Eigenvalues of a symmetric real matrix, Keystrokes display – HP 15c User Manual

Section 4: Using Matrix Operations

125

These estimates agree (to within 3 in the ninth significant digit) with the results of the
preceding example, which uses the normal equations. In addition, you can include additional
data and update the parameter estimates. For example, add this data from 1968: CPI = 4.2,
PPI = 2.5 and UR = 3.6.

Keystrokes

Display

1

A

1.000000000

Enters row weight for new row.

1

¦

2.000000000

Enters x

12,1

.

2.5

¦

3.000000000

Enters x

12,2

.

3.6

¦

4.000000000

Enters x

12,3

.

4.2

¦

1.000000000

Enters y

12

.

B

1.000000000

Updates factorization.

C

3.700256908

|x

13.691900119

Calculates residual sum of
squares.

lC

1.581596327

Displays

)

12

(

1

b

.

lC

0.373826487

Displays

)

12

(

2

b

.

lC

0.370971848

Displays

)

12

(

3

b

.

´•4

0.3710

´U

0.3710

Deactivates User mode.

Eigenvalues of a Symmetric Real Matrix

The eigenvalues of a square matrix A are the roots λj of its characteristic equation

det(A − λI) = 0.

When A is real and symmetric (A = A

T

) its eigenvalues λj are all real and possess orthogonal

eigenvectors q

j

. Then

Aq

j

= λ

j

q

j

and













.

1

0

k

j

if

k

j

if

k

T

j

q

q

The eigenvectors (q

1

, q

2

,…) constitute the columns of an orthogonal matrix Q which satisfies

Q

T

AQ = diag(λ

1

, λ

2

, …)

and

Q

T

= Q

−1

.