University of Florida/Egm6341/s10.team2.niki/HW2

Problem 1[edit | edit source]

Statement[edit | edit source]

Using the following equations find the expressions for ${\boldsymbol {c_{i}}}$ in terms of ${\boldsymbol {x_{i}}}$ and ${\boldsymbol {f(x_{i})}}$ where i=0,1,2

$\displaystyle {\boldsymbol {f_{2}(x)=p_{2}(x)=c_{2}x^{2}+c_{1}x+c_{0}}}$

(1 p8-3)

$\displaystyle {\boldsymbol {p_{2}(x)=\sum _{i=0}^{2}(l_{i}(x)f(x_{i}))}}$

(3 p8-3)

Solution[edit | edit source]

We have the general formula for the Lagrange basis function ${\boldsymbol {l_{i}(x)}}$ as

$\displaystyle {\boldsymbol {l_{i}(x)=\prod _{j=0;j\neq i}^{n}\left({\frac {x-x_{j}}{x_{i}-x_{j}}}\right)}}$

(2 p7-3)

for the case of Simple Simpson's Rule, n =2 i.e i=0,1,2. For the given interval $[a,b]$

${\boldsymbol {x_{0}=a}}$

${\boldsymbol {x_{2}=b}}$

${\boldsymbol {x_{1}={\frac {a+b}{2}}}}$

Expanding equation 3 p8-3 we get:

${\boldsymbol {p_{2}(x)=l_{0}(x)f(x_{0})+l_{1}(x)f(x_{1})+l_{2}(x)f(x_{2})}}$ where,

${\boldsymbol {l_{0}(x)=\left({\frac {x-x_{1}}{x_{0}-x_{1}}}\right)\left({\frac {x-x_{2}}{x_{0}-x_{2}}}\right)}}$ ;

${\boldsymbol {l_{1}(x)=\left({\frac {x-x_{0}}{x_{1}-x_{0}}}\right)\left({\frac {x-x_{2}}{x_{1}-x_{2}}}\right)}}$ ;

${\boldsymbol {l_{2}(x)=\left({\frac {x-x_{0}}{x_{2}-x_{0}}}\right)\left({\frac {x-x_{1}}{x_{2}-x_{1}}}\right)}}$

Thus we have the polynomial as ${\boldsymbol {p_{2}(x)=\left({\frac {x^{2}-(x_{2}+x_{1})x+(x_{1}x_{2})}{(x_{0}-x_{1})(x_{0}-x_{2}))}}\right)f(x_{0})+\left({\frac {x^{2}-(x_{2}+x_{0})x+(x_{0}x_{2})}{(x_{1}-x_{0})(x_{1}-x_{2}))}}\right)f(x_{1})+\left({\frac {x^{2}-(x_{0}+x_{1})x+(x_{1}x_{0})}{(x_{2}-x_{0})(x_{2}-x_{1}))}}\right)f(x_{2})}}$

Grouping coefficients of ${\boldsymbol {x^{2},x^{1},x^{0}}}$ , ${\boldsymbol {p_{2}(x)=\left\{{\frac {f(x_{0})}{(x_{0}-x_{1})(x_{0}-x_{2})}}+{\frac {f(x_{1})}{(x_{1}-x_{0})(x_{1}-x_{2})}}+{\frac {f(x_{2})}{(x_{2}-x_{0})(x_{2}-x_{1})}}\right\}x^{2}-\left\{{\frac {f(x_{0})[x_{2}+x_{1}]}{(x_{0}-x_{1})(x_{0}-x_{2})}}+{\frac {f(x_{1})[x_{2}+x_{0}]}{(x_{1}-x_{0})(x_{1}-x_{2})}}+{\frac {f(x_{2})[x_{1}+x_{0}]}{(x_{2}-x_{0})(x_{2}-x_{1})}}\right\}x+\left\{{\frac {f(x_{0})[x_{1}x_{2}]}{(x_{0}-x_{1})(x_{0}-x_{2})}}+{\frac {f(x_{1})[x_{0}x_{2}]}{(x_{1}-x_{0})(x_{1}-x_{2})}}+{\frac {f(x_{2})[x_{0}x_{1}]}{(x_{2}-x_{0})(x_{2}-x_{1})}}\right\}}}$

Comparing this equation with eqn 1p8-3 we see that

$\displaystyle {\boldsymbol {c_{2}=\left\{{\frac {f(x_{0})}{(x_{0}-x_{1})(x_{0}-x_{2})}}+{\frac {f(x_{1})}{(x_{1}-x_{0})(x_{1}-x_{2})}}+{\frac {f(x_{2})}{(x_{2}-x_{0})(x_{2}-x_{1})}}\right\}}}$

(1)

$\displaystyle {\boldsymbol {c_{1}=-\left\{{\frac {f(x_{0})[x_{2}+x_{1}]}{(x_{0}-x_{1})(x_{0}-x_{2})}}+{\frac {f(x_{1})[x_{2}+x_{0}]}{(x_{1}-x_{0})(x_{1}-x_{2})}}+{\frac {f(x_{2})[x_{1}+x_{0}]}{(x_{2}-x_{0})(x_{2}-x_{1})}}\right\}}}$

(2)

$\displaystyle {\boldsymbol {c_{0}=\left\{{\frac {f(x_{0})[x_{1}x_{2}]}{(x_{0}-x_{1})(x_{0}-x_{2})}}+{\frac {f(x_{1})[x_{0}x_{2}]}{(x_{1}-x_{0})(x_{1}-x_{2})}}+{\frac {f(x_{2})[x_{0}x_{1}]}{(x_{2}-x_{0})(x_{2}-x_{1})}}\right\}}}$

(3)

Problem 6[edit | edit source]

Statement[edit | edit source]

For the Lagrange Interpolation Error verify the following:

$\displaystyle {\boldsymbol {E^{(n+1)}(x)=f^{(n+1)}(x)-0}}$

(1)

Solution[edit | edit source]

We can write the Lagrange Interpolation error as

${\boldsymbol {E(x)=f(x)-f_{n}(x)}}$

differentiating the above expression once we get

${\boldsymbol {E^{1}(x)=f^{1}(x)-f_{n}^{1}(x)}}$

differentiating the expression (n+1) times we get

${\boldsymbol {E^{n+1}(x)=f^{n+1}(x)-f_{n}^{n+1}(x)}}$

But since ${\boldsymbol {f_{n}(x)}}$ is a polynomial of degree n the (n+1)th derivative is zero

$\displaystyle {\boldsymbol {E^{n+1}(x)=f^{n+1}(x)-0}}$

(1)

Problem 11:To show that Simpson's rule can be used to integrate a cubic polynomial exactly[edit | edit source]

Statement[edit | edit source]

Given the polynomial ${\boldsymbol {f_{3}(x)=P_{3}(x)=3+8x^{1}-2x^{2}+6x^{3}}}$ where ${\boldsymbol {x\epsilon \left[0,1\right]}}$ determine the exact integral ${\boldsymbol {I}}$ and the integral using Simpson's Rule ${\boldsymbol {I_{n}}}$