Trying to grasp a basic concept of how distancing with ibeacon (beacon/ bluetooth-le/ble) can work. Is there any true documentation on how far exactly an ibeacon can measure. Lets say I am 300 feet it possible for an ibeacon to detect this?

up vote 207 down vote accepted

The distance estimate provided by iOS is based on the ratio of the iBeacon signal strength (rssi) over the calibrated transmitter power (txPower). The txPower is the known measured signal strength in rssi at 1 meter away. Each iBeacon must be calibrated with this txPower value to allow accurate distance estimates.

When we were building the Android iBeacon library we had to come up with our own independent algorithm because the iOS CoreLocation source code is not available. We measured a bunch of rssi measurements at known distances, then did a best fit curve to match our data points. The algorithm we came up with is shown below as Java code.

Note that the term "accuracy" here is iOS speak for distance in meters. This formula isn't perfect, but it roughly approximates what iOS does.

protected static double calculateAccuracy(int txPower, double rssi) {
  if (rssi == 0) {
    return -1.0; // if we cannot determine accuracy, return -1.

  double ratio = rssi*1.0/txPower;
  if (ratio < 1.0) {
    return Math.pow(ratio,10);
  else {
    double accuracy =  (0.89976)*Math.pow(ratio,7.7095) + 0.111;    
    return accuracy;

Note: The values 0.89976, 7.7095 and 0.111 are the three constants calculated when solving for a best fit curve to our measured data points. YMMV

  • 4
    Great answer and code David. Where does the txPower value come from? Is it a calibration value done on the client (receiving) side? Or is it a metric you can get from a beacon? – rmooney Jan 6 '14 at 19:06
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    what are the 0.89976, 7.7095 and 0.111 values for? – malhal Mar 6 '14 at 17:58
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    With this equation I end up with 84457991114.574738 when the beacon is laying on 1/4 from my phone. – jdog Apr 10 '14 at 17:24
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    Eddystone is a 0 m reference point, yrs. The division vs. Subtraction is because we are not using a logarithmic function in this case. Subtracting did not work for the curve fit we used. – davidgyoung Apr 11 '16 at 20:29
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    @davidgyoung can you please share best curve fit formula or anything through which we can find out these 3 values for our device? – Paresh Mayani May 5 '16 at 13:35

I'm very thoroughly investigating the matter of accuracy/rssi/proximity with iBeacons and I really really think that all the resources in the Internet (blogs, posts in StackOverflow) get it wrong.

davidgyoung (accepted answer, > 100 upvotes) says:

Note that the term "accuracy" here is iOS speak for distance in meters.

Actually, most people say this but I have no idea why! Documentation makes it very very clear that CLBeacon.proximity:

Indicates the one sigma horizontal accuracy in meters. Use this property to differentiate between beacons with the same proximity value. Do not use it to identify a precise location for the beacon. Accuracy values may fluctuate due to RF interference.

Let me repeat: one sigma accuracy in meters. All 10 top pages in google on the subject has term "one sigma" only in quotation from docs, but none of them analyses the term, which is core to understand this.

Very important is to explain what is actually one sigma accuracy. Following URLs to start with:,

In physical world, when you make some measurement, you always get different results (because of noise, distortion, etc) and very often results form Gaussian distribution. There are two main parameters describing Gaussian curve:

  1. mean (which is easy to understand, it's value for which peak of the curve occurs).
  2. standard deviation, which says how wide or narrow the curve is. The narrower curve, the better accuracy, because all results are close to each other. If curve is wide and not steep, then it means that measurements of the same phenomenon differ very much from each other, so measurement has a bad quality.

one sigma is another way to describe how narrow/wide is gaussian curve.
It simply says that if mean of measurement is X, and one sigma is σ, then 68% of all measurements will be between X - σ and X + σ.

Example. We measure distance and get a gaussian distribution as a result. The mean is 10m. If σ is 4m, then it means that 68% of measurements were between 6m and 14m.

When we measure distance with beacons, we get RSSI and 1-meter calibration value, which allow us to measure distance in meters. But every measurement gives different values, which form gaussian curve. And one sigma (and accuracy) is accuracy of the measurement, not distance!

It may be misleading, because when we move beacon further away, one sigma actually increases because signal is worse. But with different beacon power-levels we can get totally different accuracy values without actually changing distance. The higher power, the less error.

There is a blog post which thoroughly analyses the matter:

Author has a hypothesis that accuracy is actually distance. He claims that beacons from are faulty beacuse when he increased power to the max value, accuracy value was very small for 1, 5 and even 15 meters. Before increasing power, accuracy was quite close to the distance values. I personally think that it's correct, because the higher power level, the less impact of interference. And it's strange why Estimote beacons don't behave this way.

