# How should I order these “helpful” scores?

Under the user generated posts on my site, I have an Amazon-like rating system:

``````   Was this review helpful to you: Yes | No
``````

If there are votes, I display the results above that line like so:

``````   5 of 8 people found this reply helpful.
``````

I would like to sort the posts based upon these rankings. If you were ranking from most helpful to least helpful, how would you order the following posts?

``````   a) 1/1 = 100% helpful
``````

Clearly, its not right to sort just on the percent helpful, somehow the total votes should be factored in. Is there a standard way of doing this?

UPDATE:

Using Charles' formulas to calculate the Agresti-Coull lower range and sorting on it, this is how the above examples would sort:

``````   1) 999/1000 (99.9%) = 95% likely to fall in 'helpfulness' range of 99.2% to 100%
2) 299/400 (74.8%) = 95% likely to fall in 'helpfulness' range of 69.6% to 79.3%
3) 3/4 (75%) = 95% likely to fall in 'helpfulness' range of 24.7% to 97.5%
4) 2/2 (100%) = 95% likely to fall in 'helpfulness' range of 23.7% to 100%
5) 1/1 (100%) = 95% likely to fall in 'helpfulness' range of 13.3% to 100%
``````

Intuitively, this feels right.

UPDATE 2:

From an application point of view, I don't want to be running these calculations every time I pull up a list of posts. I'm thinking I'll either update and store the Agresti-Coull lower bound either on a regular, cron-driven schedule (updating only those posts which have received a vote since the last run) or update it whenever a new vote is received.

-

For each post, generate bounds on how helpful you expect it to be. I prefer to use the Agresti-Coull interval. Pseudocode:

``````float AgrestiCoullLower(int n, int k) {
//float conf = 0.05;  // 95% confidence interval
float kappa = 2.24140273; // In general, kappa = ierfc(conf/2)*sqrt(2)
float kest=k+kappa^2/2;
float nest=n+kappa^2;
float pest=kest/nest;
}
``````

Then take the lower end of the estimate and sort on this. So the 2/2 is (by Agresti-Coull) 95% likely to fall in the 'helpfulness' range 23.7% to 100%, so it sorts below the 999/1000 which has range 99.2% to 100% (since .237 < .992).

Edit: Since some people seem to have found this helpful (ha ha), let me note that the algorithm can be tweaked based on how confident/risk-averse you want to be. The less confidence you need, the more willing you will be to abandon the 'proven' (high-vote) reviews for the untested but high-scoring reviews. A 90% confidence interval gives kappa = 1.95996398, an 85% confidence interval gives 1.78046434, a 75% confidence interval gives 1.53412054, and the all-caution-to-the-wind 50% confidence interval gives 1.15034938.

The 50% confidence interval gives

``````1) 999/1000 (99.7%) = 50% likely to fall in 'helpfulness' range of 99.7% to 100%
2) 299/400 (72.2%) = 50% likely to fall in 'helpfulness' range of 72.2% to 77.2%
3) 2/2 (54.9%) = 50% likely to fall in 'helpfulness' range of 54.9% to 100%
4) 3/4 (45.7%) = 50% likely to fall in 'helpfulness' range of 45.7% to 91.9%
5) 1/1 (37.5%) = 50% likely to fall in 'helpfulness' range of 37.5% to 100%
``````

which isn't that different overall, but it does prefer the 2/2 to the safety of the 3/4.

-
For ties (especially those at 0), I suggest breaking in favor of largest number of upvotes, then smallest number of downvotes. –  Charles Sep 20 '10 at 23:51
wow, Charles, this is hard core. very impressive. i'll run it on my examples and see how they sort (after i spend a few minutes educating myself on Agresti-Coull at wikipedia!) –  mitchf Sep 21 '10 at 0:25
Let me know how it goes. I can give more information and/or references as needed. –  Charles Sep 21 '10 at 3:16
+1 for this elegant solution (ordering by the lower end of the confidence interval). Just out of curiosity: how does the size of the interval behave for number of upvotes = 0 or = number of answers ? (the plain Binomial variance goes to zero in these cases) –  Andre Holzner Sep 21 '10 at 5:54
@Andre: Asymptotically, it decreases like 1/n, or rather C/n where C depends on the chosen confidence. –  Charles Sep 21 '10 at 16:09

This question is probably better asked on http://stats.stackexchange.com .

I guess you still want to order by increasing of 'helpfulness'.

If you want to know how precise a given number is, the simplest way is to use the square root of the variance of the Binomial distribution with `n` equal to the total number of responses and `p` the fraction of responses which were 'helpful'.

-
+1 for stats.stackexchange.com –  Thilo Sep 20 '10 at 6:43

A very simple solution would be to ignore everything with less than a cut-off amount of votes, and then sort by percentage.

For example (require at least five votes)

``````   1.  99.9% (1000 votes)
``````(x+z^2/2)/(n+z^2)    The midpoint of the Adjusted Wald Interval / Wilson Score