Question 10.1:

Monochromatic light of wavelength 589 nm is incident from air on a water surface. What are the wavelength, frequency and speed of (a) reflected, and (b) refracted light?

Refractive index of water is 1.33.

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Wavelength of incident monochromatic light,

λ = 589 nm = 589 × 10^{−9} m

Speed of light in air, *c *= 3 × 10^{8} m/s Refractive index of water,
*μ *= 1.33

The ray will reflect back in the same medium as that of incident ray. Hence, the wavelength, speed, and frequency of the reflected ray will be the same as that of the incident ray.

Frequency of light is given by the relation,

Hence, the speed, frequency, and wavelength of the reflected light are 3 × 10^{8} m/s, 5.09

×10^{14} Hz, and 589 nm respectively.

Frequency of light does not depend on the property of the medium in which it is travelling. Hence, the frequency of the refracted ray in water will be equal to the frequency of the incident or reflected light in air.

Refracted frequency, *ν *= 5.09 ×10^{14} Hz

Speed of light in water is related to the refractive index of water as:

Wavelength of light in water is given by the relation,

Hence, the speed, frequency, and wavelength of refracted light are 2.26 ×10^{8} m/s, 444.01nm, and 5.09 × 10^{14} Hz respectively.

Question 10.2:

What is the shape of the wavefront in each of the following cases:

Light diverging from a point source.

Light emerging out of a convex lens when a point source is placed at its focus.

The portion of the wavefront of light from a distant star intercepted by the Earth.

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The shape of the wavefront in case of a light diverging from a point source is spherical. The wavefront emanating from a point source is shown in the given figure.

The shape of the wavefront in case of a light emerging out of a convex lens when a point source is placed at its focus is a parallel grid. This is shown in the given figure.

The portion of the wavefront of light from a distant star intercepted by the Earth is a plane.

Question 10.3:

The refractive
index of glass is 1.5. What is the speed of light in glass? Speed of light in vacuum is 3.0 × 10^{8} m s^{−1})

Is the speed of light in glass ndependent of the colour of light? If not, which of the two

colours red and violet travels slower in a glass prism?

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Refractive index of glass,
*μ *= 1.5 Speed of light, c = 3 × 10^{8} m/s

Speed of light in glass is giv n by the relation,

Hence, the speed of light in glass is 2 × 10^{8} m/s.

The speed of light in glass is not independent of the colour of light.

The refractive index of a violet component of white light is greater than the refractive index of a red component. Hence, the speed of violet light is less than the speed of red light in glass. Hence, violet light travels slower than red light in a glass prism.

Question 10.4:

In a Young’s double-slit experiment, the slits are separated by 0.28 mm and the screen is placed 1.4 m away. The distance between the central bright fringe and the fourth bright fringe is measured to be 1.2 cm. Determine the wavelength of light used in the experiment.

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Distance between the slits, *d *=
0.28 mm = 0.28 × 10^{−3} m

Distance between the slits and the screen, *D *= 1.4 m

Distance between the central fringe and the fourth (*n *= 4) fringe,

*u *= 1.2 cm = 1.2 × 10^{−2} m

In case of a constructive interference, we have the relation for the distance between the two fringes as:

Where,

*n *= Order of fringes = 4

λ = Wavelength of light used

∴

Hence, the wavelength of the light is 600 nm.

Question 10.5:

In Young’s double-slit experiment
using monochromatic light of wavelengthλ, the intensity of light at a point on the screen where path difference is λ, is *K *units. What is the intensity of light at a point where path difference is λ /3?

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Let *I*_{1} and *I*_{2} be the intensity
of the two light waves. Their resultant
intensities can be obtained as:

Where,

= Phase difference between the two waves

For monochromatic light waves,

Phase difference =

Since path difference = λ,

Phase difference,

Given,

*I*’ = *K*

* *

* *

When path difference ,

Phase difference,

Hence, resultant intensity,

Using equation (1), we can write:

Hence, the intensity of light at a point where the path difference is is units.

