Understanding Period and Frequency in Composite Sine Functions

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SUMMARY

The discussion focuses on the addition of two sine functions with different frequencies and its impact on period and frequency. The trigonometric identity \(\sin x + \sin y = 2\sin \frac{x+y}{2}\cos\frac{x-y}{2}\) is highlighted as a key relationship. Participants express a need for further understanding of how to decompose a graph into its constituent sine functions, leading to the suggestion of researching Fourier series for deeper insights.

PREREQUISITES
  • Understanding of trigonometric functions and their properties
  • Familiarity with the concept of frequency in mathematics
  • Knowledge of trigonometric identities
  • Basic understanding of Fourier series and signal decomposition
NEXT STEPS
  • Study the properties of sine functions and their frequencies
  • Learn about the application of Fourier series in signal processing
  • Explore advanced trigonometric identities and their applications
  • Investigate methods for graphing and analyzing composite functions
USEFUL FOR

Mathematicians, physics students, and anyone interested in signal processing or the analysis of waveforms through trigonometric functions.

Cluelessness
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Hey all!
I have a question concerning the addition of 2 sine functions.
Could anyone point me to the right direction as to what happens to the period and frequency when two sine functions are added together?
Note: when adding, these two functions possesses two different frequencies.
Thanks in advance! :D
 
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Cluelessness said:
Hey all!
I have a question concerning the addition of 2 sine functions.
Could anyone point me to the right direction as to what happens to the period and frequency when two sine functions are added together?
Note: when adding, these two functions possesses two different frequencies.
Thanks in advance! :D



I know what period of a trigonometric function is, but I can't say the same of "frequency" though

this seems to be a term from physics related to the inverse of the function's argument times 2\pi ...

Anyway, we have the trigonometric identity \sin x+\sin y=2\sin \frac{x+y}{2}\cos\frac{x-y}{2} .

DonAntonio
 
Thanks DonAntonio :D
But do you happen to know any other relationships apart from Simpsons' or Werner's?
My dilemma is, given a graph, how would you figure out what it is made up of? i.e what sine functions were added to produce that graph?
I just need a hint - do you happen to know any thing else which could help me?
 

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