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Tag Archives: Definition of What It Is to Be Two Existents
Ontological Arithmetic. The Second Foot in the Door
Greetings. In the immediately previous post, the “Ontological Arithmetic. One Realistic Foot in the Door of the Philosophy of Mathematics” of September 24, 2020, I said that in the present post I would “spell out how one can prove, demonstrate, … Continue reading
Posted in Philosophy of Mathematics
Tagged After Aristotle, Arithmetic, Definition of What It Is to Be Four Existents, Definition of What It Is to Be One Existent, Definition of What It Is to Be Three Existents, Definition of What It Is to Be Two Existents, Ontological Arithmetic, Ontology, Philosophy of Mathematics, Proof That Any Existent Is One Existent, Proof That One Existent Plus One Existent Are Two Existents, Proof That Two Existents Plus One Existent Are Three Existents, Proof That Two Existents Plus Two Existents Are Four Existents, Richard. E. Hennessey
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Ontological Arithmetic. One Realistic Foot in the Door of the Philosophy of Mathematics
The aim of the present post is three-fold. I wish first to draw attention to the ontological theory of identity, i.e., of existents as identical with existents, and three quite basic principles of the theory. I then wish to then … Continue reading
Posted in Philosophy of Mathematics
Tagged After Aristotle, Apodicticism in Philosophy of Mathematics, Arithmetic, Definition of What It Is to Be Four Existents, Definition of What It Is to Be One Existent, Definition of What It Is to Be Three Existents, Definition of What It Is to Be Two Existents, Identity, Ontological Arithmetic, Philosophy of Mathematics, Reflexivity of Identity, Richard Hennessey, Symmetry of Identity, Transitivity of Identity
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After Aristotle 