If a $3 k g$ $3 kg$ object moving at $9 \frac{m}{s}$ $9 m/s$ slows down to a halt after moving $27 m$ $27 m$ , what is the coefficient of kinetic friction of the surface that the object was moving over?

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If a $3 k g$ $3 kg$ object moving at $9 \frac{m}{s}$ $9 m/s$ slows down to a halt after moving $27 m$ $27 m$ , what is the coefficient of kinetic friction of the surface that the object was moving over?

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Answer 1 · 2017-04-01T20:07:26

$μ = 0.15$ $mu=0.15$

Explanation:

The work being done on the object is Work due to friction so the following equation is going to be used:

$a a a a a a a a a a a a$ $color(white)(aaaaaaaaaaaa)$ Equation (a) $W_f = DeltaKE$

We can rewrite Equation (a) if we break down both sides step-by-step to become:

$color(white)(aaaaaaaaaaaaaaaaaaa)$ Equation (b)
$color(white)(aaaaaa)$ $(mu*mg)*d*costheta = (1/2mv_f^2 - 1/2mv_i^2)$

$mu = "coefficient of kinetic friction"$
$m = "mass (kg)"$
$g = "acceleration due to gravity" (m/s^2)$
$d = "displacement"(m)$
$theta = "angle between friction and displacement"$
$v_f = "velocity final"$
$v_i = "velocity initial"$

Since our object stopped, its final velocity becomes $0$ and therefore $"final KE"$ becomes $0$ . Friction and displacement are opposite one another so $cos(180^@) = -1$ . Mass cancels on both sides. Rearrange, plug in, and solve.

$-mu*g*d= - 1/2v_i^2$

$mu=(0.5*9^2)/(9.8*27) = 40.5/264.6 = 0.15$

Answer: 0.15

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If a $3 k g$ $3 kg$ object moving at $9 \frac{m}{s}$ $9 m/s$ slows down to a halt after moving $27 m$ $27 m$ , what is the coefficient of kinetic friction of the surface that the object was moving over?

1 Answer

Explanation:

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Explanation:

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If a $3 k g$ $3 kg$ object moving at $9 \frac{m}{s}$ $9 m/s$ slows down to a halt after moving $27 m$ $27 m$ , what is the coefficient of kinetic friction of the surface that the object was moving over?