Tension required in the string 17.424N .
A wave's speed increases with increased string tension, which raises its frequency (for a given length). By applying varied amounts of pressure, you can alter the string's length, the standing wave's wavelength, and the frequency.
A string can be raised to the pitch of the following note by applying too much tension, but it can be readily lowered by releasing tension. The pitch rises as the strain does. A string's length is also crucial. A string vibrates and makes music when it is supported at two places and pulled.
The fundamental frequency rises with increasing tension. The fundamental frequency rises with the weight of the string.
Here L = .6 , n = 6 , m = 14.4 x 10^(-3.)
Tension required in the string = (4 * L^2 * f^2) / n) * u
u=m/l
u= (14.4*10^-3 kg) /.6m
u = .024 kg/m
T = (4 x .6 x .6 x 55 x 55 / 6) x .024
= 726 x .024 = 17.424 N
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