r(r -- 1){r .3 3! where r is an arbitrary integral or fractional exponent. The necessary condition |x| < 1 for convergence was not stated by Newton. 8. Use the binomial theorem to obtain the following series expansions. – x³ + · . . (1+x)-1 = 1 – x +x? (a) + (-1)"x" + ·... (1– x)-2 = 1+ 2x + 3x² + . (b) %3D + (n + 1)x" +. ..

r(r -- 1){r .3 3! where r is an arbitrary integral or fractional exponent. The necessary condition |x| < 1 for convergence was not stated by Newton. 8. Use the binomial theorem to obtain the following series expansions. – x³ + · . . (1+x)-1 = 1 – x +x? (a) + (-1)"x" + ·... (1– x)-2 = 1+ 2x + 3x² + . (b) %3D + (n + 1)x" +. ..

Name: Number 8b r(r -- 1){r.33!where r is an arbitrary integral or fractiona
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Description: Number 8b r(r -- 1){r.33!where r is an arbitrary integral or fractional exponent.The necessary condition |x| < 1 for convergence wasnot stated by Newton.8. Use the binomial theorem to obtain the followingseries expansions.– x³ + · . .(1+x)-1 = 1 – x

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter10: Sequences, Series, And Probability

Section: Chapter Questions

Problem 63RE

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A percentage is a number indicated as a fraction of 100. It is a dimensionless number often expressed using the symbol %.

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Subtraction

Before we begin to understand the subtraction of algebraic expressions, we need to list out a few things that form the basis of algebra.

Addition

Before we begin to understand the addition of algebraic expressions, we need to list out a few things that form the basis of algebra.

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Question

Number 8b

r(r -- 1){r
.3
3!
where r is an arbitrary integral or fractional exponent.
The necessary condition |x| < 1 for convergence was
not stated by Newton.
8. Use the binomial theorem to obtain the following
series expansions.
– x³ + · . .
(1+x)-1 = 1 – x +x?
(a)
+ (-1)"x" + ·...
(1– x)-2 = 1+ 2x + 3x² + .
(b)
%3D
+ (n + 1)x" +. ..

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