# Understanding the Pearson Correlation Coefficient

As part of the calculations to generate a Pearson Correlation Coefficient, the following computation is performed:

In the second formula: `p_a,i` is the predicted rating user a would give item `i`, `n` is the number of similar users being compared to, and `ru,i` is the rating of item `i` by user `u`.

What value will be used if user `u` has not rated this item? Did I misunderstand anything here?

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According to the link, earlier calculations in step 1 of the algorithm are over a set of items, indexed 1 to `m`, whe `m` is the total number of items in common.

Step 3 of the algorithm specifies: "To find a rating prediction for a particular user for a particular item, first select a number of users with the highest, weighted similarity scores with respect to the current user that have rated on the item in question."

These calculations are performed only on the intersection of different users set of rated items. There will be no calculations performed when a user has not rated an item.

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Thanks for edit the question :) –  user691223 Jun 7 '11 at 18:28
@user691223: No problem. Hope I got it right. –  Greg Jun 7 '11 at 18:30
So it means that the task of selecting a number of users with highest, weighted similarity scores(neighbors)... must be repeated k times where k = total number of items in DB - number of rated items by user u? –  user691223 Jun 7 '11 at 18:31

It only makes sense to calculate results if both users have rated a movie. Linear regression can be visualised as a method of finding a straight line through a two-dimensional graph where one variable is plotted on the X axis and another one - on Y axis. Each combination of ratings is represented as a point on an euclidean plane [u1_rating, u2_rating]. Since you can not plot points which only have one dimension to them, you'll have to discard those cases.

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