★ Find a new page to transcribe in our list of Untranscribed Manuscripts
Auto loaded |
No edit summary |
||
| Line 3: | Line 3: | ||
<!-- ENTER TRANSCRIPTION BELOW THIS LINE --> | <!-- ENTER TRANSCRIPTION BELOW THIS LINE --> | ||
<p>1831 May 11 M 16</p> | |||
<head>Posology</head> | |||
<note>ult<lb/> | |||
Introduction<lb/> | |||
1. Alegomorphics<lb/> | |||
Elucidation continued<lb/> | |||
§5 Nomenclature amended<lb/> | |||
Equivalents<lb/> | |||
1. <sic>Ascendendo</sic>.</note> | |||
<p>? 2</p> | |||
<note>16<lb/> | |||
One above another<lb/> | |||
rise all these equivalents:<lb/> | |||
and at every step are<lb/> | |||
more distant from the<lb/> | |||
originally <unclear>known</unclear><lb/> | |||
<del>Thus they</del> rise in the<lb/> | |||
ascending direction: and<lb/> | |||
descend lower than one<lb/> | |||
another in the converse<lb/> | |||
direction</note> | |||
<p>Relation had to the contents of the aggregate, those of all<lb/> | |||
others <add>other aggregates</add> may be said to be unknown: <add>in</add> comparison had with this<lb/> | |||
aggregate, those <add>the contents</add> of all other aggregates may be said to be unknown<lb/> | |||
As they advance higher and higher above this basis<lb/> | |||
they are less and less known — less and less clearly and readily <add>promptly</add><lb/> | |||
known: require more and more explanation, <del>the</del> <add>every</add> one of them<lb/> | |||
by another <add>some other</add></p> | |||
<note>17<lb/> | |||
1. Addition. No<lb/> | |||
explanation does this<lb/> | |||
require or <sic>admitt</sic>, other<lb/> | |||
than what is given by<lb/> | |||
indication of its relation<lb/> | |||
to the original and standard<lb/> | |||
size</note> | |||
<p>Thus <gap/> next to what is known — first of the <unclear>relations</unclear> unknown<lb/> | |||
operation stands <hi rend="underline">addition</hi>. This requires nil — this<lb/> | |||
<sic>admitts</sic> not explanation by any other <hi rend="underline">medium</hi> than the relation<lb/> | |||
which it bears to the abovementioned standard sizes</p> | |||
<note>18<lb/> | |||
2. Multiplication<lb/> | |||
Explained is this by its<lb/> | |||
relation to <del>the</del> <hi rend="underline">addition</hi> — the<lb/> | |||
intermediate operation between<lb/> | |||
that <del>and</del> operation and<lb/> | |||
the original standard</note> | |||
<p>2. Next <del><gap/></del> in the ascending line, comes <add>stands</add> multiplication<lb/> | |||
This <sic>admitts</sic> — this requires — this receives explanation, by<lb/> | |||
the medium of addition of the relation it bears to addition</p> | |||
<note>19<lb/> | |||
3. Squaring.<lb/> | |||
Explained is this by its<lb/> | |||
relation to the two preceding<lb/> | |||
operations intermediate<lb/> | |||
between the results of<lb/> | |||
this operation and the<lb/> | |||
original standard</note> | |||
<p>3. Next comes <add>consideration of the 2<hi rend="superscript">d</hi> power: or say</add> <hi rend="underline">squaring</hi>. This <sic>admitts</sic> — this requires —<lb/> | |||
this receives explanation by the medium of the relation<lb/> | |||
it bears to <hi rend="underline">multiplication</hi>, and thence to <hi rend="underline">addition</hi></p> | |||
<note>20<lb/> | |||
4. Cubing or say<lb/> | |||
cubation. Explained<lb/> | |||
in like manner, by the<lb/> | |||
<hi rend="underline">three</hi> intermediate operations.</note> | |||
<p>4. Next comes <del>squ cubing</del> involution to the 3<hi rend="superscript">d</hi> power: or say<lb/> | |||
cubing: <add>or say</add> though as yet the term is <add>thought to be</add> scarcely in use. As to this matter<lb/> | |||
see further in § <hi rend="underline">conjugates</hi>. If we have not <hi rend="underline">cubation</hi>, we have at<lb/> | |||
any rate <hi rend="underline">incubation</hi>: but here, <unclear>analogy</unclear> fails us altogether: the image — the <gap/><lb/> | |||
imaging is an altogether different one</p> | |||
<note><del><gap/></del> 21.<lb/> | |||
5. Involution to the<lb/> | |||
4<hi rend="superscript">th</hi> power, or say Biquadration.<lb/> | |||
Explained in<lb/> | |||
like manner: intermediate<lb/> | |||
operations, four.</note> | |||
<p>5. Next comes involution to the fourth power or say<lb/> | |||
<hi rend="underline">biquadration</hi>: though as yet the term is thought to be scarcely in use</p> | |||
<note>22.<lb/> | |||
Higher than this goes<lb/> | |||
not the scale of different<lb/> | |||
independently denominated<lb/> | |||
equivalences:<lb/> | |||
by numbers added to<lb/> | |||
the word power are the<lb/> | |||
several gradations designated:<lb/> | |||
5<hi rend="superscript">th</hi>, 6<hi rend="superscript">th</hi> power<lb/> | |||
&c in an infinite<del><gap/></del> series<lb/> | |||
(a)</note> | |||
