In many applications, we have some progress bar for a file download, for a compression task, for a search, etc. We all often use progress bars to let users know something is happening. And if we know some details like just how much work has been done and how much is left to do, we can even give a time estimate, often by extrapolating from how much time it's taken to get to the current progress level.

compression ETA screenshot
(source: jameslao.com)

But we've also seen programs which this Time Left "ETA" display is just comically bad. It claims a file copy will be done in 20 seconds, then one second later it says it's going to take 4 days, then it flickers again to be 20 minutes. It's not only unhelpful, it's confusing! The reason the ETA varies so much is that the progress rate itself can vary and the programmer's math can be overly sensitive.

Apple sidesteps this by just avoiding any accurate prediction and just giving vague estimates! Apple's vague evasion
(source: autodesk.com)

That's annoying too, do I have time for a quick break, or is my task going to be done in 2 more seconds? If the prediction is too fuzzy, it's pointless to make any prediction at all.

Easy but wrong methods

As a first pass ETA computation, probably we all just make a function like if p is the fractional percentage that's done already, and t is the time it's taken so far, we output t*(1-p)/p as the estimate of how long it's going to take to finish. This simple ratio works "OK" but it's also terrible especially at the end of computation. If your slow download speed keeps a copy slowly advancing happening overnight, and finally in the morning, something kicks in and the copy starts going at full speed at 100X faster, your ETA at 90% done may say "1 hour", and 10 seconds later you're at 95% and the ETA will say "30 minutes" which is clearly an embarassingly poor guess.. in this case "10 seconds" is a much, much, much better estimate.

When this happens you may think to change the computation to use recent speed, not average speed, to estimate ETA. You take the average download rate or completion rate over the last 10 seconds, and use that rate to project how long completion will be. That performs quite well in the previous overnight-download-which-sped-up-at-the-end example, since it will give very good final completion estimates at the end. But this still has big problems.. it causes your ETA to bounce wildly when your rate varies quickly over a short period of time, and you get the "done in 20 seconds, done in 2 hours, done in 2 seconds, done in 30 minutes" rapid display of programming shame.

The actual question:

What is the best way to compute an estimated time of completion of a task, given the time history of the computation? I am not looking for links to GUI toolkits or Qt libraries. I'm asking about the algorithm to generate the most sane and accurate completion time estimates.

Have you had success with math formulas? Some kind of averaging, maybe by using the mean of the rate over 10 seconds with the rate over 1 minute with the rate over 1 hour? Some kind of artificial filtering like "if my new estimate varies too much from the previous estimate, tone it down, don't let it bounce too much"? Some kind of fancy history analysis where you integrate progress versus time advancement to find standard deviation of rate to give statistical error metrics on completion?

What have you tried, and what works best?


11 Answers 11


Original Answer

The company that created this site apparently makes a scheduling system that answers this question in the context of employees writing code. The way it works is with Monte Carlo simulation of future based on the past.

Appendix: Explanation of Monte Carlo

This is how this algorithm would work in your situation:

You model your task as a sequence of microtasks, say 1000 of them. Suppose an hour later you completed 100 of them. Now you run the simulation for the remaining 900 steps by randomly selecting 90 completed microtasks, adding their times and multiplying by 10. Here you have an estimate; repeat N times and you have N estimates for the time remaining. Note the average between these estimates will be about 9 hours -- no surprises here. But by presenting the resulting distribution to the user you'll honestly communicate to him the odds, e.g. 'with the probability 90% this will take another 3-15 hours'

This algorithm, by definition, produces complete result if the task in question can be modeled as a bunch of independent, random microtasks. You can gain a better answer only if you know how the task deviates from this model: for example, installers typically have a download/unpacking/installing tasklist and the speed for one cannot predict the other.

Appendix: Simplifying Monte Carlo

I'm not a statistics guru, but I think if you look closer into the simulation in this method, it will always return a normal distribution as a sum of large number of independent random variables. Therefore, you don't need to perform it at all. In fact, you don't even need to store all the completed times, since you'll only need their sum and sum of their squares.

In maybe not very standard notation,

sigma = sqrt ( sum_of_times_squared-sum_of_times^2 )
scaling = 900/100          // that is (totalSteps - elapsedSteps) / elapsedSteps
lowerBound = sum_of_times*scaling - 3*sigma*sqrt(scaling)
upperBound = sum_of_times*scaling + 3*sigma*sqrt(scaling)

With this, you can output the message saying that the thing will end between [lowerBound, upperBound] from now with some fixed probability (should be about 95%, but I probably missed some constant factor).

