QUESTION IMAGE
Question
- set the frequency so it is now at 3.00 hz. keep the amplitude at 1.00 cm.
- restart the wave. play the oscillation, then pause it.
- move the horizontal ruler to measure the wavelength. wavelength #5 =
- summarize your data in the chart below.
| data # | frequency (hz) | wavelength (cm) |
|---|---|---|
| #2 | 1.00 hz | 5.8 |
| #3 | 1.50 hz | 4.2 |
| #4 | 2.00 hz | 3 |
| #5 | 3.00 hz | 2.4 |
- why did the summary chart not include any information about the amplitude?
- did changing the frequency affect the wavelength?
- as the frequency increased, what happened to the wavelength? (look at your data)
- what happens to the wavelength of a wave if the frequency is doubled?
- what happens to the wavelength of a wave if the frequency is tripled?
Step1: Recall wave - speed formula
The speed of a wave is given by $v = f\lambda$, where $v$ is the wave - speed, $f$ is the frequency, and $\lambda$ is the wavelength. When the wave - speed is constant (which is likely the case in this experiment as no information about changing the medium is given), frequency and wavelength are inversely proportional.
Step2: Analyze question 20
The summary chart focuses on the relationship between frequency and wavelength. Since the amplitude was kept constant ($1.00$ cm) throughout the experiment, it is not relevant to the study of how frequency affects wavelength. So, it is not included in the chart.
Step3: Analyze question 21
From the data in the chart, as the frequency increases from $1.00$ Hz to $3.00$ Hz, the wavelength decreases from $6$ cm to $2.4$ cm. So, changing the frequency does affect the wavelength.
Step4: Analyze question 22
As the frequency increases, according to the inverse - proportionality relationship $v = f\lambda$ (with $v$ constant), the wavelength decreases. This is consistent with the data in the chart.
Step5: Analyze question 23
If the frequency is doubled, since $v = f\lambda$ and $v$ is constant, the wavelength is halved. For example, if the initial frequency is $f_1$ and wavelength is $\lambda_1$, and the new frequency $f_2 = 2f_1$, then $v=f_1\lambda_1=f_2\lambda_2 = 2f_1\lambda_2$, so $\lambda_2=\frac{\lambda_1}{2}$.
Step6: Analyze question 24
If the frequency is tripled, since $v = f\lambda$ and $v$ is constant, the wavelength is reduced to one - third of its original value. If the initial frequency is $f_1$ and wavelength is $\lambda_1$, and the new frequency $f_3 = 3f_1$, then $v=f_1\lambda_1=f_3\lambda_3 = 3f_1\lambda_3$, so $\lambda_3=\frac{\lambda_1}{3}$.
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- The amplitude was kept constant throughout the experiment, so it is not relevant to the relationship between frequency and wavelength being studied.
- Yes
- It decreases.
- It is halved.
- It is reduced to one - third of its original value.