I´m trying to implement a method that fits a line to a set of points in 2D. I wrote the following code that reads the data from two Array (X, Y coordinate) and should calculate the parameters of the best fitting line with the least squares method. I used the formulas given here: mathworld.wolfram

```
- (void) linearRegressionOfUserAcceleration
{
double avgX = [[_accelBufferX valueForKeyPath:@"@avg.doubleValue"] doubleValue];
double avgY = [[_accelBufferY valueForKeyPath:@"@avg.doubleValue"] doubleValue];
int n = _accelBufferX.count;
double ssX, ssY, ssXY;
ssX = ssY = ssXY = 0;
int i;
// Sum of squares X, Y & X*Y
for (i = 0; i < n; i++)
{
ssX += pow([[_accelBufferX objectAtIndex:i] doubleValue],2);
ssY += pow([[_accelBufferY objectAtIndex:i] doubleValue],2);
ssXY += [[_accelBufferX objectAtIndex:i] doubleValue] * [[_accelBufferY objectAtIndex:i] doubleValue];
}
ssX = ssX - n * pow(avgX,2);
ssY = ssY - n * pow(avgY,2);
ssXY = ssXY - n * avgX * avgY;
// Best fit of line y_i = a + b * x_i
b = ssXY / ssX;
a = avgY - b * avgX;
// Correlationcoefficent gives the quality of the estimate: 1 = perfect to 0 = no fit
corCoeff = pow(ssXY,2) / ssX * ssY;
NSLog(@"n: %d, a: %f --- b: %f --- cor: %f --- avgX: %f --- avgY: %f --- ssX: %f - ssY: %f - ssXY: %f", n, a, b, corCoeff, avgX, avgY, ssX, ssY, ssXY);
}
```

I get outputs like this:

```
n: 15, a: -0.095204 --- b: 0.929245 --- cor: 3.567163 --- avgX: -0.017827 -- avgY: -0.111770 --- ssX: 2.176048 - ssY: 1.898429 - ssXY: 2.022081
```

The resulting line does not fit the data at all and although the corelationCoefficient is sometimes bigger than one, which IMHO should never happen if everything works correctly.

Does anyone see any errors in my implementation?

**- EDIT -**

This is the corrected code, following the tip from CRD. I used this to extract the direction vector of the sampled userAcceleration in the horizontal plane between two steps, to get the step direction.

This worked for me:

```
- (void) linearRegressionOfUserAcceleration
{
NSUInteger n = _accelBufferX.count;
double ax, ay, sX, sY, ssX, ssY, ssXY, avgX, avgY;
// Sum of squares X, Y & X*Y
for (NSUInteger i = 0; i < n; i++)
{
@synchronized(self) {
ax = [[_accelBufferX objectAtIndex:i] doubleValue];
ay = [[_accelBufferY objectAtIndex:i] doubleValue];
}
sX += ax;
sY += ay;
ssX += ax * ax;
ssY += ay * ay;
ssXY += ax * ay;
}
avgX = sX / n;
avgY = sY / n;
radius = hypot(avgX, avgY);
ssX = ssX - n * (avgX * avgX);
ssY = ssY - n * (avgY * avgY);
ssXY = ssXY - n * avgX * avgY;
// Best fit of line y_i = a + b * x_i
b = ssXY / ssX;
a = (avgY - b * avgX);
theta = atan2(1, b);
// Correlationcoefficent gives the quality of the estimate: 1 = perfect to 0 = no fit
corCoeff = (ssXY * ssXY) / (ssX * ssY);
NSLog(@"n: %d, a: %f --- b: %f --- cor: %f --- avgX: %f -- avgY: %f --- ssX: %f - ssY: %f - ssXY: %f", n, a, b, corCoeff, avgX, avgY, ssX, ssY, ssXY);
}
```

`double ssX, ssY, ssXY;`

syntax, but`ssX = ssY = ssXY = 0;`

is new for me :) – Anne Jun 3 '12 at 9:24