A model train with a mass of 4 kg is moving along a track at 18 (cm)/s. If the curvature of the track changes from a radius of 25 cm to 42 cm, by how much must the centripetal force applied by the tracks change?

1 Answer
Pitufox27
Oct 20, 2016

The centripetal force changes in a factor of 25/42, i.e. approximately 0.6 times greater.

Explanation:

The centripetal force acting on a moving mass m traveling a circular path with radius r at a constant speed v is given by the formula:

F_c = m v^2/r

If the path's radius is modified from a r_1 value to a r_2 one, the initial centripetal force F_{c1} changes to a new value F_{c2} which can be compared using the above formula:

{F_{c2}}/{F_{c1}} = {m v^2/r_2}/{m v^2/r_1} = {1/r_2}/{1/r_1}=r_1 / r_2

Thus:

{F_{c2}}/{F_{c1}} = r_1 / r_2 = {25 cm} / {42 cm} ~~0.595... rArr F_{c2} ~~0.595 F_{c1}

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