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A stationary sound waves has a series of nodes. The distance between the first and the 6th node is 30cm. What is the wavelength of the sound wave

User Mike DaCosta
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2 Answers

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22 votes

Final answer:

To calculate the wavelength of a stationary sound wave when the distance between the first and the sixth node is known (30 cm), we use the relation that five half-wavelengths fit between these nodes. By performing the calculations, we find the wavelength to be 12 cm.

Step-by-step explanation:

To find the wavelength of a stationary sound wave when the distance between the first and the 6th node is given, we need to understand the concept of standing waves and nodes in Physics. A node is a point along a standing wave where the wave has minimum amplitude. In the case of stationary waves, such as those on a string or in an air column, the distance between successive nodes is half a wavelength (λ/2). Therefore, five half-wavelengths are between the first and sixth nodes (λ/2 × 5). Given the total distance between these nodes is 30 cm, we can calculate the wavelength (&lambda) of the sound wave.

To find the wavelength:

Find the value of five half-wavelengths: Distance between the 1st and 6th node = &lambda/2 × 5.

Therefore, 5 × &lambda/2 = 30 cm.

To find the full wavelength, &lambda, we rearrange the equation: &lambda = (30 cm) / 5 × 2.

Calculate &lambda = 12 cm.

Thus, the wavelength of the sound wave is 12 cm.

User Kit Ostrihon
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17 votes
17 votes

Answer:

Assume a node at the left end and the right end

N-A-N-A-N-A-N-A-N-A-N shows nodes and anti-nodes

10 quarter wavelengths are shown (or 2.5 wavelengths)

30 / 2.5 = 12 cm wavelength since there is 1/4 wavelength between node and anti-node

User Tibor Udvari
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