archematics/public/rostamian/trisect-raiford.html

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<h1>An angle trisection</h1>

<h4>
William R. Raiford, <i>An approximate trisection</i>,
American Mathematical Monthly,
vol.&nbsp;68, no.&nbsp;9, Nov 1961, p.&nbsp;917.
</h4>

<table class="centered">
<tr><td align="center">
<applet code="Geometry" archive="Geometry.zip" width="450" height="400">
<param name="background" value="ffffff">
<param name="title" value="An angle trisection">

<param name="e[1]"  value="O;point;fixed;210,365">
<param name="e[2]"  value="A;point;fixed;410,365">
<param name="e[3]"  value="pt0;point;fixed;410,0;none;none">
<param name="e[4]"  value="li0;line;connect;A,pt0;none;none;green">
<param name="e[5]"  value="cir1;circle;radius;O,A;none;none;none;none">
<param name="e[6]"  value="B;point;circleSlider;cir1,0,300;red;red">
<param name="e[7]"  value="OA;line;connect;O,A;none;none;blue">
<param name="e[8]"  value="OB;line;connect;O,B;none;none;blue">
<param name="e[9]"  value="arcAB;sector;sector;O,A,B;none;none;blue;none">
<param name="e[10]"  value="pt1;point;angleBisector;A,O,B;none;none">
<param name="e[11]"  value="C;point;cutoff;O,pt1,O,A">
<param name="e[12]" value="OC;line;connect;O,C;none;none;lightGray">
<param name="e[13]" value="li1;line;connect;B,C;none;none;lightGray">
<param name="e[14]" value="li2;line;extend;B,C,B,C;none;none;lightGray">
<param name="e[15]" value="T;point;intersection;li0,li2">
<param name="e[16]" value="OT;line;connect;O,T;none;none;red">

<!-- angle marker -->
<param name="e[17]" value="p1;point;fixed;240,385;none;none">
<param name="e[18]" value="c1;circle;radius;O,p1;none;none;none;none">
<param name="e[19]" value="l1;line;chord;OA,c1;none;none;none">
<param name="e[20]" value="q1;point;first;l1;none;none">
<param name="e[21]" value="l2;line;chord;O,T,c1;none;none;none">
<param name="e[22]" value="q2;point;first;l2;none;none">
<param name="e[23]" value="s1;sector;sector;O,q1,q2;none;none;black;orange">

<!-- angle marker -->
<param name="e[24]" value="l3;line;chord;OB,c1;none;none;none">
<param name="e[25]" value="q3;point;first;l3;none;none">
<param name="e[26]" value="s2;sector;sector;O,q2,q3;none;none;black;yellow">

</applet>
</td></tr>
<tr><td>
<b>
Drag the point $B$ to change the angle $AOB$.<br>
Press &ldquo;r&rdquo; to reset the diagram to its initial state.<br>
The red line $OT$ is an approximate trisector of the angle $AOB$.
</b>
</td></tr></table>

<h2>Construction</h2>

<p>
The construction described in the article cited at the top of the page,
is quite straightforward.  Consider the angle $AOB$ represented by the
circular arc $AB$ centered at $O$, as shown in the diagram above.
To trisect $AOB$ do:

<ol>

<li>
Erect a perpendicular to $OA$ at $A$ (shown in green).

<li>
Construct the bisector $OC$ of the angle $AOB$.

<li>
Connect $B$ to $C$ and extend to intersect the green line at a point $T$.

</ol>

The line $OT$ is an approximate trisector of the angle $AOB$.

<h2>Error Analysis</h2>

<p>
Let $\alpha$ and $\beta$ be the sizes of the angles $AOB$ and $AOT$,
respectively.  One may verify that
\[
	\beta 
	= \arctan \Big( \sin\alpha - (1 - \cos\alpha)
		\cot \big( \frac{3}{4}\alpha \big) \Big)
	= \frac{1}{3}\alpha + \frac{1}{2^3\cdot3^4} \alpha^3 + O(\alpha^5)
	= \frac{1}{3}\alpha + \frac{1}{648} \alpha^3 + O(\alpha^5).
\]

<p>
The error 
$
	\ds e(\alpha) = \beta - \frac{\alpha}{3}
$
is monotonically increasing in $\alpha$.
The worst error on the interval $0 \le \alpha \le \pi/2$ is
$e(\pi/2)$ = 0.0063 radians = 0.361 degrees.
The worst error on the interval $0 \le \alpha \le \pi$ is
$e(\pi)$ = 0.06 radians = 3.435 degrees.

