Reaction force on a semi-cubical parabola

AI Thread Summary
A particle of mass m moves along a semi-cubical parabolic curve described by y²=4ax³ with a constant speed v. The reaction force on the particle at the point (x = 1, y = 2) can be calculated using the formula F=mv²/r, where 'r' represents the radius of curvature. The discussion highlights the need to determine 'r' for accurate calculations. A reference to a formula for finding the radius of curvature is provided, indicating that there is a straightforward method available. Understanding the radius of curvature is essential for solving the problem effectively.
zorro
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Homework Statement



A particle of mass m moves without friction along a semi-cubical parabolic curve given by y2=4ax3 with a constant speed v. The reaction force of the curve on the particle when it is at the point (x = 1, y = 2) is given approximately by

The Attempt at a Solution



F=mv2/r

How do I find out 'r' here?
 
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I suggest that the r value is the radius of curvature of the path on which the particle travels.
 
I did not ask 'what does r stand for?'! :rolleyes:
 
Have you investigated how to find the radius of curvature of a curve? There's a http://en.wikipedia.org/wiki/Radius_of_curvature_%28applications%29" that might shed some light.
 
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Oh I see!...so there is a 'ready made' formula for that. Thanks!
 

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