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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 relationship of frequency to period is that frequency is thereciprocal of the period.f = 1/TSo their product is always ' 1 ', and if the period increases, thenthe frequency decreases by exactly the same factor.
Frequency is 1 of 3 variables that determine wave energy. The other two are amplitude and velocity.
If you're taking about a system, you need to make the parts and joints of it work together more finely. In other words, you turn up the frequency of the vibration.
The frequency is the reciprocal of the period. In other words, in this case you need to divide 1 / 0.75 seconds. The answer will be in hertz (Hz).
Frequency and period are mutual reciprocals.
The period is the reciprocal of the frequency, in other words, one divide by the frequency. If the frequency is in Hertz, the period is in seconds.
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.
Time period = 1 / frequency. Frequency = 1 / time period.
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 relationship of frequency to period is that frequency is thereciprocal of the period.f = 1/TSo their product is always ' 1 ', and if the period increases, thenthe frequency decreases by exactly the same factor.
Frequency is 1 of 3 variables that determine wave energy. The other two are amplitude and velocity.
A wave or other periodic phenomenon with a period of 1 second has a frequency of 1 Hz.
Increase decrease. The frequency MUST decrease.
If you're taking about a system, you need to make the parts and joints of it work together more finely. In other words, you turn up the frequency of the vibration.
Period and frequency are 'locked' together, not independent numbers. They're simply the reciprocals of each other.Period = 1 / (frequency).Frequency = 1 / (period).So definitely, if one changes, the other changes. Their product is always [ 1 ].
The pitch period of a signal is the fundamental period of the signal, or in other words, the time interval on which the signal repeats itself. The pitch frequency is the inverse of the pitch period, which is the fundamental frequency of the signal.