Find the laylar polynomials of orders = 0,1,2,3, and 4 about x = No, and then find the nth laylor polynomials, Plx)for the function in sigma notation for fx) - e"; Xo = In2 Choose the correct answer. O po(x)= 2", a*(x - In2) PI(X) = 2"|| + atx - In2)), pi(x) = 2" |1+ a(x - In2) + 21 a*(x - In2), a'c – In2) P(x) = 2" |1+ a(x - In2) + 2! 31 (x - In2), '(x – In2)', a*x - In2)* PA(x) = 2" |1 + aix - In2) + + 2! 3! 4! 2"x- In2y Px) = k! O po(x)= 2", PI(x)- 2"|1 + ax), P:(x) = 2" |I + ax + PN) = 2" |1 + ar + PAN) = 2"|I + ar+ 21 3! 2 P.(X) = k! O po(x) = 1, a(x - In2) Pix) = 1+ atx - In2), p1(x) = 1 + a(x - In2) + 2! a*(x - In2), '(x - In2) Ps(x) =1+ alx - In2) + 21 31 a*(x - In2), a'(x – In2), a*x - In2) PA(x) -1+ a(x - In2) + 2! 3! a(x- In2y P.(X)= O po(x) = 2", a*x + In2) P(X) = 2"|1 + atx + In2)), p:(x) = 2" |1 + a(x + In2) + 21 a*(x + In2), a'c + In2) Pi(x) = 2" |1 + a(x + In2) + 21 3!
Find the laylar polynomials of orders = 0,1,2,3, and 4 about x = No, and then find the nth laylor polynomials, Plx)for the function in sigma notation for fx) - e"; Xo = In2 Choose the correct answer. O po(x)= 2", a*(x - In2) PI(X) = 2"|| + atx - In2)), pi(x) = 2" |1+ a(x - In2) + 21 a*(x - In2), a'c – In2) P(x) = 2" |1+ a(x - In2) + 2! 31 (x - In2), '(x – In2)', a*x - In2)* PA(x) = 2" |1 + aix - In2) + + 2! 3! 4! 2"x- In2y Px) = k! O po(x)= 2", PI(x)- 2"|1 + ax), P:(x) = 2" |I + ax + PN) = 2" |1 + ar + PAN) = 2"|I + ar+ 21 3! 2 P.(X) = k! O po(x) = 1, a(x - In2) Pix) = 1+ atx - In2), p1(x) = 1 + a(x - In2) + 2! a*(x - In2), '(x - In2) Ps(x) =1+ alx - In2) + 21 31 a*(x - In2), a'(x – In2), a*x - In2) PA(x) -1+ a(x - In2) + 2! 3! a(x- In2y P.(X)= O po(x) = 2", a*x + In2) P(X) = 2"|1 + atx + In2)), p:(x) = 2" |1 + a(x + In2) + 21 a*(x + In2), a'c + In2) Pi(x) = 2" |1 + a(x + In2) + 21 3!
Algebra & Trigonometry with Analytic Geometry
13th Edition
ISBN:9781133382119
Author:Swokowski
Publisher:Swokowski
Chapter4: Polynomial And Rational Functions
Section4.3: Zeros Of Polynomials
Problem 65E
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