Name DateWORKSHEET 3.23: IDENTIFYING CONDITIONS
FOR MULTIPLYING TWO MATRICES
-------------------------------------------------------------------------------------To multiply two matrices, the number of columns in the first matrix must be the same as the
number of rows in the second matrix. (If this is not true, the matrices cannot be multiplied.)
The product of two matrices is a matrix that has the same number of rows as the first matrix
and the same number of columns as the second matrix. This is summarized by the formula:
Am×n×Bn×q=Pm×q.Pis a matrix that represents the product ofA×B.Phasmrows andq
columns.EXAMPLE
Determine ifP, the product ofA×B, can be found. If it can, find the dimensions ofP.
A 2 × 3 ×B 3 × 1 =P 2 × 1 MatrixAhas three columns, which is the same as the number of
rows of MatrixB, therefore the product can be found. The dimensions ofPare 2 × 1.
DIRECTIONS: Use the matrices below to determine if the product of the matrices in each
problem can be found. If the product can be found, find the dimensions of the product. If the
product cannot be found, write ‘‘cannot be multiplied.’’L=
[
34
− 16
]
M=
[
− 34
25
]
C=
[
1
2
]
D=
⎡
⎢
⎣
314
6 − 15
−10 4
⎤
⎥
⎦
- L×M 2. M×L 3. M×C
4. C×M 5. C×D 6. L×C
CHALLENGE:Samantha said that if a matrix has the same number of rows
and columns, it can be multiplied by any other matrix that has an identical
number of rows and columns. Do you agree with her? Explain your
reasoning.133Copyright
©
2011 by Judith A. Muschla, Gary Robert Muschla, and Erin Muschla. All rights reserved.