Numerical Methods Formula Sheet

Numerical Methods – Reference Formula Sheet Newton-Raphson Method / Method of Tangents

Bisection Method / Intermediate Values Theorem

        +    

Method of False Position / Regular Falsi Method

               −  +              −             −−         ℎ ℎ                  ∆  − ∆  − − ∆  − − − ∆  − − − − ∆  − − − ∆                              =−                     �∆   ∆        ∆       ∆         ∆                     =         �∆      ∆       ∆       ∆     −         ≡     → −         → −        �∆     ∆         ∆       ℎ        −      − ℎ       −  − −          − +     ∗      −   +         ∗   −   +                                (

). (

) < ,S

.[

],

,

,

,

,

, (

=

)

(

). (

) < ,

Newton’s Gregory Forward Interpolation Method (Equally Spaced – Initial Area Interpolation)

( )=

+

(

+

)

(

+

!

)(

)

(

+

!

)(

)(

)

(

+

!

)(

)(

.[

],

,

,

=

)(

,

)

(

…+

!

,

=

=

)(

(

)

(

)

(

). ( =

Num. Integration – Trapezoidal Rule

)…(

(

+

)

(

+

+ )

(

+

)

+

(

+

+

( )

=

[ (

)+ (

)]

( )

=

{ (

)+ (

)} + {

+(

=

+

)

(

+

)

+

(

+

)

+

(

( )=

(

)

(

+

+

+

+

+

!

+

!

+

!

,

=

(

)

+

=

+

!

   � − +         − +             − +     �    − +             − +     � − +          − +  (

+

=

)

+

+

(

=

+

+

(

+

)

(

+

+

)(

+

)

+

)

)(

(

+

(

+

(

,

,

,

=

(

)

=

( )

 [ , ]

)

(

( )}

( )

)

 [ , ]

)

=

(

( )

+

)

)(

+

(

+

+ )(

+

=

Num. Integration – Simpson’s 1/3 Rule

+...

( )

)

|

( )| ,

(

( )

)

|

( )|

=

[ (

)+

(

{ (

)+ (

)+ (

)]

=

,

( )

=

,

=

( )

( )=

=

 [ , ]

   =−  =−    =−  =−                   −    =    =  −       −         ≡      → −          → −   

Derivative using Sterling or Central Difference Formula  (Equally Spaced – Centre Area Derivative) =

( )

,

)

+

Sterling or Central Difference Formula  (Equally Spaced – Centre Area Interpolation)

( )=

)

,

=

( )=

(

=

],

,

=

,

(

( )

)

+

=

,

.[

)

!

Derivative using Newton’s Gregory Forward Interpolation Method  (Equally Spaced – Initial Area Derivative) =

) < ,

(

( )

)

=

)

(

(

)

(

( )=

)

( )

)

(

)} + {

)

=

)

)} + {

(

(

(

( )

)

|

)}

( )

)

( )| , )| ,

(

( )

)

|

( )|

    ℎ          −      − ℎ   +  + +  + + +  + + + +  + + +                                                    =    =             �                                        =  −  −  − −        =                    �                            ≡      →         →      ′′  �                 ∏= ≠ −−  ∑=                                            −−       −−          −−    − −    −−                                             −      Newton’s Gregory Backward Interpolation Method (Equally Spaced – Last Area Interpolation)

( )=

+

+

(

)

+

!

(

)(

)

(

+

!

)(

)(

)

(

+

!

)(

)(

)(

,

= )

…+

!

=

(

Num. Integration – Simpson’s 3/8 Rule

)(

)…(

=

 ,

=

 ,

=

)

!

( )

=

[ (

)+

(

)+ (

)]

( )

=

( )

( )=

=

 [ , ]

Derivative using Newton’s Gregory Backward Interpolation Method (Equally Spaced – Last Area Derivative)

(

=

+

+

+

+

+

+

+

+

+

+

+

+

( )

=

{ (

)+ (

)

)} + {

(

(

=

+

+

+

+

+

+

+

( )

( )=

=

+

+

+

(

)

( )= (

)

( )+ (

)

( )+ (

(

( )=

Lagrange Interpolation Formula (Un-Equally Spaced Data)

=

)

=

( )

+

)

 &

( )+ (

)

(

)

)

( )+ (

)

( )+ (

)

( )… + (

)

( )

Newton’s Divided Difference Interpolation Formula  (Un-Equally Spaced Data, Preferred for finding Polynomial)

(

,

)=

( )= (

(

,

)+(

) (

,

 ,

,

)=

)+(

(

,

)(

)

(

,

)

) (

,

 ,

(

,

,

)+ (

,

,

)= )(

(

,

,

)(

)

(

,

,

)

) (

(

,

 ,

,

,

,

,

)…+ (

)=

(

)(

,

)

(

)… (

,

)

) (

 ,

,

…

)

(

)

(

)

)} + {

}

|

( )| ,

( )

( )

|

( )|