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Using Higher Derivatives to Approximate Functions Assistance

I have been working on this lab for my Calc I class and I can't seem to get what I want. It is asking me to find the quadratic and cubic approximations to f(x)=(e^-x)cos(Pi)x near the point x=1. So i ran through what the procedure wants and Im supposed to get a quadratic tangent line to the function. I keep getting this parabola which seems to have no correlation with the diagram in the procedure of how it is supposed to look like. The procedure is attached to this post and the Lab is 5.3. Can somebody explain to me what I am doing wrong or if Im doing this right . 
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POSTED BY: Matthew Jones
With f[x_]:=Exp[-x] Cos[Pi x], calculate the Taylor series f=f[1]+{x-1)f' ' [1]+(1/2)(x-1)^2 f ' ' [1]+(1/3!){x-1)^3 f ' ' ' [1] + .  . .
POSTED BY: S M Blinder
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