7

Clear["Global`*"] size = 250; testfig = ContourPlot[Sin[x^2 + y^2], {x, -Pi, Pi}, {y, -Pi, Pi}, ImageSize -> size, PlotLegends -> Automatic]; testfig2 = ContourPlot[Cos[x^2 + y^2], {x, -Pi, Pi}, {y, -Pi, Pi}, ImageSize -> size]; Row[{testfig, testfig2}] EDIT: For a legend below testfig = ContourPlot[Sin[x^2 + y^2], {x, -...


5

This is certainly suboptimal behavior, if not a bug. You can workaround the issue by using PlotStyle->None and including Opacity[1] in your style: ListPlot[ Table[Style[RandomReal[{-2,2},2],Opacity[1],PointSize[RandomReal[{0,0.03}]]],{i,100}], PlotStyle->None ] And, your second example: ListPlot[ Table[Style[{i,2},Opacity[1],PointSize[0.08-...


3

Use the graphics primitives from a2 as Prolog in Show and use the options PlotRangeClipping -> False and ImagePadding -> ... to prevent clipping: Show[a1, Prolog -> First @ a2, ImagePadding -> 70, PlotRangeClipping -> False]


3

ticks = Subdivide[## & @@ Rest@rs1, 8]; minorticks = Thread[{MovingAverage[ticks, 2], "", {0, .02}}, List, 1]; majorticks = Thread[{Rest@Most@ticks, Rest@Most@ticks, {0, 0.03}}, List, 2]; Plot[g1[x, 0.01], Evaluate[rs1], PlotRange -> {rx1, ry1}, PlotStyle -> {Purple}, Axes -> False, AspectRatio -> Automatic, Frame -> True, ...


2

I am not sure how to do this with TriangulateMesh but you can do this with the finite element mesher ToElementMesh (See the options for more details on "IncludePoints": Needs["NDSolve`FEM`"] includeCoord = N[{{0, 0}, {1/Sqrt[2], 1/2}}]; mesh = ToElementMesh[Disk[], "IncludePoints" -> includeCoord]; Position[mesh["...


1

This seems to work and allows you to carry on using the IntervalMarkers, but works by modifying the plot internals, so be careful if you add any other markers that might be based on BezierCurve internally: OverallSD = {{0.037, 0.75} \[PlusMinus] {{.008}, {.09}}} OverallSDPlot = ListPlot[{OverallSD}, IntervalMarkers -> "Ellipses", ...


1

Try Graphics[{FaceForm[Green], EdgeForm[Red], Ellipsoid[{0, 0}, {2, 1 }]}]


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