Nymology :: Polynym Math

Equality

$$A \neq B$$

A is not equal to B

Subset

$$A \not\subseteq B$$

A is not a subset of or equal to B

Superset

$$A \not\supseteq B$$

A is not a superset of or equal to B

Intersection

$$A \cap B =$$

{ }

Union

$$A \cup B =$$

{ ambiguities, distortion, exploitative, fiction, hoarding, marketing, paradox, productive, receptive }

Symmetric Difference

$$A \ominus B =$$

{ ambiguities, distortion, exploitative, fiction, hoarding, marketing, paradox, productive, receptive }

Difference

$$A - B =$$

{ exploitative, hoarding, marketing, productive, receptive }

Difference

$$B - A =$$

{ ambiguities, distortion, fiction, paradox }

Cartesian Product

$$A \times B =$$

{ (exploitative, ambiguities),
(exploitative, distortion),
(exploitative, fiction),
(exploitative, paradox),
(hoarding, ambiguities),
(hoarding, distortion),
(hoarding, fiction),
(hoarding, paradox),
(marketing, ambiguities),
(marketing, distortion),
(marketing, fiction),
(marketing, paradox),
(productive, ambiguities),
(productive, distortion),
(productive, fiction),
(productive, paradox),
(receptive, ambiguities),
(receptive, distortion),
(receptive, fiction),
(receptive, paradox) }

Polynym Erich Fromm orientation Source Erich Fromm Area Psychology Mode type Depth 5 User scotty	vs.	Polynym Optical illusion Illusions Source Richard Gregory Area Cognition Mode type Depth 4 User dane
5 types of orientation	⊥	4 types of Illusions
receptive exploitative hoarding marketing productive	⊥	distortion ambiguities paradox fiction

Polynym Math

Porientation ⊥ PIllusions

Equality

Subset

Superset

Intersection

Union

Symmetric Difference

Difference

Difference

Cartesian Product

orientation

vs.

Illusions

⊥

⊥

P_orientation ⊥ P_Illusions