Example 11. (a) Find the
Taylor polynomial of degree n = 3 for ![[Graphics:tp11.txtgr1.gif]](tp11.txtgr1.gif){kind=small}
,
expanded about ![[Graphics:tp11.txtgr2.gif]](tp11.txtgr2.gif){kind=small}
.
First, find the derivatives of f(x).
Second, evaluate the derivatives of f(x) at x = ![[Graphics:tp11.txtgr5.gif]](tp11.txtgr5.gif){kind=small}
,
and obtain a sequence of constants ![[Graphics:tp11.txtgr6.gif]](tp11.txtgr6.gif){kind=small}
.
Third, substitute the constants ![[Graphics:tp11.txtgr8.gif]](tp11.txtgr8.gif){kind=small}
in Taylor's formula.
![[Graphics:tp11.txtgr4.gif]](tp11.txtgr4.gif){kind=small}
![[Graphics:tp11.txtgr10.gif]](tp11.txtgr10.gif)
Example 11. (b) Find the Taylor polynomial of degree n = 5.
(c) John H. Mathews, 1998
![[Graphics:tp11.txtgr3.gif]](tp11.txtgr3.gif)
![[Graphics:tp11.txtgr7.gif]](tp11.txtgr7.gif)
![[Graphics:tp11.txtgr9.gif]](tp11.txtgr9.gif)
![[Graphics:tp11.txtgr11.gif]](tp11.txtgr11.gif)