# 3.1: The Laws of Planetary Motion

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##### Learning Objectives

By the end of the section, you will be able to:

- Describe how Tycho Brahe and Johannes Kepler contributed to our understanding of how planets move around the Sun
- Explain Kepler’s three laws of planetary motion

At about the time that Galileo was beginning his experiments with falling bodies, the efforts of two other scientists dramatically advanced our understanding of the motions of the planets. These two astronomers were the observer Tycho Brahe and the mathematician Johannes Kepler. Together, they placed the speculations of Copernicus on a sound mathematical basis and paved the way for the work of Isaac Newton in the next century.

## Tycho Brahe’s Observatory

Three years after the publication of Copernicus’ *De Revolutionibus*, Tycho Brahe was born to a family of Danish nobility. He developed an early interest in astronomy and, as a young man, made significant astronomical observations. Among these was a careful study of what we now know was an exploding star that flared up to great brilliance in the night sky. His growing reputation gained him the patronage of the Danish King Frederick II, and at the age of 30, Brahe was able to establish a fine astronomical observatory on the North Sea island of Hven (Figure \(\PageIndex{1}\)). Brahe was the last and greatest of the pre-telescopic observers in Europe.

At Hven, Brahe made a continuous record of the positions of the Sun, Moon, and planets for almost 20 years. His extensive and precise observations enabled him to note that the positions of the planets varied from those given in published tables, which were based on the work of Ptolemy. These data were extremely valuable, but Brahe didn’t have the ability to analyze them and develop a better model than what Ptolemy had published. He was further inhibited because he was an extravagant and cantankerous fellow, and he accumulated enemies among government officials. When his patron, Frederick II, died in 1597, Brahe lost his political base and decided to leave Denmark. He took up residence in Prague, where he became court astronomer to Emperor Rudolf of Bohemia. There, in the year before his death, Brahe found a most able young mathematician, Johannes Kepler, to assist him in analyzing his extensive planetary data.

## Johannes Kepler

Johannes Kepler was born into a poor family in the German province of Württemberg and lived much of his life amid the turmoil of the Thirty Years’ War (see Figure \(\PageIndex{1}\)). He attended university at Tubingen and studied for a theological career. There, he learned the principles of the Copernican system and became converted to the heliocentric hypothesis. Eventually, Kepler went to Prague to serve as an assistant to Brahe, who set him to work trying to find a satisfactory theory of planetary motion—one that was compatible with the long series of observations made at Hven. Brahe was reluctant to provide Kepler with much material at any one time for fear that Kepler would discover the secrets of the universal motion by himself, thereby robbing Brahe of some of the glory. Only after Brahe’s death in 1601 did Kepler get full possession of the priceless records. Their study occupied most of Kepler’s time for more than 20 years.

Through his analysis of the motions of the planets, Kepler developed a series of principles, now known as *Kepler’s three laws,*which described the behavior of planets based on their paths through space. The first two laws of planetary motion were published in 1609 in *The New Astronomy*. Their discovery was a profound step in the development of modern science.

## The First Two Laws of Planetary Motion

The path of an object through space is called its orbit. Kepler initially assumed that the orbits of planets were circles, but doing so did not allow him to find orbits that were consistent with Brahe’s observations. Working with the data for Mars, he eventually discovered that the orbit of that planet had the shape of a somewhat flattened circle, or **ellipse**. Next to the circle, the ellipse is the simplest kind of closed curve, belonging to a family of curves known as *conic sections* (Figure \(\PageIndex{2}\)).

You might recall from math classes that in a circle, the center is a special point. The distance from the center to anywhere on the circle is exactly the same. In an ellipse, the sum of the distance from two special points inside the ellipse to any point on the ellipse is always the same. These two points inside the ellipse are called its foci (singular: focus), a word invented for this purpose by Kepler.

This property suggests a simple way to draw an ellipse (Figure \(\PageIndex{3}\)). We wrap the ends of a loop of string around two tacks pushed through a sheet of paper into a drawing board, so that the string is slack. If we push a pencil against the string, making the string taut, and then slide the pencil against the string all around the tacks, the curve that results is an ellipse. At any point where the pencil may be, the sum of the distances from the pencil to the two tacks is a constant length—the length of the string. The tacks are at the two foci of the ellipse.

The widest diameter of the ellipse is called its **major axis**. Half this distance—that is, the distance from the center of the ellipse to one end—is the **semimajor axis**, which is usually used to specify the size of the ellipse. For example, the semimajor axis of the orbit of Mars, which is also the planet’s average distance from the Sun, is 228 million kilometers.

The shape (roundness) of an ellipse depends on how close together the two foci are, compared with the major axis. The ratio of the distance between the foci to the length of the semimajor axis is called the **eccentricity** of the ellipse.

If the foci (or tacks) are moved to the same location, then the distance between the foci would be zero. This means that the eccentricity is zero and the ellipse is just a circle; thus, a circle can be called an ellipse of zero eccentricity. In a circle, the semimajor axis would be the radius.

