Null Space and One-to-One Transformations

The set of all vectors that satisfy Ax = b

The set of all vectors that satisfy Ax = 0

The set of all vectors that satisfy Ax = I

The set of all vectors that satisfy Ax = A

By solving Ax = I

By solving Ax = 0

By solving Ax = A

By solving Ax = b

The span of vectors that are scalar multiples of free variables

The span of vectors that are scalar multiples of dependent variables

The span of vectors that are scalar multiples of independent variables

The span of vectors that are scalar multiples of constant variables

A particular solution plus a homogeneous solution

A particular solution minus a homogeneous solution

A homogeneous solution plus a particular solution

A homogeneous solution minus a particular solution

It is a specific solution that satisfies Ax = I

It is a specific solution that satisfies Ax = 0

It is a specific solution that satisfies Ax = b

It is a specific solution that satisfies Ax = A

There are multiple solutions to Ax = b for any b

There is at least one solution to Ax = b for any b

There are no solutions to Ax = b for any b

There is at most one solution to Ax = b for any b

The null space must be empty

The null space must be non-trivial

The null space must be trivial

The null space must be infinite

The columns of the matrix are linearly independent

The columns of the matrix are linearly dependent

The columns of the matrix are identical

The columns of the matrix are orthogonal

A matrix is one-to-one if its rank equals the number of columns

A matrix is one-to-one if its rank equals one

A matrix is one-to-one if its rank equals zero

A matrix is one-to-one if its rank equals the number of rows

The zero vector

The columns themselves

The rows themselves

The diagonal elements