Answer to Question #163587 in Math for ali

The picture shows forces acting on the vehicle.

There are: the gravitational force "\\vec Q=m\\vec g," the reaction of road’s surface "\\vec R" and frictional force "\\vec F," working against the vehicle’s velocity "\\vec \\text{v}."

The vehicle is moved uphill by the tractive force "\\vec T" which does the real work.

The force "\\vec Q" can be split into 2 compounds: "\\vec Q_p," perpendicular to the road surface and "\\vec Q_t" parallel to the road.

Write the Newton’s second law of dynamics for the vehicle as follows:

The angle between "\\vec Q" and "\\vec Q_p" equals "\\alpha" (the same as the slope of the road). Therefore:

The acceleration "a" may be calculated as "a=\\text{v}\/t," where "\\text{v}" is the given velocity, and "t" is the acceleration time .

"m=700kg"

"g=9.81m\/s^2"

"\\text{v}=60km\/h=\\dfrac{50}{3}m\/s"

"t=10s"

"F=0.5kN=500N"

"\\tan\\alpha=0.15"

"\\sin\\alpha\\approx0.14834"

The work "W" done in ascending the slope equals "T\\times s," where "s" is the slope length. 

In a uniformly accelerating movement the distance "s" can be calculated by multiplying time by the average velocity.

The amount of work "W" equals:

The average power "P" equals "W" divided by time "t," therefore: