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<p>1831. May 9</p> | |||
<head>Posology.</head> | |||
<note>Morphoscopics<lb/> | |||
Ch. or §. Genesis analytic<lb/> | |||
and synthetic</note> | |||
<p>1</p> | |||
<p>1.<lb/> | |||
Modes of genesis<lb/> | |||
or say formation<lb/> | |||
of <sic>plain</sic> figures<lb/> | |||
two — 1. the analytic<lb/> | |||
— 2. the synthetic.</p> | |||
<p>2<lb/> | |||
By the analytic is<lb/> | |||
employed a mass<lb/> | |||
of really-existing<lb/> | |||
matter natural or<lb/> | |||
artificial — by a flat<lb/> | |||
or say <sic>plain</sic> instrument,<lb/> | |||
it is supposed<lb/> | |||
to be divided<lb/> | |||
into two parts<lb/> | |||
and by each part<lb/> | |||
is this provided a<lb/> | |||
new surface.</p> | |||
<p>3.<lb/> | |||
Name of the solid<lb/> | |||
thus cut, the<lb/> | |||
of the <sic>plain</sic> cutting<lb/> | |||
it, the — this<lb/> | |||
term is in use —<lb/> | |||
of the parts thus<lb/> | |||
formed the <hi rend="underline">segments</hi><lb/> | |||
— this term is also in use.</p> | |||
<p>4.<lb/> | |||
These two segments<lb/> | |||
will with reference<lb/> | |||
to each other be either<lb/> | |||
1, equal — or 2. unequal.<lb/> | |||
If unequal, one will be<lb/> | |||
the lesser — the other<lb/> | |||
the greater.</p><pb/> | |||
<p>5.<lb/> | |||
Exemplified are<lb/> | |||
some sorts of these<lb/> | |||
solids by bodies<lb/> | |||
produced by nature<lb/> | |||
without the intervention<lb/> | |||
of art —<lb/> | |||
call them <hi rend="underline">naturally-<lb/> | |||
existing</hi> solids —<lb/> | |||
others not without<lb/> | |||
such intervention: call<lb/> | |||
them <hi rend="underline">artificially-<lb/> | |||
produced</hi> solids.</p> | |||
<p>6.<lb/> | |||
Completely regularly<lb/> | |||
in number altogether<lb/> | |||
infinite are<lb/> | |||
capable of having<lb/> | |||
place the artificially-<lb/> | |||
produced solids:<lb/> | |||
very few the naturally-<lb/> | |||
existing: only<lb/> | |||
among saline crystallizations<lb/> | |||
are examples<lb/> | |||
to be found:<lb/> | |||
namely the cubical<lb/> | |||
crystals of common<lb/> | |||
salt and the parallelopipedon<lb/> | |||
crystals of some<lb/> | |||
other salt or salts.</p> | |||
<p>7.<lb/> | |||
Idea of a surface<lb/> | |||
has produced by<lb/> | |||
the section of the<lb/> | |||
solid — Thus are<lb/> | |||
formed the abstract<lb/> | |||
ideas of the first order.</p><pb/> | |||
<p>8.<lb/> | |||
Abstraction is<lb/> | |||
drawing-off.</p> | |||
<p>9.<lb/> | |||
In the surface you<lb/> | |||
consider a line only.<lb/> | |||
Formed thus,<lb/> | |||
abstract idea of<lb/> | |||
the 2<hi rend="superscript">d</hi> order.</p> | |||
<p>10<lb/> | |||
Surface is either<lb/> | |||
1. Single-line-bounded<lb/> | |||
or 2. Many-line-bounded.</p> | |||
<p>11.<lb/> | |||
If single-line bounded<lb/> | |||
that line is<lb/> | |||
curve: and that<lb/> | |||
curve a recurrent<lb/> | |||
curve.</p> | |||
<p>12.<lb/> | |||
Curves recurrent<lb/> | |||
are 1. Circles — 2.<lb/> | |||
Cycloids.</p> | |||
<p>13.<lb/> | |||
At the last step<lb/> | |||
comes an abstract<lb/> | |||
idea of the 3<hi rend="superscript">d</hi> order:<lb/> | |||
that of a <hi rend="underline">point</hi> —<lb/> | |||
mathematical or say<lb/> | |||
posological.</p> | |||
<p>14<lb/> | |||
Of one point you<lb/> | |||
<hi rend="underline">cannot</hi> obtain the<lb/> | |||
impression without<lb/> | |||
the impression of<lb/> | |||
another: one <hi rend="underline">idea</hi><lb/> | |||
you <unclear>care</unclear> for by the<lb/> | |||
<hi rend="underline">ends</hi> more than two<lb/> | |||
are produced impressions<lb/> | |||
of <hi rend="underline">lines</hi><lb/> | |||
more than one.</p> | |||
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{{Metadata:{{PAGENAME}}}} | {{Metadata:{{PAGENAME}}}}{{Completed}} | ||
1831. May 9
Posology.
Morphoscopics
Ch. or §. Genesis analytic
and synthetic
1
1.
Modes of genesis
or say formation
of plain figures
two — 1. the analytic
— 2. the synthetic.
2
By the analytic is
employed a mass
of really-existing
matter natural or
artificial — by a flat
or say plain instrument,
it is supposed
to be divided
into two parts
and by each part
is this provided a
new surface.
3.
Name of the solid
thus cut, the
of the plain cutting
it, the — this
term is in use —
of the parts thus
formed the segments
— this term is also in use.
4.
These two segments
will with reference
to each other be either
1, equal — or 2. unequal.
If unequal, one will be
the lesser — the other
the greater.
---page break---
5.
Exemplified are
some sorts of these
solids by bodies
produced by nature
without the intervention
of art —
call them naturally-
existing solids —
others not without
such intervention: call
them artificially-
produced solids.
6.
Completely regularly
in number altogether
infinite are
capable of having
place the artificially-
produced solids:
very few the naturally-
existing: only
among saline crystallizations
are examples
to be found:
namely the cubical
crystals of common
salt and the parallelopipedon
crystals of some
other salt or salts.
7.
Idea of a surface
has produced by
the section of the
solid — Thus are
formed the abstract
ideas of the first order.
---page break---
8.
Abstraction is
drawing-off.
9.
In the surface you
consider a line only.
Formed thus,
abstract idea of
the 2d order.
10
Surface is either
1. Single-line-bounded
or 2. Many-line-bounded.
11.
If single-line bounded
that line is
curve: and that
curve a recurrent
curve.
12.
Curves recurrent
are 1. Circles — 2.
Cycloids.
13.
At the last step
comes an abstract
idea of the 3d order:
that of a point —
mathematical or say
posological.
14
Of one point you
cannot obtain the
impression without
the impression of
another: one idea
you care for by the
ends more than two
are produced impressions
of lines
more than one.
|
Identifier: | JB/135/127/001"JB/" can not be assigned to a declared number type with value 135. |
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1831-05-09 |
1-14 |
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135 |
posology |
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127 |
posology |
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001 |
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marginal summary sheet |
1 |
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recto |
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richard doane |
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46245 |
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