Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

How can I calculate the length of a list

?- size_sub([[b,a,g], [9,3,7,4], [6]], X).

X = [3, 4, 1]

?- size_sub([[c,g,e,w], [7]], X).

X = [4, 1]

?- size_sub([], X).

X = []

share|improve this question
1  
is that last one correct? to be consistent wouldn't that be size_sub([[]],X). or size_sub([],X) the answer would be [] –  Bob Vale Sep 15 '11 at 19:50

2 Answers 2

Ok you need to start with the base case which is the last answer

so size_sub([],X). is true if X=[] so first you write that as a rule.

size_sub([],[]).

Then you need to do the inductive step a list that is one longer than the previous. I am going to assume that you have a size/2 function for determining the size of a single list (if not please comment).

So the inductive step is going to operate on the length of the first parameter so N->N+1. We would represent this by striping off the head of the list syntax will be [H|T] now the second parameter (your answer) is going to be the length of H with the result of calling size_sub on T. As we cannot specify rules in the parameters in the header we will use N to represent the length of H and T2 to represent the result of size_sub on T.

So the first part of the rule becomes size_sub([H|T],[N|T2]):-

now we follow it with the predicates that will assert the values for N and T2.

size(H,N),
size_sub(T,T2).

putting that all together you get

size_sub([],[]).

size_sub([H|T],[N|T2]):-
    size(H,N),
    size_sub(T,T2).

size/2 is a far simpler case and following the same process of base + inductive you should be able to create the rules for it. Please comment if you need further help.

** EDIT - Request for size/2 definition **

To define size/2

Start with the base case, the empty list has a size of 0.

size([],0).

Now the inductive step. The size of list of length(N+1) is the size of a list of length(N). So lets define our list as [_|T] I've defined the list using _ to represent the head because we never use it so we can just use the anonymous variable. Lets use N to represent the length of T, and M to be N+1.

so

size([_|T],M):-

now lets define N

  size(T,N),

and finally assert that M is equal to N + 1

  M is N+1.

so putting everything together

size([],0).

size([_|T],N):-
    size(T,M),
    N is M+1.

size_sub([],[]).

size_sub([H|T],[N|T2]):-
    size(H,N),
    size_sub(T,T2).
share|improve this answer
    
I don't know how to create size/2 –  Mary Sep 15 '11 at 20:24
    
@Mary answer updated –  Bob Vale Sep 15 '11 at 22:37

basically you have to map length/2 over a list of lists; so:

size_sub(L,X):-
    maplist(length,L,X).
share|improve this answer

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.