1 Answer

TJ Asher · Answer 1 · 2020-07-24T13:30:30+0000

Answer:

The equilibrium temperature of the surface of the moon can be found by the formula as follows:

$T=((K_s(1-alebdo))/(4 \sigma))^{(1)/(4)}$

Where
K_s = 1366 W/m^2 is the solar constant and
$\sigma = 5.67 * 10^ {-8}W/m^2K^(-4)$ is the Stefan's Boltzmann constant.

$T=(\frac{1366(1-0.08)}{4* 5.67 * 10^ {-8}})^{(1)/(4)} = (55.41* 10^8)^{(1)/(4)} = 272.7 K=273 K$

Thus, the equilibrium temperature of the surface of the moon is 273 K.

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