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The contrivance in<lb/> | The contrivance in<lb/> | ||
Euclids first proposition.<lb/> | Euclids first proposition.<lb/> | ||
— <add>namely a</add> Problem — how to | — <add>namely a</add> Problem — how to construct<lb/> | ||
an equilateral triangle<lb/> | an equilateral triangle.<lb/> | ||
Mode of designating and<lb/> | |||
exhibiting it.</p> | exhibiting it.</p> | ||
| Line 17: | Line 17: | ||
Here it follows expressed<lb/> | Here it follows expressed<lb/> | ||
in the asi<gap/><lb/> | in the asi<gap/><lb/> | ||
and | and historical <add>inferential or conjectural</add><lb/> | ||
method.</p> | method.</p> | ||
| Line 40: | Line 40: | ||
exception of the <del><gap/></del><lb/> | exception of the <del><gap/></del><lb/> | ||
point at that end, the rest<lb/> | point at that end, the rest<lb/> | ||
of the twig | of the twig is moved round<lb/> | ||
till it comes back into <del>the</del><lb/> | till it comes back into <del>the</del><lb/> | ||
a position exactly the same<lb/> | a position exactly the same<lb/> | ||
| Line 65: | Line 65: | ||
figure is bounded at all<lb/> | figure is bounded at all<lb/> | ||
points over which the moving<lb/> | points over which the moving<lb/> | ||
end of the twig has passed is the circumferential line: — in one word, the circumference.</p> | end of the twig has passed is the circumferential line: — in one word, the circumference.</p><pb/> | ||
<p>8<lb/> | |||
One mark having thus<lb/> | |||
been made with the twig,<lb/> | |||
employ now this same<lb/> | |||
twig in the formation of<lb/> | |||
another circle</p> | |||
<p>9<lb/> | |||
But in the formation<lb/> | |||
of this new circle the<lb/> | |||
whole twig must not be<lb/> | |||
moved from the position<lb/> | |||
it had when employed<lb/> | |||
in the formation of the<lb/> | |||
first circle</p> | |||
<p>10<lb/> | |||
The end which in the<lb/> | |||
formation of the first circle<lb/> | |||
was the first end, must<lb/> | |||
in the formation of the second<lb/> | |||
circle be the moving<lb/> | |||
end: and conversely,<lb/> | |||
the end which in the formation<lb/> | |||
of the first circle<lb/> | |||
was the moving end must<lb/> | |||
new be the <sic>fixt</sic> end</p> | |||
<p>11<lb/> | |||
The position which<lb/> | |||
the twig occupied the instant<lb/> | |||
before the formation<lb/> | |||
of the first circle was commenced<lb/> | |||
should have<lb/> | |||
been noted: <del>if</del> supposing<lb/> | |||
the coloring matter<lb/> | |||
previously applied to it<lb/> | |||
on the raising of <del>the</del> <add>the</add> whole<lb/> | |||
twig from its position<lb/> | |||
it will have been seen<lb/> | |||
to have left on the ground<lb/> | |||
the figure of a line.</p> | |||
<p>12<lb/> | |||
The second circle<lb/> | |||
having been formed as<lb/> | |||
above, the result will<lb/> | |||
be two circular figures<lb/> | |||
cutting one another at<lb/> | |||
two points.</p><pb/> | |||
<p>13<lb/> | |||
If <add>The position of</add> the twig at the<lb/> | |||
commencement of the second<lb/> | |||
circle was such<lb/> | |||
as to be a continuation<lb/> | |||
of that <del>at</del> which it<lb/> | |||
occupied at the formation<lb/> | |||
of the first in<lb/> | |||
such sort that no angle<lb/> | |||
or corner can be seen<lb/> | |||
to be formed between the<lb/> | |||
two, the whole line <add>is composed</add><lb/> | |||
will <add>thus</add> be seen composed<lb/> | |||
of three distinguishable<lb/> | |||
