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In mathematics, a Newtonian series, named after Isaac Newton, is a sum over a sequence ... is the binomial coefficient and () is the falling ...
The first results concerning binomial series for other than positive-integer exponents were given by Sir Isaac Newton in the study of areas enclosed under certain curves. John Wallis built upon this work by considering expressions of the form y = (1 − x 2 ) m where m is a fraction.
Around 1665, Isaac Newton generalized the binomial theorem to allow real exponents other than nonnegative integers. (The same generalization also applies to complex exponents.) In this generalization, the finite sum is replaced by an infinite series. In order to do this, one needs to give meaning to binomial coefficients with an arbitrary upper ...
Newton [4] The explication was written to remedy apparent weaknesses in the logarithmic series [ 6 ] [infinite series for log ( 1 + x ) {\displaystyle \log(1+x)} ] , [ 7 ] that had become republished due to Nicolaus Mercator , [ 6 ] [ 8 ] or through the encouragement of Isaac Barrow in 1669, to ascertain the knowing of the prior authorship ...
An infinite series of any rational function of can be reduced to a finite series of polygamma functions, by use of partial fraction decomposition, [8] as explained here. This fact can also be applied to finite series of rational functions, allowing the result to be computed in constant time even when the series contains a large number of terms.
Newton's series may refer to: The Newton series for finite differences, used in interpolation theory. The binomial series, first proved by Isaac Newton.
In the mathematical field of numerical analysis, a Newton polynomial, named after its inventor Isaac Newton, [1] is an interpolation polynomial for a given set of data points. The Newton polynomial is sometimes called Newton's divided differences interpolation polynomial because the coefficients of the polynomial are calculated using Newton's ...
The Newton identities now relate the traces of the powers to the coefficients of the characteristic polynomial of . Using them in reverse to express the elementary symmetric polynomials in terms of the power sums, they can be used to find the characteristic polynomial by computing only the powers A k {\displaystyle \mathbf {A} ^{k}} and their ...