Question 10.6:

A beam of light consisting of two wavelengths, 650 nm and 520 nm, is used to obtain interference fringes in a Young’s double-slit experiment.

Find the distance of the third bright fringe on the screen from the central maximum for wavelength 650 nm.

What is the least distance from the central maximum where the bright fringes due to both the wavelengths coincide?

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Wavelength of the light beam,

Wavelength of another light beam,

Distance of the slits from the screen = *D*

* *

Distance between the two slits = *d*

* *

Distance of the *n*^{th} bright
fringe on the screen from the central
maximum is given by the relation,

Let the *n*^{th} bright fringe due to wavelength and
(*n *− 1)^{th} bright fringe due to wavelength coincide on the screen.
We can equate the conditions for bright fringes
as:

Hence, the least distance from the central maximum can be obtained by the relation:

Note: The value of *d *and *D *are
not given in the question.

Question 10.7:

In a double-slit experiment the angular width of a fringe is found to be 0.2° on a screen placed 1 m away. The wavelength of light used is 600 nm. What will be the angular width of the fringe if the entire experimental apparatus is immersed in water? Take refractive index of water to be 4/3.

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Distance of the screen from the slits, *D *= 1 m Wavelength of light used,
Angular
width of the fringe in

Angular width of the fringe in water =

Refractive index of water,

Refractive index is related to angular width as:

Therefore, the angular width of the fringe in water will reduce to 0.15°.

Question 10.8:

What is the Brewster angle for air to glass transition? (Refractive index of glass = 1.5.)

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Refractive
index of glass, Brewster
angle = *θ*

Brewster angle is related to refractive index as:

Therefore, the Brewster angle for air to glass transition is 56.31°.

Question 10.9:

Light of wavelength 5000 Å falls on a plane reflecting surface. What are the wavelength and frequency of the reflected light? For what angle of incidence is the reflected ray normal to the incident ray?

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Wavelength of incident light,
λ = 5000 Å = 5000 × 10^{−10} m Speed of light,
*c *= 3 × 10^{8} m

Frequency of incident light is given by the relation,

The wavelength and frequency of incident light is the same as that of reflected ray. Hence, the wavelength of reflected light is 5000 Å and its frequency
is 6 × 10^{14} Hz.

When reflected ray is normal to incident ray, the sum of the angle of incidence, and angle of reflection, is 90°.

According to the law of reflection, the angle of incidence is always equal to the angle of reflection. Hence, we can write the sum as:

Therefore, the angle of incidence for the given condition is 45°.

Question 10.10:

Estimate the distance for which ray optics is good approximation for an aperture of 4 mm and wavelength 400 nm.

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Fresnel’s distance (*Z _{F}*) is the distance
for which the ray optics is a good approximation. It is given by the relation,

Where,

Aperture width,

Therefore, the distance for which the ray optics is a good approximation is 40 m.

Question 10.11:

The 6563 Å line emitted by hydrogen in a star is found to be red shifted by 15 Å. Estimate the speed with which the star is receding from the Earth.

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Wavelength of line emitted by hydrogen,

λ = 6563 Å

= 6563 × 10^{−10} m.

Star’s red-shift, Speed of light,

Let the velocity of the star receding away from the Earth be *v*.

The red shift is related with velocity as:

Therefore, the speed with which the star is receding away from the Earth is 6.87 × 10^{5} m/s.

Question 10.12:

Explain how Corpuscular theory predicts the speed of light in a medium, say, water, to be greater than the speed of light in vacuum. Is the prediction confirmed by experimental determination of the speed of light in water? If not, which alternative picture of light is consistent with experiment?

No; Wave theory

Newton’s corpuscular theory of light states that when light corpuscles strike the interface of two media from a rarer (air) to a denser (water) medium, the particles experience forces of attraction normal to the surface. Hence, the normal component of velocity increases while the component along the surface remains unchanged.

