The period and frequency of a wave are inversely related, i.e. the period is the time it takes for wave to go through a cycle, and the frequency is the number of cycles in a certain time period. For example, a wave with a period of 0.5 seconds would have a frequency of 2 per second.
Since these properties are the inverse of each other, than they will be opposite when changing. If the period decreases (i.e. gets shorter, faster) than the frequency increases. Or vice versa.
Velda Hauck
If the period of a wave decreases, its frequency must increase. This is because frequency and period are inversely related: as one increases, the other decreases. Frequency is the number of wave cycles per unit of time, while period is the time it takes for one complete wave cycle.
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.
increase. The frequency of a wave is inversely proportional to its period, meaning that as the period decreases, the frequency increases. The relationship between frequency and period is given by the formula: frequency = 1 / period.
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.
When the frequency of a wave decreases, the period of the wave increases. The period of a wave is the inverse of its frequency, so as frequency decreases, the time between each wave cycle, or period, also increases.
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.
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.
increase. The frequency of a wave is inversely proportional to its period, meaning that as the period decreases, the frequency increases. The relationship between frequency and period is given by the formula: frequency = 1 / period.
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.
When the frequency of a wave decreases, the period of the wave increases. The period of a wave is the inverse of its frequency, so as frequency decreases, the time between each wave cycle, or period, also increases.
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.
frequency
When a wave period decreases, speed increases.
The period decreases.
The period decreases.
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.
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.