physics 218 lecture 5
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Physics 218, Lecture V 1
Physics 218Lecture 5
Dr. David Toback
Physics 218, Lecture V 2
Physics 218, Lecture V 3
Chapter 3
• Kinematics in Two Dimensions
• Vectors
Physics 218, Lecture V 4
Overview
• Motion in multiple dimensions• Vectors: (Tools to solve problems)
– Why we care about them– Addition, Subtraction and Multiplication
• Graphical and Component– Unit Vectors
• Projectile Motion (Next lecture)– Problem Solving
Physics 218, Lecture V 5
Why do we care about Vectors?• Last week we worked in one dimension• However, as you may have noticed, the world is
not one-dimensional. • Three dimensions: X, Y and Z. Example:
1. Up from us2. Straight in front of us3. To the side from us
– All at 90 degrees from each other. Three dimensional axis.
– Need a way of saying how much in each direction
For this we use VECTORS
Physics 218, Lecture V 6
Another reason to care about vectors
• It turns out that nature has decided that the directions don’t really care about each other.
• Example: You have a position in X, Y and Z. If you have a non-zero velocity in only the Y direction, then only your Y position changes. The X and Z directions could care less. (I.e, they don’t change).
Represent these ideas with Vectors
Physics 218, Lecture V 7
• Vector notation: – In the book,
variables which are vectors are in bold
– On the overheads, I’ll use an arrow over it
• Vectors are REALLY important
• Kinda like calculus: These are the tools!
First the Math: Vector Notation
v
Some motion represented by vectors. What do these vectors represent
physically?
Physics 218, Lecture V 8
Vector Addition• Why might I need to add vectors?
– If I travel East for 10 km and then North for 4 km, it would be good to know where I am. What is my new position?
• Can think of this graphically or via components
– Graphically:• Lay down first vector (the first
part of my trip)• Lay down second vector (the
second part of the trip) with its tail at the head of the first vector
• The “Sum” is the vector from the tail of the first to the head of the second
First
Second
Sum
Adding vectors is a skill Use this in far more
than just physics
Physics 218, Lecture V 9
Examples without an axis
Physics 218, Lecture V 10
Multiplication
• Multiplication of a vector by a scalar
• Let’s say I travel 1 km east. What if I had gone 4 times as far in the same direction? – Just stretch it out, multiply the magnitudes
• Negatives: – Multiplying by a negative number turns the
vector around
Physics 218, Lecture V 11
Subtraction
• Subtraction is easy: – It’s the same as addition but turning around one
of the vectors. I.e., making a negative vector is the equivalent of making the head the tail and vice versa. Then add:
)V(- V V V 1212
Physics 218, Lecture V 12
The tricky part• We saw that if you travel
East for 10 km and then North for 4 km, you end up with the same displacement as if you traveled in a straight line NorthEast.
• Could think of this the other way: If I had gone NorthEast, it’s the equivalent of having gone both North and East.
My single vector in some funny direction, can be thought of as
two vectors in nice simple directions (like X and Y). This
makes things much easier.
Physics 218, Lecture V 13
Components• This is the tricky part that separates the good
students from the poor students• Break a vector into x and y components (I.e, a
right triangle) THEN add them• This is the sine and cosine game• Can use the Pythagorean Theorem: A2 + B2 = C2
Again, this is a skill. Get good at this!!!
Physics 218, Lecture V 14
Adding Vectors by Components
How do you do it?• First RESOLVE the vector by its
components! Turn one vector into two• V = Vx + Vy
Vx = VcosVy = Vsin
• Careful when using the sin and cos
Physics 218, Lecture V 15
Specifying a Vector
• Two equivalent ways: – Components Vx and Vy
– Magnitude V and angle
• Switch back and forth– Magnitude of V
|V| = (vx2 + vy
2)½
(Pythagorean Theorem)
– Tan = vy /vx
Physics 218, Lecture V 16
Example
What is the magnitude and angle of the displacement in this example?
