According to Kepler\'s 3rd Law the square of the orbital period of a planet is p

Question

According to Kepler's 3rd Law the square of the orbital period of a planet is proportional to the
cube of the semi-major axis. Verify this from the data in the
                                  Planet Orbital Period (julian years)                      Semi-Major Axis (AU)
Mercury                                               0:2408467                                               0:38709893
Venus                                                0:61519726                                               0:72333199
Earth                                                   1:0000174                                                1:00000011
Mars                                                     1:8808476                                               1:52366231
Jupiter                                                11:862615                                                   5:20336301
Saturn                                                 29:447298                                                9:53707032
Uranus                                               84:016846                                                19:19126393
Neptune                                             164:79132                                                 30:06896248
Here a Julian year is 365:25 days and an AU - Astronomical Unit, is 1:496  1011 m. Try the calculation first using the units of years and AU, and then change to meters and seconds.

Explanation / Answer

Where the period (T) is in years and
(R) is the object's mean distance from
the sun in this case measured in
astronomical (earth=1au) units, kepler's
law reduces to:
T^2/R^3 = 1
T = sqrt((5.07au)^3) = 11.416 Yr

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