Answer:
[tex]0.37163\ m/s^2[/tex]
0.07576
0.13235
Explanation:
[tex]\omega[/tex] = Angular speed = [tex]\dfrac{100}{3}\times \dfrac{2\pi}{60}[/tex]
r = Distance from the center = 6.1 cm
g = Acceleration due to gravity = 9.81 m/s²
Acceleration of the seed would be
[tex]a_c=r\omega^2\\\Rightarrow a_c=0.061\times (\dfrac{100}{3}\times \dfrac{2\pi}{60})^2\\\Rightarrow a_c=0.74326\ m/s^2[/tex]
The acceleration of the seed is [tex]0.74326\ m/s^2[/tex]
Frictional force is given by
[tex]f=\mu mg\\\Rightarrow ma_c=\mu mg\\\Rightarrow \mu=\dfrac{a_c}{g}\\\Rightarrow \mu=\dfrac{0.74326}{9.81}\\\Rightarrow \mu=0.07576[/tex]
The coefficient of friction is 0.07576
Transverse acceleration is given by
[tex]a_t=r\dfrac{\omega}{t}[/tex]
The resultant acceleration is given by
[tex]a=\sqrt{a_c^2+a_t^2}\\\Rightarrow a=\sqrt{0.74326^2+(0.061\times \dfrac{100}{3}\times \dfrac{2\pi}{60}\times \dfrac{1}{0.2})^2}\\\Rightarrow a=1.29842\ m/s^2[/tex]
[tex]\mu=\dfrac{1.29842}{9.81}\\\Rightarrow \mu=0.13235[/tex]
The coefficient of friction is 0.13235
