11.3 The Dot Product of Two Vectors. The dot product of u and v in the plane is The dot product of u...
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Transcript of 11.3 The Dot Product of Two Vectors. The dot product of u and v in the plane is The dot product of u...
![Page 1: 11.3 The Dot Product of Two Vectors. The dot product of u and v in the plane is The dot product of u and v in space is Two vectors u and v are orthogonal.](https://reader036.fdocuments.net/reader036/viewer/2022080915/56649d925503460f94a7885e/html5/thumbnails/1.jpg)
11.3 The Dot Product of Two Vectors
![Page 2: 11.3 The Dot Product of Two Vectors. The dot product of u and v in the plane is The dot product of u and v in space is Two vectors u and v are orthogonal.](https://reader036.fdocuments.net/reader036/viewer/2022080915/56649d925503460f94a7885e/html5/thumbnails/2.jpg)
1 2 1 2Let , , , .u u v v u v
1 1 2 2u v u v u v
1 1 2 2 3 3u v u v u v u v
The dot product of u and v in the plane is
The dot product of u and v in space is
Two vectors u and v are orthogonal if they meet at a right angle. if and only if u ∙ v = 0 (since slopes are opposite reciprocal)
(Read “u dot v”)
Definitions
![Page 3: 11.3 The Dot Product of Two Vectors. The dot product of u and v in the plane is The dot product of u and v in space is Two vectors u and v are orthogonal.](https://reader036.fdocuments.net/reader036/viewer/2022080915/56649d925503460f94a7885e/html5/thumbnails/3.jpg)
3,4 5,2 3 5 4 2 23
2, 3 3,2 2 3 3 2 0
Examples
![Page 4: 11.3 The Dot Product of Two Vectors. The dot product of u and v in the plane is The dot product of u and v in space is Two vectors u and v are orthogonal.](https://reader036.fdocuments.net/reader036/viewer/2022080915/56649d925503460f94a7885e/html5/thumbnails/4.jpg)
Let , , be vectorsu v w
2
1.
2. ( )
3. ( )
4. 0
5.
c c c
u v v u
u v w u v u w
u v u v u v
0 v
v v v
cos u v u vAnother form of the Dot Product:
where is the angle between two nonzero vectors and . u v
Properties
![Page 5: 11.3 The Dot Product of Two Vectors. The dot product of u and v in the plane is The dot product of u and v in space is Two vectors u and v are orthogonal.](https://reader036.fdocuments.net/reader036/viewer/2022080915/56649d925503460f94a7885e/html5/thumbnails/5.jpg)
Find the angle between vectors u and v:
2,3 , 2,5 u v
1cos
u v
u v1 11
cos13 29
55.5
Examples
![Page 6: 11.3 The Dot Product of Two Vectors. The dot product of u and v in the plane is The dot product of u and v in space is Two vectors u and v are orthogonal.](https://reader036.fdocuments.net/reader036/viewer/2022080915/56649d925503460f94a7885e/html5/thumbnails/6.jpg)
Angles between a vector v and 3 unit vectors i, j and k are called direction angles of v, denoted by α, β, and γ respectively. Since
1 2 3 1 cos , , 1,0,0v v v v v i v
31 2cos cos cosvv v
v v v
we obtain the following 3 direction cosines of v:
So any vector v has the normalized form:
cos cos cos v
i j kv
Direction Cosines
![Page 7: 11.3 The Dot Product of Two Vectors. The dot product of u and v in the plane is The dot product of u and v in space is Two vectors u and v are orthogonal.](https://reader036.fdocuments.net/reader036/viewer/2022080915/56649d925503460f94a7885e/html5/thumbnails/7.jpg)
1 2v
u vproj v
v
2 1
w u
w = u - w
Let u and v be nonzero vectors. w1 is called the vector component of u along v
(or projection of u onto v), and is denoted by projvu w2 is called the vector component of u orthogonal to v
w2 w1
u
v
Vector Components
![Page 8: 11.3 The Dot Product of Two Vectors. The dot product of u and v in the plane is The dot product of u and v in space is Two vectors u and v are orthogonal.](https://reader036.fdocuments.net/reader036/viewer/2022080915/56649d925503460f94a7885e/html5/thumbnails/8.jpg)
A Boeing 727 airplane, flying due east at 500mph in still air, encounters a 70-mph tail wind acting in the direction of 60o north of east. The airplane holds its compass heading due east but, because of the wind, acquires a new ground speed and direction. What are they?
