Lesson14: Eigenvalues And Eigenvectors

Lesson 14
Eigenvalues and Eigenvectors

Math 20

October 22, 2007

Announcements
Midterm almost done
Problem Set 5 is on the WS. Due October 24
OH: Mondays 1–2, Tuesdays 3–4, Wednesdays 1–3 (SC 323)
Prob. Sess.: Sundays 6–7 (SC B-10), Tuesdays 1–2 (SC 116)

Geometric eﬀect of a diagonal linear transformation

Example
20
Let A = . Draw the eﬀect of the linear transformation
0 −1
which is multiplication by A.


Example
20
0 −1

y

x


Example
20
0 −1

y

x
e1


Example
20
0 −1

y

x
e1 Ae1


Example
20
0 −1

y

e2

x
e1 Ae1


Example
20
0 −1

y

e2

x
e1 Ae1
Ae2


Example
20
0 −1

y

e2
v

x
e1 Ae1
Ae2


Example
20
0 −1

y

e2
v

x
e1 Ae1
Ae2
Av

Example
Draw the eﬀect of the linear transformation which is multiplication
by A2 .

y

x

Geometric eﬀect of a non-diagonal linear transformation
Example
1/2 3/2
Let B = . Draw the eﬀect of the linear transformation
3/2 1/2
which is multiplication by B.
y

x

Example
1/2 3/2
3/2 1/2
y

x
e1

Example
1/2 3/2
3/2 1/2
y

Be1

x
e1

Example
1/2 3/2
3/2 1/2
y

e2 Be1

x
e1

Example
1/2 3/2
3/2 1/2
y

e2 Be1
Be2
x
e1

Example
1/2 3/2
3/2 1/2
y

e2 Be1
v
Be2
x
e1

Example
1/2 3/2
3/2 1/2
y

e2 Be1
v
Be2
x
e1

Bv

Example
1/2 3/2
3/2 1/2
y

v1
x

Example
1/2 3/2
3/2 1/2
y

Bv1

v1
x

Example
1/2 3/2
3/2 1/2
y

Bv1

v1
x

v2

Example
1/2 3/2
3/2 1/2
y

Bv1
Bv2
v1
x

v2

Example
1/2 3/2
3/2 1/2
y

Bv1
Bv2
v1
x
2e2

v2

Example
1/2 3/2
3/2 1/2
y

2Be2

Bv1
Bv2
v1
x
2e2

v2

The big concept

Deﬁnition
Let A be an n × n matrix. The number λ is called an eigenvalue
of A if there exists a nonzero vector x ∈ Rn such that

Ax = λx. (1)

Every nonzero vector satisfying (1) is called an eigenvector of A
associated with the eigenvalue λ.

Finding the eigenvector(s) corresponding to an eigenvalue

Example (Worksheet Problem 1)
0 −2
Let A = . The number 3 is an eigenvalue for A. Find
−3 1
an eigenvector corresponding to this eigenvalue.


0 −2
−3 1

Solution
We seek x such that

Ax = 3x =⇒ (A − 3I)x = 0.


0 −2
−3 1

Solution
We seek x such that

Ax = 3x =⇒ (A − 3I)x = 0.

−3 −2 0 1 2/3 0
A − 3I 0 =
−3 −2 0 0 00


0 −2
−3 1

Solution
We seek x such that

Ax = 3x =⇒ (A − 3I)x = 0.

−3 −2 0 1 2/3 0
A − 3I 0 =
−3 −2 0 0 00
−2/3 −2
So , or , are possible eigenvectors.
1 3

The number −2 is also an eigenvalue for A. Find an eigenvector.

The number −2 is also an eigenvalue for A. Find an eigenvector.

Solution
We have
2 −2 1 −1
A + 2I = .
−3 3 00
1
is an eigenvector for the eigenvalue −2.
So
1

Summary

To ﬁnd the eigenvector(s) of a matrix corresponding to an
eigenvalue λ, do Gaussian Elimination on A − λI.

Find the eigenvalues of a matrix

Determine the eigenvalues of

−4 −3
A= .
3 6



−4 −3
A= .
3 6

Solution
Ax = λx has a nonzero solution if and only if (A − λI)x = 0 has a
nonzero solution, if and only if A − λI is not invertible.



−4 −3
A= .
3 6

Solution
nonzero solution, if and only if A − λI is not invertible. What
magic number determines whether a matrix is invertible?



−4 −3
A= .
3 6

Solution
magic number determines whether a matrix is invertible? The
determinant!



−4 −3
A= .
3 6

Solution
magic number determines whether a matrix is invertible? The
determinant! So to ﬁnd the possible values λ for which this could
be true, we need to ﬁnd the determinant of A − λI.

−4 − λ −3
det(A − λI) =
6−λ
3
= (−4 − λ)(6 − λ) − (−3)(3)
= (−24 − 2λ + λ2 ) + 9 = λ2 − 2λ − 15
= (λ + 3)(λ − 5)

So λ = −3 and λ = 5 are the eigenvalues for A.

We can ﬁnd the eigenvectors now, based on what we did before.
We have
A + 3I =

We have
−1 −3
A + 3I =
3 9

We have
−1 −3 13
A + 3I =
3 9 00

We have
−1 −3 13
A + 3I =
3 9 00
−3
So is an eigenvector for this eigenvalue.
1

We have
−1 −3 13
A + 3I =
3 9 00
−3
So is an eigenvector for this eigenvalue. Also,
1

A − 5I =

We have
−1 −3 13
A + 3I =
3 9 00
−3
1

−9 −3
A − 5I =
3 1

We have
−1 −3 13
A + 3I =
3 9 00
−3
1

−9 −3 1 1/3
A − 5I =
3 1 0 0

We have
−1 −3 13
A + 3I =
3 9 00
−3
1

−9 −3 1 1/3
A − 5I =
3 1 0 0

−1/3 −1
So or would be an eigenvector for this eigenvalue.
1 3

Summary

To ﬁnd the eigenvalues of a matrix A, ﬁnd the determinant of
A − λI. This will be a polynomial in λ, and its roots are the
eigenvalues.

Find the eigenvalues of

−10 6
A= .
−15 9


−10 6
A= .
−15 9

Solution
The characteristic polynomial is

−10 − λ 6
= (−10−λ)(9−λ)−(−15)(6) = λ2 +λ = λ(λ+1).
−15 9−λ


−10 6
A= .
−15 9

Solution

−10 − λ 6
= (−10−λ)(9−λ)−(−15)(6) = λ2 +λ = λ(λ+1).
−15 9−λ

The eigenvalues are 0 and −1.


−10 6
A= .
−15 9

Solution

−10 − λ 6
= (−10−λ)(9−λ)−(−15)(6) = λ2 +λ = λ(λ+1).
−15 9−λ

3
The eigenvalues are 0 and −1. A set of eigenvectors are and
5
2
.
3

Applications

In a Markov Chain, the steady-state vector is an eigenvector
corresponding to the eigenvalue 1.

Lesson14: Eigenvalues And Eigenvectors

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Lesson14: Eigenvalues And Eigenvectors