Lagrange's interpolation formula

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English

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Etymology

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Named after Joseph Louis Lagrange (1736–1813), an Italian Enlightenment Era mathematician and astronomer.

Noun

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Lagrange's interpolation formula (uncountable)

  1. (mathematics) A formula which when given a set of n points , gives back the unique polynomial of degree (at most) n − 1 in one variable which describes a function passing through those points. The formula is a sum of products, like so: . When then all terms in the sum other than the i th contain a factor in the numerator, which becomes equal to zero, thus all terms in the sum other than the i th vanish, and the i th term has factors both in the numerator and denominator, which simplify to yield 1, thus the polynomial should return as the function of for any i in the set .