o fricken idea....
i have nk
Wiki User
∙ 11y agoPeriod = 1 / frequency
They are inverses. Seconds and Hertz are inverse units.
Not sure about duty cycle of a waveform. The frrequency is the inverse of the period and the period is the inverse of the frequency. Frequency (it pains me to tell you) is measured in Hertz, cycles per second. Period is the time for one cycle or seconds per cycle. If we let f be frequency and T be period, then f=1/T and T= 1/f
If you mean a wave that has a frequency of 10 hz at 360 m/s, then the answer is 1/36 of a second. The period is the inverse of the wavelength and the wavelength is equal to the wave speed divided y the frequency. 360/10=36 and the inverse of 36 is 1/36.
For waves, frequency(f) is the inverse of period(T). Therefore, f = 1/T. f = 1/0.358s = 1.79cycles/s = 1.79Hz
The inverse of period is frequency. Period refers to the time it takes to complete one cycle of a repeating event, while frequency represents the number of cycles that occur in a unit of time.
frequency
Yes.
To find the inverse frequency of a wave, you simply take the reciprocal of the frequency value. For example, if the frequency of a wave is 10 Hz, the inverse frequency would be 1/10 Hz. This can be useful in certain calculations or when analyzing wave properties.
I think it's frequency.
Period = 1 / frequency
They are inverses. Seconds and Hertz are inverse units.
The period of a wave is the time it takes for one complete cycle to occur, while the frequency is the number of cycles that occur in one second. The relationship between period and frequency is inverse, meaning that as the period increases, the frequency decreases, and vice versa. This can be mathematically demonstrated by the equation: frequency = 1/period.
Frequency (f) is the inverse of period (T), so the equation relating the two is: f = 1/T
The period of a 4Hz wave is 0.25 seconds. This can be calculated by taking the inverse of the frequency (1/4 = 0.25).
Period and frequency are inverse to each other, as period increases frequency decreases. So, to answer this question as the period of the wave decreases its frequency must increase.
The fundamental building period is simply the inverse of the building frequency at the lowest harmonic - easy right? Basically, every system has a set of frequencies in which it "wants" to vibrate when set in motion by some sort of disturbance (in building design, typically a seismic or wind event) based on the system's mass and stiffness characteristics. The shortest frequency is known as the natural frequency. The inverse of frequency is the period of the system, and more specifically, the inverse of the natural frequency is the fundamental period.