The total time is 6.45 s
Explanation:
The motion of the car is a uniformly accelerated motion, so we can use suvat equations.
In the first part,
[tex]u_1 = 14.4 m/s[/tex] (initial velocity)
[tex]a_1 = -1.55 m/s^2[/tex] (acceleration)
[tex]t_1=4.26 s[/tex] (time of the first part)
So, we can find the velocity of the car after the first part, by using
[tex]v_1 = u_1 +a_1 t_1 =14.4+(-1.55)(4.26)=7.8 m/s[/tex]
This is therefore the initial velocity of the second part:
[tex]u_2 = v_1 = 7.8 m/s[/tex]
[tex]a_2 = 1.83 m/s^2[/tex] (acceleration in the second part)
[tex]v_2 = 11.8 m/s[/tex] (final velocity)
And therefore,
[tex]v_2 = u_2 + a_2 t_2\\t_2=\frac{v_2-u_2}{a_2}=\frac{11.8-7.8}{1.83}=2.19 s[/tex]
So, the total time is
[tex]t=t_1+t_2=4.26+2.19=6.45 s[/tex]
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