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<head>1831 May 4 + + M 19<lb/> | |||
Posology</head> | |||
<note>ult<hi rend="superscript">o</hi><lb/> | |||
Introduction<lb/> | |||
1 Alegomorphics<lb/> | |||
§. Mutual Relation</note> | |||
<p>1 1</p> | |||
<p>Ch. or §. Relations as between abbreviation — indication of equivalence <add>the several means of facilitation</add><lb/> | |||
&c.</p> | |||
<note>1<lb/> | |||
Object of Alegomorphics<lb/> | |||
making known the unknown</note> | |||
<p>To make known quantities <add>a quantity</add> as yet unknown — this is the<lb/> | |||
object or end in view — thus when the object is attained is the<lb/> | |||
fruit of whatsoever labour is performed in this part of the<lb/> | |||
field <del>and</del> of art-and-science to which the denomination <add>appellation</add> of<lb/> | |||
alegomorphics <add>posology</add> has been given by this paper <add>the present work</add></p> | |||
<note>2<lb/> | |||
Means, its relation<lb/> | |||
to something known<lb/> | |||
Quantities <hi rend="underline">in<gap/></hi><lb/> | |||
known — <add>using</add> those of the<lb/> | |||
numeration table, those<lb/> | |||
which the term in<lb/> | |||
question has had occasion<lb/> | |||
to take note of:<lb/> | |||
viz <del>those of</del> to fingers<lb/> | |||
of one hand — two hands<lb/> | |||
both feet<lb/> | |||
And to them, <gap/><lb/> | |||
whence the <gap/> of<lb/> | |||
the hand. See Conjectural<lb/> | |||
History</note> | |||
<p><add>Of</add> This term — the <del><gap/></del> attribution <hi rend="underline">unknown</hi> the use is peculiar<lb/> | |||
to <hi rend="underline">algebra</hi>: that is to say to bodies having algebra for their<lb/> | |||
professed matter. But it has been seen that the most simple<lb/> | |||
combinations of <add>the</add> numerical quantities contained in the numeration<lb/> | |||
table are unknown <del><gap/></del> relation <add>had</add> and comparison made with<lb/> | |||
those same quantities in their uncombined state.</p> | |||
<note>3<lb/> | |||
Then come the highest<lb/> | |||
article of the numeration<lb/> | |||
Table: hence the highest<lb/> | |||
of each by its relation<lb/> | |||
to all those one after<lb/> | |||
another that have gone<lb/> | |||
before it, and are less than<lb/> | |||
it</note> | |||
<note>4<lb/> | |||
Then come the <del><gap/></del><lb/> | |||
compound numbers rising<lb/> | |||
one above another in<lb/> | |||
the way of <gap/>.<lb/> | |||
These then may <gap/> <gap/><lb/> | |||
<gap/> in the way of multiplication.<lb/> | |||
Then to multiplication of<lb/> | |||
multiplication — i.e. <gap/> <unclear>346</unclear></note> | |||
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{{Metadata:{{PAGENAME}}}} | {{Metadata:{{PAGENAME}}}}{{Completed}} | ||
1831 May 4 + + M 19
Posology
ulto
Introduction
1 Alegomorphics
§. Mutual Relation
1 1
Ch. or §. Relations as between abbreviation — indication of equivalence the several means of facilitation
&c.
1
Object of Alegomorphics
making known the unknown
To make known quantities a quantity as yet unknown — this is the
object or end in view — thus when the object is attained is the
fruit of whatsoever labour is performed in this part of the
field and of art-and-science to which the denomination appellation of
alegomorphics posology has been given by this paper the present work
2
Means, its relation
to something known
Quantities in
known — using those of the
numeration table, those
which the term in
question has had occasion
to take note of:
viz those of to fingers
of one hand — two hands
both feet
And to them,
whence the of
the hand. See Conjectural
History
Of This term — the attribution unknown the use is peculiar
to algebra: that is to say to bodies having algebra for their
professed matter. But it has been seen that the most simple
combinations of the numerical quantities contained in the numeration
table are unknown relation had and comparison made with
those same quantities in their uncombined state.
3
Then come the highest
article of the numeration
Table: hence the highest
of each by its relation
to all those one after
another that have gone
before it, and are less than
it
4
Then come the
compound numbers rising
one above another in
the way of .
These then may
in the way of multiplication.
Then to multiplication of
multiplication — i.e. 346
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relation as between /abbreviations - indication of equivalents / the several means of facilitation/ |
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jeremy bentham |
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