Analyzing Linear Systems and Errors

Calculating eigenvalues

Performing matrix multiplication

Finding the determinant of a matrix

Solving Ax = b for x

The identity matrix

Errors or noise in the system

A matrix of zeros

A scaling factor

A norm that is only applicable to square matrices

A norm that is always less than 1

A norm that satisfies the triangle inequality

A norm that is compatible with both vector and matrix norms

It cannot be used in error analysis

It is only applicable to diagonal matrices

It is compatible with the vector norm that induces the matrix norm

It is always greater than 1

Finding the inverse of the matrix

Calculating the determinant

Defining the vector norm in terms of the matrix norm

Defining the matrix norm

By using the condition number to bound the error

By ignoring the condition number

By assuming the error is zero

By calculating the determinant

The product of the matrix and the solution

The sum of all errors in the system

The difference between the true solution and the computed solution

The inverse of the matrix

The determinant of the matrix

The sensitivity of the system to perturbations

The eigenvalues of the matrix

The rank of the matrix