  • 1
    This is a bootstrap estimate.
    – piccolbo
    Commented Oct 12, 2010 at 20:52
  • 2
    Can you clarify sum_of_times_squared and sum_of_times? Is sum_of_times_squared += time^2 ? If so, then surely sum_of_times_squared - sum_of_times^2 is negative?
    – RazerM
    Commented Jan 12, 2015 at 18:45
  • 1
    This is essentially the first of SPWorley's "easy but wrong" methods with Sigma estimation. By assuming the process to consist of many random and independent microtasks, it ascribes all variation in speed to noise with zero mean and estimates the actual speed as if it were constant. It works but poorly in cases when performance varies. I admit to using this primitive method myself (see my answer) and can say our clients will often laugh at my progress bar, which may start by reporting a growing ETA and then go down to zero at a double rate of two seconds per second. Commented Aug 29, 2017 at 22:31

Here's what I've found works well! For the first 50% of the task, you assume the rate is constant and extrapolate. The time prediction is very stable and doesn't bounce much.

Once you pass 50%, you switch computation strategy. You take the fraction of the job left to do (1-p), then look back in time in a history of your own progress, and find (by binary search and linear interpolation) how long it's taken you to do the last (1-p) percentage and use that as your time estimate completion.

So if you're now 71% done, you have 29% remaining. You look back in your history and find how long ago you were at (71-29=42%) completion. Report that time as your ETA.

This is naturally adaptive. If you have X amount of work to do, it looks only at the time it took to do the X amount of work. At the end when you're at 99% done, it's using only very fresh, very recent data for the estimate.

It's not perfect of course but it smoothly changes and is especially accurate at the very end when it's most useful.

  • This approach could indeed provide a good estimate. However, I don't like that it requires you to keep a history of all progress updates. This list could grow very large.
    – moi
    Commented Apr 27 at 5:50

Whilst all the examples are valid, for the specific case of 'time left to download', I thought it would be a good idea to look at existing open source projects to see what they do.

From what I can see, Mozilla Firefox is the best at estimating the time remaining.

Mozilla Firefox

Firefox keeps a track of the last estimate for time remaining, and by using this and the current estimate for time remaining, it performs a smoothing function on the time. See the ETA code here. This uses a 'speed' which is previously caculated here and is a smoothed average of the last 10 readings.

This is a little complex, so to paraphrase:

  • Take a smoothed average of the speed based 90% on the previous speed and 10% on the new speed.
  • With this smoothed average speed work out the estimated time remaining.
  • Use this estimated time remaining, and the previous estimated time remaining to created a new estimated time remaining (in order to avoid jumping)

Google Chrome

Chrome seems to jump about all over the place, and the code shows this.

One thing I do like with Chrome though is how they format time remaining. For > 1 hour it says '1 hrs left' For < 1 hour it says '59 mins left' For < 1 minute it says '52 secs left'

You can see how it's formatted here

DownThemAll! Manager

It doesn't use anything clever, meaning the ETA jumps about all over the place.

See the code here

pySmartDL (a python downloader)

Takes the average ETA of the last 30 ETA calculations. Sounds like a reasonable way to do it.

See the code here/blob/916f2592db326241a2bf4d8f2e0719c58b71e385/pySmartDL/pySmartDL.py#L651)


Gives a pretty good ETA in most cases (except when starting off, as might be expected).

Uses a smoothing factor over the past 5 readings, similar to Firefox but not quite as complex. Fundamentally similar to Gooli's answer.

See the code here


I usually use an Exponential Moving Average to compute the speed of an operation with a smoothing factor of say 0.1 and use that to compute the remaining time. This way all the measured speeds have influence on the current speed, but recent measurements have much more effect than those in the distant past.

In code it would look something like this:

alpha = 0.1 # smoothing factor
speed = (speed * (1 - alpha)) + (currentSpeed * alpha)

If your tasks are uniform in size, currentSpeed would simply be the time it took to execute the last task. If the tasks have different sizes and you know that one task is supposed to be i,e, twice as long as another, you can divide the time it took to execute the task by its relative size to get the current speed. Using speed you can compute the remaining time by multiplying it by the total size of the remaining tasks (or just by their number if the tasks are uniform).

Hopefully my explanation is clear enough, it's a bit late in the day.

  • 1
    Something along these lines is a good idea. But it likely could cause big problems if your update ticks are irregularly spaced. Perhaps make the "alpha" smoothing factor be a function of the time since the last update, like alpha=exp(-C*TimeSinceLastUpdate))? And maybe C should vary itself based on percentage of competion?
    – SPWorley
    Commented Jun 7, 2009 at 20:34
  • @Enerccio: speed starts at 0. Commented Dec 14, 2018 at 16:57

In certain instances, when you need to perform the same task on a regular basis, it might be a good idea of using past completion times to average against.

