Understanding the Gram-Schmidt Process

To determine the inverse of a matrix

To solve a system of linear equations

To find a linearly dependent set of vectors

To compute an orthogonal basis for R3

Vector v3

Vector v2

Vector u2

Vector v1

By adding vector v2 and vector u1

By subtracting a scalar multiple of vector u1 from vector v2

By multiplying vector v2 by a constant

By dividing vector v2 by vector u1

1

2

3

0

Vector 1 1 0

Vector 0 0 1

Vector 1 1 1

Vector 3 1 1

Matrix inversion

Dot product calculation

Matrix multiplication

Cross product calculation

Different from the scalar for vector u2

Zero

One

The same as for vector u2

Vector 1 1 0

Vector 0 0 1

Vector 3 1 1

Vector 1 -1 0

The vectors are orthogonal

The vectors are linearly dependent

The vectors are identical

The vectors are parallel

It has the same span as the original vectors but is orthogonal

It is not useful for any applications

It is a subset of the original vectors

It has a different span than the original vectors