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Introduction to Newton’s Laws
Newton’s First Law.
Isaac Newton
Arguably the greatest scientific genius ever.
Came up with 3 Laws of Motion to explain the
observations and analyses of Galileo and Kepler.
Discovered that white light was composed of many
colors all mixed together.
Invented new mathematical techniques such as
calculus and binomial expansion theorem in his
study of physics.
Published his Laws in 1687 in the book
Mathematical Principles of Natural Philosophy.
Newton’s First Law
A body in motion stays in motion at
constant velocity and a body at rest
stays at rest unless acted upon by a
net external force.
This law is commonly referred to as
the Law of Inertia.
What is Force?
A force is a push or pull on an object.
Forces cause an object to
accelerate…



To speed up
To slow down
To change direction
The First Law is Counterintuitive
Aristotle firmly believed this.
Implications of Newton’s 1st Law
If there is zero net force on a body,
it cannot accelerate, and therefore
must move at constant velocity, which
means



it cannot turn,
it cannot speed up,
it cannot slow down.
What is Zero Net Force?
The table pushes up
on the book.
A book rests on a table.
FT
Physics
Gravity pulls down on
the book.
FG
Even though there are forces on the book, they are balanced.
Therefore, there is no net force on the book.
SF = 0
Diagrams
Draw a force diagram and a free body
diagram for a book sitting on a table.
Force Diagram
N
Physics
W
Free Body Diagram
N
W
Sample Problem
A monkey hangs by its tail from a tree
branch. Draw a force diagram
representing all forces on the monkey
FT
FG
Sample Problem
Now the monkey hangs by
both hands from two
vines. Each of the
monkey’s arms are at a
45o from the vertical.
Draw a force diagram
representing all forces
on the monkey.
Fa1
Fa2
FG
Mass and Inertia
Chemists like to define mass as the
amount of “stuff” or “matter” a
substance has.
Physicists define mass as inertia,
which is the ability of a body to
resist acceleration by a net force.
Newton’s Second Law
Newton’s Second Law
A body accelerates when acted upon
by a net external force.
The acceleration is proportional to
the net force and is in the direction
which the net force acts.
Newton’s Second Law
∑F = ma
where ∑F is the net force
measured in Newtons (N)
 m is mass (kg)
 a is acceleration (m/s2)

Units of force
Newton (SI system)