Next, we can make ellipses of various elongations (or extended lengths) by varying the spacing of the tacks (as long as they are not farther apart than the length of the string). The greater the eccentricity, the more elongated is the ellipse, up to a maximum eccentricity of 1.0, when the ellipse becomes “flat,” the other extreme from a circle.

The size and shape of an ellipse are completely specified by its semimajor axis and its eccentricity. Using Brahe’s data, Kepler found that Mars has an elliptical orbit, with the Sun at one focus (the other focus is empty). The eccentricity of the orbit of Mars is only about 0.1; its orbit, drawn to scale, would be practically indistinguishable from a circle, but the difference turned out to be critical for understanding planetary motions.

Kepler generalized this result in his first law and said that *the orbits of all the planets are ellipses*. Here was a decisive moment in the history of human thought: it was not necessary to have only circles in order to have an acceptable cosmos. The universe could be a bit more complex than the Greek philosophers had wanted it to be.

Kepler’s second law deals with the speed with which each planet moves along its ellipse, also known as its **orbital** **speed**. Working with Brahe’s observations of Mars, Kepler discovered that the planet speeds up as it comes closer to the Sun and slows down as it pulls away from the Sun. He expressed the precise form of this relationship by imagining that the Sun and Mars are connected by a straight, elastic line. When Mars is closer to the Sun (positions 1 and 2 in Figure \(\PageIndex{4}\)), the elastic line is not stretched as much, and the planet moves rapidly. Farther from the Sun, as in positions 3 and 4, the line is stretched a lot, and the planet does not move so fast. As Mars travels in its elliptical orbit around the Sun, the elastic line sweeps out areas of the ellipse as it moves (the colored regions in our figure). Kepler found that in equal intervals of time (t), the areas swept out in space by this imaginary line are always equal; that is, the area of the region B from 1 to 2 is the same as that of region A from 3 to 4.

If a planet moves in a circular orbit, the elastic line is always stretched the same amount and the planet moves at a constant speed around its orbit. But, as Kepler discovered, in most orbits that speed of a planet orbiting its star (or moon orbiting its planet) tends to vary because the orbit is elliptical.

## Kepler’s Third Law

Kepler’s first two laws of planetary motion describe the shape of a planet’s orbit and allow us to calculate the speed of its motion at any point in the orbit. Kepler was pleased to have discovered such fundamental rules, but they did not satisfy his quest to fully understand planetary motions. He wanted to know why the orbits of the planets were spaced as they are and to find a mathematical pattern in their movements—a “harmony of the spheres” as he called it. For many years he worked to discover mathematical relationships governing planetary spacing and the time each planet took to go around the Sun.

In 1619, Kepler discovered a basic relationship to relate the planets’ orbits to their relative distances from the Sun. We define a planet’s **orbital** **period**, (\(P\)), as the time it takes a planet to travel once around the Sun. Also, recall that a planet’s semimajor axis, *a,* is equal to its average distance from the Sun. The relationship, now known as *Kepler’s third law*, says that a planet’s orbital period squared is proportional to the semimajor axis of its orbit cubed, or

\[P^2 \propto a^3 \nonumber\]

When \(P\) (the orbital period) is measured in years, and *a* is expressed in a quantity known as an **astronomical** **unit** (**AU**), the two sides of the formula are not only proportional but equal. One AU is the average distance between Earth and the Sun and is approximately equal to 1.5 × 108 kilometers. In these units,

\[P^2=a^3 \nonumber\]

Kepler’s third law applies to all objects orbiting the Sun, including Earth, and provides a means for calculating their relative distances from the Sun from the time they take to orbit. Let’s look at a specific example to illustrate how useful Kepler’s third law is.

For instance, suppose you time how long Mars takes to go around the Sun (in Earth years). Kepler’s third law can then be used to calculate Mars’ average distance from the Sun. Mars’ orbital period (1.88 Earth years) squared, or \(P^2\), is 1.882 = 3.53, and according to the equation for Kepler’s third law, this equals the cube of its semimajor axis, or \(a^3\). So what number must be cubed to give 3.53? The answer is 1.52 (since \(1.52 \times 1.52 \times 1.52 = 3.53\)). Thus, Mars’ semimajor axis in astronomical units must be 1.52 AU. In other words, to go around the Sun in a little less than two years, Mars must be about 50% (half again) as far from the Sun as Earth is.

##### Example \(\PageIndex{1}\): Calculating Periods

Imagine an object is traveling around the Sun. What would be the orbital period of the object if its orbit has a semimajor axis of 50 AU?

**Solution**

From Kepler’s third law, we know that (when we use units of years and AU)

\[P^2=a^3 \nonumber\]

If the object’s orbit has a semimajor axis of 4 AU (*a* = 50), we can cube 50 and then take the square root of the result to get P:

\[ \begin{array}{l} P = \sqrt{a^3} \\ P = \sqrt{50 \times 50 \times 50} = \sqrt{125,000} = 353.6 \text{ years} \end{array}\]

Therefore, the orbital period of the object is about 350 years. This would place our hypothetical object beyond the orbit of Pluto.

