To develop this problem it is necessary to apply the concepts related to the Dopler effect.
The equation is defined by
[tex]f_i = f_0 \frac{c}{c+v}[/tex]
Where
[tex]f_h[/tex]= Approaching velocities
[tex]f_i[/tex]= Receding velocities
c = Speed of sound
v = Emitter speed
And
[tex]f_h = f_0 \frac{c}{c+v}[/tex]
Therefore using the values given we can find the velocity through,
[tex]\frac{f_h}{f_0}=\frac{c-v}{c+v}[/tex]
[tex]v = c(\frac{f_h-f_i}{f_h+f_i})[/tex]
Assuming the ratio above, we can use any f_h and f_i with the ratio 2.4 to 1
[tex]v = 353(\frac{2.4-1}{2.4+1})[/tex]
[tex]v = 145.35m/s[/tex]
Therefore the cars goes to 145.3m/s
