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Find the instantaneous velocity of the particle described in Figure at the following times: (a) (b) and .
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Text solutionVerified
Key Concepts: Instantaneous Velocity, Particle Motion, Position Function, Derivative
Explanation:
To find instantaneous velocity of a particle at a given time, we need to find its velocity function and evaluate it at that time. Given the position function of the particle, we can find its velocity function by differentiating the position function with respect to time.
Step by Step Solution:
Step 1. Differentiate the position function with respect to time to get the velocity function.
Step 2. Evaluate the velocity function at the given times to find the instantaneous velocity.
Final Answer:
The instantaneous velocities of the particle are: (a) m/s, (b) m/s, (c) m/s, and (d) m/s.
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Question Text | Find the instantaneous velocity of the particle described in Figure at the following times: (a) (b) and . |
Topic | All topics |
Subject | Physics |
Class | Class 11 |
Answer Type | Text solution:1 |