03. The expression for stopping distance d of a vehicles in terms of vo
and a is
Answers
Answer:
If a driver puts on the brakes of a car, the car will not come to a stop immediately. The stopping distance is the distance the car travels before it comes to a rest. It depends on the speed of the car and the coefficient of friction (μ) between the wheels and the road. This stopping distance formula does not include the effect of anti-lock brakes or brake pumping. The SI unit for stopping distance is meters.
d = stopping distance (m)
v = velocity of the car (m/s)
μ = coefficient of friction (unitless)
g = acceleration due to gravity (9.80 m/s2)
Stopping Distance Formula Questions:
1) A driver in a car on a residential street is traveling at 50.0 km/h. She puts on the brakes when she sees a stop sign. The coefficient of friction between the tires and the road is μ = 0.60. What is the stopping distance of the car?
Answer: The speed of the car must be converted to meters per second:
v = 13.89 m/s
The stopping distance can be found using the formula:
d = 16.40 m
The stopping distance of the car is 16.40 m.
2) A driver in a car on an icy highway is traveling at 100.0 km/h. He puts on the brakes and begins to slide. The coefficient of friction between the tires and the ice on the road is μ = 0.15. What is the stopping distance of the car?
Answer: The speed of the car must be converted to meters per second:
v = 27.78 m/s
The stopping distance can be found using the formula:
d = 262.4 m
The stopping distance of the car on an icy highway is 262.4 m.
Answer:
d=vo^2/2as
Explanation:
stopping distance is the distance travelled by car after it applies brake