vectors and scalars a scalar quantity can be described by a single number, with some meaningful unit...
TRANSCRIPT
![Page 1: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/1.jpg)
Vectors and scalars
• A scalar quantity can be described by a single number, with some meaningful unit
4 oranges
20 miles
5 miles/hour
10 Joules of energy
9 Volts
![Page 2: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/2.jpg)
Vectors and scalars
• A scalar quantity can be described by a single number with some meaningful unit
• A vector quantity has a magnitude and a direction in space, as well as some meaningful unit.
5 miles/hour North
18 Newtons in the “x direction”
50 Volts/meter down
![Page 3: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/3.jpg)
© 2014 John Wiley & Sons, Inc. All rights reserved.
3-1 Vectors and Their Components
The simplest example is a displacement vector If a particle changes position from A to B, we represent
this by a vector arrow pointing from A to B
Figure 3-1
In (a) we see that all three arrows have the same magnitude and direction: they are identical displacement vectors.
In (b) we see that all three paths correspond to the same displacement vector. The vector tells us nothing about the actual path that was taken between A and B.
![Page 4: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/4.jpg)
Vectors and scalars
• A scalar quantity can be described by a single number with some meaningful unit
• A vector quantity has a magnitude and a direction in space, as well as some meaningful unit.
• To establish the direction, you MUST first have a coordinate system!
Standard x-y Cartesian coordinates common
Compass directions (N-E-S-W)
![Page 5: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/5.jpg)
Drawing vectors
• Draw a vector as a line with an arrowhead at its tip.
• The length of the line shows the vector’s magnitude.
• The direction of the line shows the vector’s direction relative to a coordinate system (that should be indicated!)
x
y
z
5 m/sec at 30 degrees from the x axis towards y in the xy plane
![Page 6: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/6.jpg)
Drawing vectors
• Vectors can be identical in magnitude, direction, and units, but start from different places…
![Page 7: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/7.jpg)
Drawing vectors
• Negative vectors refer to direction relative to some standard coordinate already established – not to magnitude.
![Page 8: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/8.jpg)
Adding two vectors graphically
• Two vectors may be added graphically using either the head-to-tail method or the parallelogram method.
![Page 9: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/9.jpg)
Adding two vectors graphically
• Two vectors may be added graphically using either the head-to-tail method or the parallelogram method.
![Page 10: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/10.jpg)
Adding two vectors graphically
![Page 11: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/11.jpg)
© 2014 John Wiley & Sons, Inc. All rights reserved.
3-1 Vectors and Their Components
The vector sum, or resultanto Is the result of performing vector additiono Represents the net displacement of two or more
displacement vectors
o Can be added graphically as shown:
Figure 3-2
Eq. (3-1)
![Page 12: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/12.jpg)
© 2014 John Wiley & Sons, Inc. All rights reserved.
3-1 Vectors and Their Components
Vector addition is commutativeo We can add vectors in any order
Eq. (3-2)
Figure (3-3)
![Page 13: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/13.jpg)
© 2014 John Wiley & Sons, Inc. All rights reserved.
3-1 Vectors and Their Components
Vector addition is associativeo We can group vector addition however we like
Eq. (3-3)
Figure (3-4)
![Page 14: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/14.jpg)
© 2014 John Wiley & Sons, Inc. All rights reserved.
3-1 Vectors and Their Components
A negative sign reverses vector direction
We use this to define vector subtraction
Eq. (3-4)
Figure (3-5)
Figure (3-6)
![Page 15: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/15.jpg)
© 2014 John Wiley & Sons, Inc. All rights reserved.
3-1 Vectors and Their Components
These rules hold for all vectors, whether they represent displacement, velocity, etc.
Only vectors of the same kind can be addedo (distance) + (distance) makes senseo (distance) + (velocity) does not
![Page 16: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/16.jpg)
© 2014 John Wiley & Sons, Inc. All rights reserved.
3-1 Vectors and Their Components
These rules hold for all vectors, whether they represent displacement, velocity, etc.
Only vectors of the same kind can be addedo (distance) + (distance) makes senseo (distance) + (velocity) does not
Answer:
(a) 3 m + 4 m = 7 m (b) 4 m - 3 m = 1 m
![Page 17: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/17.jpg)
Adding more than two vectors graphically
• To add several vectors, use the head-to-tail method.
• The vectors can be added in any order.
![Page 18: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/18.jpg)
Adding more than two vectors graphically—Figure 1.13
• To add several vectors, use the head-to-tail method.
• The vectors can be added in any order.
![Page 19: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/19.jpg)
Subtracting vectors
• Reverse direction, and add normally head-to-tail…
![Page 20: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/20.jpg)
Subtracting vectors
![Page 21: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/21.jpg)
Multiplying a vector by a scalar
• If c is a scalar, the product cA has magnitude |c|A.
![Page 22: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/22.jpg)
Addition of two vectors at right angles
• First add vectors graphically.
• Use trigonometry to find magnitude & direction of sum.
