You used a telescope and other mathematics to discover that Jupiter is 5.20 au from the sun. Use the equation to find its orbital period. rounded to the nearest tenths

We can find the orbital period by using Kepler's third law, which states that the ratio between the square of the orbital period and the cube of the average distance of a planet from the Sun is constant for every planet orbiting aroudn the Sun:

[tex]\frac{T^2}{r^3}=const.[/tex]

Using the Earth as reference, we can re-write the law as

[tex]\frac{T_e^2}{r_e^2}=\frac{T_j^2}{r_j^3}[/tex]

where

Te = 1 year is the orbital period of the Earth

re = 1 AU is the average distance of the Earth from the Sun

Tj = ? is the orbital period of Jupiter

rj = 5.20 AU is the average distance of Jupiter from the Sun

Substituting the numbers and re-arranging the equation, we find:

[tex]T_j=\sqrt{\frac{T_e^2 r_j^3}{T_j^2}}=\sqrt{\frac{(1 y)^2 (5.2 AU)^3}{(1 AU)^3}}=11.9 y[/tex]

pstnonsonjoku pstnonsonjoku · Answer 2 · 2022-02-21T14:12:44+01:00

pstnonsonjoku pstnonsonjoku

21-02-2022

From Kepler's laws, the period of the Jupiter is 11.9 years.

What are Kepler's laws?

Kepler's laws are used to describe the relationship between planets and their distance from the sun.

From Kepler's third law; T^2 = r^3 where T = orbital period and r = distance in astronomical units.

T =√(5.20)^3

T = 11.9 years

Learn more about Kepler's laws: https://brainly.com/question/867780

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