Matrix Inverses and Systems of Equations

Matrix B times Vector A equals Vector X

Matrix A times Vector X equals Vector B

Vector B times Matrix X equals Matrix A

Vector X times Matrix A equals Vector B

Adding the identity matrix

Multiplying by the transpose of A

Subtracting Vector B

Multiplying by the inverse of A

Original matrix

Zero matrix

Transpose of the matrix

Identity matrix

By adding the identity matrix

By using row operations on an augmented matrix

By multiplying by a scalar

By transposing the matrix

To multiply matrices

To add matrices

To simplify the matrix

To perform row operations

When its determinant is zero

When it has an inverse

When it is a square matrix

When it is a diagonal matrix

The matrix is a diagonal matrix

The matrix is a zero matrix

The matrix is invertible

The matrix is not invertible

The system is dependent

The system is consistent

The coefficient matrix is not invertible

The coefficient matrix is invertible

The equations are inconsistent

The equations are dependent

The equations are consistent

The equations are identical

The system is inconsistent

The equations are multiples of each other

The determinant is non-zero

The coefficient matrix is invertible