parts: 1. a middle<lb/> | |||
part which belongs equally<lb/> | |||
to both circles<lb/> | |||
2. a part peculiar to<lb/> | |||
the first circle: and being<lb/> | |||
either on the left or<lb/> | |||
the right of the middle<lb/> | |||
line — say on the left.<lb/> | |||
<add>3.</add> and a part peculiar<lb/> | |||
to the second circle<lb/> | |||
and being on the right<lb/> | |||
of the middle line.</p> | |||
<p><!-- This paragraph has been deleted --> Place now the whole <add>compound</add><lb/> | |||
<add>figure with the</add> compound line before<lb/> | |||
you in such this <add>a horizontal</add><lb/> | |||
position</p> | |||
<p>14<lb/> | |||
Place yourself now in<lb/> | |||
such a situation as<lb/> | |||
that nearest to you<lb/> | |||
shall be the bottom <add>lower</add><lb/> | |||
parts of the two <del><add>the</add> circles</del><lb/> | |||
thus connected circles.<lb/> | |||
furthest from you consequently<lb/> | |||
the upper <add>top</add><lb/> | |||
parts.</p> | |||
<p>15<lb/> | |||
From the right hand<lb/> | |||
end of the middle line<lb/> | |||
<del><gap/></del> <add>trace</add> a line to that one<lb/> | |||
of the two intersecting parts<lb/> | |||
of the two circles which<lb/> | |||
<add>is</add></p><pb/> | |||
<p>is furthest from you: this<lb/> | |||
you may do by laying that<lb/> | |||
same twig in that position</p> | |||
<p><!-- This paragraph has been deleted --> Turn the left hand end<lb/> | |||
of the same middle line <add>that</add><lb/> | |||
trace another line to that<lb/> | |||
same furthest point; in<lb/> | |||
that same manner</p> | |||
<p>16<lb/> | |||
You will this have another<lb/> | |||
line which being<lb/> | |||
traced by the same twig<lb/> | |||
can not be different in<lb/> | |||
its length — <add>from —</add> can not be<lb/> | |||
otherwise than exactly<lb/> | |||
equal to the first.</p> | |||
<p>17<lb/> | |||
Thus then you have<lb/> | |||
two lines equal to one<lb/> | |||
another</p> | |||
<p>18<lb/> | |||
In that same manner<lb/> | |||
From the right hand<lb/> | |||
end of that same middle<lb/> | |||
line <add>with that same twig</add> trace now another<lb/> | |||
line to that same furthest<lb/> | |||
point. By this means<lb/> | |||
you have obtained a<lb/> | |||
third line exactly equal<lb/> | |||
to <del>both</del> each of the two<lb/> | |||
others which you have<lb/> | |||
already seen to be exactly<lb/> | |||
equal the one to the other<lb/> | |||
Thus have you obtained<lb/> | |||
<del>a figure</del> <unclear><sic>compleat</sic> plain</unclear><lb/> | |||
figure — a surface<lb/> | |||
bounded on all sides<lb/> | |||
by three lines all of<lb/> | |||
them of the same length<lb/> | |||
a trilateral equilateral<lb/> | |||
figure.</p> | |||
<p>19<lb/> | |||
These three lines <del>will</del><lb/> | |||
you will see meeting at<lb/> | |||
three places: and at each<lb/> | |||
of these places, you will<lb/> | |||
see two of the lines forming<lb/> | |||
between them one angle or<lb/> | |||
corner: on consideration<lb/> | |||
of this circumstance the<lb/> | |||
figure is called a triangular<lb/> | |||
figure and in consideration<lb/> | |||
of the equality of <del>the</del> <add>all</add> three bounding<lb/> | |||
lines an equilateral<lb/> | |||
triangle. M. T. Col. 2</p> | |||
<!-- DO NOT EDIT BELOW THIS LINE --> | <!-- DO NOT EDIT BELOW THIS LINE --> | ||
{{Metadata:{{PAGENAME}}}} | {{Metadata:{{PAGENAME}}}}{{Completed}} | ||
1824 May 5
Posology — Rudiments
1
The contrivance in
Euclids first proposition.
