In this question you may find usefull one of the following Maclaurin expansions e x
=β k=0
[infinity]
β
k!
x k
β
,sinx=β k=0
[infinity]
β
(β1) k
(2k+1)!
x 2k+1
β
,cosx=β k=0
[infinity]
β
(β1) k
(2k)!
x 2k
β
valid for all xβR, 1βx
1
β
=β k=0
[infinity]
β
x k
valid for xβ(β1,1) Suppose that the Taylor series for e x
cos(4x) about 0 is a 0
β
+a 1
β
x+a 2
β
x 2
+β―+a 6
β
x 6
+β― Enter the exact values of a 0
β
and a 6
β
in the boxes below. Suppose that a function f has derivatives of all orders at a. Then the series β k=0
[infinity]
β
k!
f (k)
(a)
β
(xβa) k
is called the Taylor series for f about a, where f(n) is the nth order derivative of f. Suppose that the Taylor series for e 2x
cos(2x) about 0 is a 0
β
+a 1
β
x+a 2
β
x 2
+β―+a 4
β
x 4
+β― Enter the exact values of a 0
β
and a 4
β
in the boxes below.
