Answer:
M = 6.014x10^24 kg
Explanation:
First of all we need to gather all data:
Period (T) is 27.32 days
Constant distant (a) is 3.84x10^8 m
The expression given is T² = (4π²/GM)*a³
We need to know the value of the constant G which is 6.674x10^-11 Nm² / kg²
Finally M is the mass of the earth.
From that expression, we should solve for M:
M = (4π²/GT²)*a³
In this case, we just trade the T for the M, because it was the only change we needed to do. Now, before we can do the calculations, let's convert the days to second:
T = 27.32 days * 24 h/day * 3600 s/h = 2,360,448 s
Now, let's solve for M replacing all the data in the formula:
M = (4π² / 6.674x10^-11 * 2,360,448²)*(3.84x10^8)³
M = (39.4784 / 371.6891) * 5.662x10^25
M = 6.014x10^24 kg
