The maximum velocity (in `ms^(-1)`) with which a car driver must traverse a flat curve of radius 150 m and coefficient of friction 0.6 tp avoid skidding is :

The maximum velocity (in ms^(-1) ) with which a car driver must traverse a flat curve of radius 150 m and coefficient of friction 0.6 to avoid skidding is

The minimum velocity (in ms^(-1)) with which a car driver must traverse a flat curve of radius 150m and coefficient of friction 0.6 to avoid skidding is

The minimum velocity (in ms^(-1)) with which a car driver must traverse a flat curve of radius 150m and coefficient of friction 0.6 to avoid skidding is

The maximum speed (in ms^(-1) ) with which a car driver can traverse on a horizontal unbanked curve of radius 80 m with coefficient of friction 0.5 without skidding is : (g = 10 m/ s^(2) )

What is the maximum speed with which a cylist can turn around curved path of radius 10.0 m, if the coefficient of friction between the tyre and the road is 0.5 ? If the cyclist wants to avoid overturning by what angle the cyclist must lean from the vertical ?

Find the maximum speed with which a car can turn on a bend without skidding, if radius of bend is 20 m and coefficient of friction between the road and the tyres is 0*4

Find the maximum speed with which a car can turn on a bend without skidding, if radius of bend is 20 m and coefficient of friction between the road and the tyres is 0.4.

Find the maximum speed at which a car can take turn round a curve of 30 cm radius on a level road if the coefficient of friction between the tyres and the road is 0.4. Take g = 10 ms^(-2) .

What is the maximum speed with which a cyclist can move without skidding, in a circular path of radius 10 m, on a road where the coefficient of friction between the tyre and the road is 0.5 ?

A motorcycle is travelling on a curved track of radius 500 m. If the coefficient of friction between road and tyres is 0.5, the speed avoiding skidding will be