<p>
<span class="name">Raiford</span>, whose affiliation is given as IBM,
states that he has calculated
the error in increments of one degree in an IBM&nbsp;709.  Computers
were novelties when that article was published.


<hr width="60%">
<p>
<em>This applet was created by
<a href="http://userpages.umbc.edu/~rostamia">Rouben Rostamian</a>
using
<a href="http://aleph0.clarku.edu/~djoyce/home.html">David Joyce</a>'s
<a href="http://aleph0.clarkU.edu/~djoyce/java/Geometry/Geometry.html">Geometry
Applet</a>
on June 14, 2010.
</em>
<p>

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<td valign="top">Go to <a href="index.html#trisections">list of trisections</a></td>
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feat: Start implementing Rostamian's pages (#39) Began with incenter.html, the first one alphabetically. Needed one new point construction method, and a new option to see what was going on. Got the planar diagrams on that page working. The next step on #36 will be to get 3D diagrams as the theorem on this page generalizes to 3D. That will be a bigger task, so merging this now. Reviewed-on: https://code.studioinfinity.org/glen/archematics/pulls/39 Co-authored-by: Glen Whitney <glen@studioinfinity.org> Co-committed-by: Glen Whitney <glen@studioinfinity.org> 2023-10-06 19:38:56 +00:00			`<!DOCTYPE HTML PUBLIC "-//W3C//DTD HTML 4.01 Transitional//EN">`
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			`<meta http-equiv="X-UA-Compatible" content="IE=EmulateIE7">`

			`<meta http-equiv="Content-Type" content="text/html; charset=utf-8">`
			`<title>An angle trisection</title>`
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			`<script type="text/javascript"`
			`src="http://cdn.mathjax.org/mathjax/latest/MathJax.js?config=TeX-AMS-MML_HTMLorMML,http://userpages.umbc.edu/~rostamia/mathjax-config.js">`
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			`</head>`
			`<body style="visibility:hidden">`

			`<h1>An angle trisection</h1>`

			`<h4>`
			`William R. Raiford, <i>An approximate trisection</i>,`
			`American Mathematical Monthly,`
			`vol. 68, no. 9, Nov 1961, p. 917.`
			`</h4>`

			`<table class="centered">`
			`<tr><td align="center">`
			`<applet code="Geometry" archive="Geometry.zip" width="450" height="400">`
			`<param name="background" value="ffffff">`
			`<param name="title" value="An angle trisection">`

			`<param name="e[1]" value="O;point;fixed;210,365">`
			`<param name="e[2]" value="A;point;fixed;410,365">`
			`<param name="e[3]" value="pt0;point;fixed;410,0;none;none">`
			`<param name="e[4]" value="li0;line;connect;A,pt0;none;none;green">`
			`<param name="e[5]" value="cir1;circle;radius;O,A;none;none;none;none">`
			`<param name="e[6]" value="B;point;circleSlider;cir1,0,300;red;red">`
			`<param name="e[7]" value="OA;line;connect;O,A;none;none;blue">`
			`<param name="e[8]" value="OB;line;connect;O,B;none;none;blue">`
			`<param name="e[9]" value="arcAB;sector;sector;O,A,B;none;none;blue;none">`
			`<param name="e[10]" value="pt1;point;angleBisector;A,O,B;none;none">`
			`<param name="e[11]" value="C;point;cutoff;O,pt1,O,A">`
			`<param name="e[12]" value="OC;line;connect;O,C;none;none;lightGray">`
			`<param name="e[13]" value="li1;line;connect;B,C;none;none;lightGray">`
			`<param name="e[14]" value="li2;line;extend;B,C,B,C;none;none;lightGray">`
			`<param name="e[15]" value="T;point;intersection;li0,li2">`
			`<param name="e[16]" value="OT;line;connect;O,T;none;none;red">`

