4.2 Matrix Operations - cpb-us-w2.wpmucdn.com · Matrix Operations MDM. WARM UP ... W2. 0 8 c) Name...
Transcript of 4.2 Matrix Operations - cpb-us-w2.wpmucdn.com · Matrix Operations MDM. WARM UP ... W2. 0 8 c) Name...
4.2
Matrix Operations
MDM
WARM UP
W1. 2 57 13 3
a) How many rows are there?
b) How many columns are there?
W2. 0 8 c) Name the matrix.
s
OBJECTIVES
Understand how to add and subtract matrices
Understand how to multiply a matrix by a scalar
ADDING MATRICES
Basic Addition
3 + 4 = 7
Basic Matrix Addition
3 15 5
+ 4 62 0
= 7
ADDING MATRICES
Ex:
5 2 41 0 18 6 4
+ 3 3 17 9 82 6 2
= 8 5 5
ADDING MATRICES
Ex:
5 2 41 0 18 6 4
+ 3 3 17 9 82 6 2
= 8 5 58 9 9
ADDING MATRICES
Ex:
5 2 41 0 18 6 4
+ 3 3 17 9 82 6 2
= 8 5 58 9 910 12 6
TRY THESE ON YOUR OWN
1) 11 −20 35 1
+ −1 89 −72 4
2) 10 96 4
-7 51 2
3)129
+ 7 5 48 1 0
ANSWERS
1) 11 −20 35 1
+ −1 89 −72 4
= 10 69 −47 5
2) 10 96 4
-7 51 2
= 3 45 2
ANSWERS
3) 129
+ 7 5 48 1 0
= ?
REQUIREMENTS FOR ADDING/SUBTRACTING
In order to add or subtract matrices, both matrices
MUST have the same number of rows and the
same number of columns.
3x1 and 3x1 2x1 and 2x2
ex: 123
+ 456
ex: 84
-2 11 5
MULTIPLYING BY A SCALAR
A scalar is a number that is multiplied to each
number inside a matrix.
Just like when you dilate a shape by a scale factor
ex: 37 24 30 1
=
3(7) 3(2)3(4) 3(3)3(0) 3(1)
= 21 612 90 3
TRY THESE ON YOUR OWN
ex: 25 −1 32 0 7
ex: 1
2
8 5 4−2 10 612 4 3
TRY THESE ON YOUR OWN
ex: 25 −1 32 0 7
= 10 −2 64 0 14
ex: 1
2
8 5 4−2 10 612 4 3
=
4 2.5 2−1 5 36 2 1.5
OBJECTIVES
Understand how to add and subtract matrices
Understand how to multiply a matrix by a scalar
HOMEWORK
Assignment 4.2
EDPuzzle 4.2