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Subject: [jvsw] Definition Edited At Word praperi -- By krtisfranks
Date: Sun, 22 Oct 2017 00:40:47 -0700
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 Content preview:  In jbovlaste, the user krtisfranks has edited a definition
    of "praperi" in the language "English". Differences: 2,2c2,2 < $x_1$ is a
    strict/proper sub-$x_2$ [structure] in/of $x_3$; $x_2$ is a structure and
    $x_1$ and $x_3$ are both examples of that structure $x_2$ such that $x_1$
    is entirely contained within $x_3$ (where containment is defined according
    to the standard/characteristics/definition of $x_2$; but in any case, no
   member/part/element that belongs to $x_1$ does not also belong to $x_3$) but
    there is some member/part/element of $x_3$ that does not belong to $x_1$
   in the same way. --- > $x_1$ is a strict/proper sub-$x_2$ [structure] in/of
    $x_3$; $x_2$ is a structure and $x_1$ and $x_3$ are both examples of that
    structure $x_2$ such that $x_1$ is entirely contained within $x_3$ (where
    containment is defined according to the standard/characteristics/definition
    of $x_2$; but in any case, no member/part/element that belongs to $x_1$ does
    not also belong to $x_3, but there is some member/part/element of $x_3$ that
    does not belong to $x_1$ in the same way). 5,5c5,5 < If x2 is a (sub)set,
    then x1 is a proper subset of x3; if x2 is a mathematical/algebraic (sub)group,
    then x1 is a proper subgroup of x3; etc. Can also be used for describing
   proper sub-lakes (such as Lake Michigan), proper super-selma'o, and other
   non-mathmetical usages. x3 is a proper super-x2 of/with x1. Biological taxa,
    if comparable, are usually/hypothetically proper. See also: {klesi}, {cmeta}.
    --- > If x2 is a (sub)set, then x1 is a proper subset of x3; if x2 is a mathematical/algebraic
    (sub)group, then x1 is a proper subgroup of x3; etc. Can also be used for
    describing proper sub-lakes (such as Lake Michigan), proper super-selma'o,
    and other non-mathmetical usages. x3 is a proper super-x2 of/with x1. Biological
    taxa, if comparable, are usually/hypothetically proper. See also: {klesi},
    {enklesi}, {cletu}, {cmeta}. [...] 
 
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In jbovlaste, the user krtisfranks has edited a
definition of "praperi" in the language "English".

Differences:

2,2c2,2
< 		$x_1$ is a strict/proper sub-$x_2$ [structure] in/of $x_3$; $x_2$ is a structure and $x_1$ and $x_3$ are both examples of that structure $x_2$ such that $x_1$ is entirely contained within $x_3$ (where containment is defined according to the standard/characteristics/definition of $x_2$; but in any case, no member/part/element that belongs to $x_1$ does not also belong to $x_3$) but there is some member/part/element of $x_3$ that does not belong to $x_1$ in the same way.
---
> 		$x_1$ is a strict/proper sub-$x_2$ [structure] in/of $x_3$; $x_2$ is a structure and $x_1$ and $x_3$ are both examples of that structure $x_2$ such that $x_1$ is entirely contained within $x_3$ (where containment is defined according to the standard/characteristics/definition of $x_2$; but in any case, no member/part/element that belongs to $x_1$ does not also belong to $x_3, but there is some member/part/element of $x_3$ that does not belong to $x_1$ in the same way).
5,5c5,5
< 		If x2 is a (sub)set, then x1 is a proper subset of x3; if x2 is a mathematical/algebraic (sub)group, then x1 is a proper subgroup of x3; etc. Can also be used for describing proper sub-lakes (such as Lake Michigan), proper super-selma'o, and other non-mathmetical usages. x3 is a proper super-x2 of/with x1. Biological taxa, if comparable, are usually/hypothetically proper. See also: {klesi}, {cmeta}.
---
> 		If x2 is a (sub)set, then x1 is a proper subset of x3; if x2 is a mathematical/algebraic (sub)group, then x1 is a proper subgroup of x3; etc. Can also be used for describing proper sub-lakes (such as Lake Michigan), proper super-selma'o, and other non-mathmetical usages. x3 is a proper super-x2 of/with x1. Biological taxa, if comparable, are usually/hypothetically proper. See also: {klesi}, {enklesi}, {cletu}, {cmeta}.


Old Data:

	Definition:
		$x_1$ is a strict/proper sub-$x_2$ [structure] in/of $x_3$; $x_2$ is a structure and $x_1$ and $x_3$ are both examples of that structure $x_2$ such that $x_1$ is entirely contained within $x_3$ (where containment is defined according to the standard/characteristics/definition of $x_2$; but in any case, no member/part/element that belongs to $x_1$ does not also belong to $x_3$) but there is some member/part/element of $x_3$ that does not belong to $x_1$ in the same way.

	Notes:
		If x2 is a (sub)set, then x1 is a proper subset of x3; if x2 is a mathematical/algebraic (sub)group, then x1 is a proper subgroup of x3; etc. Can also be used for describing proper sub-lakes (such as Lake Michigan), proper super-selma'o, and other non-mathmetical usages. x3 is a proper super-x2 of/with x1. Biological taxa, if comparable, are usually/hypothetically proper. See also: {klesi}, {cmeta}.

	Jargon:
		Mathematics, but possible in laic speak

	Gloss Keywords:
		Word: proper substructure, In Sense: 
		Word: strictly-sub-structure, In Sense: 
		Word: strict substructure, In Sense: 

	Place Keywords:



New Data:

	Definition:
		$x_1$ is a strict/proper sub-$x_2$ [structure] in/of $x_3$; $x_2$ is a structure and $x_1$ and $x_3$ are both examples of that structure $x_2$ such that $x_1$ is entirely contained within $x_3$ (where containment is defined according to the standard/characteristics/definition of $x_2$; but in any case, no member/part/element that belongs to $x_1$ does not also belong to $x_3, but there is some member/part/element of $x_3$ that does not belong to $x_1$ in the same way).

	Notes:
		If x2 is a (sub)set, then x1 is a proper subset of x3; if x2 is a mathematical/algebraic (sub)group, then x1 is a proper subgroup of x3; etc. Can also be used for describing proper sub-lakes (such as Lake Michigan), proper super-selma'o, and other non-mathmetical usages. x3 is a proper super-x2 of/with x1. Biological taxa, if comparable, are usually/hypothetically proper. See also: {klesi}, {enklesi}, {cletu}, {cmeta}.

	Jargon:
		Mathematics, but possible in laic speak

	Gloss Keywords:
		Word: proper substructure, In Sense: 
		Word: strictly-sub-structure, In Sense: 
		Word: strict substructure, In Sense: 

	Place Keywords:




You can go to <http://jbovlaste.lojban.org/dict/praperi> to see it.