8 Potential Energy and Conservation of Energy

8 Chapter Review

Key Terms

conservative force
force that does work independent of path
conserved quantity
one that cannot be created or destroyed, but may be transformed between different forms of itself
energy conservation
total energy of an isolated system is constant
equilibrium point
position where the assumed conservative, net force on a particle, given by the slope of its potential energy curve, is zero
exact differential
is the total differential of a function and requires the use of partial derivatives if the function involves more than one dimension
mechanical energy
sum of the kinetic and potential energies
non-conservative force
force that does work that depends on path
non-renewable
energy source that is not renewable, but is depleted by human consumption
potential energy
function of position, energy possessed by an object relative to the system considered
potential energy diagram
graph of a particle’s potential energy as a function of position
potential energy difference
negative of the work done acting between two points in space
renewable
energy source that is replenished by natural processes, over human time scales
turning point
position where the velocity of a particle, in one-dimensional motion, changes sign

Key Equations

Difference of potential energy [latex]\Delta {U}_{AB}={U}_{B}-{U}_{A}=\text{−}{W}_{AB}[/latex]
Potential energy with respect to zero of

potential energy at

[latex]{\mathbf{\overset{\to }{r}}}_{0}\Delta U=U(\mathbf{\overset{\to }{r}})-U({\mathbf{\overset{\to }{r}}}_{0})[/latex]
Gravitational potential energy near Earth’s surface [latex]U(y)=mgy+\text{const}.[/latex]
Potential energy for an ideal spring [latex]U(x)=\frac{1}{2}k{x}^{2}+\text{const}.[/latex]
Work done by conservative force over a closed path [latex]{W}_{\text{closed path}}=\oint {\mathbf{\overset{\to }{E}}}_{\text{cons}}\cdot d\mathbf{\overset{\to }{r}}=0[/latex]
Condition for conservative force in two dimensions [latex](\frac{d{F}_{x}}{dy})=(\frac{d{F}_{y}}{dx})[/latex]
Conservative force is the negative derivative of potential energy [latex]{F}_{l}=-\frac{dU}{dl}[/latex]
Conservation of energy with no
non-conservative forces
[latex]0={W}_{nc,AB}=\Delta {(K+U)}_{AB}=\Delta {E}_{AB}.[/latex]

Summary

8.1 Potential Energy of a System

  • For a single-particle system, the difference of potential energy is the opposite of the work done by the forces acting on the particle as it moves from one position to another.
  • Since only differences of potential energy are physically meaningful, the zero of the potential energy function can be chosen at a convenient location.
  • The potential energies for Earth’s constant gravity, near its surface, and for a Hooke’s law force are linear and quadratic functions of position, respectively.

8.2 Conservative and Non-Conservative Forces

  • A conservative force is one for which the work done is independent of path. Equivalently, a force is conservative if the work done over any closed path is zero.
  • A non-conservative force is one for which the work done depends on the path.
  • For a conservative force, the infinitesimal work is an exact differential. This implies conditions on the derivatives of the force’s components.
  • The component of a conservative force, in a particular direction, equals the negative of the derivative of the potential energy for that force, with respect to a displacement in that direction.

8.3 Conservation of Energy

  • A conserved quantity is a physical property that stays constant regardless of the path taken.
  • A form of the work-energy theorem says that the change in the mechanical energy of a particle equals the work done on it by non-conservative forces.
  • If non-conservative forces do no work and there are no external forces, the mechanical energy of a particle stays constant. This is a statement of the conservation of mechanical energy and there is no change in the total mechanical energy.
  • For one-dimensional particle motion, in which the mechanical energy is constant and the potential energy is known, the particle’s position, as a function of time, can be found by evaluating an integral that is derived from the conservation of mechanical energy.

8.4 Potential Energy Diagrams and Stability

  • Interpreting a one-dimensional potential energy diagram allows you to obtain qualitative, and some quantitative, information about the motion of a particle.
  • At a turning point, the potential energy equals the mechanical energy and the kinetic energy is zero, indicating that the direction of the velocity reverses there.
  • The negative of the slope of the potential energy curve, for a particle, equals the one-dimensional component of the conservative force on the particle. At an equilibrium point, the slope is zero and is a stable (unstable) equilibrium for a potential energy minimum (maximum).

8.5 Sources of Energy

  • Energy can be transferred from one system to another and transformed or converted from one type into another. Some of the basic types of energy are kinetic, potential, thermal, and electromagnetic.
  • Renewable energy sources are those that are replenished by ongoing natural processes, over human time scales. Examples are wind, water, geothermal, and solar power.
  • Non-renewable energy sources are those that are depleted by consumption, over human time scales. Examples are fossil fuel and nuclear power.

