Frequency of a sin function
[DOC File]Graphing Sine and Cosine – Worksheet #1
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Title: Graphing Sine and Cosine – Worksheet #1 Author: chris.jackson Last modified by: BPS Created Date: 1/6/2016 7:25:00 PM Company: Fortbend ISD
[DOC File]Loyola University Chicago
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In column A create a time string from 1 to 512. In column B create the signal associated with the source (=sin{(2 /512)*(time in column A}). The sin function should include (2 time/512). In column C create a similar set of data for the noise at some large frequency multiple and lower amplitude (=0.3 *sin{(2(/512)*20*(time in column A}).
[DOC File]Amplitude and Period for Sine and Cosine Functions Worksheet
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Sketch the graph of the function over the interval –2( ≤ x ≤ 2(. 11. y = 4 sin x 12. y = 2 cos x. 13. y = 2 sin 2x 14. y = – cos 2x 15. y = 3 cos x 16. y = – 2 sin (4x) Determine the amplitude, period, phase shift, and vertical shift for each. 17. 18. y = 2 cos (x − π) Amplitude _____ Amplitude _____
[DOC File]Amplitude and Period for Sine and Cosine Functions Worksheet
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Pre-Calculus. Mixed Review: Equations & Graphing of Trig Functions. Determine the amplitude, period, and vertical shift of each function. 1. y = sin 4x 2. y = cos 5x - 4 3. y = 2 sin x - 3 4. y = –4 sin 3x + 2
[DOC File]Applications of Sine and Cosine Graphs Learning Task:
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Middle C has a frequency of 262 hertz. The C found one octave above middle C has a frequency of 254 hertz. The C found one octave below middle C has a frequency of 131 hertz. Write a sine equation that models middle C if its amplitude is 0.4. Write a sine equation that models the C above middle C if its amplitude is one-half that of middle C.
[DOC File]Math II Unit 6
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The frequency of a sine or cosine function refers to the number of times it repeats compared to the parent function’s period. Frequency is usually associated with the unit Hertz or oscillations/second and measures the number of repeated cycles per second. The frequency and period are reciprocals of each other. Example: Determine the equation ...
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