Matrix Determinants and Properties

It is always invertible.

It is always singular.

It has n rows and m columns.

It has n rows and n columns.

By using diagonal vectors.

By using scalar multiplication.

By using row vectors for each row.

By using column vectors.

It doubles.

It remains the same.

It becomes the negative of the original determinant.

It becomes zero.

The matrix becomes singular.

The matrix remains unchanged.

The determinant becomes positive.

The matrix becomes invertible.

It is undefined.

It is zero.

It is negative.

It is positive.

Because it makes the matrix invertible.

Because it creates a row of zeros in row reduction.

Because it changes the matrix to a diagonal form.

Because it increases the rank of the matrix.

Duplicate rows make a matrix non-invertible.

Duplicate rows increase the determinant.

Duplicate rows do not affect invertibility.

Duplicate rows make a matrix invertible.

Duplicate rows make the determinant positive.

Duplicate rows have no effect on the determinant.

Duplicate rows increase the determinant.

Duplicate rows result in a zero determinant.

It becomes positive.

It becomes negative.

It becomes zero.

It remains unchanged.

The determinant becomes positive.

The matrix becomes invertible.

The determinant becomes zero.

The matrix becomes singular.