Respuesta :
Answer:
(a) Time period is 8.85 s
(b) Normal force at the highest point is 390.2 N
(c) Normal force at the lowest point is 1217 N
Explanation:
Given:
Mass of person, m = 82.0 kg
Radius of the wheel, r = 10.0 m
Speed of the wheel, v = 7.10 m/s
(a) Time period of the circular motion is determine by the relation:
[tex]T=\frac{2\pi r}{v}[/tex]
Substitute the suitable values in the above equation.
[tex]T=\frac{2\pi\times10 }{7.10}[/tex]
T = 8.85 s
(b) The normal force ( F ) at the highest point of the circular path is given by the relation:
F = F₁ - F₂ ....(1)
Here F₁ is gravitational downward force acting on the person and F₂ is the centripetal force.
Gravitational Force, F₁ = mg
Here g is acceleration due to Earth's gravity.
Centripetal force, F₂ = mv²/r
Thus, the equation (1) becomes:
[tex]F=mg-\frac{mv^{2} }{r}[/tex]
Substitute the suitable values in the above equation.
[tex]F=82\times9.8-\frac{82\times7.10^{2} }{10}[/tex]
F = 390.2 N
(c) The normal force ( F ) at the lowest point of the circular path is given by the relation:
F = F₁ + F₂ ....(2)
Here F₁ is gravitational downward force acting on the person and F₂ is the centripetal force.
Thus the equation (2) becomes:
[tex]F=mg+\frac{mv^{2} }{r}[/tex]
[tex]F=82\times9.8+\frac{82\times7.10^{2} }{10}[/tex]
F = 1217 N
