consider the wavelengths 1.75m 3.5m 5m andd 7m which of these will produce standing waves on a string that is 3.5m long
consider the wavelengths 1.75m 3.5m 5m andd 7m which of these will produce standing waves on...
the equation for the possible wavelengths of standing waves on a string in terms of the length of the string and the harmonic numbers: lambda = ?
What are the three longest wavelengths for standing waves on a 210-cm-long string that is fixed at both ends? Enter your answers in meters in ascending order separated by commas. If the frequency of the second-longest wavelength in part a is 50.0 Hz , what is the frequency of the third-longest wavelength?
What are the three longest wavelengths for standing sound waves in a 122-cm-long tube under the following conditions. a)The tube is open at both ends. b)The tube is open at one end, closed at the other?
Question 26 If two of the wavelengths of standing waves on a 12 meter rope secured at both ends are 2 meters and 1 meter, which of the following could not be a standing wave wavelength on the same rope with the same tension? OA.4m O B. 2.5m O C. 1.5 m D. 66.67 cm
Complete the equation for the possible wavelengths of standing waves in a closed-ended tube in terms of the length of the tube and the harmonic numbers lambda = ?
a) Find the pattern of allowed wavelengths and frequencies for standing waves inside a pipe of length L open at both ends. Show how you arrive at your answer. b) If the length of the pipe is 1.00 m and it is filled with air, tell me the frequency of the 5th harmonic.
In the standing waves experiment, the string has a mass of 40.6 g string and length of 1.20 m. The string is connected to a mechanical wave generator that produce standing waves with frequency of f. The other end of the string is connected to a mass holder (mholder = 50.0 g) that carries a weight of 5.00x102 g. Calculate the velocity of the standing waves in the string. (g = 9.80 m/s2)
In the standing waves experiment, the string has a mass of 39.4 g string and length of 1.11 m. The string is connected to a mechanical wave generator that produce standing waves with frequency of f. The other end of the string is connected to a mass holder (mholder = 50.0 g) that carries a weight of 5.00x102 g. Calculate the tension in the string. (g = 9.80 m/s2)
Two waves are generated on a string of length 5.4 m to produce a three-loop standing wave with an amplitude of 3.2 cm. The wave speed is 100 m/s. Let the equation for one of the waves be of the form y(x, t) = ym sin (kx + ωt). In the equation for the other wave, what are (a) ym, (b) k, (c) ω, and (d) the sign in front of ω?