<note>Note 22(a) <add>series or say</add> scales of <hi rend="underline">addition</hi> in any number may be formed, by adding <add>continually</add> to the standard number any number other than itself.</note> | |||
<p>6. <add>Next</add> After these, come or comes involution to the 5<hi rend="superscript">th</hi>, 6<hi rend="superscript">th</hi><lb/> | |||
and so other powers in number actually indefinite, <sic>encreasing</sic><lb/> | |||
and ascending and <sic>encreasing</sic> in <unclear>serieses</unclear> of correspondent length<lb/> | |||
produced by multiplication <add>(a)</add></p> | |||
<!-- Horizontal line --> | |||
<head>Note <add>(a)</add></head> | |||
<p><add>(a)</add> Another species of series is that which is produced by addition<lb/> | |||
In the Numeration Table, the subject mattter of the addition is no other<lb/> | |||
than No 1. <add>Number one</add>. But any other number may be added either<lb/> | |||
to itself to to any other number or numbers; and thus in infinite<lb/> | |||
variety altogether infinite may be formed all in the way <add><unclear>produced</unclear></add> of simple addition <gap/> <unclear>serieses</unclear> in number altogether<lb/> | |||
infinite.</p> | |||
1831 May 11 M 16
Posology
ult
Introduction
1. Alegomorphics
Elucidation continued
§5 Nomenclature amended
Equivalents
1. Ascendendo.
? 2
16
One above another
rise all these equivalents:
and at every step are
more distant from the
originally known
Thus they rise in the
ascending direction: and
descend lower than one
another in the converse
direction
Relation had to the contents of the aggregate, those of all
others other aggregates may be said to be unknown: in comparison had with this
aggregate, those the contents of all other aggregates may be said to be unknown
As they advance higher and higher above this basis
they are less and less known — less and less clearly and readily promptly
known: require more and more explanation, the every one of them
by another some other
17
1. Addition. No
explanation does this
require or admitt, other
than what is given by
indication of its relation
to the original and standard
size
Thus next to what is known — first of the relations unknown
operation stands addition. This requires nil — this
admitts not explanation by any other medium than the relation
which it bears to the abovementioned standard sizes
18
2. Multiplication
Explained is this by its
relation to the addition — the
intermediate operation between
that and operation and
the original standard
2. Next in the ascending line, comes stands multiplication
This admitts — this requires — this receives explanation, by
the medium of addition of the relation it bears to addition
19
3. Squaring.
Explained is this by its
relation to the two preceding
operations intermediate
between the results of
this operation and the
original standard
3. Next comes consideration of the 2d power: or say squaring. This admitts — this requires —
this receives explanation by the medium of the relation
it bears to multiplication, and thence to addition
20
4. Cubing or say
cubation. Explained
in like manner, by the
three intermediate operations.
4. Next comes squ cubing involution to the 3d power: or say
cubing: or say though as yet the term is thought to be scarcely in use. As to this matter
see further in § conjugates. If we have not cubation, we have at
any rate incubation: but here, analogy fails us altogether: the image — the
imaging is an altogether different one
21.
5. Involution to the
4th power, or say Biquadration.
Explained in
like manner: intermediate
operations, four.
5. Next comes involution to the fourth power or say
biquadration: though as yet the term is thought to be scarcely in use
22.
Higher than this goes
not the scale of different
independently denominated
equivalences:
by numbers added to
the word power are the
several gradations designated:
5th, 6th power
&c in an infinite series
(a)
Note 22(a) series or say scales of addition in any number may be formed, by adding continually to the standard number any number other than itself.
6. Next After these, come or comes involution to the 5th, 6th
and so other powers in number actually indefinite, encreasing
and ascending and encreasing in serieses of correspondent length
produced by multiplication (a)
Note (a)
(a) Another species of series is that which is produced by addition
In the Numeration Table, the subject mattter of the addition is no other
than No 1. Number one. But any other number may be added either
to itself to to any other number or numbers; and thus in infinite
variety altogether infinite may be formed all in the way produced of simple addition serieses in number altogether
infinite.
|
Identifier: | JB/135/193/001"JB/" can not be assigned to a declared number type with value 135. |
|||
|---|---|---|---|
|
1831-05-11 |
16-22 |
||
|
135 |
posology |
||
|
193 |
posology |
||
|
001 |
note (a) |
||
|
text sheet |
1 |
||
|
recto |
d16 / e2 |
||
|
jeremy bentham |
|||
|
46311 |
|||