Hence, we can write the expression:

… (i)

Where,

*i *= Angle of incidence

*r *= Angle of reflection

*c *= Velocity of light in air

*v *= Velocity of light in water

We have the relation for relative refractive index of water with respect to air as:

Hence, equation (i) reduces to

But, > 1

Hence, it can be inferred from equation (ii) that *v *> *c*.
This is not possible since this prediction is opposite to the experimental results of *c *>
*v*.

The wave picture of light is consistent with the experimental results.

Question 10.13:

You have learnt in the text how Huygens’ principle leads to the laws of reflection and refraction. Use the same principle to deduce directly that a point object placed in front of a plane mirror produces a virtual image whose distance from the mirror is equal to the object distance from the mirror.

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Let an object at O be placed in front of a plane mirror MO’ at a distance *r *(as shown in the given figure).

A circle is drawn from the centre (O) such that it just touches the plane mirror at point O’. According to Huygens’ Principle, XY is the wavefront of incident light.

If the mirror is absent, then a similar wavefront X’Y’ (as XY) would form behind O’ at distance
*r *(as shown in the given figure).

can be considered as a virtual
reflected ray for the plane mirror. Hence, a point object placed in front of the plane mirror produces a virtual image whose distance
from the mirror is equal to the object distance
(*r*).

Question 10.14:

Let us list some of the factors, which could possibly influence the speed of wave propagation:

Nature of the source.

Direction of propagation.

Motion of the source and/or observer.

Wave length.

Intensity of the wave.

On which of these factors, if any, does

The speed of light in vacuum,

The speed of light in a medium (say, glass or water), depend?

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Thespeed of light in a vacuum i.e., 3 × 10^{8} m/s (approximately) is a universal
constant. It is not affected by the motion of the
source, the observer, or both. Hence, the given factor does not affect the speed of light in a vacuum.

Out of the listed factors, the speed of light in a medium depends on the wavelength of light in that medium.

Question 10.15:

For sound waves, the Doppler formula for frequency shift differs slightly between the two situations: (i) source at rest; observer moving, and (ii) source moving; observer at rest.

The exact Doppler formulas for the case of light waves in vacuum are, however, strictly identical for these situations. Explain why this should be so. Would you expect the formulas to be strictly identical for the two situations in case of light travelling in a medium?

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No

Sound waves can propagate only through a medium. The two given situations are not scientifically identical because the motion of an observer relative to a medium is different in the two situations. Hence, the Doppler formulas for the two situations cannot be the same.

In case of light waves, sound can travel in a vacuum. In a vacuum, the above two cases are identical because the speed of light is independent of the motion of the observer and the motion of the source. When light travels in a medium, the above two cases are not identical because the speed of light depends on the wavelength of the medium.

Question 10.16:

In double-slit experiment using light of wavelength 600 nm, the angular width of a fringe formed on a distant screen is 0.1º. What is the spacing between the two slits?

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Wavelength of light used, *λ *= 6000 nm = 600 × 10^{−9} m

Angular width of fringe, Angular
width of a fringe is related to slit spacing (*d*) as:

Therefore, the spacing between the slits is .

Question 10.17:

Answer the following questions:

In a single slit diffraction experiment, the width of the slit is made double the original width. How does this affect the size and intensity of the central diffraction band?

In what way is diffraction from each slit related to the interference pattern in a double-slit experiment?

When a tiny circular obstacle is placed in the path of light from a distant source, a bright spot is seen at the centre of the shadow of the obstacle. Explain why?

Two students are separated by a 7 m partition wall in a room 10 m high. If both light and sound waves can bend around obstacles, how is it that the students are unable to see each other even though they can converse easily.

Ray optics is based on the assumption that light travels in a straight line. Diffraction effects (observed when light propagates through small apertures/slits or around small obstacles) disprove this assumption. Yet the ray optics assumption is so commonly used in understanding location and several other properties of images in optical instruments. What is the justification?

