Vectors
© Department of Physics, University of Guelph
© Department of Physics, University of Guelph
In this tutorial we will examine some of the elementary ideas concerning
vectors.
The reason for this introduction to vectors is that many concepts in
science,
for
example, displacement, velocity, force, acceleration, have a size or magnitude,
but
also they have associated with them the idea of a direction. And it is
obviously
more convenient to represent both quantities by just one symbol. That is the
vector.
Graphically, a vector is represented by an arrow, defining the direction, and
the
length of the arrow defines the vector's magnitude. This is shown in Panel 1.
. If we denote one end of the arrow by the origin O and the tip of the
arrow by Q. Then the
vector may be represented algebraically by  .
|
Panel 1 |
This is often simplified to just 
. The line and
arrow above the Q are there
to
indicate that the symbol represents a vector. Another notation is
boldface type as:Q.
Note, that since a direction is implied, 
.
Even
though their lengths are
identical, their directions are exactly opposite, in fact OQ =
-QO.
The magnitude of a vector is denoted by absolute value signs around the vector symbol: magnitude of Q = |Q|.
The operation of addition, subtraction and multiplication of ordinary algebra can be extended to vectors with some new definitions and a few new rules. There are two fundamental definitions.
#1 Two vectors,A and B are equal
if they have the same magnitude
and direction, regardless of whether they have the same initial points, as shown
in Panel 2. |
Panel 2 |
|
#2 A vector having the same magnitude as A but in the opposite
direction
to A is denoted by -A , as shown in
Panel 3.
|
Panel 3 |
We can now define vector addition. The sum of two vectors, A and
B, is a vector C, which is obtained by
placing the initial point
of
B on the final point of A, and then
drawing a line from the
initial point of A to the final point of B , as illustrated
in
Panel 4.
|
Panel 4 |
The operation of vector addition as described here can be written as C = A + B
This would be a good place to try this simulation on the graphical
addition of vectors. Use the "BACK" buttion to return to this
point.
Vector subtraction is defined in the following way. The difference of two
vectors,
A - B , is a vector C ,
C = A - B
or C = A + (-B).Thus vector subtraction can be
represented as a
vector addition.
| The graphical representation is shown in Panel 5. Inspection of the graphical representation shows that we place the initial point of the vector -B on the final point the vector A , and then draw a line from the initial point of A to the final point of -B. |
Panel 5 |
Any quantity which has a magnitude but no direction associated with it is called
a
"scalar". For example, speed, mass and temperature.
The product of a scalar, m say, times a vector A , is another
vector,
B, where B has the same direction as
A but
|B| = m|A|.
As was stated earlier, many of the laws of ordinary algebra hold also for
vector
algebra. These laws are:
Commutative Law for Addition: A + B = B + A
Associative Law for Addition: A + (B + C) = (A + B) + C
| The verification of the latter law is shown in Panel 6. |
Panel 6 |
If we add A and B we get a vector E. And similarly if B is added to C , we get F . Now D = E + C = A + F. Replacing E with (A + B) and F with (B + C), we get (A +B) + C = A + (B + C) and we see that the law is verified.
Stop now and make sure that you follow the above proof.
Commutative Law for Multiplication: mA = Am
Associative Law for Multiplication: (m + n)A = mA + nA, where m and n are two different scalars.
Distributive Law: m(A + B) = mA + mB
These laws allow the manipulation of vector quantities in much the same way as ordinary algebraic equations.
Vectors can be related to the basic coordinate systems which we use by the
introduction of what we call unit vectors.
A unit vector is one which has a magnitude of 1 and is often indicated by
putting a
hat on top of the vector symbol, for example 
.
is read as "a hat" or "a unit".
|
Let us consider the two-dimensional Cartesian Coordinate System, as shown
in Panel 7. |
Panel 7 |
We can define a unit vector in the x-direction by  or it is sometimes
denoted by  . Similarly in the y-direction we use  or sometimes
 . Any two-dimensional vector can now be represented by employing multiples
of the unit vectors, and , as illustrated in Panel 8.
|
Panel 8 |
The vector A can be represented algebraically by
A = Ax + Ay. Where Ax and
Ay are vectors in the x and y directions. If
Ax and Ay are the magnitudes of Ax
and Ay,
then 
and 
are the vector components of A
in the x and y directions respectively.
| The actual operation implied by this is shown in Panel 9. |
Panel 9 |
The breaking up of a vector into it's component parts is known as
resolving a
vector. Notice that the representation of A by it's components,
and 
is not unique. Depending on the
orientation of the coordinate system with respect to the vector in question, it
is possible to have more than one set of components.
