The frequency of a tone with a period of 100 milliseconds is 10 Hz. Frequency is the reciprocal of period, so to find frequency, you would take 1 divided by the period in seconds (0.1 seconds in this case).
To find the frequency of a wave, you take the reciprocal of the period. In this case, the frequency would be 1/1.6 Hz, which is approximately 0.625 Hz.
The period of a simple pendulum is the time it takes for one full oscillation (swing) back and forth. To find the period, you can use the formula: Period = 1 / Frequency. So, if the frequency is 20 Hz, the period would be 1/20 = 0.05 seconds.
The period of a sound wave is the inverse of its frequency. To find the period, you can use the formula T = 1/f, where T is the period and f is the frequency. Thus, for a blade of grass vibrating at a frequency of 428 Hz, the period would be 1/428, which is approximately 0.0023 seconds.
The frequency of a wave is inversely proportional to its period. This means that as the period of the wave increases, the frequency decreases. Mathematically, the relationship between frequency (f) and period (T) is f = 1/T.
The period is the reciprocal of the frequency.
The frequency of a tone with a period of 100 milliseconds is 10 Hz. Frequency is the reciprocal of period, so to find frequency, you would take 1 divided by the period in seconds (0.1 seconds in this case).
You will have to measure it.
Period = 1 / frequency
Period = 1/frequency = 1/500 = 0.002 second = 2 milliseconds
Period = reciprocal of ('1' divided by) the frequency = 1/256 = 0.00390625 second
The period is the reciprocal of ("one over") the frequency.1/500,000 = 0.000002 second = 2 microseconds
To find the frequency of a wave, you take the reciprocal of the period. In this case, the frequency would be 1/1.6 Hz, which is approximately 0.625 Hz.
The mathematical symbol for period is a Capital T with short legs on either side of the horizontal line. This symbol is most often used when finding frequency through 1/period or using frequency to find the period of a wave in the equation Period =1/ frequency T
As frequency increases, the period decreases. This relationship is inverse, meaning that a higher frequency corresponds to a shorter period. Mathematically, the period is the reciprocal of the frequency, so as one increases, the other decreases.
They are mutual reciprocals. frequency = 1/period period = 1/frequency
Time period = 1 / frequency. Frequency = 1 / time period.