The wavelength of a stationary wave is 36.0cm. What is the distance between a node and the next anti -node
To determine the distance between a node and the next antinode in a stationary wave, we need to understand the pattern of nodes and antinodes in the wave. In a stationary wave, there are points where the amplitude is always zero, known as nodes, and points where the amplitude is maximum, known as antinodes.
The distance between a node and the next antinode is equal to half the wavelength of the stationary wave.
Given that the wavelength of the wave is 36.0 cm, we can calculate the distance between a node and the next antinode as follows:
Distance between a node and the next antinode = 1/2 * Wavelength
Distance between a node and the next antinode = 1/2 * 36.0 cm
Distance between a node and the next antinode = 18.0 cm
Therefore, the distance between a node and the next antinode in the stationary wave is 18.0 cm.
To determine the distance between a node and the next anti-node in a stationary wave, we need to understand the concept of node and antinode in a stationary wave.
In a stationary wave, nodes are the points where the amplitude of the wave is always zero. In contrast, antinodes are the points where the amplitude of the wave oscillates between maximum and minimum.
Now, the distance between a node and the next antinode in a stationary wave is equal to half of the wavelength (λ/2).
So, in this case, if the wavelength (λ) of the stationary wave is given as 36.0 cm, we can calculate the distance between a node and the next antinode as follows:
Distance between node and next antinode = λ/2
= 36.0 cm / 2
= 18.0 cm
Therefore, the distance between a node and the next antinode in the given stationary wave is 18.0 cm.