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<head>CLASSIFICATION (I)</head> | <head>CLASSIFICATION (I)</head> | ||
<p>1. If it <hi rend="underline">should</hi> be necessary to insert any new Propositions | <p><note>Euclids Order<lb/> | ||
preferred</note><lb/>1. If it <hi rend="underline">should</hi> be necessary to insert any new Propositions <lb/> | |||
Those of Euclid should still <add>retain</add> their former names, as they <lb/> | Those of Euclid should still <add>retain</add> their former names, as they <lb/> | ||
are refered to be those names from Books of Mechanics. &</p> | are refered to be those names from Books of Mechanics. &</p> | ||
<p> | <p><note>Order how<lb/> | ||
Changeable<lb/> | Changeable<lb/> | ||
at pleasure<lb/> | at pleasure<lb/> | ||
Use of it</note><lb/> | Use of it</note><lb/>2. By the assistance of the Cards described Method 1<gap/><lb/> | ||
The Order of Prop: and Cor: may be changed so as to | |||
place all those together which relate to the several<lb/> | place all those together which relate to the several<lb/> | ||
genera & species, <del>and</del> By this means each parcel<lb/> | genera & species, <del>and</del> By this means each parcel<lb/> | ||
| Line 24: | Line 24: | ||
proved equal, then you perceive that Parallelograms<lb/> | proved equal, then you perceive that Parallelograms<lb/> | ||
should be proved equal under like circumstances.</p> | should be proved equal under like circumstances.</p> | ||
< | |||
<p><note>Different Classification<lb/> | |||
of Different Authors</note><lb/>3. Consider the different orders <hi rend="underline">Geometerical Trut</hi>hs have been | |||
disposed in, by different Authors, and the different ends they<lb/> | disposed in, by different Authors, and the different ends they<lb/> | ||
had in view in [purposes they have sought to compass by] such<lb/> | had in view in [purposes they have sought to compass by] such<lb/> | ||
different Dispositions.</p> | different Dispositions.</p> | ||
< | |||
pb/> | |||
<head>CLASSIFICATION (I)</head> | <head>CLASSIFICATION (I)</head> | ||
<p>The order necessary to be assumed for the purpose of <hi rend="underline">demonstrating</hi><lb/> | <p>The order necessary to be assumed for the purpose of <hi rend="underline">demonstrating</hi><lb/> | ||
the several Propositions is one thing.</p> | the several Propositions is one thing.</p> | ||
<p><note>Species of Order</note> The order which would be most <del>proper</del> convenient & methodical<lb/> | <p><note>Species of Order</note> The order which would be most <del>proper</del> convenient & methodical<lb/> | ||
for the purpose of teaching<add>them</add> (were the business only<lb/> | for the purpose of teaching<add>them</add> (were the business only<lb/> | ||
to apprehend and retain them) would be another.</p> | to apprehend and retain them) would be another.</p> | ||
<p>The order in which they occurred to the Inventor, probably<lb/> | <p>The order in which they occurred to the Inventor, probably<lb/> | ||
was a third, certainly it was different from the first.</p> | was a third, certainly it was different from the first.</p> | ||
<p><note>Order of <lb/> | <p><note>Order of <lb/> | ||
1<hi rend="superscript">st</hi> Invention<lb/> | 1<hi rend="superscript">st</hi> Invention<lb/> | ||
| Line 48: | Line 53: | ||
2<hi rend="superscript">d</hi> the order of conception & retension 3<hi rend="superscript">dly</hi> the order of<lb/> | 2<hi rend="superscript">d</hi> the order of conception & retension 3<hi rend="superscript">dly</hi> the order of<lb/> | ||
Invention.</p> | Invention.</p> | ||
<p>The 1<hi rend="superscript">st</hi> and only state in which Geometry has been<lb/> | <p>The 1<hi rend="superscript">st</hi> and only state in which Geometry has been<lb/> | ||
transmitted to us by the <sic>Antients</sic> is a state for advanced<lb/> | transmitted to us by the <sic>Antients</sic> is a state for advanced<lb/> | ||
| Line 63: | Line 69: | ||
to be determined by the Order of Enquiry: for how should a man who had it<lb/> | to be determined by the Order of Enquiry: for how should a man who had it<lb/> | ||
in other respects in his choice think if answering questions, but in <lb/> | in other respects in his choice think if answering questions, but in <lb/> | ||
the order in which they were asked.</p | the order in which they were asked.</p> | ||
CLASSIFICATION (I)
Euclids Order
preferred
1. If it should be necessary to insert any new Propositions
Those of Euclid should still retain their former names, as they
are refered to be those names from Books of Mechanics. &
Order how
Changeable
at pleasure
Use of it
2. By the assistance of the Cards described Method 1
The Order of Prop: and Cor: may be changed so as to
place all those together which relate to the several
genera & species, and By this means each parcel
may be made equally perfect. For Ex: if after having
divided Triangles and Parallelograms into 2 Parcels
you find that for Triangles as well as Parallelograms
upon the same bases & between the same parallels
are proved equal, But that Triangles only are if on equal bases
proved equal, then you perceive that Parallelograms
should be proved equal under like circumstances.
Different Classification
of Different Authors
3. Consider the different orders Geometerical Truths have been
disposed in, by different Authors, and the different ends they
had in view in [purposes they have sought to compass by] such
different Dispositions.
< pb/>
CLASSIFICATION (I)
The order necessary to be assumed for the purpose of demonstrating
the several Propositions is one thing.
Species of Order The order which would be most proper convenient & methodical
for the purpose of teachingthem (were the business only
to apprehend and retain them) would be another.
The order in which they occurred to the Inventor, probably
was a third, certainly it was different from the first.
Order of
1st Invention
Demonstration
Systematical We have therefore (unless the two latter coincide) three
different species of Orders 1st the order of Demonstration.
2d the order of conception & retension 3dly the order of
Invention.
The 1st and only state in which Geometry has been
transmitted to us by the Antients is a state for advanced
towards perfection. I mean relatively according to the
order of demonstration, we see it not in this Science
in its first rude essays as we do those for example of
Natural History & Legislation
It will appear very plain that Euclid could never
have first thought of his Propositions in the order in
which he has placed them. but it is to be supposed he
he placed them in their present order for the purpose
of demonstration.
[+] as it may be termed The order of Simple or Authoritative Illustration [+] is the
Order of Instruction same with the Order of enquiry. It is in its Nature for Instruction
to be determined by the Order of Enquiry: for how should a man who had it
in other respects in his choice think if answering questions, but in
the order in which they were asked.
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Identifier: | JB/135/019/002"JB/" can not be assigned to a declared number type with value 135. |
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sir samuel bentham |
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