Half of the shortest diameter of an elliptical orbit

By measuring the average distance from the sun and using the law of harmonies formula T^2=k*r^3

By dividing the distance between the two foci by the length of the major axis.

The law of ellipses 2. The law of equal areas 3. The law of harmonies

A line that connects a planet to the sun sweeps out equal areas in equal time intervals.

Planetary orbits are shaped like ellipses, with the sun located at one of the two foci.

The law of ellipses 2. The law of equal areas 3. The law of harmonies

By observing the shape and size of their orbits, as well as the time it takes to complete one orbit.

By measuring the average distance from the sun and using the law of harmonies formula: T^2 = k * r^3.

The time it takes for a celestial body to complete one orbit around another.

By measuring the distance between the two farthest points and the two closest points on the orbit.

A line that connects a planet to the sun sweeps out equal areas in equal time intervals

By observing the shape and size of their orbits, as well as the time it takes to complete one orbit.

The square of a planet's orbital period is directly proportional to the cube of its average distance from the sun.

T^2 = k * r^3, where T is the orbital period and r is the average distance from the sun.

The average distance between a celestial body and the sun throughout its elliptical orbit

A The closer the eccentricity is to 0, the closer the orbit is to a perfect circle.

The two points inside the ellipse that determine its shape.

By observing how quickly a planet moves in different parts of its orbit.

By understanding that all planetary orbits are shaped like ellipses, not perfect circles.

By observing the shape and size of their orbits, as well as the time it takes to complete one orbit.

The time it takes for a celestial body to complete one orbit around another.

The law of ellipses 2. The law of equal areas 3. The law of harmonies

Planetary orbits are shaped like ellipses, with the sun located at one of the two foci.

A line that connects a planet to the sun sweeps out equal areas in equal time intervals.

By measuring the average distance from the sun and using the law of harmonies formula: T^2 = k * r^3.

By using the relationship between a planet's orbital period and its average distance from the sun to calculate orbital parameters.

By understanding that all planetary orbits are shaped like ellipses, not perfect circles.

The two points inside the ellipse that determine its shape.