Sounds like you are looking for a best fit curve to draw in WPF. You would have to create a custom control to draw it, but a Bezier spline should work nicely for you if you can do the drawing. Here is a class I wrote that will allow you to generate a set of smooth points from a small set of seed points. Instantiate the object, set the SeedPoints property to a set of points, then call the GenerateSpline(int NumberPointsToGenerate) to get the points for a smooth curve. I generally use about 40 points to generate a really smooth curve.

```
/// <summary>
/// Class to generate a Bezier Curve from a set of seed points.
/// Note that this is a best fit curve through a set of points
/// and a Bezier does NOT require the curve to pass through the points.
/// </summary>
public class BezierSpline
{
/// <summary>
/// Default Constructor
/// </summary>
public BezierSpline()
{
SeedPoints = new List<PointF>();
}
/// <summary>
/// Constructs a BezierSpline object using SeedPoints
/// </summary>
/// <param name="seedPoints"></param>
public BezierSpline(IList<PointF> seedPoints)
: this()
{
SeedPoints = new List<PointF>(seedPoints);
}
/// <summary>
/// Set of SeedPoints to run the spline through
/// </summary>
public List<PointF> SeedPoints { get; set; }
/// <summary>
/// Generates a smooth curve through a series of points
/// </summary>
/// <param name="numberPointsToGenerate">Number of points to generate between P0 and Pn</param>
/// <returns>IList of Points along the curve</returns>
public IList<PointF> GenerateSpline(int numberPointsToGenerate)
{
List<double> ps = new List<double>();
List<PointF> np = new List<PointF>();
for (int i = 0; i < SeedPoints.Count; i++)
{
ps.Add(SeedPoints[i].X);
ps.Add(SeedPoints[i].Y);
}
double[] newpts = Bezier2D(ps.ToArray(), numberPointsToGenerate);
for (int i = 0; i < newpts.Length; i += 2)
np.Add(new PointF(newpts[i], newpts[i + 1], 0));
return np;
}
private double[] Bezier2D(double[] b, int cpts)
{
double[] p = new double[cpts * 2];
int npts = (b.Length) / 2;
int icount, jcount;
double step, t;
// Calculate points on curve
icount = 0;
t = 0;
step = (double)1 / (cpts - 1);
for (int i1 = 0; i1 < cpts; i1++)
{
if ((1.0 - t) < 5e-6)
t = 1.0;
jcount = 0;
p[icount] = 0.0;
p[icount + 1] = 0.0;
for (int i = 0; i != npts; i++)
{
double basis = Bernstein(npts - 1, i, t);
p[icount] += basis * b[jcount];
p[icount + 1] += basis * b[jcount + 1];
jcount += 2;
}
icount += 2;
t += step;
}
return p;
}
private double Ni(int n, int i)
{
return Factorial(n) / (Factorial(i) * Factorial(n - i));
}
/// <summary>
/// Bernstein basis formula
/// </summary>
/// <param name="n">n</param>
/// <param name="i">i</param>
/// <param name="t">t</param>
/// <returns>Bernstein basis</returns>
private double Bernstein(int n, int i, double t)
{
double basis;
double ti; /* t^i */
double tni; /* (1 - t)^i */
if (t == 0.0 && i == 0)
ti = 1.0;
else
ti = System.Math.Pow(t, i);
if (n == i && t == 1.0)
tni = 1.0;
else
tni = System.Math.Pow((1 - t), (n - i));
//Bernstein basis
basis = Ni(n, i) * ti * tni;
return basis;
}
/// <summary>
/// Gets a single y value for a given x value
/// </summary>
/// <param name="x">X value</param>
/// <returns>Y value at the given location</returns>
public PointF GetPointAlongSpline(double x)
{
return new PointF();
}
public static int Factorial(int n)
{
int f = 1;
for (int i = n; i > 1; i--)
f *= i;
return f;
}
}
```