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Chapter Thirteen Notes: Universal Gravitation

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Page 1: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

Chapter Thirteen Notes:

Universal Gravitation

Page 2: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known astronomical data in order to develop three laws to describe the motion of planets about the sun. Kepler's three laws emerged from the analysis of data carefully collected over a span of several years by his Danish predecessor and teacher, Tycho Brahe. Kepler's three laws of planetary motion can be briefly described as follows:◦ The path of the planets about the sun are elliptical in shape, with the

center of the sun being located at one focus. (The Law of Ellipses)◦ An imaginary line drawn from the center of the sun to the center of the

planet will sweep out equal areas in equal intervals of time. (The Law of Equal Areas)

◦ The ratio of the squares of the periods of any two planets is equal to the ratio of the cubes of their average distances from the sun. (The Law of Harmonies)

Page 3: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

While Kepler's laws provided a suitable framework for describing the motion and paths of planets about the sun, there was no accepted explanation for why such paths existed. The cause for how the planets moved as they did was never stated. Kepler could only suggest that there was some sort of interaction between the sun and the planets which provided the driving force for the planet's motion. To Kepler, the planets were somehow "magnetically" driven by the sun to orbit in their elliptical trajectories. There was however no interaction between the planets themselves.

Newton was troubled by the lack of explanation for the planet's orbits. To Newton, there must be some cause for such elliptical motion. Even more troubling was the circular motion of the moon about the earth. Newton knew that there must be some sort of force which governed the heavens; for the motion of the moon in a circular path and of the planets in an elliptical path required that there be an inward component of force. Circular and elliptical motion were

Page 4: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

clearly departures from the inertial paths (straight-line) of objects. And as such, these celestial motions required a cause in the form of an unbalanced force. As learned in Lesson 1, circular motion (as well as elliptical motion) requires a centripetal force. The nature of such a force - its cause and its origin - bothered Newton for some time and was the fuel for much mental pondering. And according to

legend, a breakthrough came at age 24 in an apple orchard in England. Newton never wrote of such an event, yet it is often claimed that the notion of gravity as the cause of all heavenly

motion was instigated when he was struck in the head by an apple while lying under a tree in an orchard in England. Whether it is a myth or a reality, the fact is certain that it was Newton's ability to relate the cause for heavenly motion (the orbit of the moon about the earth) to the cause for Earthly motion (the falling of an apple to the Earth) which led him to his notion of universal gravitation.

Page 5: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

Newton realized that the moon’s circular path around the earth could be caused in this way by the same gravitational force that would hold such a cannonball in low orbit, in other words, the same force that causes bodies to fall. 

To think about this idea, let us consider the moon’s motion, beginning at some particular instant, as deviating downwards—falling—from some initial “horizontal” line, just as for the cannonball shot horizontally from a high mountain.  The first obvious question is: does the moon fall five meters below the horizontal line, that is, towards the earth, in the first second? This was not difficult for Newton to check, because the path of the moon was precisely known by this time.  The moon’s orbit is approximately a circle of radius about 384,000 kilometers (240,000 miles), which it goes around in a month (to be precise, in 27.3 days), so the

Page 6: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

distance covered in one second is, conveniently, very close to one kilometer.  It is then a matter of geometry to figure out how far the curved path falls below a “horizontal” line in one second of flight, and the answer turns out to be not five meters, but only a little over one millimeter! (Actually around 1.37 millimeters.)

It’s completely impossible to draw a diagram showing how far it falls in one second, but the geometry is the same if we look how far it falls in one day, so here it is:

Page 7: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

triangle ABC is really thin, but we can still use Pythagoras’ theorem!

Thus the “natural acceleration” of the moon towards the earth, measured by how far it falls below straight line motion in one second, is less than that of an apple here on earth by the ratio of five meters to 1.37 millimeters, which works out to be about 3,600. 

What can be the significance of this much smaller rate of fall? Newton’s answer was that the natural acceleration of the moon was much smaller than that of the cannonball because they were both caused by a force—a gravitational attraction towards the earth, and that the gravitational force became weaker on going away from the earth. 

Page 8: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

In fact, the figures we have given about the moon’s orbit enable us to compute how fast the gravitational attraction dies away with distance.  The distance from the center of the earth to the earth’s surface is about 6,350 kilometers (4,000 miles), so the moon is about 60 times further from the center of the earth than we and the cannonball are. 

From our discussion of how fast the moon falls below a straight line in one second in its orbit, we found that the gravitational acceleration for the moon is down by a factor of 3,600 from the cannonball’s (or the apple’s). 

