<![CDATA[Optimizing Multivariable Functions]]>
https://help.geogebra.org/topic/optimizing-multivariable-functions
Fri, 17 Apr 2020 21:15:28 +0000Thu, 16 Apr 2020 18:10:42 +0000Zend_Feed<![CDATA[Please give an example]]>
https://help.geogebra.org/topic/optimizing-multivariable-functions#comment-279558
Thu, 16 Apr 2020 20:53:35 +0000<![CDATA[Thank you for your response. For example, consider f(x,y) = x^2 + y^2, which would be graphed on 3D Graphics. Is there a way for GeoGebra to calculate the extremum of the function which would give a point of three coordinates? In this case it would be (0,0,0) fo example. The extremum option is not available in 3D graphics, it is just available for graphs on the x-y plane.]]>
https://help.geogebra.org/topic/optimizing-multivariable-functions#comment-279562
Thu, 16 Apr 2020 22:24:37 +0000<![CDATA[I wrote a code that worked! (x(Min[f(x), -10, 10]), x(Min[f(x(Min[f(x), -10, 10]), x), -10, 10]), f(x(f(x), -10, 10]), x(Min[f(x(Min[f(x), -10, 10]), x), -10, 10]))) I think this makes the min function very powerful!]]>
https://help.geogebra.org/topic/optimizing-multivariable-functions#comment-279588
Fri, 17 Apr 2020 11:59:18 +0000<![CDATA[para expresiones polinomicas puedes igualar las derivadas parciales a 0 y resolver el sistema con el CAS]]>
https://help.geogebra.org/topic/optimizing-multivariable-functions#comment-279592
Fri, 17 Apr 2020 12:16:48 +0000<![CDATA[Maybe this is interesting :) https://www.geogebra.org/m/jyeskjy2]]>
https://help.geogebra.org/topic/optimizing-multivariable-functions#comment-279602
Fri, 17 Apr 2020 21:15:29 +0000