Answer:
The minimum stopping distance when the car is moving at
29.0 m/sec = 285.94 m
Explanation:
We know by equation of motion that,
[tex]v^{2}=u^{2}+2\cdot a \cdot s[/tex]
Where, v= final velocity m/sec
u=initial velocity m/sec
a=Acceleration m/[tex]Sec^{2}[/tex]
s= Distance traveled before stop m
Case 1
u= 13 m/sec, v=0, s= 57.46 m, a=?
[tex]0^{2} = 13^{2} + 2 \cdot a \cdot57.46[/tex]
a = -1.47 m/[tex]Sec^{2}[/tex] (a is negative since final velocity is less then initial velocity)
Case 2
u=29 m/sec, v=0, s= ?, a=-1.47 m/[tex]Sec^{2}[/tex] (since same friction force is applied)
[tex]v^{2} = 29^{2} - 2 \cdot 1.47 \cdot S[/tex]
s = 285.94 m
Hence the minimum stopping distance when the car is moving at
29.0 m/sec = 285.94 m