For example, I have an application that loads the iTunes library via its COM interface. The size of a given iTunes library generally do not increase dramatically from launch-to-launch in terms of the number of items, so in this example it might be possible to track the last three load times and load rates and then average against that and compute your current ETA.

This would be hugely more accurate than an instantaneous measurement and probably more consistent as well.

However, this method depends upon the size of the task being relatively similar to the previous ones, so this would not work for a decompressing method or something else where any given byte stream is the data to be crunched.

Just my $0.02


First off, it helps to generate a running moving average. This weights more recent events more heavily.

To do this, keep a bunch of samples around (circular buffer or list), each a pair of progress and time. Keep the most recent N seconds of samples. Then generate a weighted average of the samples:

totalProgress += (curSample.progress - prevSample.progress) * scaleFactor
totalTime += (curSample.time - prevSample.time) * scaleFactor

where scaleFactor goes linearly from 0...1 as an inverse function of time in the past (thus weighing more recent samples more heavily). You can play around with this weighting, of course.

At the end, you can get the average rate of change:

 averageProgressRate = (totalProgress / totalTime);

You can use this to figure out the ETA by dividing the remaining progress by this number.

However, while this gives you a good trending number, you have one other issue - jitter. If, due to natural variations, your rate of progress moves around a bit (it's noisy) - e.g. maybe you're using this to estimate file downloads - you'll notice that the noise can easily cause your ETA to jump around, especially if it's pretty far in the future (several minutes or more).

To avoid jitter from affecting your ETA too much, you want this average rate of change number to respond slowly to updates. One way to approach this is to keep around a cached value of averageProgressRate, and instead of instantly updating it to the trending number you've just calculated, you simulate it as a heavy physical object with mass, applying a simulated 'force' to slowly move it towards the trending number. With mass, it has a bit of inertia and is less likely to be affected by jitter.

Here's a rough sample:

// desiredAverageProgressRate is computed from the weighted average above
// m_averageProgressRate is a member variable also in progress units/sec
// lastTimeElapsed = the time delta in seconds (since last simulation) 
// m_averageSpeed is a member variable in units/sec, used to hold the 
// the velocity of m_averageProgressRate

const float frictionCoeff = 0.75f;
const float mass = 4.0f;
const float maxSpeedCoeff = 0.25f;

// lose 25% of our speed per sec, simulating friction
m_averageSeekSpeed *= pow(frictionCoeff, lastTimeElapsed); 

float delta = desiredAvgProgressRate - m_averageProgressRate;

// update the velocity
float oldSpeed = m_averageSeekSpeed;
float accel = delta / mass;    
m_averageSeekSpeed += accel * lastTimeElapsed;  // v += at

// clamp the top speed to 25% of our current value
float sign = (m_averageSeekSpeed > 0.0f ? 1.0f : -1.0f);
float maxVal = m_averageProgressRate * maxSpeedCoeff;
if (fabs(m_averageSeekSpeed) > maxVal)
 m_averageSeekSpeed = sign * maxVal;

// make sure they have the same sign
if ((m_averageSeekSpeed > 0.0f) == (delta > 0.0f))
 float adjust = (oldSpeed + m_averageSeekSpeed) * 0.5f * lastTimeElapsed;

 // don't overshoot.
 if (fabs(adjust) > fabs(delta))
    adjust = delta;
            // apply damping
    m_averageSeekSpeed *= 0.25f;

 m_averageProgressRate += adjust;

Your question is a good one. If the problem can be broken up into discrete units having an accurate calculation often works best. Unfortunately this may not be the case even if you are installing 50 components each one might be 2% but one of them can be massive. One thing that I have had moderate success with is to clock the cpu and disk and give a decent estimate based on observational data. Knowing that certain check points are really point x allows you some opportunity to correct for environment factors (network, disk activity, CPU load). However this solution is not general in nature due to its reliance on observational data. Using ancillary data such as rpm file size helped me make my progress bars more accurate but they are never bullet proof.


Uniform averaging

The simplest approach would be to predict the remaining time linearly:

t_rem := t_spent ( n - prog ) / prog

where t_rem is the predicted ETA, t_spent is the time elapsed since the commencement of the operation, prog the number of microtasks completed out of their full quantity n. To explain—n may be the number of rows in a table to process or the number of files to copy.

