Homework Answers
Answer)
It is antinodes.
They are the positions at which the medium has maximum displacement in a standing wave.
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2. (One word) In a standing wave the positions at which the medium has maximum displacement...
1. (One word) In a standing wave the positions at which the medium does not move...
1. (One word) In a standing wave the positions at which the medium does not move are called
In a sound wave, how do the locations of maximum and minimum medium displacement compare with...
In a sound wave, how do the locations of maximum and minimum
medium displacement compare with the locations of maximum and
minimum medium density?
Question 2 1 pts In a sound wave, how do the locations of maximum and minimum medium displacement compare with the locations of maximum and minimum medium density? O None of the other options. The locations are shifted by % of the wavelength. O The locations are shifted by 4 of the wavelength. O The locations...
Two transverse sinusoidal waves combining in a medium are described by the wave functions y_1 =...
Two transverse sinusoidal waves combining in a medium are described by the wave functions y_1 = 1.00 sin pi (x + 0.900t) y_2 = 1.00 sin pi(x - 0.900t) where x, y_1, and y_2 are in centimeters and t is in seconds. Determine the maximum transverse position of an element of the medium at the following positions. x = 0.240 cm |y max| = x = 0.340 cm |ymax| = x = 1.40 cm |ymax| = Find the three smallest...
1. A sinusoidal sound wave moves through a medium and W is described by the displacement...
1. A sinusoidal sound wave moves through a medium and W is described by the displacement wave function s(x, t) = 2.00 cos (15.7x - 858t) where sis in micrometers, x is in meters, and tis in sec- onds. Find (a) the amplitude, (b) the wavelength, and (c) the speed of this wave. (d) Determine the instanta- neous displacement from equilibrium of the elements of the medium at the position x = 0.050 0 m at 1 = 3.00 ms....
1. A sinusoidal sound wave moves through a medium and W is described by the displacement...
1. A sinusoidal sound wave moves through a medium and W is described by the displacement wave function s(x, t) = 2.00 cos (15.7x – 8581) where sis in micrometers, x is in meters, and tis in sec- onds. Find (a) the amplitude, (b) the wavelength, and (c) the speed of this wave. (d) Determine the instanta- neous displacement from equilibrium of the elements of the medium at the position x = 0.050 0 m at 1 = 3.00 ms....
5. (One word) When two waves are present in the same medium, the net displacement is...
5. (One word) When two waves are present in the same medium, the net displacement is the of the displacements due to each of the individual waves.
The wave function for a standing wave on a string is described by y(x, t) =...
The wave function for a standing wave on a string is described by y(x, t) = 0.023 sin(4x) cos (591), where y and x are in meters and t is in seconds. Determine the maximum displacement and maximum speed of a point on the string at the following positions. (a) x = 0.10 m Ymax = Vmax = m/s m (b) x = 0.25 m Vmax = Vmax = m m/s (c) x = 0.30 m Ymax = m Vmax...
The wave function for a standing wave on a string is described by y(x, t) =...
The wave function for a standing wave on a string is described by y(x, t) = 0.021 sin(4x) cos (56át), where y and x are in meters and t is in seconds. Determine the maximum displacement and maximum speed of a point on the string at the following positions. (a) x = 0.10 m Ymax = m Vmax = m/s (b) x = 0.25 m Ymax = Vmax = m m/s (c) x = 0.30 m Ymax = Vmax =...
The wave function for a standing wave on a string is described by y(x, t) =...
The wave function for a standing wave on a string is described by y(x, t) = 0.016 sin(4πx) cos (57πt), where y and x are in meters and t is in seconds. Determine the maximum displacement and maximum speed of a point on the string at the following positions. (a) x = 0.10 m ymax = m vmax = m/s (b) x = 0.25 m ymax = m vmax = m/s (c) x = 0.30 m ymax = m vmax = m/s (d) x = 0.50...
A standing wave has maximum amplitude 7 and nodes at 0, /2, a, 31/2, 2T, as...
A standing wave has maximum amplitude 7 and nodes at 0, /2, a, 31/2, 2T, as shown in the figure. Each point that is not a node moves up and down with period 4T. Find a function of the form y(x, t) A sin(ax) cos(Bt) that models this wave. y(x, t) AA y Need Help? Read It Talk to a Tutor
1. (One word) In a standing wave the positions at which the medium does not move are called
In a sound wave, how do the locations of maximum and minimum
medium displacement compare with the locations of maximum and
minimum medium density?
Question 2 1 pts In a sound wave, how do the locations of maximum and minimum medium displacement compare with the locations of maximum and minimum medium density? O None of the other options. The locations are shifted by % of the wavelength. O The locations are shifted by 4 of the wavelength. O The locations...
Two transverse sinusoidal waves combining in a medium are described by the wave functions y_1 = 1.00 sin pi (x + 0.900t) y_2 = 1.00 sin pi(x - 0.900t) where x, y_1, and y_2 are in centimeters and t is in seconds. Determine the maximum transverse position of an element of the medium at the following positions. x = 0.240 cm |y max| = x = 0.340 cm |ymax| = x = 1.40 cm |ymax| = Find the three smallest...
1. A sinusoidal sound wave moves through a medium and W is described by the displacement wave function s(x, t) = 2.00 cos (15.7x - 858t) where sis in micrometers, x is in meters, and tis in sec- onds. Find (a) the amplitude, (b) the wavelength, and (c) the speed of this wave. (d) Determine the instanta- neous displacement from equilibrium of the elements of the medium at the position x = 0.050 0 m at 1 = 3.00 ms....
1. A sinusoidal sound wave moves through a medium and W is described by the displacement wave function s(x, t) = 2.00 cos (15.7x – 8581) where sis in micrometers, x is in meters, and tis in sec- onds. Find (a) the amplitude, (b) the wavelength, and (c) the speed of this wave. (d) Determine the instanta- neous displacement from equilibrium of the elements of the medium at the position x = 0.050 0 m at 1 = 3.00 ms....
5. (One word) When two waves are present in the same medium, the net displacement is the of the displacements due to each of the individual waves.
The wave function for a standing wave on a string is described by y(x, t) = 0.023 sin(4x) cos (591), where y and x are in meters and t is in seconds. Determine the maximum displacement and maximum speed of a point on the string at the following positions. (a) x = 0.10 m Ymax = Vmax = m/s m (b) x = 0.25 m Vmax = Vmax = m m/s (c) x = 0.30 m Ymax = m Vmax...
The wave function for a standing wave on a string is described by y(x, t) = 0.021 sin(4x) cos (56át), where y and x are in meters and t is in seconds. Determine the maximum displacement and maximum speed of a point on the string at the following positions. (a) x = 0.10 m Ymax = m Vmax = m/s (b) x = 0.25 m Ymax = Vmax = m m/s (c) x = 0.30 m Ymax = Vmax =...
A standing wave has maximum amplitude 7 and nodes at 0, /2, a, 31/2, 2T, as shown in the figure. Each point that is not a node moves up and down with period 4T. Find a function of the form y(x, t) A sin(ax) cos(Bt) that models this wave. y(x, t) AA y Need Help? Read It Talk to a Tutor
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