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7 December, 20:04

A car has a mass of 1520 kg. While traveling at 20 m⁄s, the driver applies the brakes to stop the car on a wet surface with a 0.40 coefficient of friction. (a) How far does the car travel before stopping? (b) If a different car with a mass 1.5 times greater is on the road traveling at the same speed and the coefficient of friction between the road and the tires is the same, what will its stopping distance be? Explain your results.

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  1. 7 December, 22:30
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    (a) d₁ = 51.02 m

    (b) d₂ = 51.02m

    Explanation:

    Newton's second law:

    ∑F = m*a Formula (1)

    ∑F : algebraic sum of the forces in Newton (N)

    m : mass s (kg)

    a : acceleration (m/s²)

    Known data

    m=1520 kg : mass of the car

    μk = 0.4 : coefficient of kinetic friction

    g = 9.8 m/s² : acceleration due to gravity

    Forces acting on the car

    We define the x-axis in the direction parallel to the movement of the car and the y-axis in the direction perpendicular to it.

    W: Weight of the block : In vertical direction downward

    FN : Normal force : In vertical direction upward

    f : Friction force: In horizontal direction

    Calculated of the W

    W = m*g

    W = 1520 kg * 9.8 m/s² = 14896 N

    Calculated of the FN

    We apply the formula (1)

    ∑Fy = m*ay ay = 0

    FN - Wy = 0

    FN = Wy

    FN = 14896 N

    Calculated of the f

    f = μk * N = (0.4) * (14896 N)

    f = 5958.4 N

    We apply the formula (1) to calculated acceleration of the block:

    ∑Fx = m*ax, ax = a : acceleration of the block

    - f = m*a

    -5958.4 = (1520) * a

    a = (-5958.4) / ((1520)

    a = - 3.92 m/s²

    (a) displacement of the car (d₁)

    Because the car moves with uniformly accelerated movement we apply the following formula to calculate the final speed of the block:

    vf²=v₀²+2*a*d₁ Formula (2)

    Where:

    d:displacement (m)

    v₀: initial speed (m/s)

    vf: final speed (m/s)

    dа ta:

    v₀ = 20 m⁄s

    vf = 0

    a = - -3.92 m/s²

    We replace data in the formula (2) to calculate the distance along the ramp the block reaches before stopping (d₁)

    vf²=v₀²+2*a*d ₁

    0 = (20) ²+2 * (-3.92) * d ₁

    2 * (3.92) * d₁ = (20) ²

    d₁ = (20) ² / (7.84)

    d₁ = 51.02 m

    (b) Different car

    m₂ = 1.5 * 1520 kg

    μk₂ = 0.4

    W₂ = m*g

    W₂ = (1.5) * 1520 kg * 9.8 m/s² = (1.5) * 14896 N

    FN₂ = (1.5) * 14896 N

    f = 0.4 * (1.5) * 14896 N

    a = - f/m₂ = - 0.4 * (1.5) * 14896 N / (1.5) * 1520

    a = - 3.92 m/s²

    vf²=v₀²+2*a*d₂

    vf=0, v₀=20 m⁄s, a = - 3.92 m/s²

    d₂ = d₁ = 51.02m
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