Question

Two of Jupiter’s moons have orbit radii which differ by a factor of 2. Their periods

• A. Differ by a factor of $2\sqrt{2}$
• B. Differ by a factor of $\sqrt{2}$
• C. Differ by a factor of 4
• D. Are the same

Answer 1

The correct option is A

Differ by a factor of $2\sqrt{2}$

Step 1: Given data and assumptions made:
Let, the radius of Jupiter’s first moon is R₁ and the time period T₁ and the radius of Jupiter’s second moon is R₂ and the time period T₂.

$R_1=2R_2$

Step 2: Calculating time period

Kepler's Third Law: The square of the orbital period of the planet is directly proportional to the cube of the semi-major axis of its orbit.
By using Kepler’s third law, $T^{2}a{R}^3$.

Therefore, the ratio of their time period will be,
$$\begin{gathered} \frac{{T_1}^2}{{T_2}^2}=\frac{{R_1}^3}{{R_2}^3} \\ \mathrm{One}\mathrm{moon}\mathrm{orbit}\mathrm{radii}\mathrm{is}\mathrm{differ}\mathrm{by}\mathrm{another}\mathrm{one}\mathrm{by}\mathrm{a}\mathrm{factor}\mathrm{of}2.\mathrm{So}, \\ {R}_1\mathit{=}\mathit{2}{R}_2 \\ \mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\frac{{T_{\mathit{1}}}^{\mathit{2}}}{{T_{\mathit{2}}}^{\mathit{2}}}\mathit{=}\frac{{\left(2R_{\mathit{2}}\right)}^{\mathit{3}}}{{R_2}^{\mathit{3}}} \\ \mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\frac{{T_{\mathit{1}}}^{\mathit{2}}}{{T_{\mathit{2}}}^{\mathit{2}}}\mathit{=}{\mathit{\left(}\mathit{2}\mathit{\right)}}^{\mathit{3}}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\frac{T_{\mathit{1}}}{T_{\mathit{2}}}\mathit{=}\mathit{\left(}\sqrt{\mathit{8}}\mathit{\right)} \\ \mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\mathit{}\frac{T_{\mathit{1}}}{T_{\mathit{2}}}\mathit{=}\mathit{2}\sqrt{\mathit{2}} \\ {T}_1\mathit{=}\mathit{2}\sqrt{\mathit{2}}{T}_{\mathit{2}} \end{gathered}$$

Hence, the correct answer is option (a).