A ball of mass m is released at the top edge of a frictionless half-pipe with a radius of curvature r. At the bottom of the pipe, the ball is moving with a speed v. What is the normal force acting on the ball at this point?

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JemdetNasr JemdetNasr · Answer 1 · 2019-08-05T07:48:56+02:00

Answer:

[tex]mg +\frac{mv^{2}}{r}[/tex]

Explanation:

At the bottom of the pipe :

[tex]N[/tex] = Normal force acting in upward direction

[tex]m[/tex] = mass of the ball

[tex]W[/tex] = weight of the ball acting in downward direction = mg

[tex]v[/tex] = speed of the ball at the bottom

[tex]r[/tex] = radius of curvature

Force equation for the motion of ball is given as

[tex]N - W = \frac{mv^{2}}{r}[/tex]

[tex]N - mg = \frac{mv^{2}}{r}[/tex]

[tex]N = mg +\frac{mv^{2}}{r}[/tex]