Wiki User
∙ 7y agoIt travels 2.28 metres.
Wiki User
∙ 7y agoFirst, calculate the velocity of the wave: v = λ/T = 0.57 m / 0.25 s = 2.28 m/s. Then, multiply the wave's velocity by the time traveled to find the distance covered: distance = velocity × time = 2.28 m/s × 33 s = 75.24 meters.
To determine the frequency of a longitudinal wave, you can measure the number of complete oscillations the wave makes in a given time period. This can be done by calculating the cycles per second, which is the frequency of the wave in hertz (Hz). You can also use the wave's wavelength and speed to calculate its frequency using the formula: frequency = speed / wavelength.
The period of a wave can be calculated using the equation Period = Wavelength / Wave Speed. Plugging in the values, we get Period = 10 mm / 50 m/s = 0.2 milliseconds.
The formula to calculate wave speed is speed = wavelength / period. Plugging in the values given: 72 / 5 = 14.4 m/s. Therefore, the wave speed is 14.4 meters per second.
To find the speed of the wave, you can use the formula: speed = wavelength / period. In this case, the wavelength is 12.0 m and the period is 3.0 seconds. Thus, the speed of the wave is 4.0 m/s.
The speed of the wave can be calculated using the formula: speed = wavelength / period. In this case, the speed of the wave is 10 meters / 20 seconds = 0.5 meters per second.
Speed = (wavelength) times (frequency) = (wavelength) divided by (period) = 30/5 = 6 meters per second
Frequency = speed/wavelengthPeriod = 1/frequency = wavelength/speed = (3,000,000)/(300,000,000) = 0.01 second
To determine the frequency of a longitudinal wave, you can measure the number of complete oscillations the wave makes in a given time period. This can be done by calculating the cycles per second, which is the frequency of the wave in hertz (Hz). You can also use the wave's wavelength and speed to calculate its frequency using the formula: frequency = speed / wavelength.
The velocity of a deepwater wave can be calculated using the formula v = L/T, where v is the velocity, L is the wavelength (50 meters), and T is the period (6.5 seconds). Substituting the values gives v = 50 meters / 6.5 seconds ≈ 7.69 m/s.
The period of a wave can be calculated using the equation Period = Wavelength / Wave Speed. Plugging in the values, we get Period = 10 mm / 50 m/s = 0.2 milliseconds.
If a wave is traveling at 5 meters per second (assuming that is what the question meant) and its wavelength is 20 meters, consider standing beside the wave and watching it pass. As the wave is 20 meters long and it is moving at 5 meters per second, it will take 4 seconds for the full cycle of the wave to pass an observer. That means its frequency is one cycle per 4 seconds. And - surprise! - that's the period of the wave. The period of the wave is 4 seconds.
The formula to calculate wave speed is speed = wavelength / period. Plugging in the values given: 72 / 5 = 14.4 m/s. Therefore, the wave speed is 14.4 meters per second.
To find the speed of the wave, you can use the formula: speed = wavelength / period. In this case, the wavelength is 12.0 m and the period is 3.0 seconds. Thus, the speed of the wave is 4.0 m/s.
The speed of the wave can be calculated using the formula: speed = wavelength / period. In this case, the speed of the wave is 10 meters / 20 seconds = 0.5 meters per second.
To find the time period of a wave, we use the formula: time period (T) = wavelength (λ) / speed (v). Converting 10 mm to meters (10 mm = 0.01m), we find T = 0.01m / 50 m/s = 0.0002 seconds. Therefore, the time period of the wave is 0.0002 seconds.
The frequency of the waves is 0.5 Hz (10 waves / 20 seconds). The time period is 2 seconds (1 / 0.5 Hz). The wavelength of the waves would depend on the speed of the waves in the medium they are traveling through.
The speed of the wave c = frequency f times wavelength lambda. c = 25 times 5 = 125 m/s, whatever that medium on what planet may be. Some formulas: Scroll down to related links and look at "Wavelength".