Conceptual Questions

8.1 Potential Energy of a System

1.

The kinetic energy of a system must always be positive or zero. Explain whether this is true for the potential energy of a system.

2.

The force exerted by a diving board is conservative, provided the internal friction is negligible. Assuming friction is negligible, describe changes in the potential energy of a diving board as a swimmer drives from it, starting just before the swimmer steps on the board until just after his feet leave it.

3.

Describe the gravitational potential energy transfers and transformations for a javelin, starting from the point at which an athlete picks up the javelin and ending when the javelin is stuck into the ground after being thrown.

4.

A couple of soccer balls of equal mass are kicked off the ground at the same speed but at different angles. Soccer ball A is kicked off at an angle slightly above the horizontal, whereas ball B is kicked slightly below the vertical. How do each of the following compare for ball A and ball B? (a) The initial kinetic energy and (b) the change in gravitational potential energy from the ground to the highest point? If the energy in part (a) differs from part (b), explain why there is a difference between the two energies.

5.

What is the dominant factor that affects the speed of an object that started from rest down a frictionless incline if the only work done on the object is from gravitational forces?

6.

Two people observe a leaf falling from a tree. One person is standing on a ladder and the other is on the ground. If each person were to compare the energy of the leaf observed, would each person find the following to be the same or different for the leaf, from the point where it falls off the tree to when it hits the ground: (a) the kinetic energy of the leaf; (b) the change in gravitational potential energy; (c) the final gravitational potential energy?

8.2 Conservative and Non-Conservative Forces

7.

What is the physical meaning of a non-conservative force?

8.

A bottle rocket is shot straight up in the air with a speed 30m/s30m/s. If the air resistance is ignored, the bottle would go up to a height of approximately 46m46m. However, the rocket goes up to only 35m35m before returning to the ground. What happened? Explain, giving only a qualitative response.

9.

An external force acts on a particle during a trip from one point to another and back to that same point. This particle is only effected by conservative forces. Does this particle’s kinetic energy and potential energy change as a result of this trip?

8.3 Conservation of Energy

10.

When a body slides down an inclined plane, does the work of friction depend on the body’s initial speed? Answer the same question for a body sliding down a curved surface.

11.

Consider the following scenario. A car for which friction is not negligible accelerates from rest down a hill, running out of gasoline after a short distance (see below). The driver lets the car coast farther down the hill, then up and over a small crest. He then coasts down that hill into a gas station, where he brakes to a stop and fills the tank with gasoline. Identify the forms of energy the car has, and how they are changed and transferred in this series of events.

A car coasts down a hill up over a small crest, then down hill. At the bottom of the hill, it stops for gasoline.

12.

A dropped ball bounces to one-half its original height. Discuss the energy transformations that take place.

13.

E=K+UE=K+U constant is a special case of the work-energy theorem.” Discuss this statement.

14.

In a common physics demonstration, a bowling ball is suspended from the ceiling by a rope.

The professor pulls the ball away from its equilibrium position and holds it adjacent to his nose, as shown below. He releases the ball so that it swings directly away from him. Does he get struck by the ball on its return swing? What is he trying to show in this demonstration?

The figure is a drawing of a man pulling a bowling ball that is suspended from the ceiling by a rope away from its equilibrium position and holding it adjacent to his nose. In a second picture, the ball swings directly away from him.

15.

A child jumps up and down on a bed, reaching a higher height after each bounce. Explain how the child can increase his maximum gravitational potential energy with each bounce.

16.

Can a non-conservative force increase the mechanical energy of the system?

17.

Neglecting air resistance, how much would I have to raise the vertical height if I wanted to double the impact speed of a falling object?

18.

A box is dropped onto a spring at its equilibrium position. The spring compresses with the box attached and comes to rest. Since the spring is in the vertical position, does the change in the gravitational potential energy of the box while the spring is compressing need to be considered in this problem?

Problems

8.1 Potential Energy of a System

19.

Using values from Table 8.2, how many DNA molecules could be broken by the energy carried by a single electron in the beam of an old-fashioned TV tube? (These electrons were not dangerous in themselves, but they did create dangerous X-rays. Later-model tube TVs had shielding that absorbed X-rays before they escaped and exposed viewers.)

20.

If the energy in fusion bombs were used to supply the energy needs of the world, how many of the 9-megaton variety would be needed for a year’s supply of energy (using data from Table 8.1)?

21.

A camera weighing 10 N falls from a small drone hovering 20m20m overhead and enters free fall. What is the gravitational potential energy change of the camera from the drone to the ground if you take a reference point of (a) the ground being zero gravitational potential energy? (b) The drone being zero gravitational potential energy? What is the gravitational potential energy of the camera (c) before it falls from the drone and (d) after the camera lands on the ground if the reference point of zero gravitational potential energy is taken to be a second person looking out of a building 30m30m from the ground?

