Its' reciprocal. 400 kilohertz.
The period of a sine wave is the reciprocal of the frequency. So, if the time period is 2.5 microseconds, the frequency would be 1 / 2.5 microseconds, which is 400 kHz.
50
200hz
Excitation frequency can be calculated as the reciprocal of the excitation period, which is the time interval between two consecutive excitations. The formula is: Excitation frequency = 1 / Excitation period. Alternatively, if you know the excitation waveform (e.g., sine wave), you can determine the excitation frequency from the period of that waveform.
Yes, as the frequency of a set of waves increases, the period of each wave decreases. This is because frequency and period are inversely related - frequency is the number of wave cycles occurring in a unit of time, while period is the time it takes for one wave cycle to complete.
The frequency of a wave decreases when its period increases. The frequency (f) of a wave is the number of cycles (or vibrations or oscillations) per unit time. The SI units of frequency is the inverse seconds or hertz (Hz). The period (T) of a wave is the time it takes to complete a cycle. The frequency and period have the following relationship: frequency= 1/period f= 1/T so if the period increases, the frequency decreases.
inversely ...wave length = 1/frequency
The reciprocal of frequency is the time period of the wave
10 Hz
Period = 1 / frequency = 1/272 = 0.003676 second (rounded)
The frequency is the reciprocal of the period. In other words, divide 1 by the period. If the period is in seconds, the frequency is in hertz.
Frequency = 1 / period = 1 / 0.807 = 1.2392 Hz (rounded)
1kHz
The period is the reciprocal of the frequency, in this case, 1/250 second.
A sine wave is a simple vertical line in the frequency domain because the horizontal axis of the frequency domain is frequency, and there is only one frequency, i.e. no harmonics, in a pure sine wave.
yes as, period time = 1/ frequency
Period = 1/frequency = 1/50,000 = 0.00002 second = 20 microseconds
The definiton of period (T) . Is T = 1/f ; Therefore if you know that the period is 2.5
The sine wave at low frequency is unstable because it can create strong currents that nobody can stop them from
The sine wave, with its repeating pattern, can represent a single frequency with no harmonics.