1) The police officer catches the speeder after a time of 19.93 s (measured from the moment the speeder passes the officer)
2) The officer catches the speeder after a distance of 299 m
Explanation:
1)
The speeder is driving at constant speed, so we represent the position of the speeder at time t as
[tex]x_s(t) = v_s t =15 t[/tex]
where
[tex]v_s = 15 m/s[/tex] is the speed of the speeder
t is the time measured from the moment the speeder passes the officer
The police car starts its motion after 9 seconds, driving from rest and accelerating at [tex]5 m/s^2[/tex], so its position at time t can be written as
[tex]x_p = \frac{1}{2}a (t-9)^2 = \frac{1}{2}(5)(t-9)^2[/tex]
where
[tex]a=5 m/s^2[/tex] is the acceleration of the car
The police officer catches the speeder when the two positions are equal, so:
[tex]15t = \frac{5}{2}(t-9)^2[/tex]
And solving for t,
[tex]6t = (t-9)^2 = t^2 -18t + 81\\t^2-24t+81=0[/tex]
which gives two solutions:
t = 4.06 s
t = 19.93 s
However, the time must be larger than 9 seconds (because we are measuring the time from the instant the speeder passes the police officer, and the officer starts its motion only 9 seconds later), so the correct solution is
t = 19.93 s
2)
To find how far the police officer went before the speeder was caught, we just substitutite t = 19.93 s into its equation of motion.
We find:
[tex]x_p (19.93)=\frac{1}{2}(5)(19.93-9)^2 = 299 m[/tex]
And we can verify that the speeder covered the same distance in this same time:
[tex]x_s(19.93) = (15)(19.93)=299 m[/tex]
Learn more about accelerated motion:
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