22.

Someone drops a 50g50−g pebble off of a docked cruise ship, 70.0m70.0m from the water line. A person on a dock 3.0m3.0m from the water line holds out a net to catch the pebble. (a) How much work is done on the pebble by gravity during the drop? (b) What is the change in the gravitational potential energy during the drop? If the gravitational potential energy is zero at the water line, what is the gravitational potential energy (c) when the pebble is dropped? (d) When it reaches the net? What if the gravitational potential energy was 30.030.0 Joules at water level? (e) Find the answers to the same questions in (c) and (d).

23.

A cat’s crinkle ball toy of mass 15g15g is thrown straight up with an initial speed of 3m/s3m/s. Assume in this problem that air drag is negligible. (a) What is the kinetic energy of the ball as it leaves the hand? (b) How much work is done by the gravitational force during the ball’s rise to its peak? (c) What is the change in the gravitational potential energy of the ball during the rise to its peak? (d) If the gravitational potential energy is taken to be zero at the point where it leaves your hand, what is the gravitational potential energy when it reaches the maximum height? (e) What if the gravitational potential energy is taken to be zero at the maximum height the ball reaches, what would the gravitational potential energy be when it leaves the hand? (f) What is the maximum height the ball reaches?

8.2 Conservative and Non-Conservative Forces

24.

A force F(x)=(3.0/x)NF(x)=(3.0/x)N acts on a particle as it moves along the positive x-axis. (a) How much work does the force do on the particle as it moves from x=2.0mx=2.0m to x=5.0m?x=5.0m? (b) Picking a convenient reference point of the potential energy to be zero at x=,x=∞, find the potential energy for this force.

25.

A force F(x)=(−5.0x2+7.0x)NF(x)=(−5.0×2+7.0x)N acts on a particle. (a) How much work does the force do on the particle as it moves from x=2.0mx=2.0m to x=5.0m?x=5.0m? (b) Picking a convenient reference point of the potential energy to be zero at x=,x=∞, find the potential energy for this force.

26.

Find the force corresponding to the potential energy U(x)=a/x+b/x2.U(x)=−a/x+b/x2.

27.

The potential energy function for either one of the two atoms in a diatomic molecule is often approximated by U(x)=a/x12b/x6U(x)=−a/x12−b/x6 where x is the distance between the atoms. (a) At what distance of seperation does the potential energy have a local minimum (not at x=)?x=∞)? (b) What is the force on an atom at this separation? (c) How does the force vary with the separation distance?

28.

A particle of mass 2.0kg2.0kg moves under the influence of the force F(x)=(3/x)N.F(x)=(3/x)N. If its speed at x=2.0mx=2.0m is v=6.0m/s,v=6.0m/s, what is its speed at x=7.0m?x=7.0m?

29.

A particle of mass 2.0kg2.0kg moves under the influence of the force F(x)=(−5x2+7x)N.F(x)=(−5×2+7x)N. If its speed at x=−4.0mx=−4.0m is v=20.0m/s,v=20.0m/s, what is its speed at x=4.0m?x=4.0m?

30.

A crate on rollers is being pushed without frictional loss of energy across the floor of a freight car (see the following figure). The car is moving to the right with a constant speed v0.v0. If the crate starts at rest relative to the freight car, then from the work-energy theorem, Fd=mv2/2,Fd=mv2/2, where d, the distance the crate moves, and v, the speed of the crate, are both measured relative to the freight car. (a) To an observer at rest beside the tracks, what distance dd′ is the crate pushed when it moves the distance d in the car? (b) What are the crate’s initial and final speeds v0v0′ and vv′ as measured by the observer beside the tracks? (c) Show that Fd=m(v)2/2m(v0)2/2Fd′=m(v′)2/2−m(v′0)2/2 and, consequently, that work is equal to the change in kinetic energy in both reference systems.

A drawing of a crate on rollers being pushed across the floor of a freight car. The crate has mass m,it is being pushed to the right with a force F, and the car has a velocity v sub zero to the right.

8.3 Conservation of Energy

31.

A boy throws a ball of mass 0.25kg0.25kg straight upward with an initial speed of 20m/s20m/s When the ball returns to the boy, its speed is 17m/s17m/s How much much work does air resistance do on the ball during its flight?

32.

A mouse of mass 200 g falls 100 m down a vertical mine shaft and lands at the bottom with a speed of 8.0 m/s. During its fall, how much work is done on the mouse by air resistance?

33.

