# Combine Gyroscope and Accelerometer Data

I am building a balancing robot using the Lego Mindstorm's NXT system. I am using two sensors from HiTechnic, the first being an Accelerometer and the second being a Gyroscope. I've successfully filtered out noise from both sensors and derived angles for both in a range between -90 and 90 degrees, with 0 degrees being perfectly balanced.

My next challenge is to combine both of the sensor values to correct for the Gyroscope's drift over time. Below is an example graph I created from actual data to demonstrate the drift from the gyroscope:

The most commonly used approach I've seen to make combining these sensors rock solid is by using a Kalman filter. However, I'm not an expert in calculus and I really don't understand mathematical symbols, I do understand math in source code though.

I'm using RobotC (which is like any other C derivative) and would really appreciate if someone can give me examples of how to accomplish this in C.

SOLUTION RESULTS:

Alright, kersny solved my problem by introducing me to complementary filters. This is a graph illustrating my results:

Result #1

Result #2

As you can see, the filter corrects for gyroscopic drift and combines both signals into a single smooth signal.

Edit: Since I was fixing the broken images anyways, I thought it would be fun to show the rig I used to generate this data:

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your data is clearly diverging. the kalman filter or any other method won't help you if your initial data doesnt agree. –  ldog Oct 19 '09 at 20:53
I'm not sure you fully understand what the graph is displaying, it's a known problem of Gyroscopic data to drift. They is why the data is diverging, which is what the filter/integration I'm looking for will correct using the accelerometers data. Also, the reason for the radical drift, is because I shook the sensors pretty violiently to illustrate my problem. :) –  Dylan Vester Oct 20 '09 at 14:42
I have no idea what you are graphing because you did not label the axis's but regardless if your data is clearly diverging from the same y-values given the same x-values it is pretty bad data. –  ldog Oct 20 '09 at 16:49
if you apply any filter to it as is that tries to minimize error in the least squares sense (what the kalman filter does for example) your going to be averaging an error that increases as your values of x increase. Clearly one part of your data is telling you something and a different part of your data is telling you something else. –  ldog Oct 20 '09 at 16:51
A great alternative to the Kalman filter is the complementary filter which is much easier to implement: http://www.pieter-jan.com/node/11 –  Pieter-Jan May 16 '13 at 9:00

Kalman Filters are great and all, but I find the Complementary Filter much easier to implement with similar results. The best articles that I have found for coding a Complementary Filter are this wiki (along with this article about converting sensors to Engineering units) and a PDF in the zip file on this page (Under Technical Documentation, I believe the file name in the zip is filter.pdf);

PS. If your stuck on a Kalman Filter, here is some C-syntax code for the Arduino that implements it.

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FANTASTIC, I believe this may be exactly what I was looking for. The Filter.pdf file was really the big help, and explained and solved my exact problem. I haven't verified it yet (I'm at work). But tonight, I'll try and get this going and mark my question as answered! –  Dylan Vester Oct 19 '09 at 20:09
Glad I could help! If you want to see an example of it in action, check out my blog at ohscope.com. I built a Segway like balancing scooter, and I will be putting up more data soon. –  kersny Oct 19 '09 at 20:44
The wiki link appears to be dead –  Jon Drnek Jun 18 '11 at 15:14
–  Edward Falk Jun 16 '12 at 0:15

This seems like a great explanation; it does use some maths symbols though. It concludes with an implementation of a Kalman filter in Matlab; perhaps you find that more palatable.

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Thank you for your reply. I've looked through the link you sent me, while it does a good job at explaining a Kalman filter, it doesn't describe how to combine two sensor values into one, which is what I really need. –  Dylan Vester Oct 19 '09 at 16:05