##### Exercise \(\PageIndex{1}\)

What would be the orbital period of an asteroid (a rocky chunk between Mars and Jupiter) with a semimajor axis of 3 AU?

**Answer**-
\[P = \sqrt{3 \times 3 \times 3} = \sqrt{27} = 5.2 \text{ years}\]

Kepler’s three laws of planetary motion can be summarized as follows:

**Kepler’s first law**: Each planet moves around the Sun in an orbit that is an ellipse, with the Sun at one focus of the ellipse.**Kepler’s second law**: The straight line joining a planet and the Sun sweeps out equal areas in space in equal intervals of time.**Kepler’s third law**: The square of a planet’s orbital period is directly proportional to the cube of the semimajor axis of its orbit.

Kepler’s three laws provide a precise geometric description of planetary motion within the framework of the Copernican system. With these tools, it was possible to calculate planetary positions with greatly improved precision. Still, Kepler’s laws are purely descriptive: they do not help us understand what forces of nature constrain the planets to follow this particular set of rules. That step was left to Isaac Newton.

##### Example \(\PageIndex{2}\): Applying Kepler’s Third Law

Using the orbital periods and semimajor axes for Venus and Earth that are provided here, calculate \(P^2\) and \(a^3\), and verify that they obey Kepler’s third law. Venus’ orbital period is 0.62 year, and its semimajor axis is 0.72 AU. Earth’s orbital period is 1.00 year, and its semimajor axis is 1.00 AU.

**Solution**

We can use the equation for Kepler’s third law, \(P^2 \propto a^3\). For Venus, \(P^2 = 0.62 \times 0.62 = 0.38 \text{ years}\) and \(a^3 = 0.72 \times 0.72 \times 0.72 = 0.37 \text{ AU}\) (rounding numbers sometimes causes minor discrepancies like this). The orbital period (0.38 year) approximates the semimajor axis (0.37 AU).

Therefore, Venus obeys Kepler’s third law. For Earth, \(P^2 = 1.00 \times 1.00 = 1.00 \text{ year}\) and \(a^3 = 1.00 \times 1.00 \times 1.00 = 1.00 \text{ AU}\). The orbital period (1.00 year) approximates (in this case, equals) the semimajor axis (1.00 AU). Therefore, Earth obeys Kepler’s third law.

##### Exercise \(\PageIndex{1}\)

Using the orbital periods and semimajor axes for Saturn and Jupiter that are provided here, calculate \(P^2\) and \(a^3\), and verify that they obey Kepler’s third law. Saturn’s orbital period is 29.46 years, and its semimajor axis is 9.54 AU. Jupiter’s orbital period is 11.86 years, and its semimajor axis is 5.20 AU.

**Answer**-
For Saturn, \(P^2 = 29.46 \times 29.46 = 867.9 \text{ years}\) and \(a^3 = 9.54 \times 9.54 \times 9.54 = 868.3 \text{ AU}\). The orbital period (867.9 years) approximates the semimajor axis (868.3 AU). Therefore, Saturn obeys Kepler’s third law.

In honor of the scientist who first devised the laws that govern the motions of planets, the team that built the first spacecraft to search for planets orbiting other stars decided to name the probe “Kepler.” To learn more about Johannes Kepler’s life and his laws of planetary motion, as well as lots of information on the Kepler Mission, visit NASA’s Kepler website and follow the links that interest you.

## Key Concepts and Summary

Tycho Brahe’s accurate observations of planetary positions provided the data used by Johannes Kepler to derive his three fundamental laws of planetary motion. Kepler’s laws describe the behavior of planets in their orbits as follows: (1) planetary orbits are ellipses with the Sun at one focus; (2) in equal intervals, a planet’s orbit sweeps out equal areas; and (3) the relationship between the orbital period (\(P\)) and the semimajor axis (\(a\)) of an orbit is given by \(P^2 = a^3\) (when \(a\) is in units of AU and \(P\) is in units of Earth years).

### Glossary

- astronomical unit (AU)
- the unit of length defined as the average distance between Earth and the Sun; this distance is about 1.5 × 108 kilometers

- eccentricity
- in an ellipse, the ratio of the distance between the foci to the major axis

- ellipse
- a closed curve for which the sum of the distances from any point on the ellipse to two points inside (called the foci) is always the same

- focus
- (plural: foci) one of two fixed points inside an ellipse from which the sum of the distances to any point on the ellipse is constant

- Kepler’s first law
- each planet moves around the Sun in an orbit that is an ellipse, with the Sun at one focus of the ellipse

- Kepler’s second law
- the straight line joining a planet and the Sun sweeps out equal areas in space in equal intervals of time

- Kepler’s third law
- the square of a planet’s orbital period is directly proportional to the cube of the semimajor axis of its orbit

- major axis
- the maximum diameter of an ellipse

- orbit
- the path of an object that is in revolution about another object or point

- orbital period (
*P*) - the time it takes an object to travel once around the Sun

- orbital speed
- the speed at which an object (usually a planet) orbits around the mass of another object; in the case of a planet, the speed at which each planet moves along its ellipse
- semimajor axis
- half of the major axis of a conic section, such as an ellipse