Answer:
frequency = 1475.45 Hz
Explanation:
given data
frequency f1 = 1215 Hz,
frequency f2 = 1265 Hz
police car moving vp = 25.0 m/s
solution
speed of sound u = 343 m / s
speed of the other car = v
when the police car is stationary
the frequency the other car receives is
f2 = f1 × [tex]\dfrac{u+v}{u}[/tex] ................1
and
the frequency the police car receives is
f2 = f1 × [tex]\dfrac{u}{u-v}[/tex] ..................2
now from equation 1 and 2
[tex]\frac{f2}{f1} = \dfrac{u+v}{u-v}[/tex]
[tex]\frac{1275}{1240} = \frac{u+v}{u-v}[/tex]
[tex]v =\frac{1275-1240}{1275+1240}\times 343[/tex]
v = 4.77 m/s
and
frequency the other car receives is
f2 = f1 × [tex]\dfrac{u+v}{u-vp}[/tex] ......................3
and
the frequency the police car receives is
f2 = f1 × [tex]\dfrac{u+vp}{u - v}[/tex] .......................4
now we get
f2 = f1 × [tex]\dfrac{(u+v)(u + vp)}{(u-v)(u-vp)}[/tex]
f2 = [tex]1240\times \frac{(343+4.77)(343+25)}{(343-4.77)(343-25)}[/tex]
f2 = 1475.45 Hz
