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Work, Energy & Power #1
Biblical Reference
By his power God raised the Lord from the dead, and he will raise us also.
1 Corinthians 6:14
What is Work?• The scientific definition of Work: Using a
force to move an object a certain distance
– The force and the direction of motion must be the same.
• Work comes from the old English word, “Weorc”, which means activity. Units: Joules (J) = N·m
2
2
2))()((
))((
s
kgmm
s
mkg
xmaFxW
Work• Work is important in science because it is
related to energy.• A force that does not make an object move
does no work.
Scalar Dot Product• A product is multiplying 2 numbers.
• A scalar is a quantity with NO DIRECTION.
• Work is the Force times the displacement.
– The result is ENERGY, which has no direction.
A dot product is a constraint on the formula, in which F and x MUST be parallel. To ensure that they are parallel we add the cosine.
xFW
xFxFW
10cos;0
cos
A student with a mass of 80.0 kg runs up three flights of stairs in 12.0 sec. The student has gone a vertical distance of 8.0 m. Determine the amount of work done by the student to elevate her body to this height. Assume that her speed is constant.
Typical Work Problem
Ns
mkgmaF 784)8.9)(80(
2
)(6272)0.8)(784( NmJmNFxW
Why is it important that speed is constant?
Does it matter how long it takes her to go up the stairs?
Positive Work
FORCE
Displacement
xFW
xFxFW
10cos;0
cos
Force & motion are in the same direction.
Negative Work
FORCE
Displacement
xFW
xFxFW
f
1180cos;180
cos
Force opposes motion.
No Work
FORCE
Displacement
JW
xFxFW
0
090cos;90
cos
Force is perpendicular to motion.
• A teacher lecturing to her class?
• A mouse pushing a piece of cheese across the floor with his nose?
Work or Not?
Not Work
Work
The mouse is using a force to push the cheese a certain distance.
The Mouse…
• Pushing a book across a desk?
• Standing still holding a stack of books for an hour?
Work or Not?
Work
Not Work
• Lifting a full backpack 1 meter from the ground?
• Lifting an empty backpack one meter from the ground?
Which is More Work?
Or…
• Lifting a full backpack 10 cm from the ground?
• Lifting a full backpack one meter from the ground?
Which is More Work?
Or…
Forces and Work• The work done on an object depends on the
direction of the force applied and the direction of the motion.
Forces and Work• When the force and the motion are in the
same direction, calculate work by multiplying the force and the distance.
Forces and Work• When the applied force and the motion of the
object are NOT in the same direction, the applied force can be thought of as being two forces acting on the objectat the same time.
Forces and Work• When the applied force and the motion of
the object are NOT in the same direction, only the horizontal part of the applied force is used in the work equation.–The vertical part of the
applied force does no workon the suitcase.
Work
cosxFxFW
• This woman is applying a force at an angle theta.
• Only the Horizontal Component causes the box to move and thus imparts energy to the box.
• The vertical component (FsinQ) does no work on the box because it is not parallel to the displacement.
ExampleIf a man pushes a wheelbarrow 10 m with a force of 20 N, how much work has he done?
Given: F = 20 N, d = 10 m Find: W
200J(20N)(10m)dFW
Lifting Objects
• The work done to lift an object equals the weight of the object multiplied by the distance it is lifted.– Weight = mass x gravity
28.9s
mg
mghW
ExampleHow much work does it take to lift an 8-kg backpack 1.5 meters?
Given: m = 8 kg, d = 1.5 m
Find: W
JW
ms
mkgmghW
118
)5.1)(8.9)(8(2
• We have learned Kinematics and Newton's Laws.
• Let 's apply both to our new formula for work.
The Work Energy Theorem
1. Start with Newton's Second Law
2. Use Kinematic #4
3. KINETIC ENERGY or the ENERGY OF MOTION
)( xamFxW
xaVV if 222
2
22if VV
xa
22
2
1
2
1if mVmVW
2
2
1mVKE
Work and Energy• Doing work on an object transfers energy
to the object.
• This helps scientists predict how an object will act when forces are applied to it.
• Work done when you lift an object also increases the object’s energy.
• Work = The Scalar Product between Force and Displacement.
• If you apply a force on an object and it covers a displacement you have supplied ENERGY or done WORK on that object.
• Energy is the ability to do Work.
There are many different TYPES of Energy.
• If we impart work to an object it will undergo a change in speed and thus a change in Kinetic Energy.
• Since both Work and Kinetic Energy are expressed in Joules, they are Equivalent Terms.
The Work Energy Theorem" The Net Work done on an object is equal to the
change in Kinetic Energy of the object."
ExampleSuppose a woman applies a 50 N force to a 25-kg box (initially at rest) at a 30 angle above the horizontal. She manages to pull the box 5 meters.
a) Calculate the WORK done by the woman on the boxb) The speed of the box after 5 meters if the box started from
rest.
JmNW
xFxFW x
5.216)5)(30cos50(
cos
a)
Is this positive or negative work?
Example
b) 22
2
1
2
1if mVmVW 0iV
s
m
kg
J
m
WV f 2.4
25
)5.216(22
Suppose a woman applies a 50 N force to a 25-kg box (initially at rest) at a 30 angle above the horizontal. She manages to pull the box 5 meters.
a) Calculate the WORK done by the woman on the boxb) The speed of the box after 5 meters if the box started from
rest.
ExampleA 58 kg skier is coasting down a 25° slope. A kinetic frictional force of 70 N opposes her motion. Near the top of the slope, the skier’s initial speed is 3.6 m/s. Ignoring air resistance, determine the final speed of the skier after a displacement of 57 m downhill.
569N25
NmgFN 516cos NFf 70
NmgFS 240sin
Example (Cont’d)
569N25
NmgFN 516cos NFf 70
NmgFS 240sin
Given: m = 58 kg Ff = 70 N Vi = 3.6 m/s x = 57 m
JmNFxW
downhillNNNFnet9717)57)(170(
)(17070240
22
2
1
2
1if mVmVW
s
m
kgs
mkgJ
m
mVWV
i
f 3.1858
))6.3)(58(2
19717(2)
2
1(2 22
ExampleA 1000-kg car traveling with a speed of 25 mls skids to a stop. The car experiences an 8000 N force of friction. Determine the stopping distance of the car.
Js
mkgmVmVW if 500,312)25)(1000(
2
10
2
1
2
1 222
Given: m = 1000 kg Ff = -8000 N Vi = 25 m/s Vf = 0 m/s
mN
J
F
Wx
FxW
3918000
500,312
Suppose you lift a mass upward at a constant speed, v = 0 & DK=0. What does the work equal now?
Lifting mass at a constant speed
Since you are lifting at a constant speed, your Applied Force equals the Weight of the object you are lifting.
Since you are lifting you are raising the object a certain “y” displacement or height above the ground.When you lift an object above the ground it has Potential Energy.
Potential Energy
mg
h
PEmghW
hxmgFxFW
10cos,0
;cos
• Since this man is lifting the package upward at a constant speed, the kinetic energy is not changing.
• The work that he does goes into the Energy of Position or Potential Energy.
• All potential energy is considering to be energy that is stored.
Potential Energy
The man shown lifts a 10 kg package 2 meters above the ground. What is the potential energy given to the package by the man?
)2)(/8.9)(10( 2 msmkgPE
mghPE
196 J
h