Answer to Question #316296 in Mechanics | Relativity for Daniel

From Newton's second law:

"mgsin\\alpha-F_f=ma," (1)

where "\\alpha=arctan(\\frac{1}{10})=6\\degree"- the angle of road incline;

"F_f=\\mu mgcos\\alpha" - the force of friction;

"\\mu" - the coefficient of friction;

"a" - the acceleration along the road.

From (1)

"a=g(sin\\alpha-\\mu cos\\alpha)=9.8(sin6\\degree-0.7cos6\\degree)=-5.79\\space m\/s^2."

Let find the time t from applaing the brake to stop:

"v_0+at=0", (2)

where "v_0=65\\space KPH=18.1\\space m\/s" - the initial speed of the car.

From (2)

"t=-\\frac{v_0}{a}=-\\frac{18.1}{-5.79}=3.13\\space s"

The distance, that car skid along the road before stopping is

"s=v_0t+\\frac{at^2}{2}=18.1\\cdot 3.13+\\frac{(-5.79)\\cdot 3.13^2}{2}=28.3\\space m."