imagine a graph of velocity on time.
the speed of the car would be (80/3.6) = 22.22 m/s
and therefore, distance travelled would = 22.22t given by d=s.t
On a graph of v vs t, the car's motion would appear to be a straight line, as he is travelling at a constant speed.
For the Policeman, it's a little different, as his motion changes from a sharp acceleration -> smaller acceleration -> constant speed
So, we know that on a velocity vs time graph, the area under the graph gives the distance. To make it easier we should break it up.
- for the first 10 s, acceleration is uniform and thus you'll have a straight line with a positive gradient on the graph.
for the distance travelled, using the area of a triangle equation A = 1/2bh, A= 1/2x10x22.22 --> giving us d= 111.11 m
- for the time interval t=10 -> t=15, the policeman reaches a final speed of 100 km/h, which is 27.78 m/s. This part of the graph gives a one sided trapezium thingy lol, and therefore, the distance travelled in this interval would be:
A(triangle) + A(rectangle) (after breaking up the shape)
A(triangle) = 1/2 x 5 x (27.78-22.22) = 13.9m
A(rectangle) = 22.22 x 5 = 111.1 m
and therefore, distance travelled = 125 meters.
so, the entire distance travelled in the ENTIRE 15s = 125+111 = 236.1 meters.
Now, we need to find the distance travelled by the car, which is 22.22x15 = 333.3 meters.
Therefore, the cop travels 236, and the car travels 333, so they are (333.3-236.1) meters apart, which = 97.2 m
so now we arrive at the last step, now we need to find how long it takes for the cop to catch up with the car, now both travelling at constant speeds.
the car's speed = 22.22 m/s
the motorcycle's speed = 27.78 m/s (5.56 m/s faster than the car)
therfore, t= d/s
t= 97.2/5.56
t= 17.5 seconds.
add that to the initial 15 seconds, and you should get your final answer of:
t= 32.5 s
Home
Help
Search
Login