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In a single slit diffraction experiment, if the width of the slit is made double the original width, then the size of the central diffraction band reduces to half and the intensity of the central diffraction band increases up to four times.

The interference pattern in a double-slit experiment is modulated by diffraction from each slit. The pattern is the result of the interference of the diffracted wave from each slit.

When a tiny circular obstacle is placed in the path of light from a distant source, a bright spot is seen at the centre of the shadow of the obstacle. This is because light waves are diffracted from the edge of the circular obstacle, which interferes constructively at the centre of the shadow. This constructive interference produces a bright spot.

Bending of waves by obstacles by a large angle is possible when the size of the obstacle is comparable to the wavelength of the waves.

On the one hand, the wavelength of the light waves is too small in comparison to the size of the obstacle. Thus, the diffraction angle will be very small. Hence, the students are unable to see each other. On the other hand, the size of the wall is comparable to the wavelength of the sound waves. Thus, the bending of the waves takes place at a large angle. Hence, the students are able to hear each other.

The justification is that in ordinary optical instruments, the size of the aperture involved is much larger than the wavelength of the light used.

Question 10.18:

Two towers on top of two hills are 40 km apart. The line joining them passes 50 m above a hill halfway between the towers. What is the longest wavelength of radio waves, which can be sent between the towers without appreciable diffraction effects?

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Distance between the towers,
*d *= 40 km

Height of the line joining the hills, *d *= 50 m.

Thus, the radial spread of the radio waves should not exceed 50 km.

Since the hill is located halfway between the towers, Fresnel’s distance can be obtained as:

*Z _{P} *= 20 km = 2 × 10

Aperture can be taken as:

*a *= *d *= 50 m

Fresnel’s distance is given by the relation,

Where,

λ = Wavelength of radio waves

Therefore, the wavelength of the radio waves is 12.5 cm.

Question 10.19:

A parallel beam of light of wavelength 500 nm falls on a narrow slit and the resulting diffraction pattern is observed on a screen 1 m away. It is observed that the first minimum is at a distance of 2.5 mm from the centre of the screen. Find the width of the slit.

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Wavelength of light beam,
*λ *= 500 nm = 500 × 10^{−9} m

Distance of the screen from the slit, *D *= 1 m

For first minima, *n *= 1 Distance between
the slits = *d*

Distance of the first minimum from the centre of the screen can be obtained as:

*x *= 2.5 mm = 2.5 × 10^{−3} m

It is related to the order of minima as:

Therefore, the width of the slits is 0.2 mm.

Question 10.20:

Answer the following questions:

When a low flying aircraft passes overhead, we sometimes notice

a slight shaking of the picture on our TV screen. Suggest a possible explanation.

As you have learnt in the text, the principle of linear superposition of wave displacement is basic to understanding intensity distributions in diffraction and interference patterns. What is the justification of this principle?

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Weak radar signals sent by a low flying aircraft can interfere with the TV signals received by the antenna. As a result, the TV signals may get distorted. Hence, when a low flying aircraft passes overhead, we sometimes notice a slight shaking of the picture on our TV screen.

The principle of
linear superposition of wave displacement is essential to our understanding of intensity distributions
and interference patterns. This is because superposition follows from the linear character
of a differential equation that governs wave motion. If *y*_{1} and *y*_{2} are the solutions of the second
order wave equation,
then any linear combination of *y*_{1} and *y*_{2} will also be the solution of the wave equation.

Question 10.21:

In deriving
the single slit diffraction pattern,
it was stated that the intensity is zero at angles of *nλ/a*. Justify this by suitably dividing
the slit to bring out the cancellation.

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Consider that a single slit of width *d *is divided into *n *smaller slits.

Width of each slit,

Angle of diffraction is given by the relation,

Now, each of these infinitesimally small slit sends zero intensity
in direction*θ*. Hence, the combination of these slits will give zero intensity.