Using energy considerations and assuming negligible air resistance, show that a rock thrown from a bridge 20.0 m above water with an initial speed of 15.0 m/s strikes the water with a speed of 24.8 m/s independent of the direction thrown. (Hint:show that Ki+Ui=Kf+Uf)Ki+Ui=Kf+Uf)

34.

A 1.0-kg ball at the end of a 2.0-m string swings in a vertical plane. At its lowest point the ball is moving with a speed of 10 m/s. (a) What is its speed at the top of its path? (b) What is the tension in the string when the ball is at the bottom and at the top of its path?

35.

Ignoring details associated with friction, extra forces exerted by arm and leg muscles, and other factors, we can consider a pole vault as the conversion of an athlete’s running kinetic energy to gravitational potential energy. If an athlete is to lift his body 4.8 m during a vault, what speed must he have when he plants his pole?

36.

Tarzan grabs a vine hanging vertically from a tall tree when he is running at 9.0m/s.9.0m/s. (a) How high can he swing upward? (b) Does the length of the vine affect this height?

37.

Assume that the force of a bow on an arrow behaves like the spring force. In aiming the arrow, an archer pulls the bow back 50 cm and holds it in position with a force of 150N150N. If the mass of the arrow is 50g50g and the “spring” is massless, what is the speed of the arrow immediately after it leaves the bow?

38.

100kg100−kg man is skiing across level ground at a speed of 8.0m/s8.0m/s when he comes to the small slope 1.8 m higher than ground level shown in the following figure. (a) If the skier coasts up the hill, what is his speed when he reaches the top plateau? Assume friction between the snow and skis is negligible. (b) What is his speed when he reaches the upper level if an 80N80−N frictional force acts on the skis?

The figure is a drawing of a skier who has gone up a slope that is 8.0 meters long. The vertical distance between the top of the slope and its bottom is 1.8 meters.

39.

A sled of mass 70 kg starts from rest and slides down a 10°10° incline 80m80m long. It then travels for 20 m horizontally before starting back up an 8° incline. It travels 80 m along this incline before coming to rest. What is the net work done on the sled by friction?

40.

A girl on a skateboard (total mass of 40 kg) is moving at a speed of 10 m/s at the bottom of a long ramp. The ramp is inclined at 20°20° with respect to the horizontal. If she travels 14.2 mupward along the ramp before stopping, what is the net frictional force on her?

41.

A baseball of mass 0.25 kg is hit at home plate with a speed of 40 m/s. When it lands in a seat in the left-field bleachers a horizontal distance 120 m from home plate, it is moving at 30 m/s. If the ball lands 20 m above the spot where it was hit, how much work is done on it by air resistance?

42.

A small block of mass m slides without friction around the loop-the-loop apparatus shown below. (a) If the block starts from rest at A, what is its speed at B? (b) What is the force of the track on the block at B?

A track has a loop of radius R. The top of the track is a vertical distance four R above the bottom of the loop. A block is shown sliding on the track. Position A is at the top of the track. Position B is half way up the loop.

43.

The massless spring of a spring gun has a force constant k=12N/cm.k=12N/cm. When the gun is aimed vertically, a 15-g projectile is shot to a height of 5.0 m above the end of the expanded spring. (See below.) How much was the spring compressed initially?

Three drawings of a gun, aimed directly upward, are shown. On the left, the spring is compressed an unknown distance d. The projectile is resting on the top of the spring. In the middle drawing, the spring is expanded. The projectile is still at the top of the spring but now moving upward with velocity v. On the right, the spring is expanded. The projectile is 5.0 meters above the top of the spring. It has zero velocity.

44.

A small ball is tied to a string and set rotating with negligible friction in a vertical circle. Prove that the tension in the string at the bottom of the circle exceeds that at the top of the circle by eight times the weight of the ball. Assume the ball’s speed is zero as it sails over the top of the circle and there is no additional energy added to the ball during rotation.

8.4 Potential Energy Diagrams and Stability

45.

A mysterious constant force of 10 N acts horizontally on everything. The direction of the force is found to be always pointed toward a wall in a big hall. Find the potential energy of a particle due to this force when it is at a distance x from the wall, assuming the potential energy at the wall to be zero.

46.

A single force F(x)=−4.0xF(x)=−4.0x (in newtons) acts on a 1.0-kg body. When x=3.5m,x=3.5m, the speed of the body is 4.0 m/s. What is its speed at x=2.0m?x=2.0m?

47.

A particle of mass 4.0 kg is constrained to move along the x-axis under a single force F(x)=cx3,F(x)=−cx3, where c=8.0N/m3.c=8.0N/m3.The particle’s speed at A, where xA=1.0m,xA=1.0m, is 6.0 m/s. What is its speed at B, where xB=−2.0m?xB=−2.0m?

