Plane MotionIf a rigid body moves with both translational and rotational motion, it is said to be in general plane motion. To analyze general plane motion, equations describing the translation of...

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Plane Motion If a rigid body moves with both translational and rotational motion, it is said to be in general plane motion. To analyze general plane motion, equations describing the translation of the center of gravity and the equations describing the rotation need to be used. 12-1 A high-speed escalator travels at 180 ft/min. What is the absolute velocity of a person running at 700 ft/min (a) in the same direction as the escalator’s motion and (b) in a direction opposite to that of the escalator’s motion? 12-10 he angular velocity of AB in Figure P12–10 is 400 rpm clockwise. Determine the angular velocity of BC and the velocity of C when (a) θ = 0° and (b) θ = 90°. 12–12. If slider C in Figure P12–12 moves downward at 0.7 m/s, determine (a) the angular velocity of AB and (b) the velocity of D. 12-21 The angular velocity of AB = 2 rad/s clockwise in Figure P12–21. Using the relative velocity equation, determine (a) the velocity of point C, (b) the angular velocity of CBD, and (c) the velocity of point D.
Answered Same DayFeb 07, 2023

Answer To: Plane MotionIf a rigid body moves with both translational and rotational motion, it is said to be...

Dr Shweta answered on Feb 08 2023
47 Votes
Plane Motion solution
Ans 1. A) The formula for calculating the absolute velocity of a person runni
ng at 700ft/min in the exact same direction as the escalator's motion is as follows:
Here, we sum the two velocities: 180 feet per minute + 700 feet per minute = 880 feet per minute.
B) The absolute velocity of a person sprinting in the opposite direction of an escalator at 700 feet per minute is computed as follows:
Subtracting the person's velocity from the escalator's velocity = 180 feet per minute - 700 feet per minute =...
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