Derivation of beat frequency formula | Physics | Khan Academy
Deriving the Formula for Beat Frequency
In this section, the teacher introduces the concept of beat frequency and explains how it is derived. The formula for beat frequency is discussed, as well as its relationship to overlapping waves with different frequencies.
Understanding Beat Frequency
- Beat frequency is produced when two waves with different frequencies overlap.
- The number of times the waves go from constructive to destructive and back per second determines the beat frequency.
- The formula for beat frequency is derived by taking the difference between the individual frequencies of the overlapping waves.
Deriving the Formula for Beat Frequency
- To derive the formula, we first focus on finding the beat period, which represents the time it takes for one complete cycle of constructive to constructive.
- By finding the beat period, we can determine that beat frequency is equal to one divided by the period.
- The goal is to find how long it takes for two overlapping waves to become constructive again.
Analyzing Wave Phases
- To find this time, we examine how these waves shift in phase over time.
- Assuming they start off in phase (constructive), we want to know how long it takes for them to become constructive again after shifting out of phase.
- We observe that every time one wave completes a full cycle (period), it becomes slightly ahead or behind in phase compared to the other wave.
Calculating Time Shift
- The amount of phase shift between two peaks is determined by the difference in periods between both waves.
- By multiplying this difference by the number of cycles completed by one wave, we can calculate how far apart these peaks are spaced in time at any given moment.
Constructive Again Condition
- When these peaks are spaced apart by exactly one entire period of the second wave, they become constructive again.
- This condition indicates that enough time has passed for the waves to overlap peak to peak.
Solving for Time
- Although there is no variable "t" in the equation, we can introduce it by considering the periods of both waves as constants.
- By finding the time when the distance between peaks equals one entire period of the second wave, we determine how long it took for them to become constructive again.
Sneaking "t" into the Equation
In this section, the teacher explains how to incorporate time ("t") into the equation despite its absence. The concept of relative phase and using a reference point are discussed.
Incorporating Time into the Equation
- Despite not having an explicit variable for time ("t"), we can still include it in our calculations.
- We introduce "t" by considering a reference point and measuring the time it takes for two peaks to become constructive again.
Relative Phase and Reference Point
- By choosing a reference point where both waves start off in phase (constructive), we can measure how far apart they are at any given moment.
- This allows us to determine when they become constructive again by comparing their relative phases.
Finding Constructive Again Time
- The time it takes for two peaks to become constructive again is determined by when their separation equals one entire period of the second wave.
- By solving this equation, we can find "t," which represents how long it took for them to reach that state.
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New Section
In this section, the speaker discusses the concept of cycles and introduces a more general way to represent the number of cycles a wave has gone through.
Representing the Number of Cycles
- The number of cycles a wave has gone through can be determined by dividing the time waited by the period of the wave. This is denoted as nR = t / T1.
- By using this representation, it becomes possible to calculate the number of cycles even when it is not an integer value.
New Section
In this section, the speaker explains how to calculate the time it takes for two waves to get out of phase by a whole period and introduces the concept of beat period.
Calculating Time for Waves to Get Out of Phase
- The time it takes for two waves to get out of phase by a whole period is denoted as t.
- It can be calculated using the formula: t = (T1 * T2) / (T1 - T2), where T1 is the period of one wave and T2 is the period of another wave.
- This time represents the beat period between two waves.
New Section
In this section, the speaker derives the formula for beat frequency from the previously calculated beat period.
Deriving Beat Frequency Formula
- The formula for beat frequency can be derived by taking one over the beat period.
- One over beat period equals one over (T2 - T1) / (T1 * T2).
- Simplifying further, we get: 1 / (beat period) = (frequency 2) - (frequency 1).
- Therefore, beat frequency equals frequency 2 minus frequency 1.
New Section
In this section, the speaker concludes the discussion by confirming that the derived formula matches the desired beat frequency formula.
Confirming Beat Frequency Formula
- The derived beat frequency formula matches the desired formula: beat frequency = |frequency 2 - frequency 1|.
- The absolute values are not necessary if we ensure that the larger period is subtracted from the smaller period.
- The derived formula accurately represents how long one must wait for two waves to get back into phase and explains why it takes exactly that amount of time.
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