Understanding the Kernel of a Matrix Transformation

The set of all vectors that do not change

The set of all input vectors that map to the zero vector

The set of all input vectors that map to themselves

The set of all output vectors

It remains unchanged

Both components change sign

Its x-component changes sign

Its y-component changes sign

(-4,-7)

(4,-7)

(-4,7)

(4,7)

Any vector with a zero y-component

Any vector with a zero x-component

The zero vector

Any vector with equal x and y components

By reflecting the vector (1,1) across the y-axis

By reflecting the vector (1,0) across the y-axis

By reflecting the vector (0,1) across the y-axis

By reflecting the vector (0,0) across the y-axis

The vector (1,0)

The vector (0,-1)

The vector (0,1)

The vector (-1,0)

To determine the determinant of the matrix

To solve the system of equations for the kernel

To find the inverse of the matrix

To find the eigenvalues of the matrix

x is equal to one

x is equal to y

y is equal to zero

x is equal to zero

x equals zero and y equals zero

x equals one and y equals zero

x equals zero and y equals one

x equals one and y equals one

y is equal to one

x is equal to y

x is equal to zero

y is equal to zero