48.

The force on a particle of mass 2.0 kg varies with position according to F(x)=−3.0x2F(x)=−3.0×2 (x in meters, F(x) in newtons). The particle’s velocity at x=2.0mx=2.0m is 5.0 m/s. Calculate the mechanical energy of the particle using (a) the origin as the reference point and (b) x=4.0mx=4.0m as the reference point. (c) Find the particle’s velocity at x=1.0m.x=1.0m. Do this part of the problem for each reference point.

49.

A 4.0-kg particle moving along the x-axis is acted upon by the force whose functional form appears below. The velocity of the particle at x=0x=0 is v=6.0m/s.v=6.0m/s. Find the particle’s speed at x=(a)2.0m,(b)4.0m,(c)10.0m,(d)x=(a)2.0m,(b)4.0m,(c)10.0m,(d) Does the particle turn around at some point and head back toward the origin? (e) Repeat part (d) if v=2.0m/satx=0.v=2.0m/satx=0.

A graph of F of x, measured in Newtons, as a function of x, measured in meters. The horizontal scale runs from 0 to 8.0, and the vertical scale from-10.0 top 10.0. The function is constant at -5.0 N for x less than 3.0 meters. It increases linearly to 5.0 N at 5.0 meters, then remains constant  at 5.0 for x larger than 5.0 m.

50.

A particle of mass 0.50 kg moves along the x-axis with a potential energy whose dependence on x is shown below. (a) What is the force on the particle at x=2.0,5.0,8.0,andx=2.0,5.0,8.0,and 12 m? (b) If the total mechanical energy E of the particle is −6.0 J, what are the minimum and maximum positions of the particle? (c) What are these positions if E=2.0J?E=2.0J? (d) If E=16JE=16J, what are the speeds of the particle at the positions listed in part (a)?

The energy I of x in Joules is plotted as a function of x in meters. The horizontal scale runs from less thqan zero to over 20 meters, but is labeled only from 0 to 20. The vertical scale runs from –12.0 to 12 Joules. U of x is a cponstant 4.0 Joules for all x less than 4.0 meters. It rises linearly to 12.0 Joules at 6.0 meters, then decreases linearly to –12.0 Joules at 10.0 meters. It remains –12.0 Joules from 10.0 to 14.0 meters, then rises to 12.0 Joules at 18 meters. It remains at 12.0 joules for all x larger than 18 meters.

51.

(a) Sketch a graph of the potential energy function U(x)=kx2/2+Aeαx2,U(x)=kx2/2+Ae−αx2, where k,A,andαk,A,andα are constants. (b) What is the force corresponding to this potential energy? (c) Suppose a particle of mass m moving with this potential energy has a velocity vava when its position is x=ax=a. Show that the particle does not pass through the origin unless

Amva2+ka22(1eαa2).A≤mva2+ka22(1−e−αa2).

The potential energy function U of x equal to k x squared over two plus A e to the alpha x squared is plotted as a function of x, with k=0.02, A=1, and alpha equal to one. The horizontal scale runs from –25 to 25 and the vertical scale runs from 0 to 4.5. The function is an upward opening parabola with a small Gaussian upward bump at the center. For the parameters chosen in this plot, the bump has a maximum value of one.

8.5 Sources of Energy

52.

In the cartoon movie Pocahontas, Pocahontas runs to the edge of a cliff and jumps off, showcasing the fun side of her personality. (a) If she is running at 3.0 m/s before jumping off the cliff and she hits the water at the bottom of the cliff at 20.0 m/s, how high is the cliff? Assume negligible air drag in this cartoon. (b) If she jumped off the same cliff from a standstill, how fast would she be falling right before she hit the water?

53.

In the reality television show “Amazing Race”, a contestant is firing 12-kg watermelons from a slingshot to hit targets down the field. The slingshot is pulled back 1.5 m and the watermelon is considered to be at ground level. The launch point is 0.3 m from the ground and the targets are 10 m horizontally away. Calculate the spring constant of the slingshot.

54.

In the Back to the Future movies, a DeLorean car of mass 1230 kg travels at 88 miles per hour to venture back to the future. (a) What is the kinetic energy of the DeLorian? (b) What spring constant would be needed to stop this DeLorean in a distance of 0.1m?

55.

In the Hunger Games movie, Katniss Everdeen fires a 0.0200-kg arrow from ground level to pierce an apple up on a stage. The spring constant of the bow is 330 N/m and she pulls the arrow back a distance of 0.55 m. The apple on the stage is 5.00 m higher than the launching point of the arrow. At what speed does the arrow (a) leave the bow? (b) strike the apple?

56.

