![[Graphics:Images/NumericalDiffFormulaeMod_gr_186.gif]](../Images/NumericalDiffFormulaeMod_gr_186.gif){kind=small}
, and
an even number of ![[Graphics:Images/NumericalDiffFormulaeMod_gr_187.gif]](../Images/NumericalDiffFormulaeMod_gr_187.gif){kind=small}
equations. Since we want to include the remainder terms,
we need to use series expansions of order ![[Graphics:Images/NumericalDiffFormulaeMod_gr_188.gif]](../Images/NumericalDiffFormulaeMod_gr_188.gif){kind=small}
. The
remainder term in these formulas all involve even powers
of h and even and odd derivatives depending on
the situation. Also, the subroutine requires a replacement
of the point where the remainder term is evaluated to be ![[Graphics:Images/NumericalDiffFormulaeMod_gr_189.gif]](../Images/NumericalDiffFormulaeMod_gr_189.gif){kind=small}
instead of ![[Graphics:Images/NumericalDiffFormulaeMod_gr_190.gif]](../Images/NumericalDiffFormulaeMod_gr_190.gif){kind=small}
. ![[Graphics:Images/NumericalDiffFormulaeMod_gr_191.gif]](../Images/NumericalDiffFormulaeMod_gr_191.gif)
![[Graphics:Images/NumericalDiffFormulaeMod_gr_192.gif]](../Images/NumericalDiffFormulaeMod_gr_192.gif){kind=small}
![[Graphics:Images/NumericalDiffFormulaeMod_gr_193.gif]](../Images/NumericalDiffFormulaeMod_gr_193.gif)
![[Graphics:../Images/NumericalDiffFormulaeMod_gr_194.gif]](../Images/NumericalDiffFormulaeMod_gr_194.gif){kind=small}
![[Graphics:../Images/NumericalDiffFormulaeMod_gr_195.gif]](../Images/NumericalDiffFormulaeMod_gr_195.gif)
![[Graphics:../Images/NumericalDiffFormulaeMod_gr_196.gif]](../Images/NumericalDiffFormulaeMod_gr_196.gif){kind=small}
![[Graphics:../Images/NumericalDiffFormulaeMod_gr_197.gif]](../Images/NumericalDiffFormulaeMod_gr_197.gif)