Find Angular Velocity for Moving Particle Parallel to x-Axis

AI Thread Summary
A particle moving parallel to the x-axis with a constant y-component of its position vector is analyzed for angular velocity about the origin. The discussion reveals that the angular velocity can be derived from the relationship between the position vector and the velocity components. One participant calculated angular velocity as ω = bv/(b² + x²), while another referenced a book solution of ω = [v sin²(θ)]/b. The conversation highlights the importance of differentiating the velocity components correctly and resolving them into radial and tangential components to accurately determine the angular velocity. Clarification on the differing approaches emphasizes the necessity of understanding the relationship between the position vector and the velocity components.
Vatsal Goyal
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Homework Statement


A particle is moving parallel to x-axis in the positive direction with velocity v such that at all the instants the y -axis component of its position vector is constant and is equal to 'b'. Find angular velocity about origin.

Homework Equations

The Attempt at a Solution


I thought that angular velocity would be the rate of change of the angle of the position vector of the particle with the origin, let's say theta. So I wrote tan (theta) = b/x and differentiated with time but got the wrong answer.
 
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Seems to me your general approach is correct, so either you did a mistake in the differentiation or on the afterwards algebraic manipulation that is needed in order to find the angular velocity.

Please post your work with as much detail as you can so we ll be able to pinpoint your mistakes.
 
Vatsal Goyal said:
got the wrong answer.
perhaps it is a matter of whether you take the angle as from the x-axis or from the y axis.
 
The answer I got myself, taking the angle from the x-axis is ω=bv/(b2+x2). replace x=vt to get it as a function of time t. Is that the answer from your book, or is that what you calculated?
 
Delta² said:
The answer I got myself, taking the angle from the x-axis is ω=bv/(b2+x2). replace x=vt to get it as a function of time t. Is that the answer from your book, or is that what you calculated?
Thats what I am getting, but the answer is different in the book, I checked the solutions and what they had done is that they took component of velocity perpendicular to position vector and then differentiated, I have a feeling that its wrong because that's not what my teacher taught, what do you think?
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haruspex said:
perhaps it is a matter of whether you take the angle as from the x-axis or from the y axis.
No the book had a diagram, and angle is clearly marked with horizontal, similar to the one I have drawn in the post above.
 
I think the two approaches should give same result. Can you give us what is the final answer from your book?
 
Delta² said:
I think the two approaches should give same result. Can you give us what is the final answer from your book?
Its [v sin^2(theta)]/b
 
Vatsal Goyal said:
Its [v sin^2(theta)]/b
are you quite sure that is different? Note that you were not given x, so you should eliminate that from your answer.
 
  • #10
It is the same as we calculated, it is easy to see that ##\sin^2(\theta(t))=\frac{b^2}{b^2+x(t)^2}##
 
  • #11
Ohh I didn't see that, thank you! But how do I justify the book's approach, I don't understand why their answer is correct. They have divided the magnitude of component of velocity perpendicular to position vector by the magnitude of position vector.
 
  • #12
Vatsal Goyal said:
Ohh I didn't see that, thank you! But how do I justify the book's approach, I don't understand why their answer is correct. They have divided the magnitude of component of velocity perpendicular to position vector by the magnitude of position vector.
If you resolve the motion vector into radial and tangential components relative to the origin then only the tangential component causes the angle to change. vtangential=rradialω.
 
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