![[Graphics:Images/BigOMod_gr_75.gif]](../Images/BigOMod_gr_75.gif){kind=small}
and
its derivatives ![[Graphics:Images/BigOMod_gr_76.gif]](../Images/BigOMod_gr_76.gif){kind=small}
are
all continuous on ![[Graphics:Images/BigOMod_gr_77.gif]](../Images/BigOMod_gr_77.gif){kind=small}
. If both ![[Graphics:Images/BigOMod_gr_78.gif]](../Images/BigOMod_gr_78.gif){kind=small}
and ![[Graphics:Images/BigOMod_gr_79.gif]](../Images/BigOMod_gr_79.gif){kind=small}
lie
in the interval ![[Graphics:Images/BigOMod_gr_80.gif]](../Images/BigOMod_gr_80.gif){kind=small}
, and ![[Graphics:Images/BigOMod_gr_81.gif]](../Images/BigOMod_gr_81.gif){kind=small}
then ![[Graphics:Images/BigOMod_gr_82.gif]](../Images/BigOMod_gr_82.gif){kind=small}
, is the n-th degree Taylor polynomial expansion of
![[Graphics:Images/BigOMod_gr_83.gif]](../Images/BigOMod_gr_83.gif){kind=small}
about ![[Graphics:Images/BigOMod_gr_84.gif]](../Images/BigOMod_gr_84.gif){kind=small}
. The
Taylor polynomial of degree n is![[Graphics:Images/BigOMod_gr_85.gif]](../Images/BigOMod_gr_85.gif){kind=small}
and
![[Graphics:Images/BigOMod_gr_86.gif]](../Images/BigOMod_gr_86.gif){kind=small}
.The integral form of the remainder is
![[Graphics:Images/BigOMod_gr_87.gif]](../Images/BigOMod_gr_87.gif){kind=small}
,and Lagrange's formula for the remainder is
![[Graphics:Images/BigOMod_gr_88.gif]](../Images/BigOMod_gr_88.gif){kind=small}
![[Graphics:Images/BigOMod_gr_89.gif]](../Images/BigOMod_gr_89.gif){kind=small}
![[Graphics:Images/BigOMod_gr_90.gif]](../Images/BigOMod_gr_90.gif){kind=small}
where
![[Graphics:Images/BigOMod_gr_91.gif]](../Images/BigOMod_gr_91.gif){kind=small}
depends on ![[Graphics:Images/BigOMod_gr_92.gif]](../Images/BigOMod_gr_92.gif){kind=small}
and lies somewhere between ![[Graphics:Images/BigOMod_gr_93.gif]](../Images/BigOMod_gr_93.gif){kind=small}
. ![[Graphics:../Images/BigOMod_gr_94.gif]](../Images/BigOMod_gr_94.gif)
![[Graphics:../Images/BigOMod_gr_95.gif]](../Images/BigOMod_gr_95.gif)