1 N = 1 kg m /s2
1 N is the force required to
accelerate a 1 kg mass at a rate of 1
m/s2
Pound (British system)

1 lb = 1 slug ft /s2
Working 2nd Law Problems
1. Draw a force or free body diagram.
2. Set up 2nd Law equations in each
dimension.
SFx = max and/or
SFy = may
3. Identify numerical data.
x-problem and/or y-problem
4. Substitute numbers into equations.
“plug-n-chug”
5. Solve the equations.
Sample Problem
In a grocery store, you push a 14.5-kg cart with a force of
12.0 N. If the cart starts at rest, how far does it move in 3.00
seconds?
Sample Problem
A catcher stops a 50m/s pitch in his glove, bringing it
to rest in 0.15 m. If the force exerted by the catcher is
803 N, what is the mass of the ball?
Sample Problem
A 747 jetliner lands and begins to slow to a stop as it moves
along the runway. If its mass is 3.50 x 105 kg, its speed is 27.0
m/s, and the net braking force is 4.30 x 105 N
a) What is its speed 7.50 s later?
b) How far has it traveled in this time?
Newton’s Third Law
Newton’s Third Law
For every action there exists an equal
and opposite reaction.
If A exerts a force F on B, then B
exerts a force of -F on A.
Examples of
Newton’s
3rd Law
Copyright James Walker, “Physics”, 1st edition
Sample Problem
You rest an empty glass on a table.
a) How many forces act upon the glass?
b) Identify these forces with a free body diagram.
Sample Problem
A force of magnitude 7.50 N pushes three boxes with masses m1
= 1.30 kg, m2 = 3.20 kg, and m3 = 4.90 kg as shown. Find the
contact force between (a) boxes 1 and 2 and (b) between boxes
2 and 3.
Copyright James Walker, “Physics”, 1st edition
Newton’s Laws in 2D
Newton’s 2nd Law in 2-D
The situation is more complicated when
forces act in more than one dimension.
You must still identify all forces and draw
your force diagram.
You then resolve your problem into an xproblem and a y-problem (just like
projectile motion).
Sample Problem
An object acted on by three forces moves with constant
velocity. One force acting on the object is in the positive x
direction and has a magnitude of 6.5 N; a second force has
a magnitude of 4.4 N and points in the negative y direction.
Find the direction and magnitude of the third force acting
on the object.
Mass and Weight
Mass and Weight
Many people think mass and weight are the
same thing. They are not.
Mass is inertia, or resistance to
acceleration.
Weight can be defined as the force due to
gravitation attraction.
W = mg
Sample Problem
A man weighs 150 pounds on earth at sea level. Calculate
his
a) mass in kg.
b) weight in Newtons.
Apparent weight
If an object subject to gravity is not
in free fall, then there must be a
reaction force to act in opposition to
gravity.
We sometimes refer to this reaction
force as apparent weight.
Elevator rides
When you are in an elevator, your actual
weight (mg) never changes.
You feel lighter or heavier during the
ride because your apparent weight
increases when you are accelerating up,
decreases when you are accelerating
down, and is equal to your weight when
you are not accelerating at all.
Going
Up?
v=0
a=0
v>0
a>0
v>0
a=0
v>0
a<0
Heavy feeling
Normal feeling
Normal feeling
Light feeling
Wapp
Wapp
Wapp
Wapp
W
W
W
W
Ground
floor
Just
starting up
Between
floors
Arriving at
top floor
Going
Down?
v<0
a<0
v=0
a=0
v<0
a>0
v<0
a=0
Heavy feeling
Normal feeling
Normal feeling
Light feeling
Wapp
Wapp
Wapp
Wapp
W
W
W
W
Beginning
descent
Between Arriving at
floors Ground floor
Top
floor
Normal Force
Sample Problem
An 85-kg person is standing on a bathroom scale in an elevator. What
is the person’s apparent weight
a) when the elevator accelerates upward at 2.0 m/s2?
b) when the elevator is moving at constant velocity between floors?
c) when the elevator begins to slow at the top floor at 2.0 m/s2?
Sample Problem
A 5-kg salmon is hanging from a fish scale in an elevator. What is the
salmon’s apparent weight when the elevator is
a) at rest?
b) moving upward and slowing at 3.2 m/s2?
c) moving downward and speeding up at 3.2 m/s2?
d) moving upward and speeding up at 3.2 m/s2?
Normal force
The normal force is a force that keeps one
object from penetrating into another
object.
The normal force is always perpendicular a
surface.
The normal exactly cancels out the
components of all applied forces that are
perpendicular to a surface.
Normal force on flat surface
The normal force is equal to the weight of an
object for objects resting on horizontal
surfaces.
N = W = mg
N
mg
Normal force on ramp
N = mgcos
N
mgsin
mg

The normal force is
perpendicular to
angled ramps as well.
It’s always equal to
the component of
weight perpendicular
to the surface.
mgcos

Sample Problem
How long will it take a 1.0 kg block initially at rest to slide
down a frictionless 20.0 m long ramp that is at a 15o angle
with the horizontal?
Normal force not associated
with weight.
A normal force can be totally
unrelated to the weight of an object.
applied force
normal
friction
weight
N = applied force
Sample problem
A 5.0-kg bag of potatoes sits on the bottom of a stationary
shopping cart. Sketch a free-body diagram for the bag of
potatoes. Now suppose the cart moves with a constant velocity.
How does this affect the free-body diagram?
More on the Normal Force
Sample problem
a)
b)
Find the normal force exerted on a 2.5-kg book resting on a
surface inclined at 28o above the horizontal.
If the angle of the incline is reduced, do you expect the
normal force to increase, decrease, or stay the same?
Sample problem
A gardener mows a lawn with an old-fashioned push
mower. The handle of the mower makes an angle of 320
with the surface of the lawn. If a 249 N force is applied
along the handle of the 21-kg mower, what is the normal
force exerted by the lawn on the mower?
Sample problem
Larry pushes a 200 kg block on a frictionless floor at a 45o
angle below the horizontal with a force of 150 N while Moe
pulls the same block horizontally with a force of 120 N.
a) Draw a free body diagram.
b) What is the acceleration of the block?
c) What is the normal force exerted on the block?