Function rank, Function rank ,11-11, Dc c – HP 50g Graphing Calculator User Manual

Page 11-11

Try the following exercise for matrix condition number on matrix A33. The
condition number is COND(A33) , row norm, and column norm for A33 are
shown to the left. The corresponding numbers for the inverse matrix, INV(A33),
are shown to the right:

Since RNRM(A33) > CNRM(A33), then we take ||A33|| = RNRM(A33) =
21. Also, since CNRM(INV(A33)) < RNRM(INV(A33)), then we take
||INV(A33)|| = CNRM(INV(A33)) = 0.261044... Thus, the condition
number is also calculated as CNRM(A33)*CNRM(INV(A33)) = COND(A33) =
6.7871485…

Function RANK

Function RANK determines the rank of a square matrix. Try the following
examples:

The rank of a matrix
The rank of a square matrix is the maximum number of linearly independent
rows or columns that the matrix contains. Suppose that you write a square
matrix A

n

×n

as A = [c

1

c

2

… c

n

], where c

i

(i = 1, 2, …, n) are vectors

representing the columns of the matrix A, then, if any of those columns, say c

k

,

can be written as

,

}

,...,

2

,

1

{

,

∑

∈

≠

⋅

=

n

j

k

j

j

j

k

d

c

c