Two identical guitar strings have identical tensions of 80.0 N and produce fundamental frequencies of A = 110 Hz. If the tension of one string drops by 2.0 N, what is the difference in frequency (in Hz) of the fundamental frequency produced by the two strings?
Properties of sound
A sound wave is a mechanical wave (or mechanical vibration) that transit through media such as gas (air), liquid (water), and solid (wood).
Quality Of Sound
A sound or a sound wave is defined as the energy produced due to the vibrations of particles in a medium. When any medium produces a disturbance or vibrations, it causes a movement in the air particles which produces sound waves. Molecules in the air vibrate about a certain average position and create compressions and rarefactions. This is called pitch which is defined as the frequency of sound. The frequency is defined as the number of oscillations in pressure per second.
Categories of Sound Wave
People perceive sound in different ways, like a medico student takes sound as vibration produced by objects reaching the human eardrum. A physicist perceives sound as vibration produced by an object, which produces disturbances in nearby air molecules that travel further. Both of them describe it as vibration generated by an object, the difference is one talks about how it is received and other deals with how it travels and propagates across various mediums.
Two identical guitar strings have identical tensions of 80.0 N and produce fundamental frequencies of A = 110 Hz. If the tension of one string drops by 2.0 N, what is the difference in frequency (in Hz) of the fundamental frequency produced by the two strings?
Given data
*The given tension of two identical guitar strings is T = 80.0 N
*The given fundamental frequency is A = 110 Hz
*The tension in one string drops by T1 = = T - 2.0 N = 80.0 - 2.0 N = 78.0 N
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