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Little bit of a 2 parter. First of all im trying to do this in all c. First of all I'll go ahead and post my program

#include <stdio.h>
#include <stdlib.h>
#include <math.h>
#include <omp.h>
#include <string.h>

double f(double x);    
void Trap(double a, double b, int n, double* integral_p);

int main(int argc, char* argv[]) {

   double  integral=0.0;  //Integral Result
   double  a=6, b=10;   //Left and Right Points
   int    n;     //Number of Trapezoids (Higher=more accurate) 
   int degree;

  if (argc != 3) {
      printf("Error: Invalid Command Line arguements, format:./trapezoid N filename");
   n = atoi(argv[2]);

   FILE *fp = fopen( argv[1], "r" );

#  pragma omp parallel 
   Trap(a, b, n, &integral);
   printf("With n = %d trapezoids....\n", n);
   printf("of the integral from %f to %f = %.15e\n",a, b, integral);
   return 0;

double f(double x) {
   double return_val;
   return_val = pow(3.0*x,5)+pow(2.5*x,4)+pow(-1.5*x,3)+pow(0*x,2)+pow(1.7*x,1)+4;
   return return_val;
void Trap(double a, double b, int n, double* integral_p) {
   double  h, x, my_integral;
   double  local_a, local_b;
   int  i, local_n;
   int my_rank = omp_get_thread_num();
   int thread_count = omp_get_num_threads();

   h = (b-a)/n;
   local_n = n/thread_count;
   local_a = a + my_rank*local_n*h;
   local_b = local_a + local_n*h;
   my_integral = (f(local_a) + f(local_b))/2.0;
   for (i = 1; i <= local_n-1; i++) {
     x = local_a + i*h;
     my_integral += f(x);
   my_integral = my_integral*h;

#  pragma omp critical
   *integral_p += my_integral;

As you can see, it calculates trapezoidal rule given an interval. First of all it DOES work, if you hardcode the values and the function. But I need to read from a file in the format of

3.0 2.5 -1.5 0.0 1.7 4.0
6 10

Which means: It is of degree 5 (no more than 50 ever) 3.0x^5 +2.5x^4 −1.5x^3 +1.7x+4 is the polynomial (we skip ^2 since it's 0) and the Interval is from 6 to 10

My main concern is the f(x) function which I have hardcoded. I have NO IDEA how to make it take up to 50 besides literally typing out 50 POWS and reading in the values to see what they could be.......Anyone else have any ideas perhaps?

Also what would be the best way to read in the file? fgetc? Im not really sure when it comes to reading in C input (especially since everything i read in is an INT, is there some way to convert them?)

share|improve this question
up vote 3 down vote accepted

For a large degree polynomial, would something like this work?

double f(double x, double coeff[], int nCoeff)
    double return_val = 0.0;
    int exponent = nCoeff-1;

    int i;
    for(i=0; i<nCoeff-1; ++i, --exponent)
        return_val = pow(coeff[i]*x, exponent) + return_val;
    /* add on the final constant, 4, in our example */
    return return_val + coeff[nCoeff-1];  

In your example, you would call it like:

    double coefficients[] = {3.0, 2.5, -1.5, 0, 1.7, 4};
    /* This expresses 3x^5 + 2.5x^4 + (-1.5x)^3 + 0x^2 + 1.7x + 4 */
    my_integral = f(x, coefficients, 6);

By passing an array of coefficients (the exponents are assumed), you don't have to deal with variadic arguments. The hardest part is constructing the array, and that is pretty simple.

It should go without saying, if you put the coefficients array and number-of-coefficients into global variables, then the signature of f(x) doesn't need to change:

double f(double x)
   // access glbl_coeff and glbl_NumOfCoeffs, instead of parameters
share|improve this answer
+1 Beat me to it. – chrisaycock Nov 29 '10 at 20:00
Hmmm this prolly seems like the best way, i re-call f(x) in the Trapezoid Function however, would this be a problem? I would just need to readjust the f(x) in that function as well I guess – user475353 Nov 29 '10 at 20:01
Really good answer but for homework are we supposed to actually provide complete code like you did? My take is maybe not. I dunno. – jim mcnamara Nov 29 '10 at 20:05
It's a small task but regardless I agree it is a very good answer. – user475353 Nov 29 '10 at 20:10
NOTE: I left the function as you wrote it. However, my understanding of this type of polynomial is that it should be done as: 3.0 * pow(x, 5), and NOT pow(3.0*x, 5). These expressions are NOT equivalent. You should double-check which one is appropriate for you. – abelenky Nov 29 '10 at 20:21

For you f() function consider making it variadic (varargs is another name)

This way you could pass the function 1 arg telling it how many "pows" you want, with each susequent argument being a double value. Is this what you are asking for with the f() function part of your question?

share|improve this answer
This doesn't address his issue of reading from config file. – chrisaycock Nov 29 '10 at 19:59
You are correct - I answered 1 out 2 questions. This is homework, I can't just post code. – jim mcnamara Nov 29 '10 at 20:01
No, I mean, this doesn't even solve his problem with f() because variadic function arguments must be known at compile time, like f(3, a, b, c). Since he's reading from a config file, the list of arguments can't be supplied at compile time. – chrisaycock Nov 29 '10 at 20:07

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