2 Marks Suppose That A Function F Has Derivatives Of All Orders At A Then The Series F K A K X A K Is Called 1 (23.85 KiB) Viewed 68 times
(2 marks) Suppose that a function f has derivatives of all orders at a. Then the series f(k) (a) k! - (x − a)k is called the Taylor series for f about a, where f(n) is then th order derivative of f. Suppose that the Taylor series for e2 cos (2x) about 0 is ao + a₁ + a₂x² + +4²¹ +... a4 = Enter the exact values of ao and as in the boxes below. a0 ª0 = 1
(2 marks) Consider the Maclaurin series fore and cosha: where A = 1 8Wi 8 (i) Using the power series above, it follows that the Maclaurin series for e4 is given by k! 32/3 and cosh z= A + Br + C₂² P3(x) = B z2k (2k)! + Dz³ + 4 and D (ii) Using the power series above, or otherwise, calculate the Taylor polynomial of degree 3 about 0 for e4 cosh z. [Make sure to use Maple syntax when you enter the polynomial. For example, for P3(x) = 4+3x+5x² + 72³ you would enter 4+3*x+5*x^2+7*x^3.]
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