![Page 23: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/23.jpg)
Addition of two vectors at right angles
• Displacement (D) = √(1.002 + 2.002) = 2.24 km
• Direction f = tan-1(2.00/1.00) = 63.4º East of North
![Page 24: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/24.jpg)
Note how the final answer has THREE things!
• Answer: 2.24 km at 63.4 degrees East of North
• Magnitude (with correct sig. figs!)
![Page 25: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/25.jpg)
Note how the final answer has THREE things!
• Answer: 2.24 km at 63.4 degrees East of North
• Magnitude (with correct sig. figs!)
• Units
![Page 26: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/26.jpg)
Note how the final answer has THREE things!
• Answer: 2.24 km at 63.4 degrees East of North• Magnitude (with correct sig. figs!)
• Units
• Direction
![Page 27: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/27.jpg)
Components of a vector
• Represent any vector by an x-component Ax and a y-component Ay.
• Use trigonometry to find the components of a vector: Ax = Acos θ and Ay = Asin θ, where θ is measured from the +x-axis toward the +y-axis.
![Page 28: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/28.jpg)
Positive and negative components
• The components of a vector can be positive or negative numbers.
![Page 29: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/29.jpg)
Finding components
• We can calculate the components of a vector from its magnitude and direction.
![Page 30: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/30.jpg)
© 2014 John Wiley & Sons, Inc. All rights reserved.
3-1 Vectors and Their Components
Components in two dimensions can be found by:
Where θ is the angle the vector makes with the positive x axis, and a is the vector length
The length and angle can also be found if the components are known
![Page 31: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/31.jpg)
© 2014 John Wiley & Sons, Inc. All rights reserved.
3-1 Vectors and Their Components
In the three dimensional case we need more components to specify a vectoro (a,θ,φ) or (a
x,a
y,a
z)
![Page 32: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/32.jpg)
© 2014 John Wiley & Sons, Inc. All rights reserved.
3-1 Vectors and Their Components
In the three dimensional case we need more components to specify a vectoro (a,θ,φ) or (a
x,a
y,a
z)
Answer: choices (c), (d), and (f) show the components properly arranged to form the vector
![Page 33: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/33.jpg)
Calculations using components
• We can use the components of a vector to find its magnitude and direction:
• We can use the components of a set of vectors to find the components of their sum:
2 2 and tan yx y
x
AA A A
A
, x x x x y y y yR A B C R A B C
![Page 34: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/34.jpg)
Adding vectors using their components
![Page 35: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/35.jpg)
Unit vectors
• A unit vector has a magnitude of 1 with no units.
• The unit vector î points in the +x-direction, points in the +y-direction, and points in the +z-direction.
• Any vector can be expressed in terms of its components as A =Axî+ Ay + Az .
j
jk
k
j
jk
k
![Page 36: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/36.jpg)
© 2014 John Wiley & Sons, Inc. All rights reserved.
3-2 Unit Vectors, Adding Vectors by Components
A unit vectoro Has magnitude 1o Has a particular directiono Lacks both dimension and unito Is labeled with a hat: ^
We use a right-handed coordinate systemo Remains right-handed when rotated
![Page 37: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/37.jpg)
© 2014 John Wiley & Sons, Inc. All rights reserved.
3-2 Unit Vectors, Adding Vectors by Components
The quantities axi and a
yj are vector components
The quantities ax and a
y alone are scalar
components
Vectors can be added using components
Eq. (3-9) →
![Page 38: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/38.jpg)
© 2014 John Wiley & Sons, Inc. All rights reserved.
3-2 Unit Vectors, Adding Vectors by Components
To subtract two vectors, we subtract components
Unit Vectors, Adding Vectors by Components
Eq. (3-13)
![Page 39: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/39.jpg)
© 2014 John Wiley & Sons, Inc. All rights reserved.
3-2 Unit Vectors, Adding Vectors by Components
To subtract two vectors, we subtract components
Unit Vectors, Adding Vectors by Components
Answer: (a) positive, positive (b) positive, negative
(c) positive, positive
Eq. (3-13)
![Page 40: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/40.jpg)
© 2014 John Wiley & Sons, Inc. All rights reserved.
3-3 Multiplying Vectors
Multiplying two vectors: the scalar producto Also called the dot producto Results in a scalar, where a and b are magnitudes and φ is
the angle between the directions of the two vectors:
The commutative law applies, and we can do the dot product in component form
Eq. (3-20)
Eq. (3-22)
Eq. (3-23)
![Page 41: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/41.jpg)
© 2014 John Wiley & Sons, Inc. All rights reserved.
3-3 Multiplying Vectors
A dot product is: the product of the magnitude of one vector times the scalar component of the other vector in the direction of the first vector
Eq. (3-21)
Figure (3-18) Either projection of one
vector onto the other can be used
To multiply a vector by the projection, multiply the magnitudes
![Page 42: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/42.jpg)
© 2014 John Wiley & Sons, Inc. All rights reserved.
