# Calculate the volume from a sequence of points in N^2

Given a sequence of `(integer, integer)` points, say `(p1, ..., pn)`, which define the lines `(p_i, p_i+1)` for `1 <= i < n`, plus the line `(p_n, p_1)`. The resulting lines have the additional property that they don't intersect pairwise. What would be the best way to calculate the resulting volume?

-
Just to clarify: You are asking for an algorithm to calculate the area of a 2D polygon, right? Have you looked at the relevant Wikipedia article? –  thiton Dec 5 '11 at 15:13
Duplicate of stackoverflow.com/questions/451426/…. –  Per Dec 5 '11 at 15:32
@thiton thanks for pointing to the right direction. –  Jo So Dec 5 '11 at 16:22

Here is a nice code blurb with explanations as to why it works: http://alienryderflex.com/polygon_area/

``````//  Public-domain function by Darel Rex Finley, 2006.

double polygonArea(double *X, double *Y, int points) {

double  area=0. ;
int     i, j=points-1  ;

for (i=0; i<points; i++) {
area+=(X[j]+X[i])*(Y[j]-Y[i]); j=i; }

return area*.5; }
``````

You should also read the previous incarnation of this question: How do I calculate the surface area of a 2d polygon?

-