Timeline for How to plot a function from the sphere to the reals as a colored sphere?
Current License: CC BY-SA 3.0
9 events
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| Mar 8, 2018 at 10:57 | history | bumped | CommunityBot | This question has answers that may be good or bad; the system has marked it active so that they can be reviewed. | |
| Feb 6, 2018 at 10:40 | history | bumped | CommunityBot | This question has answers that may be good or bad; the system has marked it active so that they can be reviewed. | |
| Jan 7, 2018 at 10:31 | answer | added | webcpu | timeline score: 0 | |
| Jan 6, 2018 at 11:22 | answer | added | ubpdqn | timeline score: 1 | |
| Jan 6, 2018 at 9:00 | comment | added | MeMyselfI | @Rahul Very nice thank you | |
| Jan 5, 2018 at 23:16 | comment | added | user484 |
One problem is that it should be dist[x_, y_, z_] := Abs[x + y] instead of dist[x_, y_, z_] = Abs[x + y]. Then you can just do SliceDensityPlot3D[dist[x, y, z], x^2 + y^2 + z^2 == 1, {x, -1, 1}, {y, -1, 1}, {z, -1, 1}, ColorFunction -> (Blend[{Red, Green}, #] &)].
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| Jan 5, 2018 at 17:33 | answer | added | george2079 | timeline score: 1 | |
| Jan 5, 2018 at 13:11 | comment | added | José Antonio Díaz Navas |
I think that something is wrong in the statement. You want to plot a colored unit sphere, however, $(x,y)$ coordinates can range to values within 2<=Abs[x+y]<=5, how can this be posible? Maybe, I am missing something...
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| Jan 5, 2018 at 11:02 | history | asked | MeMyselfI | CC BY-SA 3.0 |