Explanation:
In order to a person to be thrown into space, the centripetal force has to be greater than his weight. Thus, we have to calculate the magnitudes of this forces:
[tex]F_c=ma_c(1)\\W=mg[/tex]
The centripetal acceleration is given by:
[tex]a_c=\frac{v^2}{r}[/tex]
The speed is given by the distance traveled ([tex]2\pi r_{earth}[/tex]) divided into the time spent in one revolution (the period), that is, one day.
[tex]v=\frac{2\pi r_{earth}}{T}\\v=\frac{2\pi(6.37*10^{6}m)}{86400s}\\v=463.24\frac{m}{s}[/tex]
Now, we can calculate the centripetal force:
[tex]F_c=m\frac{v^2}{r}\\F_c=117kg\frac{(463.24\frac{m}{s})^2}{6.37*10^{6}m}\\F_c=3.94N[/tex]
Finally, we calculate the weight of the person:
[tex]W=117kg(9.8\frac{m}{s^2})\\W=1146.6N[/tex]
Since the weight is much greater than the centripetal force, we can say that people wouldn't be thrown into space.
