Fundamentals of Physics Extended 12th Edition · Motion Along a Straight Line · Problem 15
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Halliday, Resnick & Walker — Motion Along a Straight Line: Problem 15
(a) If a particle’s position is given by \( x = 4 - 12t + 3t^2 \) (where \( t \) is in seconds and \( x \) is in meters), what is its velocity at \( t = 1 \text{ s} \)? (b) Is it moving in the positive or negative direction of \( x \) just then? (c) What is its speed just then? (d) Is the speed increasing or decreasing just then? (Try answering the next two questions without further calculation.) (e) Is there ever an instant when the velocity is zero? If so, give the time \( t \); if not, answer no. (f) Is there a time after \( t = 3 \text{ s} \) when the particle is moving in the negative direction of \( x \)? If so, give the time \( t \); if not, answer no.
📝 Solution Approach
Find: (a) If a particle’s position is given by \; (b) Is it moving in the positive or negative direction of \; (c) What is its speed just then?
This problem covers key concepts in Motion Along a Straight Line from Fundamentals of Physics Extended 12th Edition by Halliday, Resnick & Walker. 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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📘 About This Textbook
Fundamentals of Physics Extended · 12th Edition
Author: Halliday, Resnick & Walker
Publisher: Wiley
Chapter: Motion Along a Straight Line