To calculate the stopping distance, we need more information such as the mass of the car and the acceleration. The force alone is not sufficient to determine the stopping distance.
The stopping distance for a 3000kg car if 3000 N of force is applied when the car is traveling 10 ms is 50 meter. This is based on Newton's second law of force.
The overall stopping distance would be around 122m (400ft) This is made up of a thinking distance of 24m (79ft) and an actual stopping distance of 98m (321ft). The thinking distance is around 3m for every 10mph of speed and the overall stopping distance is calculated as follows: 2x20 ft at 20mph 2.5x30 ft at 30mph 3x40 ft at 40mph 3.5x50 ft at 50mph 4x60 ft at 60mph 4.5x70 at 70mph 5x80 at 80mph = 400 ft james s
The stopping distance can be calculated using the equation: stopping distance = (initial velocity^2) / (2 * deceleration). The deceleration can be calculated using the formula: deceleration = force / mass. Plugging in the values and calculating will give you the stopping distance.
50m
The stopping distance of a car traveling uphill can be less than on a level road due to gravity assisting in the deceleration process. When driving uphill, the incline can help slow down the car as it works against the forward momentum. This can lead to a shorter stopping distance compared to a level road where the car solely relies on its brakes to stop.
The answer will depend on the condition of the brakes and tyres. It will also depend on whether or not the road is dry and and on the amount of load being carried.
25 m
200 m
200 m
If would not be bad for a car engine to shift from third to second gear if you are traveling at 30mph.
25 m