The time it takes for a car to stop skidding can be calculated using the following equation:
t = √(2d / a)
where:
t = time (s)
d = the distance traveled while skidding (m)
a = the acceleration due to friction (m/s^2)
The acceleration due to friction (a) can be calculated as follows:
a = μ * g
where:
μ = the coefficient of friction
g = the acceleration due to gravity (9.8 m/s^2)
Dry pavement (μ = 0.6):
a = 0.6 * 9.8 = 5.88 m/s^2
d = v^2 / (2a) = (80 / 3.6)^2 / (2 * 5.88) = 31.23 m
t = √(2d / a) = √(2 * 31.23 / 5.88) = 2.51 s
Wet pavement (μ = 0.3):
a = 0.3 * 9.8 = 2.94 m/s^2
d = v^2 / (2a) = (80 / 3.6)^2 / (2 * 2.94) = 62.46 m
t = √(2d / a) = √(2 * 62.46 / 2.94) = 4.30 s
Snow-covered pavement (μ = 0.12):
a = 0.12 * 9.8 = 1.17 m/s^2
d = v^2 / (2a) = (80 / 3.6)^2 / (2 * 1.17) = 262.48 m
t = √(2d / a) = √(2 * 262.48 / 1.17) = 9.98 s