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How do you determine the period of the graph of \( y = A\cos(Bx) \) where A and B are constants?

Ask by Summers Parsons. in the United States
Jan 24,2025

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The period of \( y = A\cos(Bx) \) is \( \frac{2\pi}{|B|} \).

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The Deep Dive

To determine the period of the graph of \( y = A\cos(Bx) \), you can use the formula for the period of cosine functions, which is given by \( \text{Period} = \frac{2\pi}{|B|} \). So, if \( B \) is larger, the graph will complete a cycle faster, resulting in a shorter period. If \( B \) is smaller, the graph takes longer to repeat, giving you a longer period! Now, remember that while \( A \) affects the amplitude (the height) of your graph, it does not affect the period at all! So, focus on the value of \( B \) when calculating how quickly those waves roll in and out of your view!

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