May 7 '11 at 23:12

I can only imagine i am in your class as we have the same questions and book ;) Only posted 1 hour ago and already it shows up on google, lol

a) Same.

b) Currently this would be true as long as there is one parent that is a mammal, but because the problem says 'parents' and i 2nd guess everything the professor asks us, i specifically checked that there is a mother(M,X), and a father(F,X) and that M and F are mammals.

c) Same

d) more or less same: likes(dog,X):-person(X).

e) sighs This is what i showed to the professor and he didn't seem happy. He said i made it more complicated then it needed to be... but he unhelpful on what that meant.

``````game(1,newOrleans).
game(2,city1).
game(3,city2).
game(4,newOrleans).
game(5,cit2).
game(6,newOrleans).
game(7,city1).
win(X):-game(X,Y), not(city(Y)).
city(newOrleans).
``````

f) You don't need imply there as :- stands for imply. I'm still working on f-h. I asked the professor help on this one and all i could get out of him is i didn't need p(x) and can just use p and q.

j) Same, but i have them on one line with ';' to do an or

question( X ) :- to_be(X);not(to_be(X)).

Which i'm not 100% is right. He might be the question needs to be 'to be' or 'not to be' question(tobe);question(nottobe).

``````quote(tobe).
quote(nottobe).
question(X):-quote(X).
``````

UPDATE

Forgot 5i),this is what i have.

``````rain(tue).
skipped_class(tue,frank).
disappointed(jack,Day):-rain(Day), skipped_class(Day,Student).
``````

jack will be disappointed on tue as it rain and frank skipped. Not sure if i've done this right but i'm going to stick with this.

UPDATE 2

Uh i just realized i can use true,false as values and not p. and q.

``````and(P,Q):-P,Q.
inclusive_or(P,Q):-P;Q.
exclusive_or(P,Q):-inclusive_or(P,Q),not(and(P,Q)).
``````

Exclusive_or of P and Q will be true if its inclusive or (either P or Q must be true), and not both p and Q are true.

?-exclusive_or(true,true). false.

-
@TheDPQ: Thanks mate! I guess I will have to redo f-h, and we might have to add rules for exlusive_or and inclusive_or by converting them to equivalent logic `and` and `or`. –  Chan May 8 '11 at 1:11
5e) win(X):-member(X,[2,3,5,7]). –  TheDPQ May 8 '11 at 1:20
5f) p. q. or(X,Y):-p,q. still feels weird but i don't think we need an AND function as subgoal since ',' does it for us. –  TheDPQ May 8 '11 at 1:21
`and`, `or` and `:-` are what we had. I think we have to come up with something that wrap around these operations. –  Chan May 8 '11 at 1:25
Why did you have an extra property for 5i)? I don't get it. Are you sure about 5e). I don't see how we can interpret it this way. I guess it have to have at least two parameters, one for laker, and one for new orleans. Otherwise, they're irrelevant to each others. –  Chan May 8 '11 at 1:32
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