N
E
Application
![Page 9: 11.3 The Dot Product of Two Vectors. The dot product of u and v in the plane is The dot product of u and v in space is Two vectors u and v are orthogonal.](https://reader036.fdocuments.net/reader036/viewer/2022080915/56649d925503460f94a7885e/html5/thumbnails/9.jpg)
A Boeing 727 airplane, flying due east at 500mph in still air, encounters a 70-mph tail wind acting in the direction of 60o north of east. The airplane holds its compass heading due east but, because of the wind, acquires a new ground speed and direction. What are they?
N
Eu
![Page 10: 11.3 The Dot Product of Two Vectors. The dot product of u and v in the plane is The dot product of u and v in space is Two vectors u and v are orthogonal.](https://reader036.fdocuments.net/reader036/viewer/2022080915/56649d925503460f94a7885e/html5/thumbnails/10.jpg)
A Boeing 727 airplane, flying due east at 500mph in still air, encounters a 70-mph tail wind acting in the direction of 60o north of east. The airplane holds its compass heading due east but, because of the wind, acquires a new ground speed and direction. What are they?
N
E
v
u
60o
![Page 11: 11.3 The Dot Product of Two Vectors. The dot product of u and v in the plane is The dot product of u and v in space is Two vectors u and v are orthogonal.](https://reader036.fdocuments.net/reader036/viewer/2022080915/56649d925503460f94a7885e/html5/thumbnails/11.jpg)
A Boeing 727 airplane, flying due east at 500mph in still air, encounters a 70-mph tail wind acting in the direction of 60o north of east. The airplane holds its compass heading due east but, because of the wind, acquires a new ground speed and direction. What are they?
N
E
v
u
We need to find the magnitude and direction of the resultant vector u + v.
u+v
![Page 12: 11.3 The Dot Product of Two Vectors. The dot product of u and v in the plane is The dot product of u and v in space is Two vectors u and v are orthogonal.](https://reader036.fdocuments.net/reader036/viewer/2022080915/56649d925503460f94a7885e/html5/thumbnails/12.jpg)
N
E
v
u
The component forms of u and v are:
u+v
500,0u
70cos60 ,70sin 60v
500
70
35,35 3v
Therefore: 535,35 3 u v
538.4 22535 35 3 u v
and: 1 35 3tan
535 6.5
![Page 13: 11.3 The Dot Product of Two Vectors. The dot product of u and v in the plane is The dot product of u and v in space is Two vectors u and v are orthogonal.](https://reader036.fdocuments.net/reader036/viewer/2022080915/56649d925503460f94a7885e/html5/thumbnails/13.jpg)
N
E
The new ground speed of the airplane is about 538.4 mph, and its new direction is about 6.5o north of east.
538.4
6.5o
![Page 14: 11.3 The Dot Product of Two Vectors. The dot product of u and v in the plane is The dot product of u and v in space is Two vectors u and v are orthogonal.](https://reader036.fdocuments.net/reader036/viewer/2022080915/56649d925503460f94a7885e/html5/thumbnails/14.jpg)
1) Compute
1,7, 2 , 2, 2,6 , 1, 1,3 u v w
( ) u v w
u v u w2) Compute
4) Find the angle between vectors v and w.
3) List pairs of orthogonal and/or parallel vectors.
6) Find the projection of w onto u.
5) Find the unit vector in the direction u.
7) Find vector component of w orthogonal to u.
Examples