3-3 Multiplying Vectors
Answer: (a) 90 degrees (b) 0 degrees (c) 180 degrees
![Page 43: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/43.jpg)
The scalar product
The scalar product of two vectors (the “dot product”) is
A · B = ABcosf
![Page 44: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/44.jpg)
The scalar product
The scalar product of two vectors (the “dot product”) is
A · B = ABcosf
![Page 45: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/45.jpg)
The scalar product
The scalar product of two vectors (the “dot product”) is
A · B = ABcosf
Useful for
• Work (energy) required or released as force is applied over a distance (4A)
• Flux of Electric and Magnetic fields moving through surfaces and volumes in space (4B)
![Page 46: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/46.jpg)
Calculating a scalar product
By components, A · B = AxBx + AyBy + AzBz
Example: A = 4.00 m @ 53.0°, B = 5.00 m @ 130°
![Page 47: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/47.jpg)
Calculating a scalar product
By components, A · B = AxBx + AyBy + AzBz
Example: A = 4.00 m @ 53.0°, B = 5.00 m @ 130°
Ax = 4.00 cos 53 = 2.407
Ay = 4.00 sin 53 = 3.195
Bx = 5.00 cos 130 = -3.214
By = 5.00 sin 130 = 3.830
AxBx + AyBy = 4.50 meters
A · B = ABcos = (4.00)(5.00) f cos(130-53) = 4.50 meters2
![Page 48: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/48.jpg)
The vector product
• The vector product (“cross product”) of two vectors has magnitude
and the right-hand rule gives its direction.
| | sin
ABA B
![Page 49: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/49.jpg)
© 2014 John Wiley & Sons, Inc. All rights reserved.
3-3 Cross Products
o The cross product of two vectors with magnitudes a & b, separated by angle φ, produces a vector with magnitude:
And a direction perpendicular to both original vectors
Direction is determined by the right-hand rule Place vectors tail-to-tail, sweep fingers from the first to
the second, and thumb points in the direction of the resultant vector
Eq. (3-24)
![Page 50: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/50.jpg)
© 2014 John Wiley & Sons, Inc. All rights reserved.
3-3 Multiplying Vectors
The upper shows vector a cross vector b, the lower shows vector b cross vector a
Figure (3-19)
![Page 51: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/51.jpg)
The vector product
• The vector product (“cross product”) A x B of two vectors is a vector
• Magnitude = AB sin f• Direction = orthogonal (perpendicular) to A and B,
using the “Right Hand Rule”
A
B
A x B
x
y
z
![Page 52: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/52.jpg)
© 2014 John Wiley & Sons, Inc. All rights reserved.
3-3 Multiplying Vectors
The cross product is not commutative
To evaluate, we distribute over components:
Therefore, by expanding (3-26):
Eq. (3-25)
Eq. (3-26)
Eq. (3-27)
![Page 53: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/53.jpg)
© 2014 John Wiley & Sons, Inc. All rights reserved.
3-3 Multiplying Vectors
![Page 54: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/54.jpg)
© 2014 John Wiley & Sons, Inc. All rights reserved.
3-3 Multiplying Vectors
Answer: (a) 0 degrees (b) 90 degrees
![Page 55: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/55.jpg)
The vector cross product
The cross product of two vectors is
A x B (with magnitude ABsinf)
Useful for
• Torque from a force applied at a distance away from an axle or axis of rotation (4A)
• Calculating dipole moments and forces from Magnetic Fields on moving charges (4B)
![Page 56: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/56.jpg)
© 2014 John Wiley & Sons, Inc. All rights reserved.
3-1 Vectors and Their Components
Angles may be measured in degrees or radians Recall that a full circle is 360˚, or 2π rad
Know the three basic trigonometric functions
Figure (3-11)
![Page 57: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/57.jpg)
© 2014 John Wiley & Sons, Inc. All rights reserved.
3-2 Unit Vectors, Adding Vectors by Components
Vectors are independent of the coordinate system used to measure them
We can rotate the coordinate system, without rotating the vector, and the vector remains the same
All such coordinate systems are equally valid
Figure (3-15)
Eq. (3-15)
Eq. (3-14)
![Page 58: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/58.jpg)
© 2014 John Wiley & Sons, Inc. All rights reserved.
Scalars and Vectors Scalars have magnitude only
Vectors have magnitude and direction
Both have units!
Adding Geometrically Obeys commutative and
associative laws
Unit Vector Notation We can write vectors in terms
of unit vectors
Vector Components Given by
Related back by
Eq. (3-2)
Eq. (3-5)
Eq. (3-7)
3 Summary
Eq. (3-3)
Eq. (3-6)
![Page 59: Vectors and scalars A scalar quantity can be described by a single number, with some meaningful unit 4 oranges 20 miles 5 miles/hour 10 Joules of energy](https://reader038.vdocuments.site/reader038/viewer/2022102818/56649d885503460f94a6df21/html5/thumbnails/59.jpg)
© 2014 John Wiley & Sons, Inc. All rights reserved.
Adding by Components Add component-by-component
Scalar Times a Vector Product is a new vector
Magnitude is multiplied by scalar
Direction is same or opposite
Cross Product Produces a new vector in
perpendicular direction
Direction determined by right-hand rule
Scalar Product Dot product
Eqs. (3-10) - (3-12)
Eq. (3-22)
3 Summary
Eq. (3-20)
Eq. (3-24)