In a “Top Fail” video, two women run at each other and collide by hitting exercise balls together. If each woman has a mass of 50 kg, which includes the exercise ball, and one woman runs to the right at 2.0 m/s and the other is running toward her at 1.0 m/s, (a) how much total kinetic energy is there in the system? (b) If energy is conserved after the collision and each exercise ball has a mass of 2.0 kg, how fast would the balls fly off toward the camera?

57.

In a Coyote/Road Runner cartoon clip, a spring expands quickly and sends the coyote into a rock. If the spring extended 5 m and sent the coyote of mass 20 kg to a speed of 15 m/s, (a) what is the spring constant of this spring? (b) If the coyote were sent vertically into the air with the energy given to him by the spring, how high could he go if there were no non-conservative forces?

58.

In an iconic movie scene, Forrest Gump runs around the country. If he is running at a constant speed of 3 m/s, would it take him more or less energy to run uphill or downhill and why?

59.

In the movie Monty Python and the Holy Grail a cow is catapulted from the top of a castle wall over to the people down below. The gravitational potential energy is set to zero at ground level. The cow is launched from a spring of spring constant 1.1×104N/m1.1×104N/m that is expanded 0.5 m from equilibrium. If the castle is 9.1 m tall and the mass of the cow is 110 kg, (a) what is the gravitational potential energy of the cow at the top of the castle? (b) What is the elastic spring energy of the cow before the catapult is released? (c) What is the speed of the cow right before it lands on the ground?

60.

A 60.0-kg skier with an initial speed of 12.0 m/s coasts up a 2.50-m high rise as shown. Find her final speed at the top, given that the coefficient of friction between her skis and the snow is 0.80.

A skier is shown on level ground. In front of him, the ground slopes up at an angle of 35 degrees above the horizontal, then becomes level again. The vertical rise is 2.5 meters. The skier has initial horizontal, forward velocity v sub i and initial kinetic energy K sub i. The velocity a the top of the rise is v sub f, whose value is unknown.

61.

(a) How high a hill can a car coast up (engines disengaged) if work done by friction is negligible and its initial speed is 110 km/h? (b) If, in actuality, a 750-kg car with an initial speed of 110 km/h is observed to coast up a hill to a height 22.0 m above its starting point, how much thermal energy was generated by friction? (c) What is the average force of friction if the hill has a slope of 2.5°2.5° above the horizontal?

62.

5.00×105-kg5.00×105-kg subway train is brought to a stop from a speed of 0.500 m/s in 0.400 m by a large spring bumper at the end of its track. What is the spring constant k of the spring?

63.

A pogo stick has a spring with a spring constant of 2.5×104N/m,2.5×104N/m, which can be compressed 12.0 cm. To what maximum height from the uncompressed spring can a child jump on the stick using only the energy in the spring, if the child and stick have a total mass of 40 kg?

64.

A block of mass 500 g is attached to a spring of spring constant 80 N/m (see the following figure). The other end of the spring is attached to a support while the mass rests on a rough surface with a coefficient of friction of 0.20 that is inclined at angle of 30°.30°. The block is pushed along the surface till the spring compresses by 10 cm and is then released from rest. (a) How much potential energy was stored in the block-spring-support system when the block was just released? (b) Determine the speed of the block when it crosses the point when the spring is neither compressed nor stretched. (c) Determine the position of the block where it just comes to rest on its way up the incline.

The figure shows a ramp that is at an angle of 30 degrees to the horizontal. A spring lies on the ramp, near its bottom. The lower end of the spring is attached to the ramp. The upper end of the spring is attached to a block. The block rests on the surface of the ramp.

65.

A block of mass 200 g is attached at the end of a massless spring of spring constant 50 N/m. The other end of the spring is attached to the ceiling and the mass is released at a height considered to be where the gravitational potential energy is zero. (a) What is the net potential energy of the block at the instant the block is at the lowest point? (b) What is the net potential energy of the block at the midpoint of its descent? (c) What is the speed of the block at the midpoint of its descent?

66.

A T-shirt cannon launches a shirt at 5.00 m/s from a platform height of 3.00 m from ground level. How fast will the shirt be traveling if it is caught by someone whose hands are (a) 1.00 m from ground level? (b) 4.00 m from ground level? Neglect air drag.

67.

A child (32 kg) jumps up and down on a trampoline. The trampoline exerts a spring restoring force on the child with a constant of 5000 N/m. At the highest point of the bounce, the child is 1.0 m above the level surface of the trampoline. What is the compression distance of the trampoline? Neglect the bending of the legs or any transfer of energy of the child into the trampoline while jumping.

68.

