# Android - How to use Helmert Transformation to convert gps to screen XY on CUSTOM MAP

I have built an activity that takes a custom image that I use for a map and then knowing the gps at the top left and bottom right I plot a gps on top of the map. It works pretty good but I would like to get the accuracy up. I know its off because as I log the device location and plug it into the google map its actually more accurate than I am representing on my custom map.

So....being that I have the top left and bottom right gps of the map and have mapped them to the corresponding pixel coordinates how can I accurately plot the devices gps into pixels accurately using Helmert Transformation.

EDIT:

I am currently using this to plot the gps of the device to the screen.

``````public double getCurrentPixelY(Location upperLeft, Location lowerRight, Location current) {
double hypotenuse = upperLeft.distanceTo(current);
double bearing = upperLeft.bearingTo(current);
double currentDistanceY = Math.cos(bearing * Math.PI / OneEightyDeg) * hypotenuse;
//                           "percentage to mark the position"
double totalHypotenuse = upperLeft.distanceTo(lowerRight);
double totalDistanceY = totalHypotenuse * Math.cos(upperLeft.bearingTo(lowerRight) * Math.PI / OneEightyDeg);
double currentPixelY = currentDistanceY / totalDistanceY * ImageSizeH;

return currentPixelY;
}

public double getCurrentPixelX(Location upperLeft, Location lowerRight, Location current) {
double hypotenuse = upperLeft.distanceTo(current);
double bearing = upperLeft.bearingTo(current);
double currentDistanceX = Math.sin(bearing * Math.PI / OneEightyDeg) * hypotenuse;
//                           "percentage to mark the position"
double totalHypotenuse = upperLeft.distanceTo(lowerRight);
double totalDistanceX = totalHypotenuse * Math.sin(upperLeft.bearingTo(lowerRight) * Math.PI / OneEightyDeg);
double currentPixelX = currentDistanceX / totalDistanceX * ImageSizeW;

return currentPixelX;
}
``````

I know I need to make an adjustment in there somewhere but looking at the helmert transformation I cant figure where to start implementing it with my existing code.

EDIT:

After looking at some more stuff online I can see that using the great circle formula might help. Heres a link to what Im looking at implementing

http://introcs.cs.princeton.edu/java/12types/GreatCircle.java.html

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how many kilometers is the width of your image (aproximately) –  AlexWien Mar 19 at 23:04
The first one is 118.333 m and the second is about 757.962 m –  James andresakis Mar 19 at 23:11
Those are the distances I get from using the distance tool on google maps –  James andresakis Mar 19 at 23:12
for such short distances the greater circle does not help. Fir the helmert you need 3 points. –  AlexWien Mar 19 at 23:29
When you say three points do you mean three corners? I already have the device gps, the top left gps, and the bottom right gps. Also what about using the Haverside formula? –  James andresakis Mar 19 at 23:33
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Here is source code that calculates the helmert coefficients:

http://helmparms3d.sourceforge.net/

Maybe there is a simpler approach (there is also a so called 2d helmert transormation for small maps, like your picture)

Using that code you get the helmert coefficients, these coefficients is a 3x3 matrix. so you need code that is able to multiply a vector with a matrix.
The 3d graphic routines have such matrix multiplications.

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Thanks for the help. I think Im going to figure out how to use the 2d helmert transform. I guess I could use the 3d and ignore the z axis but I dont know what kind of results that would give me being that Im not to sure how i am going to implement the 2d version. –  James andresakis Mar 20 at 0:37
yes ihnore the z, set it to 0, that will work –  AlexWien Mar 20 at 0:40
Hey Alex that link you gave me is to executables and not source code. –  James andresakis Mar 20 at 17:01
@Jamesandresakis look at the page, there is a src section for access the src via subversion (svn) –  AlexWien Mar 21 at 11:05
Oh I knew that I was just testing to see if you were paying attention :p Thanks :) –  James andresakis Mar 21 at 17:34
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