This method having no parameters, one need not worry about the fine-tuning of the exponent of attenuation. The trade-off is poor adaptation to a changing progress rate because all samples have equal contribution to the estimate, whereas it is only meet that recent samples should be have more weight that old ones, which leads us to

Exponential smoothing of rate

in which the standard technique is to estimate progress rate by averaging previous point measurements:

rate := 1 / (n * dt); { rate equals normalized progress per unit time }
if prog = 1 then      { if first microtask just completed }
    rate_est := rate; { initialize the estimate }
    weight   := Exp( - dt / DECAY_T );
    rate_est := rate_est * weight + rate * (1.0 - weight);
t_rem := (1.0 - prog / n) / rate_est;

where dt denotes the duration of the last completed microtask and is equal to the time passed since the previous progress update. Notice that weight is not a constant and must be adjusted according the length of time during which a certain rate was observed, because the longer we observed a certain speed the higher the exponential decay of the previous measurements. The constant DECAY_T denotes the length of time during which the weight of a sample decreases by a factor of e. SPWorley himself suggested a similar modification to gooli's proposal, although he applied it to the wrong term. An exponential average for equidistant measurements is:

Avg_e(n) = Avg_e(n-1) * alpha + m_n * (1 - alpha)

but what if the samples are not equidistant, as is the case with times in a typical progress bar? Take into account that alpha above is but an empirical quotient whose true value is:

alpha = Exp( - lambda * dt ),

where lambda is the parameter of the exponential window and dt the amount of change since the previous sample, which need not be time, but any linear and additive parameter. alpha is constant for equidistant measurements but varies with dt.

Mark that this method relies on a predefined time constant and is not scalable in time. In other words, if the exactly same process be uniformly slowed-down by a constant factor, this rate-based filter will become proportionally more sensitive to signal variations because at every step weight will be decreased. If we, however, desire a smoothing independent of the time scale, we should consider

Exponential smoothing of slowness

which is essentially the smoothing of rate turned upside down with the added simplification of a constant weight of because prog is growing by equidistant increments:

slowness := n * dt;   { slowness is the amount of time per unity progress }
if prog = 1 then      { if first microtask just completed }
    slowness_est := slowness; { initialize the estimate }
    weight       := Exp( - 1 / (n * DECAY_P ) );
    slowness_est := slowness_est * weight + slowness * (1.0 - weight);
t_rem := (1.0 - prog / n) * slowness_est;

The dimensionless constant DECAY_P denotes the normalized progress difference between two samples of which the weights are in the ratio of one to e. In other words, this constant determines the width of the smoothing window in progress domain, rather than in time domain. This technique is therefore independent of the time scale and has a constant spatial resolution.

Futher research: adaptive exponential smoothing

You are now equipped to try the various algorithms of adaptive exponential smoothing. Only remember to apply it to slowness rather than to rate.

  • That's the "easy"/"wrong"/"OK" method mentioned in the question. I simplified the formula and it works best for me. The downvotes were over a difference of opinion on what constitutes "smart"/"sane"/"accurate". If my link varies randomly, i prefer my simple method. Commented Jul 14, 2017 at 12:48
  • @SPWorley, answer expanded. Commented Aug 30, 2017 at 21:59
  • Exponential smoothing of slowness worked much better for me than the Monte Carlo approach did. This is quite an undervoted answer in my opinion. Kudos.
    – HericDenis
    Commented Oct 5, 2023 at 18:22
  • 1
    @HericDenis Glad to hear that. Your comment has reminded me that I have developed an improved version of my algorithm, and I will publish here as time permits—stay tuned! As to the Monte Carlo method, it is just a fancy name for a very simple extrapolation. I don't think anything simpler is actually possible. Commented Oct 9, 2023 at 20:58
  • @AntonShepelev great! Please do let me know in the comments if you get around to updating your answer. I don't think I'll get a notification otherwise. Thanks!
    – HericDenis
    Commented Oct 11, 2023 at 12:45

I always wish these things would tell me a range. If it said, "This task will most likely be done in between 8 min and 30 minutes," then I have some idea of what kind of break to take. If it's bouncing all over the place, I'm tempted to watch it until it settles down, which is a big waste of time.

  • That is possible through the estimation of the standard deviation of the progress rate Commented Feb 4, 2017 at 12:13

I have tried and simplified your "easy"/"wrong"/"OK" formula and it works best for me:

t / p - t

In Python:

>>> done=0.3; duration=10; "time left: %i" % (duration / done - duration)
'time left: 23'

That saves one op compared to (dur*(1-done)/done). And, in the edge case you describe, possibly ignoring the dialog for 30 minutes extra hardly matters after waiting all night.

Comparing this simple method to the one used by Transmission, I found it to be up to 72% more accurate.

  • Not very helpful. That algorithm would cause the 'time left' value bounce about all over the place
    – Patrick
    Commented Jan 15, 2015 at 21:13
  • @Patrick It's better than the suggested formula with "OK" results, and gets more accurate over time. If you prefer recent rates the estimation will bounce more, and smoothing is hiding the truth. Commented Jul 14, 2017 at 13:15

I don't sweat it, it's a very small part of an application. I tell them what's going on, and let them go do something else.

  • 2
    You gotta point man, except when this is what the customer is paying you for :) Commented Nov 2, 2011 at 2:36

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