Physics 3 Marks Question

Here given, $\text{u}=330\text{m/s},\ \text{f}=1600\text{Hz}$

So, apparent frequency received by the car

$\text{f}'\Big(\frac{\text{u}-\text{V}_0}{\text{u}-\text{V}_\text{s}}\Big)\text{f}=\Big(\frac{330-20}{330}\Big)\times1600\text{Hz}\ \dots$ $\big[\text{V}_0=20\text{m/s},\ \text{V}_\text{s}=0\big]$

The reflected sound from the car acts as the source for the person.

Here, $\text{V}_\text{s}=-20\text{m/s},\ \text{V}_0=0$

So $\text{f}''=\Big(\frac{330-0}{330+20}\Big)\times\text{f}'=\frac{330}{350}\times\frac{310}{330}\times1600\text{Hz}=1417\text{Hz}.$

$\therefore\ $This is the frequency heard by the person from the car.

Let, the bat be flying between the walls W₁ and W₂.

So it will listen two frequency reflecting from walls W₂ and W₁.

So, apparent frequency, as received by wall $\text{W}=\text{fw}_2=\frac{330+0+0}{330-6}\times\text{f}=\frac{330}{324}$

Therefore, apparent frequency received by the bat from wall W₂ is given by

$\text{F}_{\text{B}_2}\ \text{of wall}\ \text{W}_1=\Big(\frac{330+0-(-6)}{330+0+0}\Big)\text{f}_{\text{w}_2}$

$=\Big(\frac{336}{33}\Big)\times\Big(\frac{33}{324}\Big)\text{f}$

Similarly the apparent frequency received by the bat from wall W₁ is

$\text{f}_\text{B}=\Big(\frac{324}{336}\Big)\text{f}$

So the beat frequency heard by the bat will be $=4.47\times10^4=4.3430\times10^4=3270\text{Hz}.$

According to the data

$\lambda=20\text{cm},\text{S}_1\text{S}_2=20\text{cm},\text{BD}=20\text{cm}$

Let the detector is shifted to left for a distance x for hearing the minimum sound.

So path difference $\text{AI}=\text{BC}-\text{AB}$

$=\sqrt{(20)^2+(10+\text{x})^2}-\sqrt{(20)^2+(10-\text{x})^2}$

So the minimum distances hearing for minimum

$=\frac{(2\text{n}+1)\lambda}{2}=\frac{\lambda}{2}=\frac{20}{2}=10\text{cm}$

$=\sqrt{(20)^2+(10+\text{x})^2}-\sqrt{(20)^2+(10-\text{x}^2)}=10$

Solving we get x = 12.0cm.

Here given velocity of the sources v_s = 0

Velocity of the observer v₀ = 3m/s

So, the apparent frequency heard by the man $=\Big(\frac{332+3}{332}\Big)\times256=258.3\text{Hz}.$

From the approaching tuning form = f'

$\text{f}'=\Big[\frac{(332-3)}{332}\Big]\times256=253.7\text{Hz}.$

So, beat produced by them $=258.3-253.7=4.6\text{Hz}.$

1. $\text{f}=1400\text{Hz}, \text{u}=335\text{m/s}$

$\lambda\Big(\frac{\text{v}}{\text{f}}\Big)=\Big(\frac{335}{400}\Big)=0.8\text{m}=80\text{cm}$

The frequency received and reflected by the wall,

2. $\text{f}'=\Big(\frac{\text{u}-\text{V}_0}{\text{u}-\text{V}_\text{s}}\Big)\times\text{f}=\frac{335}{320}\times400\ \dots$ V_s = 54m/s and V_o = 0]

$\Rightarrow\text{x}'=\Big(\frac{\text{v}}{\text{f}}\Big)=\frac{320\times335}{335\times400}=0.8\text{m}=80\text{cm}$

The frequency received by the person sitting inside the car from reflected wave,

3. $\text{f}'=\Big(\frac{335-0}{335-15}\Big)\text{f}=\frac{335}{320}\times400=467$ [V_s = 0 and V_o = -15m/s]
4. Because, the difference between the original frequency and the apparent frequency from the wall is very high (437 - 440 = 37Hz), he will not hear any beats.mm)

1. According to the data

$\frac{\lambda}{4}=16.5\text{mm}$

$\Rightarrow\lambda=66\text{mm}=66\times10^{-3}\text{m}$

$\Rightarrow\text{n}=\frac{\text{V}}{\lambda}=\frac{330}{66\times10^{-3}}=5\text{KHz}$

2. $\text{I}_\text{minimum}=\text{K}(\text{A}_1-\text{A}_2)^2=\text{I}\Rightarrow\text{A}_1-\text{A}_2=11$

$\text{I}_\text{minimum}=\text{K}(\text{A}_1+\text{A}_2)^2=9\Rightarrow\text{A}_1+\text{A}_2=31$

So, $\frac{\text{A}_1+\text{A}_2}{\text{A}_1+\text{A}_2}=\frac{\text{3}}{4}$

$\Rightarrow\frac{\text{A}_1}{\text{A}_2}=\frac{2}{1}$

So, the ratio amplitudes is 2.