Putting these two facts together, and noting that 3,600 = 60 x 60, led Newton to his famous inverse square law: the force of gravitational attraction between two bodies decreases with increasing distance between them as the inverse of the square of that distance, so if the distance is doubled, the force is down by a factor of four.

Page 9: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

A survey of Newton's writings reveals an illustration similar to the one shown at the right. The illustration was accompanied by an extensive discussion of the motion of the moon as a projectile. Newton's reasoning proceeded as follows. Suppose a cannonball is fired horizontally from a very high mountainIn a region devoid of air resistance. In the Absence of gravity, the cannonball would travel in a straight-line, tangential path. Yet in the presence of gravity, the cannonball would drop below this straight-line path and eventually fall to Earth (as in

path A). Now suppose that the cannonball is fired horizontally again, yet with a greater speed. In this case, the cannonball would still fall below its straight-line tangential path and eventually drop to earth. Only this time, the cannonball would travel further before striking the ground (as in path B).

Page 10: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

Now suppose that there is a speed at which the cannonball could be fired such that the trajectory of the falling cannonball matched the curvature of the earth. If such a speed could be obtained, then the cannonball would fall around the earth instead of into it. The cannonball would fall towards the Earth without ever colliding into it and subsequently become a satellite orbiting in circular motion (as in path C). And then at even greater launch speeds, a cannonball would once more orbit the earth, but in an elliptical path (as in path D). The motion of the cannonball orbiting to the earth under the influence of gravity is analogous to the motion of the moon orbiting the Earth. And if the orbiting moon can be compared to the falling cannonball, it can even be compared to a falling apple. The same force which causes objects on Earth to fall to the earth also causes objects in the heavens to move along their circular and elliptical paths. Quite amazingly, the laws of mechanics which govern the motions of objects on Earth also govern the movement of objects in the heavens.

Page 11: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

Newton’s theory of gravity confirmed the Copernican theory of the solar system. No longer was earth considered to be the center of the universe. The earth and other planets orbit the sun, the same way the moon orbits earth. The planets continually “fall” around the sun in closed paths.

Page 12: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

Newton discovered that gravity is universal. Everything pulls on everything else in the universe in a way that involves only mass and distance.

Isaac Newton compared the acceleration of the moon to the acceleration of objects on earth. Believing that gravitational forces were responsible for each, Newton was able to draw an important conclusion about the dependence of gravity upon distance. This comparison led him to conclude that the

Page 13: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

force of gravitational attraction between the Earth and other objects is inversely proportional to the distance separating the earth's center from the object's center. But distance is not the only variable affecting the magnitude of a gravitational force. Consider Newton's famous equation

Fnet = m • a Newton knew that the force which caused

the apple's acceleration (gravity) must be dependent upon the mass of the apple. And since the force acting to cause the apple's downward acceleration also causes the earth's upward acceleration (Newton's third

Page 14: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

law), that force must also depend upon the mass of the earth. So for Newton, the force of gravity acting between the earth and any other object is directly proportional to the mass of the earth, directly proportional to the mass of the object, and inversely proportional to the square of the distance which separates the centers of the earth and the object.

But Newton's law of universal gravitation extends gravity beyond earth. Newton's law of universal gravitation is about the universality of gravity. Newton's place in the Gravity Hall of Fame is not due to his discovery of gravity, but rather due to his

Page 15: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

discovery that gravitation is universal. ALL objects attract each other with a force of gravitational attraction. Gravity is universal. This force of gravitational attraction is directly dependent upon the masses of both objects and inversely proportional to the square of the distance which separates their centers. Newton's conclusion about the magnitude of gravitational forces is summarized symbolically as

Page 16: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

Since the gravitational force is directly proportional to the mass of both interacting objects, more massive objects will attract each other with a greater gravitational force. So as the mass of either object increases, the force of gravitational attraction between them also increases. If the mass of one of the objects is doubled, then the force of gravity between them is doubled. If the mass of one of the objects is tripled, then the force of gravity between them is tripled. If the mass of both of the objects is doubled, then the force of gravity between them is quadrupled; and so on.

Page 17: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

Since gravitational force is inversely proportional to the separation distance between the two interacting objects, more separation distance will result in weaker gravitational forces. So as two objects are separated from each other, the force of gravitational attraction between them also decreases. If the separation distance between two objects is doubled (increased by a factor of 2), then the force of gravitational attraction is decreased by a factor of 4 (2 raised to the second power). If the separation distance between any two objects is tripled (increased by a factor of 3), then the force of gravitational attraction is decreased by a factor of 9 (3 raised to the second power).

