Consider:

```
row(M, N, Row) :-
nth1(N, M, Row).
column(M, N, Col) :-
transpose(M, MT),
row(MT, N, Col).
symmetrical(M) :-
transpose(M, M).
transpose([[]|_], []) :- !.
transpose([[I|Is]|Rs], [Col|MT]) :-
first_column([[I|Is]|Rs], Col, [Is|NRs]),
transpose([Is|NRs], MT).
first_column([], [], []).
first_column([[]|_], [], []).
first_column([[I|Is]|Rs], [I|Col], [Is|Rest]) :-
first_column(Rs, Col, Rest).
```

Testing with:

```
matrix([[a,b,c],[d,e,f],[g,h,i]]).
```

For rows:

```
?- matrix(M), row(M, N, Row).
M = [[a, b, c], [d, e, f], [g, h, i]],
N = 1,
Row = [a, b, c] ;
M = [[a, b, c], [d, e, f], [g, h, i]],
N = 2,
Row = [d, e, f] ;
M = [[a, b, c], [d, e, f], [g, h, i]],
N = 3,
Row = [g, h, i] ;
false.
```

Columns:

```
?- matrix(M), column(M, N, Col).
M = [[a, b, c], [d, e, f], [g, h, i]],
N = 1,
Col = [a, d, g] ;
M = [[a, b, c], [d, e, f], [g, h, i]],
N = 2,
Col = [b, e, h] ;
M = [[a, b, c], [d, e, f], [g, h, i]],
N = 3,
Col = [c, f, i] ;
false.
```

First column:

```
?- matrix(M), first_column(M, C, R).
M = [[a, b, c], [d, e, f], [g, h, i]],
C = [a, d, g],
R = [[b, c], [e, f], [h, i]].
```

Finally, matrix symmetry is defined by any matrix which is the transposition of itself.

```
?- matrix(M), symmetrical(M).
false.
?- symmetrical([[a,b,c],[b,d,e],[c,e,f]]).
true.
```