Definitions from Wiktionary (Maclaurin series)
▸ noun: (calculus) Any Taylor series that is centred at 0 (i.e., for which the origin is the reference point used to derive the series from its associated function); for a given infinitely differentiable complex function f, the power series f(0)+(f'(0))/(1!)x+(f(0))/(2!)x²+(f'(0))/(3!)x³+⋯=∑ₙ₌₀ ᪲(f⁽ⁿ⁾(0))/(n!),xⁿ.
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▸ noun: (calculus) Any Taylor series that is centred at 0 (i.e., for which the origin is the reference point used to derive the series from its associated function); for a given infinitely differentiable complex function f, the power series f(0)+(f'(0))/(1!)x+(f(0))/(2!)x²+(f'(0))/(3!)x³+⋯=∑ₙ₌₀ ᪲(f⁽ⁿ⁾(0))/(n!),xⁿ.
Similar:
Taylor series,
Taylor's series,
Maclaurin polynomial,
binomial series,
Laurent series,
analytic function,
power series,
formal power series,
Abel sum,
Dirichlet series,
more...
Opposite:
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▸ Wikipedia articles (New!)
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▸ Rhymes of Maclaurin series
▸ Invented words related to Maclaurin series