Drag the point $B$ to change the angle $AOB$
(but stay on the right half of the circle). Press “r” to reset the diagram to its initial state. The red line $OE$ is an approximate trisector of the angle $AOB$. |
This construction, due to Free Jamison (see the reference at the top of this page) is a more accurate variant of the construction described in a simpler construction.
Consider the circular arc $AB$ centered at $O$, shown in the diagram above. Assume the angle $AOB$ is between 0 and 180 degrees. To trisect $AOB$, do:
The line $OE$ is an approximate trisector of the angle $AOB$.
Let $\alpha$ and $\beta$ be the sizes of the angles $AOB$ and $EOB$, respectively. The angle $FOD$ equals $\alpha/8$ by the construction, therefore the angle $FCD$, which is half the central angle $FOD$, is equal to $\alpha/16$. The triangle $DOC$ is isosceles, therefore the angle $ODC$ also equals $\alpha/16$.
In the triangle $OED$, let $x$ and $y$ be the sizes of the angles $OED$ and $EOD$, respectively. Since the sum $x+y$ of the triangle's internal angles equals the triangle's external angle $ODC$, we have $x+y = \alpha/16$. Let us note, however, that the angle $y$ equals $DOB$ minus $EOB$. Thus $y = 3\alpha/8 - \beta$, whence $x = \beta - 5\alpha/16$.
In the triangle $OED$, the side $DE$ is twice the side $OD$ by the construction, therefore the law of sines gives $\sin y = 2 \sin x$. Consequently, $\sin(3\alpha/8 - \beta) = 2 \sin(\beta - 5\alpha/16)$. Solving this for $\beta$ we arrive at: \[ \beta = \frac{5}{16} \alpha + \arctan \frac{\sin(a/16)}{2+\cos(a/16)} = \frac{1}{3} \alpha - \frac{1}{2^{12}\cdot3^4} \alpha^3 + O(\alpha^5) = \frac{1}{3} \alpha - \frac{1}{331776} \alpha^3 + O(\alpha^5). \]
We see that the trisection error $e(\alpha) = \alpha/3 - \beta$ is given by: \[ e(\alpha) = \frac{1}{48}\alpha - \arctan \frac{\sin(a/16)}{2+\cos(a/16)}. \] (This formula is also given in Jamison's article.) The function $e(a)$ is monotonically increasing in $\alpha$. The worst error on the interval $0 \le \alpha \le \pi/2$ is $e(\pi/2)$ = 0.0000117 radians = 0.00067 degrees. The worst error on the interval $0 \le \alpha \le \pi$ is $e(\pi)$ = 0.000093756 radians = 0.00537 degrees. Quite impressive!
This applet was created by
Rouben Rostamian
using
David Joyce's
Geometry
Applet on
July 22, 2002.
Cosmetic revisions on June 7, 2010.
Go to list of trisections |