Consider a car moving on a straight road with a Speed of `100m s^(-1)` The distance at which the car can be stopped is `[muk=0.5]`

Consider a car moving on a straight road with a speed of 100m//s . The distance at which car can be stopped is [mu_k=0.5]

Consider a car moving on a straight road with a speed of 100m//s . The distance at which car can be stopped is [mu_k=0.5]

A car moving on a straight road is an example of:

Consider, a car moving along a straight horizontal road with a speed of 72 km/h. If the coefficient of static friction between the tyre and the road is 0.5, the shortest distance in which the car can be stopped is (Take g=10 //s^(2) )

A car is moving on a straight road with a speed of 20 m//s . The drive of the car put the breaks at some instant which retards the car uniformly at a rate of 2 m//s^(2) , until the car stops completely then find the time (t_(0)) taken by the car and distance (d) travelled by car, from the instant the drive put the breaks till it stops:

A car moving along a straight road with speed of 144 km h^(-1) is brought to a stop within a distance of 200 m. How long does it take for the car to stop ?

A car is moving along a straight horizontal road with a speed v_(0) . If the coefficient of friction between the tyres and the road is mu , the shortest distance in which the car can be stopped is

A car is moving on a straight road due north with a uniform speed of 50 km h^-1 when it turns left through 90^@ . If the speed remains unchanged after turning, the change in the velocity of the car in the turning process is

A car moving along a straight highway with speed of 126 km h^(-1) is brought to a stop within a distance of 200 m . What is the retardation of the car (assumed uniform) and how long does it take for the car to stop ?

A car can be stopped within a distance of s when its speed is v. What is the minimum distance within which the car can be stopped during the same time when its speed is nv ?