An object with a mass of $8 k g$ $8 kg$ is on a plane with an incline of $- \frac{π}{8}$ $- pi/8$ . If it takes $4 N$ $4 N$ to start pushing the object down the plane and $1 N$ $1 N$ to keep pushing it, what are the coefficients of static and kinetic friction?

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An object with a mass of $8 k g$ $8 kg$ is on a plane with an incline of $- \frac{π}{8}$ $- pi/8$ . If it takes $4 N$ $4 N$ to start pushing the object down the plane and $1 N$ $1 N$ to keep pushing it, what are the coefficients of static and kinetic friction?

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Answer 1 · 2017-01-16T13:27:13

The static coefficient of friction is $0.4694$ $0.4694$ (4dp)
The kinetic coefficient of friction is $0.4280$ $0.4280$ (4dp)

Explanation:

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For our diagram, $m = 8 k g$ $m=8kg$ , $θ = \frac{π}{8}$ $theta=pi/8$

If we apply Newton's Second Law up perpendicular to the plane we get:

$R - m g cos θ = 0$ $R-mgcostheta=0$
$:. R=8gcos(pi/8) \ \ N$

Initially it takes $4N$ to start the object moving, so $D=4$ . If we Apply Newton's Second Law down parallel to the plane we get:

$D+mgsin theta -F = 0$
$:. F = 4+8gsin (pi/8) \ \ N$

And the friction is related to the Reaction (Normal) Force by

$F = mu R => 4+8gsin (pi/8) = mu (8gcos(pi/8))$
$:. mu = (4+8gsin (pi/8))/(8gcos(pi/8))$
$:. mu = 0.469437 ...$

Once the object is moving the driving force is reduced from $4N$ to $1N$ . Now $D=1$ , reapply Newton's Second Law down parallel to the plane and we get:

$D+mgsin theta -F = 0$
$:. F = 1+8gsin (pi/8) \ \ N$

And the friction is related to the Reaction (Normal) Force by

$F = mu R => 1+8gsin (pi/8) = mu (8gcos(pi/8))$
$:. mu = (1+8gsin (pi/8))/(8gcos(pi/8))$
$:. mu = 0.428019 ...$

So the static coefficient of friction is $0.4694$ (4dp)
the kinetic coefficient of friction is $0.4280$ (4dp)

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An object with a mass of $8 k g$ $8 kg$ is on a plane with an incline of $- \frac{π}{8}$ $- pi/8$ . If it takes $4 N$ $4 N$ to start pushing the object down the plane and $1 N$ $1 N$ to keep pushing it, what are the coefficients of static and kinetic friction?

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Explanation:

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Explanation:

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An object with a mass of $8 k g$ $8 kg$ is on a plane with an incline of $- \frac{π}{8}$ $- pi/8$ . If it takes $4 N$ $4 N$ to start pushing the object down the plane and $1 N$ $1 N$ to keep pushing it, what are the coefficients of static and kinetic friction?