I'm not saying I'm 100% right, but apart from being iOS developer I have degree in wireless electronics and I think that we shouldn't ignore "one sigma" term from docs and I would like to start discussion about it.

It may be possible that Apple's algorithm for accuracy just collects recent measurements and analyses the gaussian distribution of them. And that's how it sets accuracy. I wouldn't exclude possibility that they use info form accelerometer to detect whether user is moving (and how fast) in order to reset the previous distribution distance values because they have certainly changed.

  • Excellent intro to "sigma" correlation. Also it would be odd for a geek (even an Apple geek) to use the variable name "accuracy" when they meant "distance". Every RSSI "distance" or "location" determination comes with a "margin of error" (e.g., you are here +/- this much). So it makes sense their library would have both a function for "distance" and a function for "accuracy". – Jesse Chisholm Dec 23 '15 at 14:25
  • @r00dY a brilliant explanation I must say. Now, just a question if you can help. I have a callibration data for beacon measured at 1m, 2m ... 15m,... 20m and so on. I have the average distance values for each distance. Now, from the location manager delegate when we get beacon data like beacon major, minor,rssi,etc is it advisable to use the distance obtained from the above calibration that I explained? Please suggest, any help would be appreciated. Thanks in Advance. – Alkesh Fudani Mar 24 '17 at 11:00
  • Apple's accuracy is a function of both rssi and tx power. It's not entirely impossible that Estimote decided to reverse engineer the accuracy function and began providing tx power values such that reading accuracy estimates the distance. This provides a simpler developer experience for estimating distance, but breaks Apple's definition of accuracy. Other brands might stay more true to Apple's definition of accuracy and actually provide a "1 meter estimate" rather than a reverse-engineered value that makes accuracy estimate distance. – Senseful Jul 29 at 3:19

The iBeacon output power is measured (calibrated) at a distance of 1 meter. Let's suppose that this is -59 dBm (just an example). The iBeacon will include this number as part of its LE advertisment.

The listening device (iPhone, etc), will measure the RSSI of the device. Let's suppose, for example, that this is, say, -72 dBm.

Since these numbers are in dBm, the ratio of the power is actually the difference in dB. So:

ratio_dB = txCalibratedPower - RSSI

To convert that into a linear ratio, we use the standard formula for dB:

ratio_linear = 10 ^ (ratio_dB / 10)

If we assume conservation of energy, then the signal strength must fall off as 1/r^2. So:

power = power_at_1_meter / r^2. Solving for r, we get:

r = sqrt(ratio_linear)

In Javascript, the code would look like this:

function getRange(txCalibratedPower, rssi) {
    var ratio_db = txCalibratedPower - rssi;
    var ratio_linear = Math.pow(10, ratio_db / 10);

    var r = Math.sqrt(ratio_linear);
    return r;

Note, that, if you're inside a steel building, then perhaps there will be internal reflections that make the signal decay slower than 1/r^2. If the signal passes through a human body (water) then the signal will be attenuated. It's very likely that the antenna doesn't have equal gain in all directions. Metal objects in the room may create strange interference patterns. Etc, etc... YMMV.

  • out of curiosity: how does ratio_dB = txCalibratedPower - RSSI work out? Since both measures are in dBm, I would assume the outcome to be in dBm as well? – BlackWolf Jun 9 '15 at 15:04
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    @BlackWolf, this because dB is logarithmic and log(x/y)=log(x)-log(y)... – nxpnsv Jan 12 '16 at 9:23

iBeacon uses Bluetooth Low Energy(LE) to keep aware of locations, and the distance/range of Bluetooth LE is 160ft (

Distances to the source of iBeacon-formatted advertisement packets are estimated from the signal path attenuation calculated by comparing the measured received signal strength to the claimed transmit power which the transmitter is supposed to encode in the advertising data.

A path loss based scheme like this is only approximate and is subject to variation with things like antenna angles, intervening objects, and presumably a noisy RF environment. In comparison, systems really designed for distance measurement (GPS, Radar, etc) rely on precise measurements of propagation time, in same cases even examining the phase of the signal.

As Jiaru points out, 160 ft is probably beyond the intended range, but that doesn't necessarily mean that a packet will never get through, only that one shouldn't expect it to work at that distance.

It's possible, but it depends on the power output of the beacon you're receiving, other rf sources nearby, obstacles and other environmental factors. Best thing to do is try it out in the environment you're interested in.

With multiple phones and beacons at the same location, it's going to be difficult to measure proximity with any high degree of accuracy. Try using the Android "b and l bluetooth le scanner" app, to visualize the signal strengths (distance) variations, for multiple beacons, and you'll quickly discover that complex, adaptive algorithms may be required to provide any form of consistent proximity measurement.

You're going to see lots of solutions simply instructing the user to "please hold your phone here", to reduce customer frustration.

protected by Community Dec 18 '17 at 14:33

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