Taylor series: Difference between revisions
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imported>Charles Blackham (inv tan (circ & hyp)) |
imported>Catherine Woodgold (Taylor series plural-->singular; formatting; "up to" the nth derivative) |
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'''Taylor series''' | A '''Taylor series''' is an infinite sum of polynomial terms to approximate a function in the region about a certain point <math>a</math>. This is only possible if the function is behaving analytically in this neighbourhood. Such series about the point<math>a=0</math> are known as '''Maclaurin series''', after Scottish mathematician Colin Maclaurin. They work by ensuring that the approximate series matches up to the n<sup>th</sup> derivative of the function being approximated when it is approximated by a polynomial of degree n. | ||
==Proof== | ==Proof== |
Revision as of 19:12, 27 April 2007
A Taylor series is an infinite sum of polynomial terms to approximate a function in the region about a certain point . This is only possible if the function is behaving analytically in this neighbourhood. Such series about the point are known as Maclaurin series, after Scottish mathematician Colin Maclaurin. They work by ensuring that the approximate series matches up to the nth derivative of the function being approximated when it is approximated by a polynomial of degree n.
Proof
See Taylor's theorem