If you increase the length of a vibrating string while keeping mass per unit length and tension constant, what happens to the fundamental frequency?

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Study for the Psychology of Music Test. Prepare with engaging multiple choice questions, complete with hints and detailed explanations. Ace your exam with confidence!

Multiple Choice

If you increase the length of a vibrating string while keeping mass per unit length and tension constant, what happens to the fundamental frequency?

Explanation:
The basic idea is that the fundamental frequency of a stretched string depends on its length, tension, and mass per unit length. The wave speed on the string is v = sqrt(T/μ), and the fundamental wavelength is λ1 = 2L, so f1 = v/λ1 = (1/2L) sqrt(T/μ). If you lengthen the string while keeping T and μ constant, v stays the same but λ1 increases, which makes f1 decrease. In short, a longer string with the same tension and density vibrates more slowly, producing a lower fundamental frequency.

The basic idea is that the fundamental frequency of a stretched string depends on its length, tension, and mass per unit length. The wave speed on the string is v = sqrt(T/μ), and the fundamental wavelength is λ1 = 2L, so f1 = v/λ1 = (1/2L) sqrt(T/μ). If you lengthen the string while keeping T and μ constant, v stays the same but λ1 increases, which makes f1 decrease. In short, a longer string with the same tension and density vibrates more slowly, producing a lower fundamental frequency.

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