Answer
The acceleration is
[tex]a=-2.5ms^{-2}[/tex] to the nearest tenth
Explanation
Since the car was travelling at [tex]37ms^{-1}[/tex] before it starts to decelerate, the initial velocity is
[tex]u=37ms^{-1}[/tex].
The final velocity is [tex]v=0ms^{-1}[/tex], because the car came to a stop.
The time taken is [tex]t=15s[/tex].
Using the Newton's equation of linear motion,
[tex]v=u +at[/tex], we find the acceleration by substituting the known values.
This implies that,
[tex]0=37 +a(15)[/tex]
This gives us,
[tex]0-37=15a[/tex]
[tex]\Rightarrow -37=15a[/tex]
We divide both sides by 15 to get,
[tex]a=-\frac{37}{15}ms^{-2}[/tex]
or
[tex]a=-2.46667ms^{-2}[/tex]
