Russell (1961: 679):
[For Kant] an 'analytic' proposition is one in which the predicate is part of the subject; for instance, 'a tall man is a man', or 'an equilateral triangle is a triangle'. Such propositions follow from the law of contradiction; to maintain that a tall man is not a man would be self-contradictory.
Blogger Comment:
From the perspective of Systemic Functional Linguistic theory, these analytic propositions are statements of class membership, realised by attributive declarative clauses.
Carrier
|
Process
|
Attribute
|
a tall man
|
is
|
a man
|
an equilateral triangle
|
is
|
a triangle
|
Subject
|
Finite
|
Complement
|
Mood
|
Residue
|
|
That is:
- a tall man is a member of the class a man
- an equilateral triangle is a member of the class a triangle
Viewed at group rank:
a
|
tall
|
man
|
=
|
a
|
man
|
Deictic
|
Epithet
|
Thing
|
Deictic
|
Thing
|
an
|
equilateral
|
triangle
|
=
|
a
|
triangle
|
Deictic
|
Classifier
|
Thing
|
Deictic
|
Thing
|
That is:
- a sub-classified Thing is a member of the class Thing
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