Till the time car is just adjacent to the bicycle we can say
distance moved by cycle = distance moved by car
Time taken by car to accelerate from rest
[tex]t = \frac{v_f - v_i}{a}[/tex]
[tex]t = \frac{49 - 0}{7} = 7 s[/tex]
Time taken by cycle to accelerate
[tex]t = \frac{23 - 0}{15} = 1.53 s[/tex]
now the distance moved by cycle in time "t"
[tex]d = \frac{23 + 0}{2}*1.53 + 23(t - 1.53)[/tex]
distance moved by car in same time
[tex]d = \frac{7t + 0}{2}(t)[/tex]
now make them equal
[tex]3.5t^2 = 17.595 - 35.19 + 23t[/tex]
[tex]3.5 t^2 - 23t + 17.595 = 0[/tex]
[tex]t = 5.68 s[/tex]
so cycle will move ahead of car for t = 5.68 s
Answer:
3.29s
Explanation:
See the sketch of speed-time graph.
Since cyclists reach a constant speed of 23mi/h before car does to constant speed of 49 mi/h, we will calculate the time taken by car to reach 23mi/h to know the time interval for which after the light turned green the bicycle is ahead of your car
a=(vf-vi)/t
Let convert acceleration from 7mi/h/s to 7mi/h²
7mi/(1/3600)
25200mi/h²
25200=(23-0)/t
t= 0.000913h or 3.28s
