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Comments for John D. Cook

Who you gonna believe: Grok or the docs? Writing down harmonic numbers Incircles and Excircles of Pythagorean triangles The Star Trek lemma Solving a chess puzzle with Claude and Prolog Comment on Formally proving a calculation with Claude and Lean by David Roberts Comment on Aitken acceleration before Aitken by lagomoof Comment on The Latin of Linux by David Comment on Partitions over permutations by Michael Kinyon Comment on Online (one-pass) algorithms by ross Comment on Expected IQ spread on a jury by blaine Comment on Calculating the expected range of normal samples by Blaise F Egan Comment on Turning K-L divergence into a metric by Emil Comment on Hilbert transform as an infinite matrix by Brian Oxley
Writing Prolog with ChatGPT
John · 2026-06-16 · via Comments for John D. Cook

A few days ago I wrote about using Claude to solve a chess puzzle by writing Prolog code. This morning I tried a similar chess puzzle with ChatGPT. The task is to place a queen, king, rook, bishop, and knight on a 4 by 4 chessboard so no piece attacks another.

Of course there’s not a lot of market demand for solving chess puzzles, but there is demand for solving real-world problems that amount to logic puzzles. Experiments with chess puzzles suggest writing Prolog with LLM help might be pleasant. The syntax of Prolog can be a little odd, but the LLM handles that. And because Prolog has been around so long without changing much, you’d expect LLMs to be good at generating code in it. [1]

I gave ChatGPT this prompt:

Write a SWI Prolog program to solve the following chess puzzle. Place a queen, king, rook, bishop, and knight on a 4 by 4 chessboard so no piece attacks another. Print all solutions.

It produced a file chess4.pl (below) that I ran with

swipl -q -s chess4.pl -g solve -t halt

It found all 16 solutions:

Solution 1:
  queen=1-2  king=2-4  rook=3-1  bishop=4-3  knight=4-4
. K . N
. . . B
Q . . .
. . R .

Solution 2:
  queen=1-2  king=4-3  rook=2-4  bishop=3-1  knight=4-1
. R . .
. . . K
Q . . .
. . B N

...

Here’s the code.

% chess4.pl
% Place queen, king, rook, bishop, and knight on a 4x4 board
% so that no piece attacks another.

:- use_module(library(lists)).

square(X-Y) :-
    between(1, 4, X),
    between(1, 4, Y).

solve :-
    findall(Board, solution(Board), Boards),
    print_solutions(Boards, 1),
    length(Boards, Count),
    format('Total solutions: ~d~n', [Count]).

solution(Board) :-
    Pieces = [queen, king, rook, bishop, knight],
    findall(S, square(S), Squares),
    place_pieces(Pieces, Squares, Board),
    safe(Board).

place_pieces([], _, []).
place_pieces([Piece | Pieces], Squares, [Piece-Square | Board]) :-
    select(Square, Squares, RemainingSquares),
    place_pieces(Pieces, RemainingSquares, Board).

safe(Board) :-
    safe(Board, Board).

safe([], _).
safe([Piece-Square | Rest], Board) :-
    forall(
        member(OtherPiece-OtherSquare, Rest),
        non_attacking(Piece-Square, OtherPiece-OtherSquare, Board)
    ),
    safe(Rest, Board).

non_attacking(P1-S1, P2-S2, Board) :-
    \+ attacks(P1, S1, S2, Board),
    \+ attacks(P2, S2, S1, Board).

% Attack rules

attacks(king, X1-Y1, X2-Y2, _) :-
    X1-Y1 \= X2-Y2,
    DX is abs(X1 - X2),
    DY is abs(Y1 - Y2),
    DX =< 1,
    DY =< 1. attacks(knight, X1-Y1, X2-Y2, _) :- DX is abs(X1 - X2), DY is abs(Y1 - Y2), ( DX =:= 1, DY =:= 2 ; DX =:= 2, DY =:= 1 ). attacks(rook, S1, S2, Board) :- same_rank_or_file(S1, S2), clear_line(S1, S2, Board). attacks(bishop, S1, S2, Board) :- same_diagonal(S1, S2), clear_line(S1, S2, Board). attacks(queen, S1, S2, Board) :- ( same_rank_or_file(S1, S2) ; same_diagonal(S1, S2) ), clear_line(S1, S2, Board). same_rank_or_file(X1-Y1, X2-Y2) :- ( X1 =:= X2 ; Y1 =:= Y2 ). same_diagonal(X1-Y1, X2-Y2) :- DX is abs(X1 - X2), DY is abs(Y1 - Y2), DX =:= DY. % For sliding pieces, make sure no piece blocks the path. clear_line(X1-Y1, X2-Y2, Board) :- step(X1, X2, SX), step(Y1, Y2, SY), NX is X1 + SX, NY is Y1 + SY, clear_path(NX-NY, X2-Y2, SX-SY, Board). clear_path(Target, Target, _, _) :- !. clear_path(X-Y, Target, SX-SY, Board) :- \+ occupied(X-Y, Board), NX is X + SX, NY is Y + SY, clear_path(NX-NY, Target, SX-SY, Board). step(A, B, 0) :- A =:= B. step(A, B, 1) :- B > A.
step(A, B, -1) :-
    B < A.

occupied(Square, Board) :-
    member(_-Square, Board).

% Printing

print_solutions([], _).
print_solutions([Board | Rest], N) :-
    format('Solution ~d:~n', [N]),
    print_coordinates(Board),
    print_board(Board),
    nl,
    N1 is N + 1,
    print_solutions(Rest, N1).

print_coordinates(Board) :-
    member(queen-Q, Board),
    member(king-K, Board),
    member(rook-R, Board),
    member(bishop-B, Board),
    member(knight-N, Board),
    format('  queen=~w  king=~w  rook=~w  bishop=~w  knight=~w~n',
           [Q, K, R, B, N]).

print_board(Board) :-
    forall(
        between(1, 4, Row0),
        (
            Y is 5 - Row0,
            forall(
                between(1, 4, X),
                (
                    piece_at(X-Y, Board, Symbol),
                    format('~w ', [Symbol])
                )
            ),
            nl
        )
    ).

piece_at(Square, Board, Symbol) :-
    member(Piece-Square, Board),
    !,
    piece_symbol(Piece, Symbol).
piece_at(_, _, '.').

piece_symbol(queen,  'Q').
piece_symbol(king,   'K').
piece_symbol(rook,   'R').
piece_symbol(bishop, 'B').
piece_symbol(knight, 'N').

[1] I’ve played around with generating Prolog and Lean this weekend, and I’ve had better results with Prolog. The problems with Lean haven’t been Lean per se but the Mathlib library. The library is frequently refactored, which makes sense for a young language, but this makes it harder to generate and debug code.