Velocity required for a car on a a frictionless banked surface

Question

My textbook has clearly explained and derived a velocity that is required for a car to navigate a turn on a frictionless banked surface. I have understood it too. My doubt is about what happens when the cars velocity exceeds or falls short of this required velocity. Someone told me that it will veer towards the outside of the curve when the velocity exceeds and will veer towards the inside when the velocity is less. I'm just not able to wrap my head around this. I tried proving it mathematically but I failed everytime.

Answer 1

Place the car's centre of gravity at the origin of a Cartesian coordinate system $x,y$, as shown above.

Now determine the balance of forces along the $x$ axis. Assume the car will slide (up or down), as there's no friction. The equation of motion is:

$ma_x=mg\sin\alpha-F_c\cos\alpha$ (Eq.1).

$F_c=\frac{mv^2}{R}$ with $v$ the velocity of the car and $R$ the radius of the turn. Insert into Eq.1, drop $m$ and solve for $a_x$:

$a_x=g\sin\alpha-\frac{v^2}{R}\cos\alpha$.

If $g\sin\alpha>\frac{v^2}{R}\cos\alpha$, then $a_x>0$ and the car will sliding 'down' (acceleration in the $x$ direction).

If $g\sin\alpha<\frac{v^2}{R}\cos\alpha$, then $a_x<0$ and the car will sliding 'up' (acceleration in the opposite of the $x$ direction).

Note that this is a very unrealistic case: a road that offers no friction at all.