My guess is you created an example for this question, but didn't really check if it would produce the desired result. For Ax = 0 to have a non-zero solution, the determinant `det(A)`

must be zero. As the determinant of your `A`

matrix is `40`

, the only solution is `x = [0; 0; 0]`

.

Now, assuming you picked a better example, such as:

```
A = [1 2 3;2 4 6;1 1 1];
```

Now, `det(A) = 0`

.

Using regular `linsolve`

, you will still only get `x = [0; 0; 0]`

as a solution. However, there are clearly (infinitely) many other non-trivial solutions. You can achieve one such solution using `null`

like this:

```
x = null(A)
x =
0.4082
-0.8165
0.4082
A*x
ans =
1.0e-014 *
0.1110
0.2220
0.0944
```

Which is practically zero (inaccuracies are due to floating point precision).

You can also use Singular value decomposition, `svd`

to get the same results:

```
[U S V] = svd(A);
x = V(:,end)
x =
0.4082
-0.8165
0.4082
A*x
ans =
1.0e-014 *
0.1110
0.2220
0.0944
```