2019年3月17日 星期日

C語言例題1-9 已知六點的座標值 使用牛頓內插法求差除表?

C語言例題1-9 已知六點的座標值 使用牛頓內插法求差除表?

已知6點座標
n=6
x        f(x)
=============
0.0      -6.0
0.1      -5.89483
0.3      -5.65014
0.6      -5.17788
1.0      -4.28172
1.1      -3.99583
=============     

源自於 https://www.geeksforgeeks.org/newtons-divided-difference-interpolation-formula/

Newton’s Divided Difference Interpolation Formula

Interpolation is an estimation of a value within two known values in a sequence of values.
Newton’s divided difference interpolation formula is a interpolation technique used when the interval difference is not same for all sequence of values.
Suppose f(x0), f(x1), f(x2)………f(xn) be the (n+1) values of the function y=f(x) corresponding to the arguments x=x0, x1, x2…xn, where interval differences are not same
Then the first divided difference is given by
 f[x_0, x_1]=\frac{f(x_1)-f(x_0)}{x_1-x_0} 
The second divided difference is given by
 f[x_0, x_1, x_2]=\frac{f[x_1, x_2]-f[x_0, x_1]}{x_2-x_0} 
and so on…
Divided differences are symmetric with respect to the arguments i.e independent of the order of arguments.
so, 
f[x0, x1]=f[x1, x0]
f[x0, x1, x2]=f[x2, x1, x0]=f[x1, x2, x0]

By using first divided difference, second divided difference as so on .A table is formed which is called the divided difference table.
Divided difference table:
NEWTON’S DIVIDED DIFFERENCE INTERPOLATION FORMULA

 f(x)=f(x_0)+f[x_0, x_1]+(x-x_0)(x-x_1)f[x_0, x_1, x_2]+..........................+(x-x_0)(x-x_1)...(x-x_k)f[x_0, x_1, x_2...x_k]

Examples:
Input : Value at 7
       
Output :
      
      Value at 7 is 13.47
程式
// CPP program for implementing 
// Newton divided difference formula 
#include <stdio.h>

  
// Function to find the product term 
double proterm(int i, float value, float x[]) 
{ 
    double pro = 1; 
    for (int j = 0; j < i; j++) { 
        pro = pro * (value - x[j]); 
    } 
    return pro; 
} 
  
// Function for calculating 
// divided difference table 
void dividedDiffTable(float x[], float y[][10], int n) 
{ 
    for (int i = 1; i < n; i++) { 
        for (int j = 0; j < n - i; j++) { 
            y[j][i] = (y[j][i - 1] - y[j + 1] 
                         [i - 1]) / (x[j] - x[i + j]); 
        } 
    } 
} 
  
// Function for applying Newton's 
// divided difference formula 
double applyFormula(float value, float x[], 
                   float y[][10], int n) 
{ 
    double sum = y[0][0]; 
  
    for (int i = 1; i < n; i++) { 
      sum = sum + (proterm(i, value, x) * y[0][i]); 
    } 
    return sum; 
} 
  
// Function for displaying  
// divided difference table 
void printDiffTable(float y[][10],int n) 
{ 
    for (int i = 0; i < n; i++) { 
        for (int j = 0; j < n - i; j++) { 
            printf("    %0.4lf\t", y[i][j]); 
        } 
        printf("\n"); 
    } 
} 
  
// Driver Function 
int main() 
{ 
    // number of inputs given 
    int n = 6; 
    float value, sum, y[10][10]; 
    float x[] = { 0.0 , 0.1 , 0.3 ,0.6 , 1.0  , 1.1 }; 
  
    // y[][] is used for divided difference 
    // table where y[][0] is used for input 
    // -6.0 ,  -5.89483   ,-5.65014  ,-5.17788 ,-4.28172  ,-3.99583 
    y[0][0] = -6.0; 
    y[1][0] = -5.89483; 
    y[2][0] = -5.65014; 
    y[3][0] = -5.17788;
    y[4][0] = -4.28172;
    y[5][0] = -3.99583;
    
  
    // calculating divided difference table 
    dividedDiffTable(x, y, n); 
  
    // displaying divided difference table 
    printDiffTable(y,n); 
  
    // value to be interpolated 
    value = 0.2; 
    double result = applyFormula(value, x, y, n);
    // printing the value 
    printf("\nValue at %.2lf  is %.5lf ",value , result); 
    return 0; 
}
輸出結果
   -6.0000     1.0517     0.5725     0.2150     0.0630     0.0141 
    -5.8948     1.2235     0.7015     0.2780     0.0786 
    -5.6501     1.5742     0.9517     0.3566 
    -5.1779     2.2404     1.2370 
    -4.2817     2.8589 
    -3.9958 

Value at 0.20  is -5.77860      

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