$\text{f}^1=\bigg(\frac{\overrightarrow{\text{u}}+\overrightarrow{\text{v}}_\text{m}-\overrightarrow{\text{v}}_0}{\overrightarrow{\text{u}}+\overrightarrow{\text{v}}_\text{m}-\overrightarrow{\text{v}}_\text{s}}\bigg)\text{f}$ [18km/h = 5m/s]

Using sign conventions,

app. Frequency $=\Big(\frac{340+0-0}{340+0-5}\Big)\times2400=2436\text{Hz}.$

$\triangle\text{S}_1\text{PO}$ and $\triangle\text{S}_2\text{PO}$ are right-angled triangle

1. Given $\text{v}_\text{s}=72\text{km/hour}=20\text{m/s},\ \rho=1250$

Apparent frequency $=\frac{340+0+0}{340+0-20}\times1250=1328\text{H}_2$

2. For second case apparent frequency will be $=\frac{340+0+0}{340+0-(-20)}\times1250=1181\text{Hz}.$

v_o = velocity of the observer; v_s = velocity of the sources.

$\text{f}=\bigg(\frac{\overrightarrow{\text{u}}+\overrightarrow{\text{v}}_\text{m}-\overrightarrow{\text{v}}_0}{\text{v}+\text{V}_\text{m}-\text{v}_\text{s}}\bigg)\text{F}$

$\text{V}_\text{m}=0,\ \text{u}=340\text{m/s},\ \text{v}_\text{s}=0$ and $\overrightarrow{\text{v}_0}=-10\text{m}$ (36km/h = 10m/s)

$=\Big(\frac{340+0-(-10)}{340+0-0}\Big)\times2\text{KHz}$

$=\frac{350}{340}\times2\text{KHz}$

$=2.06\text{KHz}.$

$1620=\Big(\frac{332+0+0}{332-15}\Big)\text{f}$

$\Rightarrow\text{f}=\Big(\frac{1620\times317}{332}\Big)\text{Hz}$

$\text{f}_1=\Big(\frac{332+0+0}{332+15}\Big)\text{f}\times\Big(\frac{1620\times317}{332}\Big)$

$=\frac{317}{347}\times1620=1480\text{Hz}.$

$\text{p}=1.0\times10^{5}\text{N/m}^2,\ \text{T}=273\text{K},\ \text{M}=32\text{g}=32\times10^{-3}\text{kg}$

$\text{V}=22.4\ \text{liter}=22.4\times10^{-3}\text{m}^3$

$\frac{\text{C}}{\text{C}_\text{v}}=\text{r}=\frac{3.5\text{R}}{2.5\text{R}}=1.4$

$\Rightarrow\text{V}=\sqrt{\frac{\text{rp}}{\text{f}}}=\sqrt{\frac{1.4\times1.0\times10^{-5}}{\frac{32}{22.4}}}=310\text{m/s}$ $\big($because $\rho=\frac{\text{m}}{\text{v}}\big)$

$\beta_\text{A}=10\log_{10}\frac{50\text{I}}{\text{I}_0};\ \beta_\text{B}=10\log_{10}\Big(\frac{100\text{I}}{\text{I}_0}\Big)$

$\Rightarrow\beta_\text{B}-\beta_\text{A}=10\log_{10}\frac{50\text{I}}{\text{I}_0}-10\log_{10}\Big(\frac{100\text{I}}{\text{I}_0}\Big)$

$=10\log\Big(\frac{100\text{I}}{50\text{I}}\Big)$

$=10\log_{10}2=3$

1. Beat heard by the standing man = 4

$\therefore\ \text{Frequency (f}_1)=440+4$

$\text{f}_1=444\text{Hz or 436 Hz}$

Now,

$\text{f}_1=\Big(\frac{340}{340-\text{v}_\text{s}}\Big)\times\text{f}_0$

On substituting the values,

We have,

$444=\Big(\frac{340+0}{340-\text{v}_\text{s}}\Big)\times440$

$\Rightarrow444(340-\text{v}_\text{s})=440\times340$

$\Rightarrow340\times(444-440)=440\times\text{v}_\text{s}$

$\Rightarrow340\times4=440\times\text{v}_\text{s}$

$\Rightarrow\text{v}_\text{s}=3.09\text{m/ s}=11\text{km/ h}$

2. The sitting man will listen to fewer than 4 beats/-s.