# Prolog length of a list

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 = []

-
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

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).
``````
-
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
``````size_sub(L,X):-