Respuesta :
Answer:
The truck will reach there in 250 seconds.
Explanation:
The frequency due to doppler effect, when the observer is stationary and the source is moving towards it is
[tex]f_{obv}[/tex]=[tex]\frac{v}{v-v_{s} } f[/tex]
where v= velocity of sound in air
[tex]v_{s}[/tex]= velocity of source of sound
f= frequency of sound and
[tex]f_{obv}[/tex]= frequency oberved due to Doppler effect
[tex]\frac{v}{v-v_{0} } f[/tex] = 460------------------------------------------( 1 )
The frequency due to doppler effect, when the observer is stationary and the source is moving away from it
[tex]f_{obv}[/tex]=[tex]\frac{v}{v+v_{s} } f[/tex]
where v= velocity of sound in air
[tex]v_{s}[/tex]= velocity of source of sound
f= frequency of sound and
[tex]f_{obv}[/tex]= frequency oberved due to Doppler effect
[tex]\frac{v}{v+v_{0} } f[/tex] = 410-------------------------------------------( 2 )
Dividing ( 1 ) by ( 2 )
[tex]\frac{v+v_{s} }{v-v_{s} } =\frac{460}{410}[/tex]
[tex]\frac{v+v_{s} }{v-v_{s} } =\frac{46}{41}[/tex]
41v + 41[tex]v_{s}[/tex] = 46v - 46[tex]v_{s}[/tex]
87[tex]v_{s}[/tex]= 5v
[tex]v_{s}[/tex]=[tex]\frac{5}{87}v[/tex]
Velocity of Sound (v)= 348 m/s
[tex]v_{s}[/tex]=20 m/s
Therefore, the truck is moving at 20 m/s.
[tex]Time=\frac{Distance}{Time}[/tex]
Distance= 5000 m
Time=[tex]\frac{5000}{20}[/tex]
Time= 250 s
Time = 4 min 10 sec
