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,