Shown below is a box of mass m1m1 that sits on a frictionless incline at an angle above the horizontal θθ. This box is connected by a relatively massless string, over a frictionless pulley, and finally connected to a box at rest over the ledge, labeled m2m2. If m1m1 and m2m2 are a height h above the ground and m2>>m1m2>>m1: (a) What is the initial gravitational potential energy of the system? (b) What is the final kinetic energy of the system?

A block, labeled as m sub1, is on an upward sloping ramp that makes an angle theta to the horizontal. The mass is connected to a string that goes up and over a pulley at the top of the ramp, then straight down and connects to another block, labeled as m sub 2. Block m sub 2 is not in contact with any surface.

Additional Problems

69.

A massless spring with force constant k=200N/mk=200N/m hangs from the ceiling. A 2.0-kg block is attached to the free end of the spring and released. If the block falls 17 cm before starting back upwards, how much work is done by friction during its descent?

70.

A particle of mass 2.0 kg moves under the influence of the force F(x)=(−5x2+7x)N.F(x)=(−5×2+7x)N. Suppose a frictional force also acts on the particle. If the particle’s speed when it starts at x=−4.0mx=−4.0m is 0.0 m/s and when it arrives at x=4.0mx=4.0m is 9.0 m/s, how much work is done on it by the frictional force between x=−4.0mx=−4.0m and x=4.0m?x=4.0m?

71.

Block 2 shown below slides along a frictionless table as block 1 falls. Both blocks are attached by a frictionless pulley. Find the speed of the blocks after they have each moved 2.0 m. Assume that they start at rest and that the pulley has negligible mass. Use m1=2.0kgm1=2.0kg and m2=4.0kg.m2=4.0kg.

A block, labeled as block 1, is suspended by a string that goes up, over a pulley, bends 90 degrees to the left, and connects to another block, labeled as block 2. Block 2 is sliding to the right on a horizontal surface. Block 1 is not in contact with any surface and is moving downward.

72.

A body of mass m and negligible size starts from rest and slides down the surface of a frictionless solid sphere of radius R. (See below.) Prove that the body leaves the sphere when θ=cos−1(2/3).θ=cos−1(2/3).

A sphere of radius R is shown. A block is shown at two locations on the surface of the sphere and moving clockwise. It is shown at the top, and at an angle of theta measured clockwise from the vertical.

73.

A mysterious force acts on all particles along a particular line and always points towards a particular point P on the line. The magnitude of the force on a particle increases as the cube of the distance from that point; that is Fr3F∞r3, if the distance from P to the position of the particle is r. Let b be the proportionality constant, and write the magnitude of the force as F=br3F=br3. Find the potential energy of a particle subjected to this force when the particle is at a distance D from P, assuming the potential energy to be zero when the particle is at P.

74.

An object of mass 10 kg is released at point A, slides to the bottom of the 30°30° incline, then collides with a horizontal massless spring, compressing it a maximum distance of 0.75 m. (See below.) The spring constant is 500 M/m, the height of the incline is 2.0 m, and the horizontal surface is frictionless. (a) What is the speed of the object at the bottom of the incline? (b) What is the work of friction on the object while it is on the incline? (c) The spring recoils and sends the object back toward the incline. What is the speed of the object when it reaches the base of the incline? (d) What vertical distance does it move back up the incline?

A block is shown at the top of a downward sloping ramp. The ramp makes an angle of 30 degrees with the horizontal. The block is a vertical distance of 2.0 meters above the ground. To the right of the ramp, on the horizontal ground, is a  horizontal spring. The far end of the spring is attached to a wall.

75.

Shown below is a small ball of mass m attached to a string of length a. A small peg is located a distance h below the point where the string is supported. If the ball is released when the string is horizontal, show that h must be greater than 3a/5 if the ball is to swing completely around the peg.

A small ball is shown attached to a string of length a. A small peg is located a distance h below the point where the string is supported. The ball is released when the string is horizontal  and swings in a circular arc.

76.

A block leaves a frictionless inclined surfarce horizontally after dropping off by a height h. Find the horizontal distance Dwhere it will land on the floor, in terms of hH, and g.

A block is shown at rest at the top of a ramp, a vertical distance h above a horizontal platform. The platform is a distance H above the floor. The block is shows to be moving horizontally to the right with speed v on the platform and to land on the floor a horizontal distance D from where it drops off the platform.

77.

A block of mass m, after sliding down a frictionless incline, strikes another block of mass M that is attached to a spring of spring constant k (see below). The blocks stick together upon impact and travel together. (a) Find the compression of the spring in terms of mMhg, and k when the combination comes to rest. Hint: The speed of the combined blocks m+M(v2)m+M(v2)is based on the speed of block m just prior to the collision with the block M (v1) based on the equation v2=(m/m)+M(v1)v2=(m/m)+M(v1). This will be discussed further in the chapter on Linear Momentum and Collisions. (b) The loss of kinetic energy as a result of the bonding of the two masses upon impact is stored in the so-called binding energy of the two masses. Calculate the binding energy.

