Received: from [192.168.123.254] (port=37250 helo=jukni.digitalkingdom.org) by stodi.digitalkingdom.org with smtp (Exim 4.92) (envelope-from ) id 1hIzKk-00032D-D5 for jbovlaste-admin@lojban.org; Tue, 23 Apr 2019 10:35:57 -0700 Received: by jukni.digitalkingdom.org (sSMTP sendmail emulation); Tue, 23 Apr 2019 10:35:54 -0700 From: "Apache" To: curtis289@att.net Reply-To: webmaster@lojban.org Subject: [jvsw] Definition Edited At Word vendaia -- By krtisfranks Date: Tue, 23 Apr 2019 10:35:54 -0700 MIME-Version: 1.0 Content-Type: text/plain; charset="UTF-8" Message-Id: X-Spam-Score: -2.9 (--) X-Spam_score: -2.9 X-Spam_score_int: -28 X-Spam_bar: -- In jbovlaste, the user krtisfranks has edited a definition of "vendaia" in the language "English". Differences: 5,5c5,5 < The Venn diagram of two sets A and B has exactly four regions/parts which would qualify for valid submissions to $x_1$ (when $x_2$ = Set(A,B)), namely: A-B, B-A, A-intersect-B, and the complement of A-union-B; under the previous assumptions, these would respectively have $x_3 =$ A, B, Set(A,B), and the empty set (again, RESPECTIVELY). --- > The Venn diagram of exactly two sets $A$ and $B$ has exactly four regions/parts which would qualify for valid submissions to $x_1$ (when $x_2$ = Set($A,B$)), namely: $A-B$, $B-A$, $A$-intersect-$B$, and the complement of $A$-union-$B$; for the first two options, see "{kei'i}"; under the previous assumptions, these would respectively have $x_3 = A$, $B$, Set($A,B$), and the empty set (again, RESPECTIVELY). Old Data: Definition: $x_1$ (set) is the unique region/part in the Venn diagram of sets $x_2$ (set of sets; exhaustive) such that each of its (i.e.: $x_1$'s) members is a member of exactly each of the explicitly-mentioned elements of $x_3$ (set of sets; subset of $x_2$; exhaustive) and of no other elements of $x_2$. Notes: The Venn diagram of two sets A and B has exactly four regions/parts which would qualify for valid submissions to $x_1$ (when $x_2$ = Set(A,B)), namely: A-B, B-A, A-intersect-B, and the complement of A-union-B; under the previous assumptions, these would respectively have $x_3 =$ A, B, Set(A,B), and the empty set (again, RESPECTIVELY). Jargon: Gloss Keywords: Word: Venn diagram, In Sense: Word: Venn diagram part, In Sense: Word: Venn diagram region, In Sense: Place Keywords: New Data: Definition: $x_1$ (set) is the unique region/part in the Venn diagram of sets $x_2$ (set of sets; exhaustive) such that each of its (i.e.: $x_1$'s) members is a member of exactly each of the explicitly-mentioned elements of $x_3$ (set of sets; subset of $x_2$; exhaustive) and of no other elements of $x_2$. Notes: The Venn diagram of exactly two sets $A$ and $B$ has exactly four regions/parts which would qualify for valid submissions to $x_1$ (when $x_2$ = Set($A,B$)), namely: $A-B$, $B-A$, $A$-intersect-$B$, and the complement of $A$-union-$B$; for the first two options, see "{kei'i}"; under the previous assumptions, these would respectively have $x_3 = A$, $B$, Set($A,B$), and the empty set (again, RESPECTIVELY). Jargon: Gloss Keywords: Word: Venn diagram, In Sense: Word: Venn diagram part, In Sense: Word: Venn diagram region, In Sense: Place Keywords: You can go to to see it.