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Reading Quiz - Work & Energy
1. A woman holds a bowling ball in a fixed position. The work she does on the ball
___ 1. depends on the weight of the ball.
___ 2. cannot be calculated without more
information.___ 3. is equal to zero.
2. A man pushes a very heavy load across a horizontal floor. The work done by gravity on the load___ 1. depends on the weight of the load.___ 2. cannot be calculated without more information.___ 3. is equal to zero.
3. When you do positive work on a
particle, its kinetic energy___ 1. increases.___ 2. decreases.___ 3. remains the same.___ 4. need more information about
the way the work was done
4. The gravitational potential energy of a particle at a height z above Earth’s surface
___ 1. depends on the height z.___ 2. depends on the path taken to
bring the particle to z.___ 3. both 1 and 2.___ 4. is not covered in the reading
assignment.
5. Which of the following is not a
conservative force?___ 1. the force exerted by a spring
on a particle in one dimension___ 2. the force of friction___ 3. the force of gravity___ 4. not covered in the reading
assignment
Work• Work done by a constant force on an object:
where F = magnitude of constant force d = magnitude of the displacement = angle between the force and
displacement vectors
cosW Fd
• Graphical interpretation of work
• Work done by a variable force.
Conceptual Questions1) A box slides through a distance of 3 m on a rough
floor where the force of friction is 10 N. What is the work done on the box?
____ a) 0 N·m
____ b) +30 N·m
____ c) - 30 N·m
____ d) +0.30 N·m
____ e) - 0.30 N·m
2) The moon revolves around the earth in a
circular orbit, kept there by the gravitational force exerted by the earth. Gravity does
___ a) positive work
___ b) negative work
___ c) no work
___ d) variable work
on the moon.
What evidence do you have to support your answer?
3) The figure shows four situations in which a force
acts on a box while the box slides to the right a distance d across a frictionless floor. The magnitudes of the forces are identical. Rank the situations according to the work done on the box during the displacement, from most positive to most negative.
Quantitative Questions1) Find the work done by the force of gravity when
an object of mass m is raised from a height of y meters to a height of y+h meters.
2) A spring is a device where the force it exerts is directly proportional to its displacement from its natural (unstretched) length. The constant of proportionality is called the spring constant k. Draw a graph of the spring force versus its displacement. What is the work done in stretching a spring from its natural length by an amount x?
3) A 280 kg piano slides 4.3 m down a 30 incline and is kept from accelerating by a man who is pushing back on it parallel to the incline. The effective coefficient of kinetic friction is 0.40. Calculate: (a) the force exerted by the man, (b) the work done by the man on the piano, (c) the work done by the friction force, (d) the work done by the force of gravity, and (e) the net work done on the piano.
Energy• Energy - property that gives something the
capacity to do work. Three broad categories:- Kinetic energy- Potential energy- Rest energy
• Kinetic Energy - Energy related to motion: (definition)
• Potential Energy - Energy related to position.
• Rest Energy - Energy by virtue of the mass of an object:
21KE2
mv
2o oE m c
Work-Energy Principle• The net work done on an object is always
equal to the change in its kinetic energy:
• Conservative forces: work done by these forces are independent of path; they depend only on the end points. Examples include gravitation, spring and magnetic forces.
• It is meaningful to define an associated potential energy only for conservative forces.
net f iKE KE KEW
Quantitative Problems1) An automobile traveling 60 km/h can brake
to a stop within a distance of 20 m. If the car is going twice as fast, 120 km/h, what is its stopping distance? The maximum braking force is approximately independent of speed.
2) A 600 gram hammer head strikes a nail at a speed of 4.0 m/s and drives it 5.0 mm into a wooden board. What is the average force on the nail?
3) A crate of mass 10 kg is pulled up a rough
incline with an initial speed of 1.5 m/s. The pulling force is 100 N parallel to the incline, which makes an angle of 20° with the horizontal. If the coefficient of kinetic friction is 0.4, and the crate is pulled a distance of 5 m, (a) how much work is done against gravity? (b) How much work is done against friction? (c) How much work is done by the 100 N force? (d) What is the change in kinetic energy of the crate? (e) What is the speed of the crate after being pulled 5 m?
Potential Energy
• For every conservative force, we can define a potential energy function. The change in the potential energy is equal to the negative of the work done by the conservative force:
• Examples: gravitational PE = mgh elastic PE =
• Note: Cannot define a potential energy function for a non-conservative force.
if i fPE PE W
212
kx
Conservation of Mechanical Energy• Net work done by net force which equals
the vector sum of conservative and non-conservative forces, implying:
• Since , and , the above reduces to: - the general form of the work-energy principle.
• If only conservative forces are acting, or if the work done by the non-conservative forces present is zero, i.e. , then
net C NCW W W
netW KEC
W PE
NCW KE PE
NC0W
0 or i i f fKE PE KE PE KE PE
Conceptual Question Two water slides at a pool are shaped differently but
start at the same height h. Two riders, Paul and Kathleen, start from rest at the same time on different slides.
Which rider, Paul or Kathleen, is travelling faster at the bottom and who gets there first?
___ a) Paul & Paul ___ e) same & Paul
___ b) Paul & Kathleen ___ f) same & Kathleen
___ c) Kathleen & Paul ___ g) Paul & same
___ d) Kathleen & Kathleen ___ h) Kathleen & same
Quantitative Problems1) A small mass m slides without friction along the
looped apparatus show. If the object is to remain on the track, even at the top of the circle (whose radius is r), from what minimum height h must it be released?
2) A roller coaster is pulled up to point A where it is
released from rest. Assuming no friction, calculate the speed at points B, C and D. Now suppose the roller coaster passes point A with a speed of 1.70 m/s. If the average force of friction is equal to one fifth of its weight, with what speed will it reach point B? The distance traveled is 45.0 m.
3) A ball is attached to a horizontal cord of length L
whose other end is fixed. (a) If the ball is released, what will be its speed at the lowest point of its path? (b) A peg is located a distance h directly below the point of attachment of the cord. If h = 0.80L, what will be the speed of the ball when it reaches the top of its circular path about the peg?
4) The figure shows an 8 kg stone at rest on a spring. The spring is compressed 10.0 cm by the stone. (a) What is the spring constant? (b) The stone is pushed down an additional 30.0 cm and released. What is the elastic potential energy of the compressed spring just before that release?
(c) What is the change in the gravitational
potential energy of the stone-Earth system when the stone moves from the release point to its maximum height? (d) What is that maximum height, measured from the release point?
Conservation of Energy; Power• The law of conservation of energy is one of the
most important principles of physics. It states:The total energy is neither increased
nor decreased in any process. Energy can be transformed from one form to another, and transferred from one body to another, but the total amount remains constant.
• Power: rate of doing work (or transforming energy). Hence average power is work (energy transformed)
timeP Fv
Discussion Problems
1) Other than nuclear energy, why do we say the source of all energy comes from the sun? Specifically, what about:
(a) wind energy
(b) hydro-electricity
(c) fossil fuel - coal, wood, oil, gas
(d) food that we eat
2) To accelerate your car at a constant acceleration, the car’s engine must
____ a) maintain a constant power output
____ b) develop ever-decreasing power
____ c) develop ever-increasing power
____ d) maintain a constant turning speed
3) Compared to yesterday, you did 3 times the
work in one-third the time. To do so, your power output must have been
____ a) the same as yesterday’s power output
____ b) one-third of yesterday’s power output
____ c) 3 times yesterday’s power output
____ d) 9 times yesterday’s power output