— namely a Problem — how to construct
an equilateral triangle.
Mode of designating and
exhibiting it.
2
Here it follows expressed
in the asi
and historical inferential or conjectural
method.
3
Take any portion of
matter exhibiting a rectilinear figure
for instance a small
twig of a tree
the straitest you can
find: consider it as if it were
perfectly strait.
4
Describe two circles with
it.
5
Circle the first is described
by keeping the twig fixt
at one of the its ends as
points: which with the
exception of the
point at that end, the rest
of the twig is moved round
till it comes back into the
a position exactly the same
as that which it occupied
before it began to move.
6
If the twig has any
coloring matter on
that part of its surface
which touches the ground
and this matter is sufficiently
copious and
adheres to leave a
mark over the whole of
the surface to which it
has applied itself, the
sort of figure
called a circle will
be the result
7
The line by which the
figure is bounded at all
points over which the moving
end of the twig has passed is the circumferential line: — in one word, the circumference.
---page break---
8
One mark having thus
been made with the twig,
employ now this same
twig in the formation of
another circle
9
But in the formation
of this new circle the
whole twig must not be
moved from the position
it had when employed
in the formation of the
first circle
10
The end which in the
formation of the first circle
was the first end, must
in the formation of the second
circle be the moving
end: and conversely,
the end which in the formation
of the first circle
was the moving end must
new be the fixt end
11
The position which
the twig occupied the instant
before the formation
of the first circle was commenced
should have
been noted: if supposing
the coloring matter
previously applied to it
on the raising of the the whole
twig from its position
it will have been seen
to have left on the ground
the figure of a line.
12
The second circle
having been formed as
above, the result will
be two circular figures
cutting one another at
two points.
---page break---
13
If The position of the twig at the
commencement of the second
circle was such
as to be a continuation
of that at which it
occupied at the formation
of the first in
such sort that no angle
or corner can be seen
to be formed between the
two, the whole line is composed
will thus be seen composed
of three distinguishable
parts: 1. a middle
part which belongs equally
to both circles
2. a part peculiar to
the first circle: and being
either on the left or
the right of the middle
line — say on the left.
3. and a part peculiar
to the second circle
and being on the right
of the middle line.
Place now the whole compound
figure with the compound line before
you in such this a horizontal
position
14
Place yourself now in
such a situation as
that nearest to you
shall be the bottom lower
parts of the two the circles
thus connected circles.
furthest from you consequently
the upper top
parts.
15
From the right hand
end of the middle line
trace a line to that one
of the two intersecting parts
of the two circles which
is
---page break---
is furthest from you: this
you may do by laying that
same twig in that position
Turn the left hand end
of the same middle line that
trace another line to that
same furthest point; in
that same manner
16
You will this have another
line which being
traced by the same twig
can not be different in
its length — from — can not be
otherwise than exactly
equal to the first.
17
Thus then you have
two lines equal to one
another
18
In that same manner
From the right hand
end of that same middle
line with that same twig trace now another
line to that same furthest
point. By this means
you have obtained a
third line exactly equal
to both each of the two
others which you have
already seen to be exactly
equal the one to the other
Thus have you obtained
a figure compleat plain
figure — a surface
bounded on all sides
by three lines all of
them of the same length
a trilateral equilateral
figure.
19
These three lines will
you will see meeting at
three places: and at each
of these places, you will
see two of the lines forming
between them one angle or
corner: on consideration
of this circumstance the
figure is called a triangular
figure and in consideration
of the equality of the all three bounding
lines an equilateral
triangle. M. T. Col. 2
|
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135 |
posology |
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299 |
posology rudiments |
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001 |
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rudiments sheet (brouillon) |
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jeremy bentham |
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46417 |
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