What we call wedges or slides in everyday language are called
inclined planesin physics-speak. From our experience on slides during recess inelementary school, sledding down hills in the winter, and skiing, weknow that when people are placed on slippery inclines, they slide downthe slope. We also know that slides can sometimes be sticky, so thatwhen you are at the top of the incline, you need to give yourself apush to overcome the force of static friction. As you descend a stickyslide, the force of kinetic friction opposes your motion. In thissection, we will consider problems involving inclined planes both withand without friction. Since they’re simpler, we’ll begin withfrictionless planes.
Frictionless Inclined Planes
Suppose you place a 10 kg box on a frictionless 30º inclined plane and release your
hold, allowing the box to slide to the ground, a horizontal distance of
d meters and a vertical distance of
h meters.
Before we continue, let’s follow those three important preliminary steps for solving problems in mechanics:
- Ask yourself how the system will move: Because this is africtionless plane, there is nothing to stop the box from sliding downto the bottom. Experience suggests that the steeper the incline, thefaster an object will slide, so we can expect the acceleration andvelocity of the box to be affected by the angle of the plane.
- Choose a coordinate system: Because we’re interestedin how the box slides along the inclined plane, we would do better toorient our coordinate system to the slope of the plane. The x-axis runs parallel to the plane, where downhill is the positive x direction, and the y-axis runs perpendicular to the plane, where up is the positive y direction.
- Draw free-body diagrams: The two forces acting on thebox are the force of gravity, acting straight downward, and the normalforce, acting perpendicular to the inclined plane, along the y-axis.Because we’ve oriented our coordinate system to the slope of the plane,we’ll have to resolve the vector for the gravitational force, mg, into its x- and y-components. If you recall what we learned about vector decomposition in Chapter 1, you’ll know you can break mg down into a vector of magnitude cos 30º in the negative y direction and a vector of magnitude sin 30º in the positive x direction. The result is a free-body diagram that looks something like this:
Decomposing the
mg vector gives a total of three force vectors at work in this diagram: the
y-component of the gravitational force and the normal force, which cancel out; and the
x-componentof the gravitational force, which pulls the box down the slope. Notethat the steeper the slope, the
greater the force pulling the box downthe slope.
Now let’s solve some problems. For the purposes of these problems, take the acceleration due to gravity to be
g = 10 m/s2. Like
SAT II Physics, we will give you the values of the relevant trigonometric functions: cos 30 = sin 60 = 0.866, cos 60 = sin 30 = 0.500.
1. What is the magnitude of the normal force?
2. What is the acceleration of the box?
3. What is the velocity of the box when it reaches the bottom of the slope?
4. What is the work done on the box by the force of gravity in bringing it to the bottom of the plane?
1. What is the magnitude of the normal force?
The box is not moving in the
y direction, so the normal force must be equal to the
y-componentof the gravitational force. Calculating the normal force is then just amatter of plugging a few numbers in for variables in order to find the
y-component of the gravitational force:
2. What is the acceleration of the box?
We know that the force pulling the box in the positive
x direction has a magnitude of
mg sin 30. Using Newton’s Second Law,
F = ma, we just need to solve for
a:
3. What is the velocity of the box when it reaches the bottom of the slope?
Because we’re dealing with a frictionless plane,the system is closed and we can invoke the law of conservation ofmechanical energy. At the top of the inclined plane, the box will notbe moving and so it will have an initial kinetic energy of zero (
). Because it is a height
h above the bottom of the plane, it will have a gravitational potential energy of
U = mgh. Adding kinetic and potential energy, we find that the mechanical energy of the system is:
At the bottom of the slope, all the box’spotential energy will have been converted into kinetic energy. In otherwords, the kinetic energy, 1⁄2
mv2, of the box at the bottom of the slope is equal to the potential energy,
mgh, of the box at the top of the slope. Solving for
v, we get:
4. What is the work done on the box by the force of gravity in bringing it to the bottom of the inclined plane?
The fastest way to solve this problem is toappeal to the work-energy theorem, which tells us that the work done onan object is equal to its change in kinetic energy. At the top of theslope the box has no kinetic energy, and at the bottom of the slope itskinetic energy is equal to its potential energy at the top of theslope,
mgh. So the work done on the box is:
Note that the work done is independent ofhow steep the inclined plane is, and is only dependent on the object’schange in height when it slides down the plane.
