Math  /  Calculus

QuestionFind the Taylor polynomial of degree 3 for the function f(x)=x+7x4f(x)=\frac{x+7}{x-4} about x=5x=5. T3(x)=+(x5)+(x5)2+(x5)3T_{3}(x)=\square+\square(x-5)+\square(x-5)^{2}+\square(x-5)^{3}
Note: You can earn partial credit on this problem.

Studdy Solution
Construct the Taylor polynomial T3(x) T_3(x) :
T3(x)=f(5)+f(5)(x5)+f(5)2!(x5)2+f(5)3!(x5)3 T_3(x) = f(5) + f'(5)(x-5) + \frac{f''(5)}{2!}(x-5)^2 + \frac{f'''(5)}{3!}(x-5)^3
Substitute the values:
T3(x)=1211(x5)+222(x5)2+666(x5)3 T_3(x) = 12 - 11(x-5) + \frac{22}{2}(x-5)^2 + \frac{-66}{6}(x-5)^3
Simplify:
T3(x)=1211(x5)+11(x5)211(x5)3 T_3(x) = 12 - 11(x-5) + 11(x-5)^2 - 11(x-5)^3
The Taylor polynomial of degree 3 is:
T3(x)=1211(x5)+11(x5)211(x5)3 T_3(x) = 12 - 11(x-5) + 11(x-5)^2 - 11(x-5)^3

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