|q₁ + x b₁₂+xb₂ + xb3 + xIf A(x) = a₂ + xa2G₁+x/C₂ + x, then show that A"(x) = 01a3 + xC3 + xand that A(x) = A(0) + Sx, where S denotes the sum of all thecofactors of all the elements in A(0).

Answered: Image /qna-images/answer/90b3982e-7eb8-4385-817a-4d629b994bcd.jpg

b₁ + x b₂ + x b3 + x + +x\ C₂+x, then show that A'(x) = 0 a₁ + x If A(x) = a₂ + x a3 + x C3 + x and that A(x) = A(0) + Sx, where S denotes the sum of all the cofactors of all the elements in A(0).

b₁ + x b₂ + x b3 + x + +x\ C₂+x, then show that A'(x) = 0 a₁ + x If A(x) = a₂ + x a3 + x C3 + x and that A(x) = A(0) + Sx, where S denotes the sum of all the cofactors of all the elements in A(0).

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter4: Polynomial And Rational Functions

Section4.3: Zeros Of Polynomials

Problem 24E

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Question

|q₁ + x b₁₂+x
b₂ + x
b3 + x
If A(x) = a₂ + x
a2
G₁+x/
C₂ + x, then show that A"(x) = 0
1a3 + x
C3 + x
and that A(x) = A(0) + Sx, where S denotes the sum of all the
cofactors of all the elements in A(0).

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