An automobile is moving on a horizontal ...

An automobile is moving on a horizontal road with a speed `upsilon` If the coefficient of friction between the tyres and the road is `mu` show that the shortest distance in which the automobile can be stooped is `upsilon^(2)//2 mu g`.

Similar Questions

Explore conceptually related problems

An automobile is moving on a horizontal road with a speed of v.If teh coeficient of friction between the tyres nd the road is mu ,show that the shortest distance in whih the automobie can be stopped is v^2l2mug .

An automobile is moving on a straight horizontal road with a speed u. If the coefficient of static friction between the tyres and the road is mu_(s) what is the shortest distance in which the automobiles can be stopped ?

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

A vehicle of mass M is moving on a rough horizontal road with a momentum P If the coefficient of friction between the tyres and the road is mu is then the stopping distance is .

An automobile is moving on a horizontal road with a speed `upsilon` If the coefficient of friction between the tyres and the road is `mu` show that the shortest distance in which the automobile can be stooped is `upsilon^(2)//2 mu g`.

Similar Questions

Recommended Questions