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Subject: [jvsw] Definition Edited At Word zmaduje -- By krtisfranks
Date: Tue, 22 Dec 2020 09:35:10 +0000
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In jbovlaste, the user krtisfranks has edited a
definition of "zmaduje" in the language "English".

Differences:

2,2c2,2
< 		$x_1$ is more than/greater than/exceeds $x_2$ in property $x_3$ and the $x_4$th (li; 1 or 2) argument of this selbri actually has/is/attains property $x_3$ according to $x_5$.
---
> 		$x_1$ is more than/greater than/exceeds $x_2$ in property $x_3$ (ka) and the $x_4$th (li; 1 or 2) argument of this selbri actually has/is/expresses/attains property $x_3$ according to $x_5$.
5,5c5,5
< 		{zmadu} implies that one things is more than another in some property, but not that either actually achieves/has that property. For example, a two-year-old is older than a one-year-old but neither is old by normal human standards. This word says that not only is one thing more than another in some property, but at least one of them does have that property. So, an octagenarian is older than a toddler, and the former (but not the latter) actually is old by normal human standards. In my cases, if $x_4 = 2$, then not only does $x_2$ have property $x_3$, but $x_1$ also has property $x_3$ (just by a greater amount/to a greater extent); it is uncommon and indicative of a pathology in definition for $x_4 = 2$ to not imply that $x_4 = 1$ is also true. The converse is untrue: $x_1$ may have property $x_3$ even while $x_2$ does not ('$x_4 = 1$' is true but '$x_4 = 2$' is false, as in the octagenerian versus toddler example); however, in order to exclude the possibility that $x_4 = 2$ when $x_4 = 1$ is specified, one must explicitly specify that it is so - $x_4$ necessarily tells which argument does satisfy the proposition of having property $x_3$, it does not necessarily give any information as to which argument does not. See: "{trajije}".
---
> 		{zmadu} implies that one things is more than another in some property, but not that either actually achieves/has that property. For example, a two-year-old is older than a one-year-old but neither is old by normal human standards. This word says that not only is one thing more than another in some property, but at least one of them does have that property. So, an octagenarian is older than a toddler, and the former (but not the latter) actually is old by normal human standards. In my cases, if $x_4 = 2$, then not only does $x_2$ have property $x_3$, but $x_1$ also has property $x_3$ (just by a greater amount/to a greater extent); it is uncommon and indicative of a pathology in definition for $x_4 = 2$ to not imply that $x_4 = 1$ is also true. The converse is untrue: $x_1$ may have property $x_3$ even while $x_2$ does not ('$x_4 = 1$' is true but '$x_4 = 2$' is false, as in the octagenerian versus toddler example); however, in order to exclude the possibility that $x_4 = 2$ when $x_4 = 1$ is specified, one must explicitly specify that it is so - $x_4$ necessarily tells which argument does indeed satisfy the proposition of having property $x_3$, but it possibly may not necessarily give any information as to which argument does not do so. See: "{trajije}".


Old Data:

	Definition:
		$x_1$ is more than/greater than/exceeds $x_2$ in property $x_3$ and the $x_4$th (li; 1 or 2) argument of this selbri actually has/is/attains property $x_3$ according to $x_5$.

	Notes:
		{zmadu} implies that one things is more than another in some property, but not that either actually achieves/has that property. For example, a two-year-old is older than a one-year-old but neither is old by normal human standards. This word says that not only is one thing more than another in some property, but at least one of them does have that property. So, an octagenarian is older than a toddler, and the former (but not the latter) actually is old by normal human standards. In my cases, if $x_4 = 2$, then not only does $x_2$ have property $x_3$, but $x_1$ also has property $x_3$ (just by a greater amount/to a greater extent); it is uncommon and indicative of a pathology in definition for $x_4 = 2$ to not imply that $x_4 = 1$ is also true. The converse is untrue: $x_1$ may have property $x_3$ even while $x_2$ does not ('$x_4 = 1$' is true but '$x_4 = 2$' is false, as in the octagenerian versus toddler example); however, in order to exclude the possibility that $x_4 = 2$ when $x_4 = 1$ is specified, one must explicitly specify that it is so - $x_4$ necessarily tells which argument does satisfy the proposition of having property $x_3$, it does not necessarily give any information as to which argument does not. See: "{trajije}".

	Jargon:
		

	Gloss Keywords:
		Word: more and actually is, In Sense: 
		Word: more than and realized in having/being, In Sense: 

	Place Keywords:


New Data:

	Definition:
		$x_1$ is more than/greater than/exceeds $x_2$ in property $x_3$ (ka) and the $x_4$th (li; 1 or 2) argument of this selbri actually has/is/expresses/attains property $x_3$ according to $x_5$.

	Notes:
		{zmadu} implies that one things is more than another in some property, but not that either actually achieves/has that property. For example, a two-year-old is older than a one-year-old but neither is old by normal human standards. This word says that not only is one thing more than another in some property, but at least one of them does have that property. So, an octagenarian is older than a toddler, and the former (but not the latter) actually is old by normal human standards. In my cases, if $x_4 = 2$, then not only does $x_2$ have property $x_3$, but $x_1$ also has property $x_3$ (just by a greater amount/to a greater extent); it is uncommon and indicative of a pathology in definition for $x_4 = 2$ to not imply that $x_4 = 1$ is also true. The converse is untrue: $x_1$ may have property $x_3$ even while $x_2$ does not ('$x_4 = 1$' is true but '$x_4 = 2$' is false, as in the octagenerian versus toddler example); however, in order to exclude the possibility that $x_4 = 2$ when $x_4 = 1$ is specified, one must explicitly specify that it is so - $x_4$ necessarily tells which argument does indeed satisfy the proposition of having property $x_3$, but it possibly may not necessarily give any information as to which argument does not do so. See: "{trajije}".

	Jargon:
		

	Gloss Keywords:
		Word: more and actually is, In Sense: 
		Word: more than and realized in having/being, In Sense: 

	Place Keywords:


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