Physics for Scientists and Engineers 10th Edition Β· Oscillatory Motion Β· Problem 36
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Serway & Jewett β Oscillatory Motion: Problem 36
To account for the walking speed of a bipedal or quadrupedal animal, model a leg that is not contacting the ground as a uniform rod of length \(\ell\), swinging as a physical pendulum through one-half of a cycle, in resonance. Let \(\theta_{\text{max}}\) represent its amplitude. (a) Show that the animalβs speed is given by the expression \[v = \frac{\sqrt{6g\ell} \sin \theta_{\text{max}}}{\pi}\] if \(\theta_{\text{max}}\) is sufficiently small that the motion is nearly simple harmonic. An empirical relationship that is based on the same model and applies over a wider range of angles is \[v = \frac{\sqrt{6g\ell \cos(\theta_{\text{max}}/2)} \sin \theta_{\text{max}}}{\pi}\] (b) Evaluate the walking speed of a human with leg length \(0.850 \text{ m}\) and leg-swing amplitude \(28.0^\circ\). (c) What leg length would give twice the speed for the same angular amplitude?
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Given: , in, 6g
Find: (a) Show that the animalβs speed is given by the expression \[v; (b) Evaluate the walking speed of a human with leg length \; (c) What leg length would give twice the speed for the same angu
This problem covers key concepts in Oscillatory Motion 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: Oscillatory Motion