Page 18: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

The proportionalities expressed by Newton's universal law of gravitation is represented graphically by the following illustration. Observe how the force of gravity is directly proportional to the product of the two masses and inversely proportional to the square of the distance of separation.

Page 19: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

Another means of representing the proportionalities is to express the relationships in the form of an equation using a constant of proportionality. This equation is shown below.

The constant of proportionality (G) in the above equation is known as the universal gravitation constant. The precise value of G was determined experimentally by Henry Cavendish in the century after Newton's death. The value of G is found to be

G = 6.673 x 10-11 N m2/kg2

Page 20: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

The units on G may seem rather odd; nonetheless they are sensible. When the units on G are substituted into the equation above and multiplied by m1• m2 units and divided by d2 units, the result will be Newtons - the unit of force. 

Knowing the value of G allows us to calculate the force of gravitational attraction between any two objects of known mass and known separation distance. As a first example, consider the following problem.

Sample Problem Determine the force of gravitational attraction

between the earth (m = 5.98 x 1024 kg) and a 70-kg physics student if the student is standing at sea level, a distance of 6.38 x 106 m from earth's center.

Page 21: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

The solution of the problem involves substituting known values of G (6.673 x 10-11 N m2/kg2), m1 (5.98 x 1024 kg ), m2 (70 kg) and d (6.38 x 106 m) into the universal gravitation equation and solving for Fgrav. The solution is as follows:

Page 22: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

Sample Problem #2 Determine the force of gravitational attraction

between the earth (m = 5.98 x 1024 kg) and a 70-kg physics student if the student is in an airplane at 40000 feet above earth's surface. This would place the student a distance of 6.39 x 106 m from earth's center.

The solution of the problem involves substituting known values of G (6.673 x 10-11 N m2/kg2), m1 (5.98 x 1024 kg ), m2 (70 kg) and d (6.39 x 106 m) into the universal gravitation equation and solving for Fgrav. The solution is as follows:

Page 23: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

Two general conceptual comments can be made about the results of the two sample calculations above. First, observe that the force of gravity acting upon the student (a.k.a. the student's weight) is less on an airplane at 40 000 feet than at sea level. This illustrates the inverse relationship between separation distance and the force of gravity (or in this case, the weight of the student). The student weighs less at the higher altitude. However, a mere change of 40 000 feet further from the center of the Earth is virtually negligible. This altitude change altered the student's weight changed by 2 N

Page 24: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

which is much less than 1% of the original weight. A distance of 40 000 feet (from the earth's surface to a high altitude airplane) is not very far when compared to a distance of 6.38 x 106 m (equivalent to nearly 20 000 000 feet from the center of the earth to the surface of the earth). This alteration of distance is like a drop in a bucket when compared to the large radius of the Earth. As shown in the diagram below, distance of separation becomes much more influential when a significant variation is made.

Page 25: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

The second conceptual comment to be made about the above sample calculations is that the use of Newton's universal gravitation equation to calculate the force of gravity (or weight) yields the same result as when calculating it using the equation presented in earlier.

Fgrav = m•g = (70 kg)•(9.8 m/s2) = 686 N

Both equations accomplish the same result because the value of g is equivalent to the ratio of (G•Mearth)/(Rearth)2.

Page 26: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known
Page 27: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

Any point source which spreads its influence equally in all directions without a limit to its range will obey the inverse square law. This comes from strictly geometrical considerations. The intensity of the influence at any given radius (r) is the source strength divided by the area of the sphere. Being strictly geometric in its origin, the inverse square law applies to diverse phenomena. Point sources of gravitational force, electric field, light, sound, and radiation obey the inverse square law.

Page 28: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

As one of the fields which obey the general inverse square law, a point radiation source can be characterized by the diagram above whether you are talking about Roentgens, rads, or rems. All measures of exposure will drop off by the inverse square law. For example, if the radiation exposure is 100 mR/hr at 1 inch from a source, the exposure will be 0.01 mR/hr at 100 inches.

Page 29: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known
Page 30: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

The effects of the Earth's gravity extend far out into space. For example, the Moon is kept in orbit by the Earth even though it is 400,000km away (where gravity is the centripetal force). The Earth has a gravitational field that will attract any object with mass towards the centre of the planet.

The Earths radial gravitational field is represented by the lines.

The Earth has a radial field of gravity, which means that the gravitational field is circular and acts from the centre point.

