Answer:
4.62N
Explanation:
Since the motion covers 1 circle (or 2π rad) per 0.8 seconds, its angular velocity is
[tex]\omega=2\pi/0.8 = 7.85 rad/s[/tex]
Radius of the circular motion is r = 75 cm or 0.75m. We can calculate the centripetal acceleration of this mass
[tex]a_c = \omega^2r = 7.85^2 * 0.75 = 46.2 m/s^2[/tex]
From Newton's 2nd law, we calculate the centripetal force, which is also the tension of the string:
[tex]F_c = a_cm = 46.2 * 0.1 = 4.62 N[/tex]