It is perhaps easier to understand this by having a look at an example.
|
Consider an object of mass, M, placed on a smooth inclined plane, as
shown in Panel 10
. The gravitational force acting on the object is F = mg where g is the acceleration due to gravity. |
Panel 10 |
In the unprimed coordinate system, the vector F can be written as
,
but in the primed coordinate system 
. Which representation to use will
depend on the particular problem that you are faced with.
For example, if you wish to determine the acceleration of the block down the
plane,
then you will need the component of the force which acts down the plane. That
is,
which would be equal to the mass times the
acceleration.
The breaking up of a vector into it's components, makes the determination of the
length of the vector quite simple and straight forward.
Since 
then using Pythagorus' Theorem 
.
For example 
.
The resolution of a vector into it's components can be used in the addition and
subtraction of vectors.
|
By resolving each of these three vectors into their components we see that the
result is Panel 11.
Dx = Ax + Bx + Cx Dy = Ay + By + Cy |
Panel 11 |
Now you should use this simulation to study the very important topic of
the algebraic
addition of vectors. Use the "BACK" buttion to return to this
point.
Very often in vector problems you will know the length, that is, the magnitude of the vector and you will also know the direction of the vector. From these you will need to calculate the Cartesian components, that is, the x and y components.
The situation is illustrated in Panel 12. Let us assume that the
magnitude of A and the angle
are given; what we wish to know is, what are Ax and
Ay?
|
Panel 12 |
From elementary trigonometry we have, that cos = Ax/|A| therefore
Ax = |A| cos , and similarly
Ay = |A|
cos(90 - ) = |A| sin .
Until now, we have discussed vectors in terms of a Cartesian, that is, an x-y
coordinate system. Any of the vectors used in this frame of reference
were directed along, or referred to,
the coordinate axes. However there is another coordinate system which is very
often encountered and that is the Polar Coordinate System.
|
In Polar coordinates one specifies the length of the line and it's orientation
with respect to some fixed line. In Panel 13, the position
of the dot is specified by it's distance from the origin, that is r, and the
position of the line is at some angle ,
from a fixed line as indicated. The quantities r and
are known as the Polar Coordinates of the point.
|
Panel 13 |
It is possible to define fundamental unit vectors in the Polar Coordinate system in
much the same way as for Cartesian coordinates. We require that the unit
vectors be perpendicular to one another, and that one unit vector be in the
direction of increasing r, and that the other is in the direction of increasing
.
In Panel 14, we have drawn these two unit vectors with the
symbols  and  .
It is clear that there must be a relation between these unit vectors and those
of the Cartesian system.
|
Panel 14 |
| These relationships are given in Panel 15. |
Panel 15 |
The multiplication of two vectors, is not uniquely defined, in the sense that
there is a question as to whether the product will be a vector or not. For this
reason there are two types of vector multiplication.
First, the scalar or dot product of two vectors, which results in a scalar.
And secondly, the vector or cross product of two vectors, which results in a vector.
In this tutorial we shall discuss only the scalar or dot product.
| The scalar product of two vectors, A and B denoted by A·B, is defined as the product of the magnitudes of the vectors times the cosine of the angle between them, as illustrated in Panel 16. |
Panel 16 |
The laws for scalar products are given in the following list, 
.
And in particular we have 
, since the angle
between a vector and itself is 0 and the cosine of 0 is 1.
Alternatively, we have 
, since the angle between and
is 90º and the cosine of
90º is 0.
In general then, if A·B = 0 and neither the magnitude of A nor B is 0, then A and B must be perpendicular.
The definition of the scalar product given earlier, required a knowledge of the
magnitude of A and B , as well
as the angle of the two vectors.
If we are given the vectors in terms of a Cartesian representation, that is, in
terms of and , we can use
the information to work out the scalar
product, without having to determine the angle between the vectors.
If, 
,
then 
.
Because the other terms involved, 
, as we
saw earlier, are equal to zero.
Let us do an example. Consider two vectors, 
and
. Now what is the angle between these two vectors?
From the definition of scalar products we have 
.
But 
.
This concludes our survey of the elementary properties of vectors, we have
concentrated on fundamentals and have restricted ourselves to the discussion of
vectors in just two dimensions. Nevertheless, a sound grasp of the ideas
presented in this tutorial are absolutely essential for further progress in
vector analysis.
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