<![CDATA[Trace a path into a curve]]>
https://help.geogebra.org/topic/trace-a-path-into-a-curve
Tue, 19 May 2020 14:44:59 +0000Mon, 18 May 2020 16:07:32 +0000Zend_Feed<![CDATA[it is a part of cardioid ]]>
https://help.geogebra.org/topic/trace-a-path-into-a-curve#comment-282628
Mon, 18 May 2020 17:52:42 +0000<![CDATA[Thank you, what kind of equation did you use?]]>
https://help.geogebra.org/topic/trace-a-path-into-a-curve#comment-282640
Tue, 19 May 2020 01:42:05 +0000<![CDATA[Ah, I think I figured it out, it's Locus(H,G) right?]]>
https://help.geogebra.org/topic/trace-a-path-into-a-curve#comment-282642
Tue, 19 May 2020 03:45:58 +0000<![CDATA[Ok, the locus method works well in this case, but it becomes too laggy when there's a high quantity of them. Is there a way to use the cardioid equation? I tried to look up the equation, but I can't figure out how to fit the curve into my setup. Can anyone help me with this?]]>
https://help.geogebra.org/topic/trace-a-path-into-a-curve#comment-282662
Tue, 19 May 2020 11:55:05 +0000<![CDATA[What's the equation?]]>
https://help.geogebra.org/topic/trace-a-path-into-a-curve#comment-282670
Tue, 19 May 2020 13:21:13 +0000<![CDATA[The equation seems to be: (x^2+y^2-2ax)^2=4a^2.(x^2+y^2)Here's a few examples I found: https://www.geogebra.org/classic/B4esju2T https://www.geogebra.org/classic/qmcpqmud But there's also this one which uses Curve(cos(s) (1-cos(s)),sin(s) (1-cos(s)),s,0,t)https://www.geogebra.org/classic/dTw7UQEj This site also lists other equations: http://xahlee.info/SpecialP...]]>
https://help.geogebra.org/topic/trace-a-path-into-a-curve#comment-282684
Tue, 19 May 2020 13:43:12 +0000<![CDATA[This looks fine, try that inside Sequence() Curve(cos(s) (1-cos(s)),sin(s) (1-cos(s)),s,0,t) ]]>
https://help.geogebra.org/topic/trace-a-path-into-a-curve#comment-282688
Tue, 19 May 2020 14:37:14 +0000<![CDATA[How do I make the curve automatically match loc1 here? (even if you move point F): https://www.geogebra.org/cl...]]>
https://help.geogebra.org/topic/trace-a-path-into-a-curve#comment-282690
Tue, 19 May 2020 14:44:59 +0000