College Physics (Instructor's)
College Physics (Instructor's)
11th Edition
ISBN: 9781305965317
Author: SERWAY
Publisher: CENGAGE L
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Question
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Chapter 27, Problem 28P

(a)

To determine

The wavelength of the incident photon.

(a)

Expert Solution
Check Mark

Answer to Problem 28P

The wavelength of the incident photon is 0.101nm .

Explanation of Solution

The Compton shift formula is,

λ'λ=hmec(1cosθ) (1)

    • h is the Plank’s constant
    • c is the speed of the light
    • me is the mass of the electron

The kinetic energy of the recoiling electron, according to the conservation of energy is,

12mev2=hcλ0hcλ=hc(λλ0)λ0λ

Using equation (1) in this equation,

12mev2=hc[hmec(1cosθ)]λ0[λ0+hmec(1cosθ)]λ0+hmec(1cosθ)=2(hmec)2(1cosθ)

On simplification, the equation is seen to be in the form aλ02+bλ0+c=0 , where a=1 .

b=hmec(1cosθ)

Substitute 17.4° for θ , 6.63×1034J.s for h , 9.11×1031kg for me and 3.00×108m/s for c .

b=6.63×1034J.s(9.11×1031kg)(3.00×108m/s)(1cos17.4°)=1.11×1013m

c=2(hmev)2(1cosθ)

Substitute 17.4° for θ , 6.63×1034J.s for h , 9.11×1031kg for me and 2.18×106m/s for v .

c=2(6.63×1034J.s)2(9.11×1031kg)(2.18×106m/s)(1cos17.4°)=1.02×1020m2

Solving the quadratic equation, the wavelength of the incident photon is, λ0=0.101nm

Conclusion:

Thus, the wavelength of the incident photon is 0.101nm .

(b)

To determine

The angle through which the electron scatters.

(b)

Expert Solution
Check Mark

Answer to Problem 28P

The angle through which the electron scatters is 80.9° .

Explanation of Solution

College Physics (Instructor's), Chapter 27, Problem 28P

Conserving momentum in the y-axis,

pesinϕ=psinθ

The wavelength of the scattered photon is,

λ=λ0+hmec(1cosθ)

Substitute 17.4° for θ , 6.63×1034J.s for h , 9.11×1031kg for me , 1.01×1010m for λ and 3.00×108m/s for c .

λ=1.01×1010m+(6.63×1034J.s)(1cos17.4°)(9.11×1031kg)(3.00×108m/s)=1.011×1010m

The scattering angle for the electron is,

ϕ=sin1[hsinθλmev]

Substitute 17.4° for θ , 6.63×1034J.s for h , 9.11×1031kg for me , 1.01×1010m for λ and 2.18×106m/s for v .

ϕ=sin1[(6.63×1034J.s)sin17.0°(1.011×1010m)(9.11×1031kg)(2.18×106m/s)]=80.9°

Conclusion:

Thus, the angle through which the electron scatters is 80.9°

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In a Compton scattering experiment, an x-ray photon scatters through an angle of 17.4° from a free electron that is initially at rest. The electron recoils with a speed of 2 180 km/s. Calculate the wavelength of the incident photon
In a Compton scattering experiment, an x - ray photon scatters through an angle of 17.4° from a free electron that is initially at rest. The electron recoils with a speed of 2 180 km/s. Calculate (a) the wavelength of the incident photon and (b) the angle through which the electron scatters
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