Taylor's Series

Taylor’s Series

(or Taylor series), a power series of the form

where f(x) is a function having derivatives of all orders at x = a.

In many cases of practical importance, Taylor’s series converges to f(x) on some interval with center at a:

(this formula was published in 1715 by B. Taylor). The difference R_n(x) = f(x) – S_n(x), where S_n(x) is the sum of the first n + 1 terms of series (1), is called the remainder. Formula (2) is valid if R_n(x)→ 0 as n→ ∞. A Taylor’s series can be represented in the form

which is also applicable to functions of several variables.

When a = 0, the expansion of a function in a Taylor’s series assumes the form

Such a series has been traditionally, although incorrectly, called a Maclaurin’s series. Examples of Maclaurin’s series are

Series (3) is a generalization of Newton’s binomial formula to the case where the exponents may be fractional or negative. This series converges for –1 < x < 1 if m < –1, for –1 < x ≤ 1 if – 1 < m < 0, and for – 1 ≤ x ≤ 1 if m > 0. Series (4), (5), and (6) converge for any value of x. Series (7) converges for –1 < x ≤ 1.

If a function f (z) of a complex variable z is regular at the point a, the function can be expanded in a Taylor’s series in powers of z – a within a circle having a center at a and a radius equal to the distance from a to the nearest singular point of f (z). Outside this circle, the Taylor’s series diverges; its behavior on the circumference of the circle of convergence may be very complicated. The radius of the circle of convergence is expressed in terms of the coefficients of the Taylor’s series (seeRADIUS OF CONVERGENCE).

Taylor’s series are used in the study of functions and in approximate calculations (see also).

REFERENCES

Khinchin, A. Ia. Kratkii kurs matematicheskogo analiza. Moscow, 1953.
Fikhtengol’ts, G. M. Kurs differentsial’nogo i integral’nogo ischisleniia, 7th ed., vol. 2. Moscow, 1969.

单词	taylor's series
释义	Taylor's series Taylor's series n (Mathematics) maths an infinite sum giving the value of a function f(z) in the neighbourhood of a point a in terms of the derivatives of the function evaluated at a. Under certain conditions, the series has the form f(z) = f(a) + [f′(a)(z – a)]/1! + [f″(a)(z – a)²]/2! + …. See also Maclaurin's series [C18: named after Brook Taylor (1685–1731), English mathematician] Taylor's Series Taylor’s Series (or Taylor series), a power series of the form where f(x) is a function having derivatives of all orders at x = a. In many cases of practical importance, Taylor’s series converges to f(x) on some interval with center at a: (this formula was published in 1715 by B. Taylor). The difference R_n(x) = f(x) – S_n(x), where S_n(x) is the sum of the first n + 1 terms of series (1), is called the remainder. Formula (2) is valid if R_n(x)→ 0 as n→ ∞. A Taylor’s series can be represented in the form which is also applicable to functions of several variables. When a = 0, the expansion of a function in a Taylor’s series assumes the form Such a series has been traditionally, although incorrectly, called a Maclaurin’s series. Examples of Maclaurin’s series are Series (3) is a generalization of Newton’s binomial formula to the case where the exponents may be fractional or negative. This series converges for –1 < x < 1 if m < –1, for –1 < x ≤ 1 if – 1 < m < 0, and for – 1 ≤ x ≤ 1 if m > 0. Series (4), (5), and (6) converge for any value of x. Series (7) converges for –1 < x ≤ 1. If a function f (z) of a complex variable z is regular at the point a, the function can be expanded in a Taylor’s series in powers of z – a within a circle having a center at a and a radius equal to the distance from a to the nearest singular point of f (z). Outside this circle, the Taylor’s series diverges; its behavior on the circumference of the circle of convergence may be very complicated. The radius of the circle of convergence is expressed in terms of the coefficients of the Taylor’s series (seeRADIUS OF CONVERGENCE). Taylor’s series are used in the study of functions and in approximate calculations (see also). REFERENCES Khinchin, A. Ia. Kratkii kurs matematicheskogo analiza. Moscow, 1953. Fikhtengol’ts, G. M. Kurs differentsial’nogo i integral’nogo ischisleniia, 7th ed., vol. 2. Moscow, 1969.
随便看	get his back up get his bait back get his bearings get his beauty sleep get his bell rung get his blood up get his bowels in an uproar get his brain in gear get his breath back get his prescription filled get his prescription refilled get his priorities right get his priorities straight get his rocks off get his rocks off on get his say get his sea legs get his second breath get his second wind get his shirt out get his shorts in a knot get his signals crossed get his skates on frenkel exercises frenkel-halsey-hill isotherm equation

Taylor's series

Taylor's series

Taylor's Series

Taylor’s Series

REFERENCES