Physics for Scientists and Engineers 10th Edition Β· Motion in Two Dimensions Β· Problem 12
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Serway & Jewett β Motion in Two Dimensions: Problem 12
A basketball star covers 2.80 m horizontally in a jump to dunk the ball (Fig. P4.12a). His motion through space can be modeled precisely as that of a particle at his center of mass, which we will define in Chapter 9. His center of mass is at elevation 1.02 m when he leaves the floor. It reaches a maximum height of 1.85 m above the floor and is at elevation 0.900 m when he touches down again. Determine (a) his time of flight (his βhang timeβ), (b) his horizontal and (c) vertical velocity components at the instant of takeoff, and (d) his takeoff angle. (e) For comparison, determine the hang time of a whitetail deer making a jump (Fig. P4.12b) with center-of-mass elevations \(y_i = 1.20 \text{ m}\), \(y_{max} = 2.50 \text{ m}\), and \(y_f = 0.700 \text{ m}\).
π Solution Approach
Given: 2.80 m, 4.12a, 1.02 m, 1.85 m, 0.900 m
Find: (a) his time of flight; (b) his horizontal and; (c) vertical velocity components at the instant of takeoff
This problem covers key concepts in Motion in Two Dimensions from Physics for Scientists and Engineers 10th Edition by Serway & Jewett. The step-by-step solution involves applying fundamental principles and systematic analysis to arrive at the correct answer. Full solution available with a Solution Pass.
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Physics for Scientists and Engineers Β· 10th Edition
Author: Serway & Jewett
Publisher: Cengage
Chapter: Motion in Two Dimensions