 A block of mass m is shown at the top of a downward sloping ramp. The block is a vertical distance h above the ground and is at rest (v=0.) To the right of the ramp, on the horizontal ground, is a mass M attached to  a horizontal spring. The far end of the spring is attached to a wall.

78.

A block of mass 300 g is attached to a spring of spring constant 100 N/m. The other end of the spring is attached to a support while the block rests on a smooth horizontal table and can slide freely without any friction. The block is pushed horizontally till the spring compresses by 12 cm, and then the block is released from rest. (a) How much potential energy was stored in the block-spring support system when the block was just released? (b) Determine the speed of the block when it crosses the point when the spring is neither compressed nor stretched. (c) Determine the speed of the block when it has traveled a distance of 20 cm from where it was released.

79.

Consider a block of mass 0.200 kg attached to a spring of spring constant 100 N/m. The block is placed on a frictionless table, and the other end of the spring is attached to the wall so that the spring is level with the table. The block is then pushed in so that the spring is compressed by 10.0 cm. Find the speed of the block as it crosses (a) the point when the spring is not stretched, (b) 5.00 cm to the left of point in (a), and (c) 5.00 cm to the right of point in (a).

80.

A skier starts from rest and slides downhill. What will be the speed of the skier if he drops by 20 meters in vertical height? Ignore any air resistance (which will, in reality, be quite a lot), and any friction between the skis and the snow.

81.

Repeat the preceding problem, but this time, suppose that the work done by air resistance cannot be ignored. Let the work done by the air resistance when the skier goes from A to B along the given hilly path be −2000 J. The work done by air resistance is negative since the air resistance acts in the opposite direction to the displacement. Supposing the mass of the skier is 50 kg, what is the speed of the skier at point B?

82.

Two bodies are interacting by a conservative force. Show that the mechanical energy of an isolated system consisting of two bodies interacting with a conservative force is conserved. (Hint: Start by using Newton’s third law and the definition of work to find the work done on each body by the conservative force.)

83.

In an amusement park, a car rolls in a track as shown below. Find the speed of the car at AB, and C. Note that the work done by the rolling friction is zero since the displacement of the point at which the rolling friction acts on the tires is momentarily at rest and therefore has a zero displacement.

A roller coaster track with three hills is shown. The first hill is the tallest at 50 meters above the ground, the second is the smallest, and the third hill is of intermediate height at 40 meters above the ground. The car starts with v = 0 at the top of the first hill. Point A is the low point between the second and third hill, 20 meters above the ground. Point B is at the top of the third hill, 40 meters above the ground. Point C is at the ground near the end of the track.

84.

A 200-g steel ball is tied to a 2.00-m “massless” string and hung from the ceiling to make a pendulum, and then, the ball is brought to a position making a 30°30° angle with the vertical direction and released from rest. Ignoring the effects of the air resistance, find the speed of the ball when the string (a) is vertically down, (b) makes an angle of 20°20° with the vertical and (c) makes an angle of 10°10° with the vertical.

85.

A hockey puck is shot across an ice-covered pond. Before the hockey puck was hit, the puck was at rest. After the hit, the puck has a speed of 40 m/s. The puck comes to rest after going a distance of 30 m. (a) Describe how the energy of the puck changes over time, giving the numerical values of any work or energy involved. (b) Find the magnitude of the net friction force.

86.

A projectile of mass 2 kg is fired with a speed of 20 m/s at an angle of 30°30° with respect to the horizontal. (a) Calculate the initial total energy of the projectile given that the reference point of zero gravitational potential energy at the launch position. (b) Calculate the kinetic energy at the highest vertical position of the projectile. (c) Calculate the gravitational potential energy at the highest vertical position. (d) Calculate the maximum height that the projectile reaches. Compare this result by solving the same problem using your knowledge of projectile motion.

87.

An artillery shell is fired at a target 200 m above the ground. When the shell is 100 m in the air, it has a speed of 100 m/s. What is its speed when it hits its target? Neglect air friction.

88.

How much energy is lost to a dissipative drag force if a 60-kg person falls at a constant speed for 15 meters?

89.

A box slides on a frictionless surface with a total energy of 50 J. It hits a spring and compresses the spring a distance of 25 cm from equilibrium. If the same box with the same initial energy slides on a rough surface, it only compresses the spring a distance of 15 cm, how much energy must have been lost by sliding on the rough surface?

 

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