Definitions from Wiktionary (Taylor series)
▸ noun: (calculus) A power series representation of given infinitely differentiable function f whose terms are calculated from the function's arbitrary order derivatives at given reference point a; the series f(a)+(f'(a))/(1!)(x-a)+(f(a))/(2!)(x-a)²+(f'(a))/(3!)(x-a)³+⋯=∑ₙ₌₀∞(f⁽ⁿ⁾(a))/(n!)(x-a)ⁿ.
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▸ noun: (calculus) A power series representation of given infinitely differentiable function f whose terms are calculated from the function's arbitrary order derivatives at given reference point a; the series f(a)+(f'(a))/(1!)(x-a)+(f(a))/(2!)(x-a)²+(f'(a))/(3!)(x-a)³+⋯=∑ₙ₌₀∞(f⁽ⁿ⁾(a))/(n!)(x-a)ⁿ.
Similar:
Taylor's series,
Maclaurin series,
power series,
Taylor polynomial,
analytic function,
formal power series,
Laurent series,
alternating series,
harmonic series,
Taylor's polynomial,
more...
Opposite:
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▸ Wikipedia articles (New!)
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▸ Invented words related to Taylor series