- #1
izforgoat
- 16
- 0
Homework Statement
I'm looking for the period of an orbiting object a certain height from the Earth's surface, I am given this height. So I have the total radius of 6,5OO,OOO m, g = 9.81 m/s^2 and the mass of Earth = 5.98*10^24 kg
Please note that for this problem G is another constant than what it usually is.
Homework Equations
Here is where I am confused I do not know whether to use the T = (2[tex]\pi[/tex]r)/[tex]\sqrt{gr}[/tex]
or the T[tex]^{2}[/tex] = (4[tex]\pi^{2}r^{3}[/tex])/(GM[tex]_{earth}[/tex])
where G = 6.67*1O^-7
The Attempt at a Solution
K. So when I use the method of going with T = (2[tex]\pi[/tex]r)/[tex]\sqrt{gr}[/tex]
I get about 5114 seconds for the period.
when I use T[tex]^{2}[/tex] = (4[tex]\pi^{2}r^{3}[/tex])/(GM[tex]_{earth}[/tex])
I get 52.13584223 seconds, which doesn't logically seem right but since G is different I don't know.
does anyone know what the right method is?