A small block starts slipping down from a point B on an inclined plane AB, which is making an angle θ with the horizontal, section BC is smooth, and the remaining section CA is rough with a coefficient of friction μ. It is found that the block comes to rest as it reaches the bottom (point A) of the inclined plane. If BC=2AC, the coefficient of friction is given by μ=ktanθ. The value of k is

A small block starts slipping down from a point B on an inclined plane

1.	A small block starts slipping down from a point B on an inclined plane AB, which is making an angle θ with the horizontal, section BC is smooth, and the remaining section CA is rough with a coefficient of friction μ. It is found that the block comes to rest as it reaches the bottom (point A) of the inclined plane. If BC=2AC, the coefficient of friction is given by μ=ktanθ. The value of k is
Answer» A small block starts slipping down from a point $B$ on an inclined plane $A B$ , which is making an angle $θ$ with the horizontal, section $B C$ is smooth, and the remaining section $C A$ is rough with a coefficient of friction $μ$ . It is found that the block comes to rest as it reaches the bottom $(point A)$ of the inclined plane. If $B C = 2 A C$ , the coefficient of friction is given by $μ = k tan θ$ . The value of $k$ is

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