			`<!-- angle marker -->`
			`<param name="e[17]" value="p1;point;fixed;240,385;none;none">`
			`<param name="e[18]" value="c1;circle;radius;O,p1;none;none;none;none">`
			`<param name="e[19]" value="l1;line;chord;OA,c1;none;none;none">`
			`<param name="e[20]" value="q1;point;first;l1;none;none">`
			`<param name="e[21]" value="l2;line;chord;O,T,c1;none;none;none">`
			`<param name="e[22]" value="q2;point;first;l2;none;none">`
			`<param name="e[23]" value="s1;sector;sector;O,q1,q2;none;none;black;orange">`

			`<!-- angle marker -->`
			`<param name="e[24]" value="l3;line;chord;OB,c1;none;none;none">`
			`<param name="e[25]" value="q3;point;first;l3;none;none">`
			`<param name="e[26]" value="s2;sector;sector;O,q2,q3;none;none;black;yellow">`

			`</applet>`
			`</td></tr>`
			`<tr><td>`
			`<b>`
			`Drag the point $B$ to change the angle $AOB$.<br>`
			`Press “r” to reset the diagram to its initial state.<br>`
			`The red line $OT$ is an approximate trisector of the angle $AOB$.`
			`</b>`
			`</td></tr></table>`

			`<h2>Construction</h2>`

			`<p>`
			`The construction described in the article cited at the top of the page,`
			`is quite straightforward. Consider the angle $AOB$ represented by the`
			`circular arc $AB$ centered at $O$, as shown in the diagram above.`
			`To trisect $AOB$ do:`

			`<ol>`

			`<li>`
			`Erect a perpendicular to $OA$ at $A$ (shown in green).`

			`<li>`
			`Construct the bisector $OC$ of the angle $AOB$.`

			`<li>`
			`Connect $B$ to $C$ and extend to intersect the green line at a point $T$.`

			`</ol>`

			`The line $OT$ is an approximate trisector of the angle $AOB$.`

			`<h2>Error Analysis</h2>`

			`<p>`
			`Let $\alpha$ and $\beta$ be the sizes of the angles $AOB$ and $AOT$,`
			`respectively. One may verify that`
			`\[`
			`\beta`
			`= \arctan \Big( \sin\alpha - (1 - \cos\alpha)`
			`\cot \big( \frac{3}{4}\alpha \big) \Big)`
			`= \frac{1}{3}\alpha + \frac{1}{2^3\cdot3^4} \alpha^3 + O(\alpha^5)`
			`= \frac{1}{3}\alpha + \frac{1}{648} \alpha^3 + O(\alpha^5).`
			`\]`

			`<p>`
			`The error`
			`$`
			`\ds e(\alpha) = \beta - \frac{\alpha}{3}`
			`$`
			`is monotonically increasing in $\alpha$.`
			`The worst error on the interval $0 \le \alpha \le \pi/2$ is`
			`$e(\pi/2)$ = 0.0063 radians = 0.361 degrees.`
			`The worst error on the interval $0 \le \alpha \le \pi$ is`
			`$e(\pi)$ = 0.06 radians = 3.435 degrees.`

			`<p>`
			`<span class="name">Raiford</span>, whose affiliation is given as IBM,`
			`states that he has calculated`
			`the error in increments of one degree in an IBM 709. Computers`
			`were novelties when that article was published.`


			`<hr width="60%">`
			`<p>`
			`<em>This applet was created by`
			`<a href="http://userpages.umbc.edu/~rostamia">Rouben Rostamian</a>`
			`using`
			`<a href="http://aleph0.clarku.edu/~djoyce/home.html">David Joyce</a>'s`
			`<a href="http://aleph0.clarkU.edu/~djoyce/java/Geometry/Geometry.html">Geometry`
			`Applet</a>`
			`on June 14, 2010.`
			`</em>`
			`<p>`

			`<table width="100%">`
			`<tr>`
			`<td valign="top">Go to <a href="index.html#trisections">list of trisections</a></td>`
			`<td align="right" style="width:200px;">`
			`<a href="http://validator.w3.org/check?uri=referer">`
			`<img src="/~rostamia/images/valid-html401.png" class="noborder" width="88" height="31" alt="Valid HTML"></a>`
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			`</table>`

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