Physics for Scientists and Engineers with Modern, Revised Hybrid (with Enhanced WebAssign Printed Access Card for Physics, Multi-Term Courses)
Physics for Scientists and Engineers with Modern, Revised Hybrid (with Enhanced WebAssign Printed Access Card for Physics, Multi-Term Courses)
9th Edition
ISBN: 9781305266292
Author: Raymond A. Serway, John W. Jewett
Publisher: Cengage Learning
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Chapter 16, Problem 15P

(a)

To determine

The transverse speed of the wave.

(a)

Expert Solution
Check Mark

Answer to Problem 15P

The transverse speed of the wave is 1.51m/s_.

Explanation of Solution

Write the general expression for wave function of a wave moving in positive x direction.

  y=Asin(kxωt+ϕ)                                                                                                (I)

Here, A is the amplitude of the wave, k is the wave number, ω is the angular frequency, and ϕ is the phase.

The wave function of the given wave.

  y=(0.120)sin(π8x+4πt)                                                                             (II)

The transverse speed will be obtained by taking the derivative of the position of the wave.

The expression for maximum speed is.

  υy=yt                                                                                                         (III)

Conclusion:

Substitute, (0.120)sin(π8x+4πt)0.100sin(πxπt) for y in equation (III).

  υy=((0.120)sin(π8x+4πt))t=0.120(4π)cos(π8x+4πt)                                                                      (IV)

Substitute, 0.200s for t, and 1.60m for x in equation (IV).

  υy=0.120(4π)cos(π8(1.60m)+4π(0.200s))=1.51m/s

Therefore, the transverse speed of any element on the string is 1.51m/s_.

(b)

To determine

The transverse acceleration at t=0.200s, and x=1.60m.

(b)

Expert Solution
Check Mark

Answer to Problem 15P

The transverse acceleration at t=0.200s, and x=1.60m is 0_.

Explanation of Solution

Transverse acceleration will be obtained by taking the derivative of transverse velocity with respect to time.

Write the expression for transverse acceleration.

  ay=υyt                                                                                                        (V)

Conclusion:

Substitute, 0.120(4π)cos(π8x+4πt) for υy in equation (V).

  ay=(0.120(4π)cos(π8x+4πt))t=0.120(4π)2sin(π8x+4πt)                                                                      (VI)

Substitute, 0.200s for t, and 1.60m for x in equation (VI).

  ay=0.120(4π)2sin(π8(1.60m)+4π(0.200s))=0

Therefore, the transverse acceleration at t=0.200s, and x=1.60m is 0_.

(c)

To determine

The wavelength of the wave.

(c)

Expert Solution
Check Mark

Answer to Problem 15P

The wavelength of the wave is 1.60m_.

Explanation of Solution

Write the expression for wavelength of the wave in terms of wave number.

  λ=2πk                                                                                                       (VII)

Here, k is the wave number.

Comparing equation (I) and (II), the wave number is π8.

Conclusion:

Substitute, π8 for k in equation (V).

  λ=2π(π8)=1.60m

Therefore, the wavelength of the wave is 1.60m_.

(d)

To determine

The period of the wave.

(d)

Expert Solution
Check Mark

Answer to Problem 15P

The period of the wave is 0.500s_.

Explanation of Solution

Write the expression for the period of the wave.

  T=2πω                                                                                                      (VIII)

Here, ω is the angular frequency

Comparing equation (I) and (II), the angular frequency is 4π.

Conclusion:

Substitute, 4π for ω in equation (VI)

  T=2π4π=0.500s

Therefore, the period of the wave is 0.500s_.

(e)

To determine

The speed of an element of propagation of wave.

(e)

Expert Solution
Check Mark

Answer to Problem 15P

The speed of an element of propagation of wave is 32.0m/s_.

Explanation of Solution

Write the expression for speed.

  υ=fλ=λT (IX)

Conclusion:

Substitute, 1.60m for λ , and 0.500s for T in equation (IX).

  υ=1.60m0.500s=32.0m/s

Therefore, the speed of an element of propagation of wave is 32.0m/s_.

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Chapter 16 Solutions

Physics for Scientists and Engineers with Modern, Revised Hybrid (with Enhanced WebAssign Printed Access Card for Physics, Multi-Term Courses)

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