A monary operation... is an irreversible arithmetical change. From some view point which I wish to expose, these operations are not ideal but cognitively, biologicaly or physicaly real and there may be considered several types and many kinds of monary operations. Some examples are:
Subitate-it is when perceiving I is 1, but when perceiving II is 2, and when perceiving III is 3. It may be considered a fourth case that IIII is 4, nevertheless, either II is 2 or III is 3 or IIII is 4 may be a limit for this type of monary operation.
Count-it is, for example, when being conscious of IIIII as is 1 and is 1 and is 1 and is 1 and is 1 or .I.I.I.I.I or 5; another example, may be, when being conscious of IIIIIII as .I.I.I.I.I.I.I or 7.
Add-it is, for example, being conscious of .I.I or counting 2 more or +2 in 3+2, 5+2, 120+2 and similar other. This is a different kind of monary operation than counting 3 more or +3 in 2+3, 5+3, 120+3 and similar other. Adding 2 or +2 is a kind of monary operation, and adding 3 or +3 is another kind of monary operation. So, notice that in this view of monary operations it happens that despite of 2+3 and 3+2 being the same binary operation, there are in them two kinds of monary addition. In 2+3 we are operating with the +3 monary operation, but in 3+2 is with the +2 monary operation that we are operating.
Subitate-it is when perceiving I is 1, but when perceiving II is 2, and when perceiving III is 3. It may be considered a fourth case that IIII is 4, nevertheless, either II is 2 or III is 3 or IIII is 4 may be a limit for this type of monary operation.
Count-it is, for example, when being conscious of IIIII as is 1 and is 1 and is 1 and is 1 and is 1 or .I.I.I.I.I or 5; another example, may be, when being conscious of IIIIIII as .I.I.I.I.I.I.I or 7.
Add-it is, for example, being conscious of .I.I or counting 2 more or +2 in 3+2, 5+2, 120+2 and similar other. This is a different kind of monary operation than counting 3 more or +3 in 2+3, 5+3, 120+3 and similar other. Adding 2 or +2 is a kind of monary operation, and adding 3 or +3 is another kind of monary operation. So, notice that in this view of monary operations it happens that despite of 2+3 and 3+2 being the same binary operation, there are in them two kinds of monary addition. In 2+3 we are operating with the +3 monary operation, but in 3+2 is with the +2 monary operation that we are operating.
