area and perimeter calculation of various shapes

Area of a circle, rectangle, triangle, trapezoid, parallelogram, ellipse, sector.
Perimeter of a rectangle, square

Is there a java library which provides mathematical functions to calculate the above?

-
Mathematical functions? Are you saying you need a library for these? –  duffymo Dec 18 '10 at 19:15
These should be trivial to implement and you don't need a special library for that –  dimitrisli Dec 18 '10 at 19:16
I am looking for a library –  Jason Dec 18 '10 at 19:17
@dimitrisli - I just added more shapes to the question, I would love to use a library if one is available –  Jason Dec 18 '10 at 19:19
If you truly want "all shapes", you'd be better off with a general purpose contour integration routine that used polynomial or piecewise representations of 2D shapes. –  duffymo Dec 18 '10 at 19:29

public double areaOfRectangle(double width, double length) {
return width*height;
}
}
public double areaOfTriangle(double a, double b, double c) {
double s = (a+b+c)/2;
return Math.sqrt(s * (s-a) * (s-b) * (s-c));
}

etc.

How hard can it be to code up yourself? Do you really need a library to do it for you?

You could also port this C code which implements area and perimeter calculations for many shapes.

-
I just added more shapes to the question, I would love to use a library if one is available. –  Jason Dec 18 '10 at 19:21
marcog, your code needs some work. your areaOfRectangle parameters don't match the values; there's no Math.pi, but there is Math.PI. And you can't be serious about porting to C. It's still not necessary. –  duffymo Dec 18 '10 at 19:28
@duffymo Agreed, it's totally unnecessary but I saw it in a quick google and thought it's worth a mention in passing. –  marcog Dec 18 '10 at 19:32
Well apparently it's not completely non-trivial, as your areaOfTriangle method returns the wrong value :). TBH, I too would like to see an answer which includes an actual library (and not just "Do it yourself!"), at the very least in the spirit of Don't Repeat Yourself. Surely some graphics library out there has already done this? –  BlueRaja - Danny Pflughoeft Dec 18 '10 at 21:57

I would not recommend that you use a library for such a thing. Just look up the formulas for each one and write the single line of code that each requires.

Sounds like somebody's classic first object-oriented assignment:

package geometry;

public interface Shape
{
double perimeter();
double area();
}

class Rectangle implements Shape
{
private double width;
private double height;

Rectangle(double w, double h)
{
this.width = w;
this.height = h;
}

public double perimeter()
{
return 2.0*(this.width + this.height);
}

public double area()
{
return this.width*this.height;
}
}

// You get the idea - same for Triangle, Circle, Square with formula changes.
-
Quite right! Looks like the goal is in understanding inheritance rather than geometry. –  Costis Aivalis Dec 18 '10 at 19:21
+1 for bringing the inheritance in the picture. classic example –  Goran Jovic Dec 18 '10 at 19:26
Until one tries to make Square inherit Rectangle, and then, the world collapses... –  Alexandre C. Dec 18 '10 at 19:48
Exactly right, Alexandre C. The Liskov Substitution Principle goes right to hell: objectmentor.com/resources/articles/lsp.pdf –  duffymo Dec 18 '10 at 19:55
yeah, this is pretty much classical material, but it always rings a bell when I see class Rectangle : public Shape –  Alexandre C. Dec 18 '10 at 19:57

The only non trivial formula you asked for is the perimeter of an ellipse.

You'll need either complete elliptical integrals (google for that), or numerical integration, or approximate formulas (basically, the "Infinite Series 2" is the one you should use)

-
It requires nothing of the sort. You generalize the equation for a circle pirr into piab where a and b are the semiaxis lengths. –  Victor Liu Dec 21 '10 at 1:20
@Victor: I talk about the perimeter, not the area. –  Alexandre C. Dec 21 '10 at 9:51

For the general case you could get an close estimate with a Monte Carlo method. You need a good random number generator. Take a rectangle large enough to contain the Shape and get a large number of random points in the rectangle. For each, use contains(double x, double y) to see if the point is in the Shape or not. The ratio of points in the Shape to all points in the rectangle, times the area of the rectangle is an estimate of the Shape area.

-