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inknit
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\sum [(-1)^n * pi ^2n] / [9^n * (2n)!] = ?
Thanks for the help.
Thanks for the help.
What is the Taylor's series for cos(pi/3)?
- Context: Undergrad
- Thread starter inknit
- Start date
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- Infinite Infinite series Series Sum
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SUMMARY
The discussion centers on deriving the Taylor series for the cosine function evaluated at \(\pi/3\). The series is expressed as \(\sum \frac{(-1)^n}{(2n)!}\left(\frac{\pi}{3}\right)^{2n}\), which aligns with the standard cosine series expansion. Participants confirm that this series converges to the value of \(\cos(\pi/3)\), which is known to be \(0.5\). The summation runs from \(n = 0\) to \(\infty\), confirming the infinite nature of the series.
PREREQUISITES- Understanding of Taylor series and their applications
- Familiarity with the cosine function and its properties
- Basic knowledge of infinite series and convergence
- Proficiency in mathematical notation and summation
- Study the derivation of Taylor series for other trigonometric functions
- Learn about convergence tests for infinite series
- Explore the implications of Taylor series in numerical methods
- Investigate the relationship between Taylor series and Maclaurin series
Mathematicians, students studying calculus, and anyone interested in series expansions and trigonometric functions.
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