6.6 Satellites and kepler’s laws: an argument for simplicity (Page 4/5)

College physics Page 4 / 5

A non-satellite body fulfilling only the first two of the above criteria is classified as “dwarf planet.”

In 2006, Pluto was demoted to a ‘dwarf planet’ after scientists revised their definition of what constitutes a “true” planet.

Orbital data and kepler’s third law
Parent	Satellite	Average orbital radius r (km)	Period T(y)	r ³ / T ² (km ³ / y ² )
Earth	Moon	$3.84 \times 10^{5}$	0.07481	$1 . 01 \times 10^{19}$
Sun	Mercury	$5 . 79 \times 10^{7}$	0.2409	$3 . 34 \times 10^{24}$
	Venus	$1 . 082 \times 10^{8}$	0.6150	$3 . 35 \times 10^{24}$
Earth	$1 . 496 \times 10^{8}$	1.000	$3 . 35 \times 10^{24}$
Mars	$2 . 279 \times 10^{8}$	1.881	$3 . 35 \times 10^{24}$
Jupiter	$7 . 783 \times 10^{8}$	11.86	$3 . 35 \times 10^{24}$
Saturn	$1 . 427 \times 10^{9}$	29.46	$3 . 35 \times 10^{24}$
Neptune	$4 . 497 \times 10^{9}$	164.8	$3 . 35 \times 10^{24}$
Pluto	$5 . 90 \times 10^{9}$	248.3	$3 . 33 \times 10^{24}$
Jupiter	Io	$4 . 22 \times 10^{5}$	0.00485 (1.77 d)	$3 . 19 \times 10^{21}$
	Europa	$6 . 71 \times 10^{5}$	0.00972 (3.55 d)	$3 . 20 \times 10^{21}$
Ganymede	$1 . 07 \times 10^{6}$	0.0196 (7.16 d)	$3 . 19 \times 10^{21}$
Callisto	$1 . 88 \times 10^{6}$	0.0457 (16.19 d)	$3 . 20 \times 10^{21}$

The universal law of gravitation is a good example of a physical principle that is very broadly applicable. That single equation for the gravitational force describes all situations in which gravity acts. It gives a cause for a vast number of effects, such as the orbits of the planets and moons in the solar system. It epitomizes the underlying unity and simplicity of physics.

Before the discoveries of Kepler, Copernicus, Galileo, Newton, and others, the solar system was thought to revolve around Earth as shown in [link] (a). This is called the Ptolemaic view, for the Greek philosopher who lived in the second century AD. This model is characterized by a list of facts for the motions of planets with no cause and effect explanation. There tended to be a different rule for each heavenly body and a general lack of simplicity.

[link] (b) represents the modern or Copernican model. In this model, a small set of rules and a single underlying force explain not only all motions in the solar system, but all other situations involving gravity. The breadth and simplicity of the laws of physics are compelling. As our knowledge of nature has grown, the basic simplicity of its laws has become ever more evident.

In figure a the paths of the different planets are shown in the forms of dotted concentric circles with the Earth at the center with its Moon. The Sun is also shown revolving around the Earth. Each planet is labeled with its name. On the planets Mercury, Venus, Mars, Jupiter and Saturn green colored epicycles are shown. In the figure b Copernican view of planet is shown. The Sun is shown at the center of the solar system. The planets are shown moving around the Sun. — (a) The Ptolemaic model of the universe has Earth at the center with the Moon, the planets, the Sun, and the stars revolving about it in complex superpositions of circular paths. This geocentric model, which can be made progressively more accurate by adding more circles, is purely descriptive, containing no hints as to what are the causes of these motions. (b) The Copernican model has the Sun at the center of the solar system. It is fully explained by a small number of laws of physics, including Newton’s universal law of gravitation.

Section summary

Kepler’s laws are stated for a small mass $m$ orbiting a larger mass $M$ in near-isolation. Kepler’s laws of planetary motion are then as follows:
Kepler’s first law

The orbit of each planet about the Sun is an ellipse with the Sun at one focus.

Kepler’s second law

Each planet moves so that an imaginary line drawn from the Sun to the planet sweeps out equal areas in equal times.

Kepler’s third law

The ratio of the squares of the periods of any two planets about the Sun is equal to the ratio of the cubes of their average distances from the Sun:

$\frac{T_{1}^{2}}{T_{2}^{2}} = \frac{r_{1}^{3}}{r_{2}^{3}},$

where $T$ is the period (time for one orbit) and $r$ is the average radius of the orbit.
The period and radius of a satellite’s orbit about a larger body $M$ are related by
$T^{2} = \frac{{4π}^{2}}{GM} r^{3}$

or

$\frac{r^{3}}{T^{2}} = \frac{G}{{4π}^{2}} M .$

Questions & Answers

if three forces F1.f2 .f3 act at a point on a Cartesian plane in the daigram .....so if the question says write down the x and y components ..... I really don't understand

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the value of V1 and V2

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advantages of electrons in a circuit

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it is the force or component of the force that the surface exert on an object incontact with it and which acts perpendicular to the surface

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what is the half reaction of Potassium and chlorine

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how to calculate coefficient of static friction

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How to calculate a current

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a structure of a thermocouple used to measure inner temperature

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a fixed gas of a mass is held at standard pressure temperature of 15 degrees Celsius .Calculate the temperature of the gas in Celsius if the pressure is changed to 2×10 to the power 4

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what is acceleration

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a rate of change in velocity of an object whith respect to time

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Acceleration is a rate of change in velocity.

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t =r×f

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Source: OpenStax, College physics. OpenStax CNX. Jul 27, 2015 Download for free at http://legacy.cnx.org/content/col11406/1.9

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