Axpyre said:
Homework Statement
A car traveling at 36 m/s passes a policeman who immediately accelerates at 3.01 m/s^2 from rest in pursuit. To the nearest second how long does it take the policeman to catch the speeder?
Homework Equations
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The Attempt at a Solution
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I used 3.0 m/s^2 rather than 3.01 m/s^2.
It would take 24 seconds for the police vehicle (starting from rest and accelerating uniformly at a rate of 3.0 m/s^2) to intersect with the pursued vehicle, which is traveling at a steady rate of 36 m/s. They would intersect 864 meters further down the highway.
½ x (3.0 m/s^2) x (24 seconds^2) = 864 meters (distance achieved by police vehicle in 24 seconds)
(36 m/s) x (24 seconds) = 864 meters (distance achieved by pursued vehicle in 24 seconds)
However, the police vehicle would have achieved far greater velocity by this point (in fact, 72 m/s), so it would simply pass the vehicle. If however, the police vehicle had to ram the vehicle Kamikaze style, then it would make contact in just 24 seconds.
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Here’s the time required per an acceleration of precisely 3.01 m/s^2:
½ x (3.01 m/s^2) x (23.92026578 seconds^2) = 861.1295681 meters (distance of accelerating police vehicle)
(36 m/s) x (23.92026578 seconds) = 861.1295681 meters (distance of speeding vehicle at steady velocity)
Since the time is the same for each equation, I used the ratio of the known values between both equations to establish the distance when the two vehicles would intersect. 36 m/s is known in the speeder’s equation while ½ x 3.01 m/s^2 (which equals 1.505) is known from the accelerating police vehicle equation therefore:
36 m/s / 1.505 = 23.92026578 seconds
23.92026578 seconds x 36 m/s = 861.1295681 meters (just as the kinematics of both equations agree)
