Answer: [tex]5.9(10)^{-8} m[/tex]
Explanation:
The equation to calculate the center of mass [tex]C_{M}[/tex] of a particle system is:
[tex]C_{M}=\frac{m_{1}r_{1}+m_{1}r_{1}+...+m_{n}r_{n}}{m_{1}+m_{2}+...+m_{n}}[/tex]
In this case we can arrange for one dimension, assuming the geometric center of the Earth and the ladder are on a line, and assuming original center of mass located at the Earth's geometric center:
[tex]C_{M}=\frac{m_{E}(0 m) + m_{p} r_{E-p}}{m_{E}+m_{p}}[/tex]
Where:
[tex]m_{E}=5.9(10)^{24} kg[/tex] is the mass of the Earth
[tex]m_{p}=55(10)^{9} kg[/tex] is the mass of 1 billion people
[tex]r_{E}=6371000 m[/tex] is the radius of the Earth
[tex]r_{E-p}=6371000 m- 2m=6370998 m[/tex] is the distance between the center of the Earth and the position of the people (2 m above the Earth's surface)
[tex]C_{M}=\frac{m_{p}55(10)^{9} kg (6370998 m)}{5.9(10)^{24} kg+55(10)^{9} kg}[/tex]
[tex]C_{M}=5.9(10)^{-8} m[/tex] This is the displacement of Earth's center of mass from the original center.
