A 10 metric ton truck drives up a hilly road of gradient 1 in 50 at a speed of `36kmh^(-1)` if the conefficient of kinetic friction between the road and years is 0.2, calculate the power delivered by the engine `(g=10ms^(-2))`

A 10 metric ton truck drives up a hilly road of gradient 1 in 50 at a speed of 36kmh^(-1) if the co-efficient of kinetic friction between the road and tyres is 0.2, calculate the power delivered by the engine (g=10ms^(-2))

A 10 metric ton truck drives up a hilly road of gradient 1 in 50 at a speed of 36kmh^(-1) if the coefficient of kinetic friction between the road and tyres is 0.2, calculate the power delivered by the engine (g=10ms^(-2))

An engine of power 58.8 k W pulls a train of mass 2xx10^(5)kg with a velocity of 36 kmh^(-1) . The coefficient of kinetic friction is

An engine of one metric ton is going up an inclined plane of slope 1 in 2 at the rate of 36km h^(-1) If the coefficient of friction is 1//sqrt3 calculate the power of the engine in k W .

Consider a car moving along a straight horizontal road with a speed of 72 km / h . If the coefficient of kinetic friction between the tyres and the road is 0.5, the shortest distance in which the car can be stopped is [g=10ms^(-2)]

An engine of one metric ton is going up an inclined plane, 1 in 2 at the rate of 36 kmph. If the coefficient of friction is 1//sqrt(3) , the power of engine is

An engine of one metric ton is going up an inclined plane, 1 in 2 at the rate of 36 kmph. If the coefficient of friction is 1//sqrt(3) , the power of engine is