Learning about matrix multiplication

Solving quadratic equations

Determining the eigenvalues and eigenvectors of a matrix

Understanding complex numbers

A variable

A scalar

A constant matrix

A differential operator

To adapt the method for vector-valued functions

To simplify the matrix

To find a particular solution

To eliminate complex numbers

A constant that satisfies a differential equation

A matrix that satisfies a vector equation

A scalar that satisfies a matrix equation

A vector that satisfies a matrix equation

By computing the trace of the matrix

By setting the determinant of (A - λI) to zero

By solving a linear equation

By finding the inverse of the matrix

n

n-1

2n

n+1

Calculating the trace of the matrix

Solving a quadratic equation

Writing the difference of A and λI times vector v equals zero

Finding the inverse of the matrix

The presence of a row of zeros in the reduced row echelon form

The matrix is invertible

The determinant is non-zero

The eigenvalue is complex

The eigenvalue is the sum of the eigenvector components

The eigenvalue is a scalar multiple of the eigenvector

The eigenvalue is the inverse of the eigenvector

The eigenvalue is unrelated to the eigenvector

Distinct real, complex, and repeated

Real, imaginary, and complex

Rational, irrational, and transcendental

Positive, negative, and zero