Frictionless Inclined Planes with Pulleys
Let’s bring together what we’ve learnedabout frictionless inclined planes and pulleys on tables into oneexciting über-problem:
Assume for this problem that
—that is, mass
M will pull mass
m up the slope. Now let’s ask those three all-important preliminary questions:
- Ask yourself how the system will move: Because the twomasses are connected by a rope, we know that they will have the samevelocity and acceleration. We also know that the tension in the rope isconstant throughout its length. Because
, we know that when the system is released from rest, mass M will move downward and mass m will slide up the inclined plane. - Choose a coordinate system: Do the same thing here that we did with the previous pulley-on-a-table problem. Make the x-axis parallel to the rope, with the positive x direction being up for mass M and downhill for mass m, and the negative x direction being down for mass M and uphill for mass m. Make the y-axis perpendicular to the rope, with the positive y-axis being away from the inclined plane, and the negative y-axis being toward the inclined plane.
- Draw free-body diagrams: We’ve seen how to drawfree-body diagrams for masses suspended from pulleys, and we’ve seenhow to draw free-body diagrams for masses on inclined planes. All weneed to do now is synthesize what we already know:
Now let’s tackle a couple of questions:
1. What is the acceleration of the masses?
2. What is the velocity of mass
m after mass
M has fallen a distance
h?
1. What is the acceleration of the masses?
First, let’s determine the net force acting on each of the masses. Applying Newton’s Second Law we get:
Adding these two equations together, we find that
. Solving for
a, we get:
Because
, the acceleration is negative, which, as we defined it, is down for mass
M and uphill for mass
m.
2. What is the velocity of mass m after mass M has fallen a distance h?
Once again, the in-clined plane isfrictionless, so we are dealing with a closed system and we can applythe law of conservation of mechanical energy. Since the masses areinitially at rest,
. Since mass
M falls a distance
h, its potential energy changes by
–-Mgh. If mass
M falls a distance
h, then mass
m must slide the same distance up the slope of the inclined plane, or a vertical distance of
. Therefore, mass
m’s potential energy increases by
.Because the sum of potential energy and kinetic energy cannot change,we know that the kinetic energy of the two masses increases precisely to the extent that their potential energy decreases. We have all we need to scribble out some equations and solve for
v:
Finally, note that the velocity of mass
m is in the uphill direction.
As with the complex equations we encountered with pulley systems above, you needn’t trouble yourself with memorizing a formula like this. If you understand the principles at work in this problem and would feel somewhat comfortable deriving this formula, you know more than SAT II Physics will likely ask of you.
Inclined Planes With Friction
There are two significant differences between frictionless inclined plane problems and inclined plane problems where friction is a factor:
- There’s an extra force to deal with. The force of friction will oppose the downhill component of the gravitational force.
- We can no longer rely on the law of conservation of mechanical energy.Because energy is being lost through the friction between the mass and the inclined plane, we are no longer dealing with a closed system.Mechanical energy is not conserved.
Consider the 10 kg box we encountered in our example of a frictionless inclined plane.This time, though, the inclined plane has a coefficient of kinetic friction of
. How will this additional factor affect us? Let’s follow three familiar steps:
- Ask yourself how the system will move: If the force of gravity is strong enough to overcome the force of friction, the box will accelerate down the plane. However, because there is a force acting against the box’s descent, we should expect it to slide with a lesser velocity than it did in the example of the frictionless plane.
- Choose a coordinate system: There’s no reason not to hold onto the co-ordinate system we used before: the positive x direction is down the slope, and the positive y direction is upward, perpendicular to the slope.
- Draw free-body diagrams: The free-body diagram will be identical to the one we drew in the example of the frictionless plane,except we will have a vector for the force of friction in the negative x direction.
Now let’s ask some questions about the motion of the box.
1. What is the force of kinetic friction acting on the box?
2. What is the acceleration of the box?
3. What is the work done on the box by the force of kinetic friction?
What is the force of kinetic friction acting on the box?
The normal force acting on the box is 86.6 N, exactly the same as for the frictionless inclined plane. The force of kinetic friction is defined as
, so plugging in the appropriate values for
and
N:
Remember, though, that the force of friction is exerted in the negative
x direction, so the correct answer is –43.3 N.
What is the acceleration of the box?
The net force acting on the box is the difference between the downhill gravitational force and the force of friction:
. Using Newton’s Second Law, we can determine the net force acting on the box, and then solve for
a:
Because
, the direction of the acceleration is in the downhill direction.
What is the work done on the box by the force of kinetic friction?
Since
W =
F ·
d,the work done by the force of friction is the product of the force of friction and the displacement of the box in the direction that the force is exerted. Because the force of friction is exerted in the negative
x direction, we need to find the displacement of the box in the
x direction. We know that it has traveled a horizontal distance of
d and a vertical distance of
h. The Pythagorean Theorem then tells us that the displacement of the box is
. Recalling that the force of friction is –43.3 N, we know that the work done by the force of friction is
Note that the amount of work done is negative, because the force of friction acts in the opposite direction of the displacement of the box.
[
本帖最后由 端木·宇 于 2008-6-19 18:47 编辑 ]
