Asked by Jennifer

An engineer in a locomotive sees a car stuck
on the track at a railroad crossing in front of
the train. When the engineer first sees the
car, the locomotive is 210 m from the crossing
and its speed is 26 m/s.
If the engineer’s reaction time is 0.62 s,
what should be the magnitude of the mini-
mum deceleration to avoid an accident?
Answer in units of m/s2.
Answered by drwls
During the engineer's reaction time, the train travels 26 x 0.62 = 16 meters. To avoid a collision after that, the train's speed must be reduced to zero while traveling less than 194 m.

While decelerating, the average speed will be 26/2 = 13 m/s

Maximum stopping time
= (194 m)/(13 m/s) = 14.92 s

Required deceleration rate
= (26 m/s)/14.92s = ____ m/s^2
Answered by Anonymous
1.742627346
Answered by Anonymous
1.742627346
Answered by why so many anonymous ..
1.742627346 1.742627346 1.742627346 1.742627346


xd
Answered by Anonymous jr.
where did 194 come from?
Answered by Anonymous
The 194 is the 210m subtracted by the 16m.
Answered by Pablo
Why does the average speed while decelerating equal 13m/s?
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