Part A
A 4460 lb Ford Explorer traveling 35 mph has a head on collision with a 2750 lb Toyota Corolla, also traveling 35 mph. Assuming that the automobiles become locked together during the collision, what is the speed of the combined mass immediately after the collision?
System: Explorer plus Corolla as point particles. External influences will be neglected, as we assume that collision forces dominate.
Model: [Momentum and Impulse].
Approach: We begin by sketching the situation and defining a coordinate system.
Since we assume that external forces are negligible during the collision, we set the external impulse to zero which gives:
\begin
[ p^
_
+ p^
_
= p^
_
]\end
or, in terms of the masses:
\begin
[ m^
v^
_
+ m^
v^
_
= (m^
+m^
)v_
]\end
which gives:
\begin
[ v_
= \frac{m^
v^
_
+ m^
v^
_{x,i}}{m^
+m^{FE}} = \mbox
= \mbox
]\end
Remember that in our coordinate system, the Corolla has a negative x-velocity before the collision.
Part B
Find the impulse that acted on each of the vehicles during the collision.
Part C
Assuming the collision lasted for 0.060 seconds, find the average force exerted on each vehicle.
Part D
Suppose a 75 kg person in each vehicle underwent the same change in velocity as their automobile in the same amount of time. Find the average force exerted on these people.