<![CDATA[Geometric Construction Then Minimize Area]]>
https://help.geogebra.org/topic/geometric-construction-then-minimize-area
Tue, 16 Feb 2021 21:48:46 +0000Fri, 12 Feb 2021 23:49:10 +0000Zend_Feed<![CDATA[ Triangle équilatéral circonscrit à un triangle 3,4 et 5 ?]]>
https://help.geogebra.org/topic/geometric-construction-then-minimize-area#comment-298236
Sat, 13 Feb 2021 03:21:47 +0000<![CDATA[oder allgemein?]]>
https://help.geogebra.org/topic/geometric-construction-then-minimize-area#comment-298246
Sat, 13 Feb 2021 09:09:19 +0000<![CDATA[moving mm in attached you can see that minimum is when one side of equilateral is over minimum side of 345 triangle really the problem can be maximum minimum=12.20652 maximum=,26.43376]]>
https://help.geogebra.org/topic/geometric-construction-then-minimize-area#comment-298262
Sat, 13 Feb 2021 11:32:42 +0000<![CDATA[Hi, hmm, I think, that the equilateral triangle should be inside the 3-4-5-triangle ... Solution with CAS ≈ 1.36]]>
https://help.geogebra.org/topic/geometric-construction-then-minimize-area#comment-298286
Sat, 13 Feb 2021 14:07:09 +0000<![CDATA[a solution by using geometric construction (solution without CAS: 1.36189 )]]>
https://help.geogebra.org/topic/geometric-construction-then-minimize-area#comment-298398
Sun, 14 Feb 2021 21:50:27 +0000<![CDATA[Thanks mire2 could you explain what you are doing? Also how do u use CAS + geometry? is that online CAS or not? cuz when I do online CAS, I cant make segments and stuff]]>
https://help.geogebra.org/topic/geometric-construction-then-minimize-area#comment-298546
Tue, 16 Feb 2021 01:35:50 +0000<![CDATA[Salut, I hope the attached file explains it better. Main Idea: Starting from a point P=(p,0) and finding points with equal distances. Minimizing this distance That's it. Great Job accomplished. 😎]]>
https://help.geogebra.org/topic/geometric-construction-then-minimize-area#comment-298606
Tue, 16 Feb 2021 21:48:50 +0000