Answer to Question #156135 in Quantum Mechanics for Anand

Question #156135

A merry-go-round is initially at rest. On being given a constant angular acceleration it

reaches an angular speed of

1 0.50 rad/sin 10.0 s. At t = 10.0 s, determine the

magnitude of: (i) the angular acceleration of the merry-go-round ; (ii) the linear velocity

of a child sitting on the merry-go-round at a distance of 3.0 m from its centre; (iii) the

tangential acceleration of the child; (iv) the centripetal acceleration of the child; and

(v) the net acceleration of the child.

Expert's answer

i) By the definition of the angular acceleration, we have:

"\\alpha=\\dfrac{\\Delta \\omega}{\\Delta t}=\\dfrac{10.5\\ \\dfrac{rad}{s}}{10.0\\ s}=1.05\\ \\dfrac{rad}{s^2}."

ii) We can find the linear velocity of the child sitting on the merry-go-round at a distance of 3.0 m from its centre from the formula:

"v=\\omega r=10.5\\ \\dfrac{rad}{s}\\cdot 3.0\\ m=31.5\\ \\dfrac{m}{s}."

iii) We can find the tangential acceleration of the child from the formula:

"a_t=r\\alpha=3.0\\ m\\cdot1.05\\ \\dfrac{rad}{s^2}=3.15\\ \\dfrac{m}{s^2}."

iv) We can find the centripetal acceleration of the child from the formula:

"a_c=\\dfrac{v^2}{r}=\\dfrac{(31.5\\ \\dfrac{m}{s})^2}{3.0\\ m}=330.75\\ \\dfrac{m}{s^2}."

v) We can find the net acceleration of the child from the Pythagorean theorem:

"a_{net}=\\sqrt{a_t^2+a_c^2},""a_{net}=\\sqrt{(3.15\\ \\dfrac{m}{s^2})^2+(330.75\\ \\dfrac{m}{s^2})^2}=330.76\\ \\dfrac{m}{s^2}."

Answer:

i) "\\alpha=1.05\\ \\dfrac{rad}{s^2}."

ii) "v=31.5\\ \\dfrac{m}{s}."

iii) "a_t=3.15\\ \\dfrac{m}{s^2}."

iv) "a_c=330.75\\ \\dfrac{m}{s^2}."

v) "a_{net}=330.76\\ \\dfrac{m}{s^2}."

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