Matrix Operations and Properties

All elements must be integers.

The matrix must be symmetric.

The first non-zero element in each row must be a one.

The matrix must be square.

It is always a zero matrix.

It is equal to the identity matrix.

It is always singular.

It has no leading entries.

To increase the determinant of the matrix.

To make all elements in row three equal.

To obtain a zero in a specific position.

To make row three identical to row two.

To increase the number of leading ones.

To make row two identical to row one.

To make all elements in row two zero.

To simplify the row by reducing common factors.

The row becomes zero, one, one.

The row becomes one, zero, zero.

The row becomes zero.

The row becomes the identity row.

It is a requirement for reduced row echelon form.

It indicates the matrix is invertible.

It means the matrix is singular.

It shows the matrix is diagonal.

The matrix is symmetric.

The matrix is diagonal.

The matrix is singular.

The matrix is invertible.

Subtracting row three from row one.

Adding row two to row one.

Replacing row one with negative 1/10 times row one.

Multiplying row one by 1/10.

By multiplying row three by 13.

By adding row two to row three.

By subtracting row two from row three.

By replacing row three with negative 13 times row three plus row two.

The matrix is in reduced row echelon form.

The matrix is invertible.

The matrix is symmetric.

The matrix is singular.