📘 Kepler’s Third Law
Kepler's Third Law, the Law of Harmonies, shows a precise mathematical link between a planet's orbital period and its average distance from the Sun.
Audio Explanation
Prefer to listen? Here’s a quick audio summary of Kepler’s Third Law.
The Law of Harmonies
While Kepler’s First and Second Laws describe the motion of a single planet, the Third Law compares different planets. It shows that a planet’s “year” is determined by its distance from the Sun.
The Mathematical Relationship
Kepler discovered that the square of a planet’s orbital period ($T$) is proportional to the cube of the semi-major axis ($a$) of its orbit:
\[T^2 \propto a^3\]For our solar system, using Earth years for time and Astronomical Units (AU) for distance:
\[T^2 = a^3\]What This Means
- Further = Slower: Planets farther from the Sun travel longer paths and move more slowly.
- Universal Constant: Newton later showed this law comes from the Law of Universal Gravitation. The ratio $T^2 / a^3$ depends only on the mass of the Sun (or central body).
Interactive: Kepler’s Third Law Vocabulary
Match the key terms and symbols to their correct definitions.
Click a term or symbol and then its matching definition. Match all pairs to complete!
💡 Quick Concept Check:
If Planet X is 4 AU away from the Sun, how many Earth years does it take to complete one orbit?