★ 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>1820 March 16</p> | |||
<head>Posology<lb/> | |||
Geometry Rudiments</head> | |||
<head><gap/><lb/> | |||
Definition</head> | |||
<p>A line is a right line<lb/> | |||
if from one of its points<lb/> | |||
to another no second <add>other</add><lb/> | |||
line can be drawn<lb/> | |||
but such an one <unclear>or</unclear><lb/> | |||
if it dies not in all<lb/> | |||
points coincide with<lb/> | |||
the first will <del>in</del> <add>by</add> some<lb/> | |||
part of it together with<lb/> | |||
some part of the first<lb/> | |||
incl<gap/> <gap/> space.</p> | |||
<p>A right line is the<lb/> | |||
shortest that can be<lb/> | |||
drawn between any two<lb/> | |||
points. <del><gap/></del> <!-- Pointer symbol --> Compare<lb/> | |||
this definition with<lb/> | |||
the former.</p> | |||
<p>5. Morph<gap/><lb/> | |||
Different modes<lb/> | |||
of <hi rend="underline"><gap/></hi><lb/> | |||
or say<lb/> | |||
<hi rend="underline">exhibition</hi>.</p> | |||
<head>Uses</head> | |||
<p>+ <del><gap/></del> A mathematical<lb/> | |||
proposition, if it has<lb/> | |||
no physical facts included<lb/> | |||
in it, is either<lb/> | |||
untrue or useless, or<lb/> | |||
both.</p><pb/> | |||
<head>Fundamental Maxims</head> | |||
<p>1. Mathematical ideas<lb/> | |||
are only physical ideas<lb/> | |||
generalised.+</p> | |||
<p>2. Number is the<lb/> | |||
sole intelligible measure<lb/> | |||
of quantity in<lb/> | |||
<del><gap/></del> its <unclear>other</unclear> form: viz<lb/> | |||
quantity having relation<lb/> | |||
to figure</p> | |||
<p>March 1<hi rend="superscript">st</hi> 1831</p> | |||
<p>In Conic Section of<lb/> | |||
the curves for<lb/> | |||
<hi rend="underline">Parameter</hi> say<lb/> | |||
The <hi rend="underline">standard case</hi>.</p> | |||
In <hi rend="underline">Posology</hi>, <hi rend="underline">Problems</hi> | |||
belong to the <hi rend="underline">Art</hi>: Theories, | |||
to the Science. | |||
<head>E<gap/></head> | |||
<p>For <del><add><gap/></add></del> the purpose of<lb/> | |||
throwing a circle round<lb/> | |||
all that is capable<lb/> | |||
of being done in posology, could not<lb/> | |||
the <del><gap/></del> logical<lb/> | |||
<hi rend="underline">method of exhaustion</hi>,<lb/> | |||
as explained in<lb/> | |||
Chrestomathia Part<lb/> | |||
II be applied to<lb/> | |||
the details — applied<lb/> | |||
in detail as it is<lb/> | |||
then applied to the<lb/> | |||
aggregate?</p> | |||
1820 March 16
Posology
Geometry Rudiments
Definition
A line is a right line
if from one of its points
to another no second other
line can be drawn
but such an one or
if it dies not in all
points coincide with
the first will in by some
part of it together with
some part of the first
incl space.
A right line is the
shortest that can be
drawn between any two
points. Compare
this definition with
the former.
5. Morph
Different modes
of
or say
exhibition.
Uses
+ A mathematical
proposition, if it has
no physical facts included
in it, is either
untrue or useless, or
both.
---page break---
Fundamental Maxims
1. Mathematical ideas
are only physical ideas
generalised.+
2. Number is the
sole intelligible measure
of quantity in
its other form: viz
quantity having relation
to figure
March 1st 1831
In Conic Section of
the curves for
Parameter say
The standard case.
In Posology, Problems belong to the Art: Theories, to the Science.
E
For the purpose of
throwing a circle round
all that is capable
of being done in posology, could not
the logical
method of exhaustion,
as explained in
Chrestomathia Part
II be applied to
the details — applied
in detail as it is
then applied to the
aggregate?
|
Identifier: | JB/135/092/001"JB/" can not be assigned to a declared number type with value 135. |
|||
|---|---|---|---|
|
1820-03-16 |
|||
|
135 |
posology |
||
|
092 |
posology geometry rudiments |
||
|
001 |
morphic / definitions / uses |
||
|
rudiments sheet (brouillon) |
1 |
||
|
recto |
f140 |
||
|
jeremy bentham |
[[watermarks::i&m [prince of wales feathers] 1818]] |
||
|
arthur wellesley, duke of wellington |
|||
|
1818 |
|||
|
46210 |
|||
