The period of a wave is the time it takes for one complete cycle. To calculate the period of a wave, you use the formula T = 1/f, where T is the period and f is the frequency. So, for a wave with a frequency of 8Hz, the period would be 1/8 seconds, which is 0.125 seconds.
8Hz
If the period increases, the frequency decreases.The product of (frequency) times (period) is always ' 1 '.
True. The period of a wave is inversely proportional to its frequency. That means as the frequency of a wave increases, the period of the wave decreases proportionally.
When the period of a wave decreases, the frequency of the wave increases. This is because frequency and period are inversely related - as one increases, the other decreases. So, a shorter period corresponds to a higher frequency.
The frequency of a wave is the reciprocal of its period, so if the period is 6 seconds, then the frequency is 1/6 Hz.
8Hz
8Hz
Period = 1 / frequency
Frequency = 24 ms-1/3 m = 8 s-1 or 8 Hertz.
If the period increases, the frequency decreases.The product of (frequency) times (period) is always ' 1 '.
True. The period of a wave is inversely proportional to its frequency. That means as the frequency of a wave increases, the period of the wave decreases proportionally.
When the period of a wave decreases, the frequency of the wave increases. This is because frequency and period are inversely related - as one increases, the other decreases. So, a shorter period corresponds to a higher frequency.
The frequency of a wave is the reciprocal of its period, so if the period is 6 seconds, then the frequency is 1/6 Hz.
Period = 1 / frequency
Wave frequency f, and period of wave T are inverses, related by fT=1.
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 is the reciprocal of the period. If the period is doubled, the frequency will change by a factor of 1/2.