Physics 218, Lecture V 17
Adding vectors in funny directions• Let’s say I walk in some random direction, then in another different
direction. How do I find my total displacement? • We can draw it
• It would be good to have a better way…
Physics 218, Lecture V 18
Addition using Components
This is the first half of how pros do it: To add two vectors, break both up into their X and Y components, then add separately
2y1yy
2x1xx
21
VVV
VVV
V V V
Magnitudes
Physics 218, Lecture V 19
Drawing the components
Physics 218, Lecture V 20
Unit Vectors
This is how the pros do it!
kV jV iV V
direction z in the means ˆ
directiony in the means ˆ
direction x in the means ˆ
zyx k
j
i
Physics 218, Lecture V 21
Simple Example
What is the displacement using Unit Vectors in this example?
k km 0 j km 5 i km 10 D
k km 0 j km 5 i km 0 D
k km 0 j km 0 i km 10 D
DD D
R
2
1
21R
Physics 218, Lecture V 22
Example: Adding Unit Vectors
12
21
2222
1111
RR RRR R:Calculate
kZ jY iX RkZ jY iX R
Physics 218, Lecture V 23
Mail Carrier and Unit Vectors
A rural mail carrier leaves leaves the post office and drives D1 miles in a Northerly direction to the next town. She then drives in a direction South of East for D2 miles to another town. Using unit vector notation, what is her displacement from the post office?
Physics 218, Lecture V 24
Vector Kinematics Continued
/dt kd /dt jd 0 /dt id used have We
:Note
kV jV iV
kdZ/dt)( jdY/dt)( i(dX/dt)
)/dtkZ jY id(X
/dtRd V
zyx
Physics 218, Lecture V 25
Constant Acceleration
ta v v
ta v v
and
tat v y y
tat v x x
as same theis
ta v v
tat v r R
y0yy
x0xx
2y2
10y0
2x2
10x0
0
221
00
Physics 218, Lecture V 26
Projectile Motion
• This is what all the setup has been for!
• Motion in two dimensions–For now we’ll ignore air friction
Physics 218, Lecture V 27
Projectile Motion
The physics of the universe:
The horizontal and The horizontal and vertical parts of the vertical parts of the
motion behave motion behave independentlyindependently
This is why we use vectors in the first place
Physics 218, Lecture V 28
Ball Dropping
• Analyze Vertical and Horizontal separately!!!
• Ay = g (downwards)
• Ax = 0
– Constant for Both cases!!!
Vx = 0 Vx>0
Physics 218, Lecture V 29
A weird consequence
An object projected horizontally will reach the ground at the same time as an object dropped vertically.
Proof:
Physics 218, Lecture V 30
Rest of this week
• Reading: Finish Chapter 3 if you haven’t already
• Homework: – Finish HW2 and be working on HW3
• Web quiz: If you don’t have ten 100’s yet, I recommend you do so before the exam (coming up!)
• Labs and Recitations: Both meet this week.• Next time: More on kinematics in two
dimensions and vectors
Physics 218, Lecture V 31
A Mail Carrier
A rural mail carrier leaves leaves the post office and drives D1 miles in a Northerly direction to the next town. She then drives in a direction degrees South of East for a distance D2 to another town.
What is the magnitude and angle of her displacement from the post office?
Physics 218, Lecture V 32
Vector stuff
1. Pythagorean theorem: We’ll use this a lot– For a right triangle (90 degrees)
– Length C is the hypotenuse
– A2 + B2 = C2
2. Vector equations
321321
1221
V )V V( )V V( V
V V V V
Physics 218, Lecture V 33
Using all this stuff
k)Z-Z( j)Y-Y( i)X-(X R
RR R
k)ZZ( j)YY( i)X(X R
RR R
kZ jY iX R
kZ jY iX R
121212
12
121212
21
2222
1111
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