To analyze the function \( f(\theta) = 4 \sin(2\theta) \), we need to find the amplitude, midline, and period.
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Amplitude: The amplitude of a sine function \( A \sin(B\theta) \) is given by the absolute value of \( A \). Here, \( A = 4 \), so the amplitude is: \[ \text{Amplitude} = 4 \]
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Midline: The midline of a sine function is defined by the vertical shift of the graph, which is typically represented by \( D \) in the general form \( A \sin(B\theta) + D \). In this case, there is no vertical shift (i.e., \( D = 0 \)), so: \[ \text{Midline} = y = 0 \]
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Period: The period of a sine function \( A \sin(B\theta) \) is calculated by the formula: \[ \text{Period} = \frac{2\pi}{|B|} \] where \( B \) is the coefficient of \( \theta \). Here \( B = 2 \), so: \[ \text{Period} = \frac{2\pi}{2} = \pi \]
Based on this analysis, the correct values for the function \( f(\theta) = 4 \sin(2\theta) \) are:
- Amplitude: 4
- Midline: \( y = 0 \)
- Period: \( \pi \)
Hence, the correct option from the responses is:
- amplitude=4, midline: y=0, period=π.
1 answer