Results 281 to 290 of about 2,026,688 (333)
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1999
If a series is absolutely convergent, then the sum is independent of the order in which terms are summed. A conditionally convergent series can be made to converge to any number (or even diverge) by suitable rearranging the order of the terms.
Knut Sydsæter, Arne Strøm, Peter Berck
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If a series is absolutely convergent, then the sum is independent of the order in which terms are summed. A conditionally convergent series can be made to converge to any number (or even diverge) by suitable rearranging the order of the terms.
Knut Sydsæter, Arne Strøm, Peter Berck
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Series, Taylor — Maclaurin Series
1976By a series we mean a set of numbers a1, a2, a3… such that we have a rule for calculating a2, a3 etc. from the first number a1.Series occur in many problems in chemistry such as specific heats of solids, the theory of black-body radiation, solution of the Schrodinger equation, statistical thermodynamics and Fourier series in X-ray crystallography.
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Summation of Series, Taylor Series
1994A geometric series is convergent if its common ratio x satisfies |x| < 1. It is divergent if |x| ≥ 1. For a convergent geometric series, its sum is known in closed form: (3.1.1)
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Taylor Series I and Taylor Series II.
The American Mathematical Monthly, 1972openaire +1 more source
Higher-order Taylor series expansion for uncertainty quantification with efficient local sensitivity
Aerospace Science and Technology, 2022Achyut Paudel +2 more
exaly
Symplectic neural networks in Taylor series form for Hamiltonian systems
Journal of Computational Physics, 2021Shiying Xiong, Xingzhe He
exaly