Let's assume there is this planet with no atmosphere, no geothermal activity and an average temperature $\ T_p$.
Now, if the distance between the planet and the star is $\ d$ and the radius of the star is $\ r$ , how do you express the temperature $\ T_s$ of the star?
I can't figure out whether the Stefan-Boltzmann law is the appropriate thing to use here.
Thank you!
this sounds like a fun homework question for upper-division astronomy !!
a couple more points to consider in your solution:
PS. i am a new contributor, so my apologies for "answering" with not a complete answer. i have a low reputation, so i am not able to put these important points as comments. besides, i'm not sure what the ethics are of just giving a straight-up answer to homework questions on here.
I can't figure out whether the Stefan-Boltzmann law is the appropriate thing to use here.
Yes, that's exactly what to use, and the 1/4 exponent in the equation below suggests to us that that's how it was derived even before we review the derivation in the article.
Wikipedia's Planetary equilibrium temperature; Calculation for extrasolar planets provides this relationship.
$$T_{eq} = T_{star} \sqrt{\frac{R}{2a}} \left(1 - A_B \right)^{1/4}$$
where $R$ is the radius of the star, $a$ is the orbital distance of the planet, and $A_B$ is the Bond albedo of the planet. You will need to read the article and other further sources to understand what Bond albedo is and how one might estimate it for the planet. See also
