What is the number of the highest harmonic that could be heard by a person who is capable of hearing frequencies up to 1.00×104 ?
To find the number of the highest harmonic that could be heard by a person capable of hearing frequencies up to 1.00×10^4, we need to understand what a harmonic is and how they relate to frequencies.
A harmonic is a frequency that is an integer multiple of a fundamental frequency. In other words, it is a tone that is produced at a higher frequency than the original sound. For example, if the fundamental frequency is 100 Hz, the second harmonic would be 200 Hz, the third harmonic would be 300 Hz, and so on.
To determine the highest harmonic that can be heard, we need to find the highest multiple of the fundamental frequency that is still below the person's limit of 1.00×10^4 Hz.
Let's assume that the fundamental frequency is 100 Hz (this is just an example, the actual value will depend on the person and their hearing capability). To find the highest harmonic, we can divide the person's limit (1.00×10^4 Hz) by the fundamental frequency and round down to the nearest whole number.
Highest harmonic = limit frequency / fundamental frequency
Highest harmonic = (1.00×10^4 Hz) / (100 Hz) = 100
Therefore, the highest harmonic that could be heard by a person capable of hearing frequencies up to 1.00×10^4 Hz is 100.