the equation for the vibration of a string fixed both ends vibration in its third harmonic is given by
y = 2 cm sin `[(0.6cm ^(-1))xx ] cos [(500 ps^(-1)t]`

the equation for the vibration of a string fixed both ends vibration in its third harmonic is given by y = 2 cm sin [(0.6cm ^(-1)x)xx ] cos [(500 ps^(-1)t] What is the position of node?

The equation for the vibration of a string fixed at both ends vibrating in its third harmonic is given by y=2cm sin[(0.6cm^-1)x]cos[(500pis^-1)t] . The length of the string is

The equation for the vibration of a string, fixed at both ends vibrating in its third harmonic, is given by y = (0.4 cm) sin[(0.314 cm^-1) x] cos[f(600pis^-1)t] .(a) What is the frequency of vibration ? (b) What are the positions of the nodes ? (c) What is the length of the string ? (d) What is the wavelength and the speed of two travelling waves that can interfere to give this vibration ?

The equation for the vibration of a string, fixed at both ends vibrating in its third harmonic, is given by y = (0.4 cm) sin[(0.314 cm^-1) x] cos[f(600pis^-1)t] .(a) What is the frequency of vibration ? (b) What are the positions of the nodes ? (c) What is the length of the string ? (d) What is the wavelength and the speed of two travelling waves that can interfere to give this vibration ?

The equation for the vibration of a string, fixed at both ends vibrating in its third harmonic, is given by y = (0.4 cm) sin[(0.314 cm^-1) x] cos[f(600pis^-1)t] .(a) What is the frequency of vibration ? (b) What are the positions of the nodes ? (c) What is the length of the string ? (d) What is the wavelength and the speed of two travelling waves that can interfere to give this vibration ?

The equation for the vibration of a string fixed at both ends vibrating in its second harmonic is given by y=2sin(0.3cm^(-1))xcos((500pis^(-1))t)cm . The length of the string is :

The equation for the vibration of a string fixed at both ends vibrating in its second harmonic is given by y=2sin(0.3cm^(-1))xcos((500pis^(-1))t)cm . The length of the string is :

The Equation for the vibration of a string fixed at both ends vibrating in its third harmonic is given by y = 2 sin (0.6x) cos (500 pi t) (x, y are in cm t is in sec). The length of the string is

The equation for the vibration of a string fixed at both ends, vibrating in its its third harmonic is given by y=0.4"sin" (pix)/(10) cos 600 pi t where x and y are in cm (1) What is the frequency of vibration ? (2) What are the positions of nodes? (3) What is the length of string? (4) What is the wavelength and speed of transverse waves that can interfer to give this vibration ?

The equation of a stationary wave on a string clamped at both ends and vibrating in its third harmonic is given by y=0.5 sin (0.314"x") cos (600pit) where x and y are in cm and t is in sec. What is the length of the string?