Answer:
489.19m
Explanation:
To find the minimum distance you first calculate the time in which the teacher stops:
[tex]v=v_o-at\\\\t=\frac{v_o-v}{a}=\frac{34.5m/s-0m/s}{2.5m/s^2}=13.8s[/tex]
however, the reaction of the teacher is 0.31s later, then you use
t=13.8-0.31s=13.49s
during this time the camper has traveled a distance of:
[tex]x=vt=(15.1m/s)(13.49s)=203.69m[/tex] (1)
Next you calculate the distance that teacher has traveled for 13.6s:
[tex]x=x_o+v_ot+\frac{1}{2}at^2\\\\x=0m+34.5m/s(13.49s)+\frac{1}{2}(2.5m/s^2)(13.49s)^2=692.88m[/tex] (2)
The minimum distance between the driver and the camper will be the difference between (2) and (1):
[tex]x_{min}=692.88m-203.69m=489.19m[/tex]
