Re: Trisecting an arbitrary angle
- From: bassam king karzeddin <bassam@xxxxxxxxxx>
- Date: Tue, 19 Jul 2005 09:27:55 EDT
> That is grate,
>
> This,might open doors to constructible polygons
>
> In fact,I have deduced & proved the same thing,I have
> mentioned that here:
>
> http://mathforum.org/kb/message.jspa?messageID=3802920
> &tstart=0
>
> I will provide examples soon.
Here is an example:
A Triangle that have an angle & its seventh multisection
(that is THETA & 7*THETA) will be given in the following symbolic (A,B,C) triangle .Where the sides are:
A = 1
B = X^3-5*X^2+6*X-1
C = SQRT(X)*(X^3-6*X^2+10*X-4)
Where : 4 >= X >= y
y = some fixed value I will define later
In other words,if (A,B,C) form a triangle you will surely
get an angle & its seventh multiple(in the same triangle)
I have a simple scientific calculator only
(casio,fx-82TL) SO:
Please,check this by MAPLE OR MATHEMATICA & REPORT HERE.
I have also obtained the general formula for the triangle
that have an angle & its integral multiple.
>
> Thank You for your interest.
>
> Bassam King Karzeddin
> Al-Hussein Bin Talal University
> JORDAN
.
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