Physics For Scientists And Engineers: Foundations And Connections, Extended Version With Modern Physics
Physics For Scientists And Engineers: Foundations And Connections, Extended Version With Modern Physics
1st Edition
ISBN: 9781305259836
Author: Debora M. Katz
Publisher: Cengage Learning
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Chapter 18, Problem 66PQ

(a)

To determine

Maximum transverse displacement of the rope if x is 1.00m.

(a)

Expert Solution
Check Mark

Answer to Problem 66PQ

The maximum transverse displacement of the rope if x is 1.00m is 2.14m_.

Explanation of Solution

Write the general equation for the standing wave formed when two waves travelling in opposite direction superimposes each other.

y(x,t)=[2ymaxsin(kx)]cos(ωt) (I)

Here, y(x,t) is the displacement of the standing wave, ymax is the maximum displacement possible, k is the wave vector, ω is the angular frequency, and t is the time.

Write the equation for the first wave function taking part in super position.

y1(x,t)=(1.20m)sin(0.350πxπ2t) (II)

Write the equation for the second wave function taking part in super position.

y2(x,t)=(1.20m)sin(0.350πx+π2t) (III)

Both the waves are travelling in the opposite direction. So after the overlap the resultant displacement is equal to the sum of displacements of individual waves.

Add equations (II) and (III) to get the resultant amplitude of the wave.

y(x,t)=y1(x,t)+y2(x,t) (IV)

Substitute equations (II) and (III) in (IV).

  y(x,t)=(1.20m)sin(0.350πxπ2t)+(1.20m)sin(0.350πx+π2t)=(2.40m)sin(0.350πx)cos(π2t)            (V)

For maximum value of y, |cos(π2t)| is equal to 1.

Rewrite equation (V) to get maximum displacement if x is 1.00m.

|ymax1|=(2.40m)sin[0.350πx1] (VI)

Here, ymax1 is the maximum displacement if x is 1.00m and x1 is the first position.

Conclusion:

Substitute 1.00m for x1 in equation (VI) to get |ymax|.

  |ymax|=(2.40m)sin[0.350π(1.00m)]=2.14m

Therefore, the maximum transverse displacement of the rope if x is 1.00m is 2.14m_.

(b)

To determine

Maximum transverse displacement of the rope if x is 3.00m.

(b)

Expert Solution
Check Mark

Answer to Problem 66PQ

The maximum transverse displacement of the rope if x is 3.00m is 0.375m_.

Explanation of Solution

Rewrite equation (V) to get maximum displacement if x is 3.00m.

|ymax3|=(2.40m)sin[0.350πx3] (VI)

Here, ymax3 is the maximum displacement if x is 3.00m and x3 is the second position.

Conclusion:

Substitute 3.00m for x3 in equation (VI) to get ymax3.

  |ymax3|=(2.40m)sin[0.350π(3.00m)]=0.375m

Therefore, the maximum transverse displacement of the rope if x is 3.00m is 0.375m_.

(c)

To determine

Location of the first three antinodes on the rope.

(c)

Expert Solution
Check Mark

Answer to Problem 66PQ

The first antinode is located at 1.43m_, second antinode is located at 4.29m_, and the location of the third antinode is 7.14m_.

Explanation of Solution

Write the condition for occurrence of antinodes in the given wave.

sin(0.350πx)=±10.350πx=nπ2 (V)

Here, n is the order of the antinodes or the position of antinodes.

Rearrange equation (V) to find x1.

x1=n10.700 (VI)

Here, x1 is the distance at which first antinode is formed and n1 is the order of first antinode.

Rearrange equation (V) to find x1.

x2=n20.700 (VII)

Here, x2 is the distance at which second antinode is formed and n2 is the order of second antinode.

Rearrange equation (V) to find x3.

x3=n30.700 (VIII)

Here, x3 is the distance at which third antinode is formed and n3 is the order of third antinode.

Conclusion:

Substitute 1 for n1 in equation (VI) to get x1.

  x1=10.700=1.43m

Substitute 3 for n2 in equation (VII) to get x2.

  x2=30.700=4.29m

Substitute 5 for n3 in equation (VIII) to get x3.

  x3=50.700=7.14m

Therefore, the first antinode is located at 1.43m_, second antinode is located at 4.29m_, and the location of the third antinode is 7.14m_.

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Chapter 18 Solutions

Physics For Scientists And Engineers: Foundations And Connections, Extended Version With Modern Physics

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