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Title: Reconstruct Triangle from Points (Geometry) Post by Barukh on Sep 24th, 2007, 12:46am A well-known class of geometric construction problems requires construction of a triangle from three given parts (sides, angles, cevians, etc.). I believe several problems from this class were presented at this forum. The less known but not less fascinating is construction of a triangle from three given points. Here’s one: Given 3 points that are feet of the altitudes of a triangle, reconstruct the triangle. |
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Title: Re: Reconstruct Triangle from Points (Geometry) Post by Eigenray on Sep 24th, 2007, 3:49am Three weeks ago, I wouldn't have known how to do this ;) |
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Title: Re: Reconstruct Triangle from Points (Geometry) Post by Barukh on Sep 24th, 2007, 4:20am on 09/24/07 at 03:49:00, Eigenray wrote:
I am glad you learnt something new with a little help from me... :) BTW, how many solutions are there? |
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Title: Re: Reconstruct Triangle from Points (Geometry) Post by Eigenray on Sep 24th, 2007, 7:41am Looks like [hide]4[/hide], but could also be [hide]1 or infinity[/hide] in degenerate cases. |
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Title: Re: Reconstruct Triangle from Points (Geometry) Post by Barukh on Sep 24th, 2007, 9:36am on 09/24/07 at 07:41:56, Eigenray wrote:
What are the cases when you get a single solution? |
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Title: Re: Reconstruct Triangle from Points (Geometry) Post by Eigenray on Sep 24th, 2007, 10:52am on 09/24/07 at 09:36:08, Barukh wrote:
When the points are collinear? |
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Title: Re: Reconstruct Triangle from Points (Geometry) Post by Barukh on Sep 26th, 2007, 1:15am on 09/24/07 at 10:52:17, Eigenray wrote:
Right. Here is another one: 2. Given: one vertex, incenter, circumcenter. |
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Title: Re: Reconstruct Triangle from Points (Geometry) Post by Eigenray on Sep 26th, 2007, 3:39am Here is a rather uninspired solution: [hideb]Change coordinates so that the vertex is at O=(0,0), the incenter I=(1,0), and the circumcenter C=(a,b). Construct lines through O of slope http://www.ocf.berkeley.edu/~wwu/YaBBImages/symbols/pm.gifm. For each line, mark the point Xi on the line such that the perpendicular bisector of OX goes through C. Then we require that angle OX1I = angle IX1X2. Solving for Xi in terms of m, and equating the tangents of the angles, gives m = (2a-1)/http://www.ocf.berkeley.edu/~wwu/YaBBImages/symbols/surd.gif{4b2+4a-1}, which of course is constructible.[/hideb] But I'm quite sure that's not what you had in mind. |
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Title: Re: Reconstruct Triangle from Points (Geometry) Post by Barukh on Sep 26th, 2007, 3:51am on 09/26/07 at 03:39:58, Eigenray wrote:
Confirmed. |
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Title: Re: Reconstruct Triangle from Points (Geometry) Post by Aryabhatta on Sep 27th, 2007, 12:59am on 09/26/07 at 03:51:13, Barukh wrote:
Another method: [hide] Use the fact that the distance between the incenter and circumcenter is sqrt(R(R-2r)) where R is the circum-radius and r is the in-radius. Using this we can draw the incircle and circumcircle. The tangents to the incircle through one vertex and their intersections with the circumcircle determine the triangle. [/hide] |
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Title: Re: Reconstruct Triangle from Points (Geometry) Post by Barukh on Sep 27th, 2007, 6:19am Yes, exactly. Good job, Aryabhatta! :D BTW, how would you constuct the incircle? |
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Title: Re: Reconstruct Triangle from Points (Geometry) Post by Aryabhatta on Sep 27th, 2007, 11:09am on 09/27/07 at 06:19:46, Barukh wrote:
To construct the circle, we construct the radius first. To do that we construct x = R-2r. Let y = R Then we are given sqrt(xy) and y. We use the well known fact that the perpendicular on the hypotenuse of a right triangle is of length sqrt(xy) where x and y are the lengths of the two segments of the hypotenuse so formed because of the perpendicular on it. Given sqrt(xy) and y, we can easily construct the whole triangle and, as a result, we can construct x. |
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