Vibrations of string fixed at one end

Standing Wave Vibrations of string fixed at both ends

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 second harmonic is given by y=2sin(0.3cm^(-1))xcos((500pis^(-1))t)cm . The length of the string is :

Vibration OF string

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 of a vibrating string, fixed at both ends, is given by y = (3 mm) sin ((Pix)/(15))sin (400 Pit) where x is the distance (in cm) measured from one end of the string, t is the time (in seconds), and y gives the displacement. The string vibrates in 4 loops. The speed of transverse waves along the string equals, for the fundamental mode,

Four standing wave segments, or loops, are observed on a string fixed at both ends as it vibrates at a frequency of 140 Hz. What is the fundamental frequency of the string?

Discuss the formation of stationary waves in a string fixed at both the ends and also explain different modes of vibration.

A string of length L is fixed at one end and carries a mass M at the other end. The string makes 2//pi revolution per second around the vertical axis through the fixed end as shown in the figure, then tension in the string is.

A string of length L is fixed at one end and carries a mass M at the other end. The string makes ( 2 ) / ( pi ) rev/s around the vertical axis through the fixed end as shown in figure, then tension in string is