Answer:
Force exerted on each back wheel = 2,356.63 N
Force exerted on each front wheel = 5,004.4N
Step-by-step explanation:
We are given that;
Mass of automobile =1510 kg
Distance between axles (d) = 3.3m
Centre of mass of automobile is 1.05m behind the front axle.
Now,
If we imagine this system,
It is clear that when sum of forces about a system is considered , the sum of the upward forces would be equal to the sum of the downward forces. In this case, the the weight of the automobile is acting downwards and thus would be equal to the sum of the forces on the front and back wheel acting upwards.
Since the mass of the automobile is 1510kg,it's weight will be W = mg = 1510 x 9.81 = 14813.1 N
Thus;
F₁ + F₂ = 14,813.1 N
where;
F₁ = The force exerted by the ground on front two wheels
F₂ = Force exerted by the ground on back two wheels
Now, to continue this, let's derive the formula for torque ;
The formula to calculate torque is given as;
τ = F x d
Where;
F = the force action on the point
d = the distance of the point
So, taking equilibrium torque about the front axle, we have;
1.05 (14,813.1) - (F_2•3.3) = 0
15553.755 = 3.3F2
F2 = 15553.755/3.3 = 4713.26
This is the total force exerted on the 2 back wheels. So the force exerted on one back wheel = (1/2)F2 = 4713.26/2 = 2356.63 N
Now, for the front wheel;
Let's take equilibrium torque about the rear wheel;
(3.3 - 1.05)(14,813.1) - (F_1•3.3) = 0
(2.25 x 14,813.1) = 3.33F1
F1 = 33329.475/3.33 = 10,008.85 N
So force exerted on one front wheel = 10008.85/2 = 5004.4N