The function y(x, t) = (18.0 cm) cos(TX-27mt), with x in meters and t in seconds, describes a wave on a taut string, what is the transverse speed for a point on the string at an instant when that point has the displacement y = +15.0 cm?
The function y(x, t) = (0.150 m) cos(x − 15t) where x is in meters, and t is in seconds, describes a transverse wave on a taught string. a) What is the transverse velocity of a point on the string at an instant in time when y = +0.120 m? b) What is the maximum transverse velocity a point on the string can have? c) What is the average transverse velocity of a point on the string averaged over an...
The function y(z, t)-(0.150 m) cos (та-15nt) where æ is in meters, and t is in seconds, describes a transverse wave on a taught string. a) What is the transverse velocity of a point on the string at an instant in time when y- +0.120 m? b) What is the maximum transverse velocity a point on the string can have? c) What is the average transverse velocity of a point on the string averaged over an integer number of wave...
A traveling wave is described by the function y(x,t) = 2 cos(3pi*t − 4pi*x), where y is in cm, x is in meters, and t is in seconds. a. In what direction is the wave traveling? b. What is the speed of the wave? c. What is the transverse acceleration of the wave at y = 0 and t = 1 second? d. Write an expression for the second harmonic of this wave (i.e., same speed, but twice the frequency).
5.A transverse periodic wave is represented by the equation y(x, t) = 2.50 cm cos(2,500 rad/st-15.0 m2 x). What is the velocity of the wave? 5.A transverse periodic wave is represented by the equation y(x, t) = 2.50 cm cos(2,500 rad/st-15.0 m2 x). What is the velocity of the wave?
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) = 0.016 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...
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 transverse wave on a string is described by the wave function y(x, t) = 0.334 sin(1.60x + 86.0t) where x and y are in meters and t is in seconds. Consider the element of the string at x = 0. (a) What is the time interval between the first two instants when this element has a position of y = 0.175 m? (b) What distance does the wave travel during the time interval found in part (a)?
1. A transverse wave on a string is described by y( x,t) = (0.1m)sin(0.4x + 5t) where x is measured in meters and t in seconds. a) What is the speed and the direction of travel of this wave? . A transverse wave on a string is described by y( x,t) = (0.12m)sin(0.5x + 4t) where x is measured in meters and t in seconds. b) What is the speed of this wave?