Mean Point Estimate Information Content Entity parent missing

[alanruttenberg]

The term Ratio Measurement Information Content Entity is defined as

A Ratio Measurement Information Content Entity that is a measurement of a set of values and is equal to the sum of all the values in the set divided by the total number of values in the set.

There is a class Ratio Measurement Information Content Entity however this class is neither the asserted parent or an inferred parent.

Ratio Measurement Information Content Entity is equivalent to ('is a ratio measurement of' some entity) so that axiom could be added to Mean Point Estimate Information Content Entity so that the reasoner classifies it properly. Or, if it's a cut and paste error then the superclass could be corrected.

[rorudn]

I think you meant "A Mean Point Estimate Information Content Entity is defined as"

The current definition does incorrectly mention Ratio Measurement Information Content Entity as the parent class. This will be changed to mention Point Estimate Information Content Entity instead.

[swartik]

This is an opportunity to address definitions of the siblings of Mean Point Estimate Information Content Entity, which are also problematic:

• Mode Point Estimate Information Content Entity says its parent is Nominal Measurement Information Content Entity.
• The definition of Median Point Estimate Information Content Entity doesn't follow the "A parent that ..." paradigm.

[mark-jensen]

These are fixed on a branch and shall be part of the next release.

Median = A Point Estimate Information Content Entity that is a measurement of a set of values and is equal to either the middle value or the average of the two values which separate the set into two equally populated upper and lower sets.

Mode = A Point Estimate Information Content Entity that is a measurement of a set of values and is equal to the values(s) that occur most often in the set.

Mean = A Point Estimate Information Content Entity that is a measurement of a set of values and is equal to the sum of all the values in the set divided by the total number of values in the set.