Page 31: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

You can see on the diagram that near the Earth's surface the lines are closer together than higher up. The closeness of the lines represent the relative strength of the field, so from the diagram, you can tell that the strength of the field decreases with altitude. Further apart lines represent points where the field is weaker.

The arrows show the direction in which the force on an object will act, which is towards the centre of the Earth.

The gravitational field of every object is a radial field, since the mass is concentrated at the objects centre, and as you already know, this is the point at which gravity could be said to act.

The strength of a radial field decreases as you move further away from it. As you can see on the diagram on the right, the number of field lines going through the

plane quarter when the distance is doubled, and it will be of the original value if the distance was tripled.

Page 32: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

If you are located a distance r from the center of a planet:

all of the planet’s mass inside a sphere of radius r pulls you toward the center of the planet.

All of the planet’s mass outside a sphere of radius r exerts no net gravitational force on you.

Page 33: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

The blue-shaded part of the planet pulls you toward point C. The grey-shaded part of the planet does not pull you at all.Half way to the center of the planet, g has

one-half of its surface value.At the center of the planet, g = 0 N/kg.

Page 34: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known
Page 35: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

Scale Readings and Weight Now consider Otis L. Evaderz who is conducting one

of his famous elevator experiments. He stands on a bathroom scale and rides an elevator up and down. As he is accelerating upward and downward, the scale reading is different than when he is at rest and traveling at constant speed. When he is accelerating, the upward and downward forces are not equal. But when he is at rest or moving at constant speed, the opposing forces balance each other. Knowing that

the scale reading is a measure of the upward normal force of the scale upon his body, its value could be predicted for various stages of motion. For instance, the value of the normal force (Fnorm) on Otis's 80-kg body could be predicted if the acceleration is known. This prediction can be made by simply applying Newton's second law.

Page 36: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

As an illustration of the use of Newton's second law to determine the varying contact forces on an elevator ride, consider the following diagram. In the diagram, Otis's 80-kg is traveling with constant speed (A), accelerating upward (B), accelerating downward (C), and free falling (D) after the elevator cable snaps.

Page 37: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

In each of these cases, the upward contact force (Fnorm) can be determined using a free-body diagram and Newton's second law. The interaction of the two forces - the upward normal force and the downward force of gravity - can be thought of as a tug-of-war. The net force acting upon the person indicates who wins the tug-of-war (the up force or the down force) and by how much. A net force of 100-N, up indicates that the upward force "wins" by an amount equal to 100 N. The gravitational force acting upon the rider is found using the equation Fgrav = m*g.

Stage A Stage B Stage C Stage D

Fnet = m*a

Fnet = 0 N

Fnet = m*a

Fnet = 400 N, up

Fnet = m*a

Fnet = 400 N, down

Fnet = m*a

Fnet = 784 N, down

Fnorm equals Fgrav

Fnorm = 784 N

Fnorm > Fgrav by 400 N

Fnorm = 1184 N

Fnorm < Fgrav by 400 N

Fnorm = 384 N

Fnorm < Fgrav by 784 N

Fnorm = 0 N

Page 38: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

There are 2 high tides and 2 low tides per day.

The tides follow the Moon.

Page 39: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

Tides are caused by the stretching of a planet. Stretching is caused by a difference in forces on the two sides of

an object. Since gravitational force depends on distance, there is more

gravitational force on the side of Earth closest to the Moon and less gravitational force on the side of Earth farther from the Moon.

Page 40: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

The Sun’s gravitational pull on Earth is much larger than the Moon’s gravitational pull on Earth. So why do the tides follow the Moon and not the Sun?

Since the Sun is much farther from Earth than the Moon, the difference in distance across Earth is much less significant for the Sun than the Moon, therefore the difference in gravitational force on the two sides of Earth is less for the Sun than for the Moon (even though the Sun’s force on Earth is more).

The Sun does have a small effect on Earth’s tides, but the major effect is due to the Moon.

Page 41: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known
Page 42: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

When a very massive star gets old and runs out of fusionable material, gravitational forces may cause it to collapse to a mathematical point - a singularity. All normal matter is crushed out of existence. This is a black hole.

Page 43: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known
Page 44: Chapter Thirteen Notes: Universal Gravitation.  In the early 1600's, German mathematician and astronomer Johannes Kepler mathematically analyzed known

The black hole’s gravity is the SAME AS THE ORIGINAL STAR’S at distances greater than the star’s original radius.

Black hole’s don’t magically “suck things in.”

The black hole’s gravity is intense because you can get really, really close to it!