http://www.ck12.org Chapter 9. Rotational Motion
SolutionTo solve this problem, we will plug in the known values into Newton’s second law for rotation and solve forα.
When calculating the moment of inertia of the door, we’ll consider it a rod being rotated about one end. We’ll first
calculate the angular acceleration when pushing from the center of the door.Στ=Iα
Fr=IαFr=1
3
mr^2 αα=
3 Fr
mr^2
α=
3 ∗50 N∗.75 m
20 kg∗( 1 .5 m)^2
α= 2 .5 rad/s^2Now we’ll calculate the angular acceleration when pushing from the end of the door.α=
3 Fr
mr^2
α=
3 ∗50 N∗ 1 .5m
20 kg∗( 1 .5 m)^2
α=5 rad/s^2Clearly, it is much faster and easier to open doors when pushing from the point farthest from the hinge.Watch this Explanation
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