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ConvexHullMesh—Wolfram Language Documentation

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Examplesopen allclose all Basic Examples (3)

A 1D convex hull mesh:

The region is the smallest convex region that includes the points:

A 2D convex hull mesh:

The region is the smallest convex region that includes the points:

A 3D convex hull mesh:

The region is the smallest convex region that includes the points:

Scope (3)

Create a 1D convex hull mesh from a set of points:

Basic properties:

Convex hull meshes are bounded:

Convex hull meshes are full dimensional:

Find its area and centroid:

Test for point membership:

Find the nearest point and its distance:

Create a 2D convex hull mesh from a set of points:

Basic properties:

Convex hull meshes are bounded:

Convex hull meshes are full dimensional:

Find its area and centroid:

Test for point membership:

Find the nearest point and its distance:

Create a 3D convex hull mesh from a set of points:

Basic properties:

Convex hull meshes are bounded:

Convex hull meshes are full dimensional:

Find its volume and centroid:

Find its surface area:

Find the nearest point and its distance:

Options (13) MeshCellHighlight (3)

MeshCellHighlight allows you to specify highlighting for parts of a ConvexHullMesh:

By making faces transparent, the internal structure of a 3D ConvexHullMesh can be seen:

Individual cells can be highlighted using their cell index:

Or by the cell itself:

MeshCellLabel (2)

MeshCellLabel can be used to label parts of a ConvexHullMesh:

Individual cells can be labeled using their cell index:

Or by the cell itself:

MeshCellShapeFunction (2) MeshCellStyle (3)

MeshCellStyle allows you to specify styling for parts of a ConvexHullMesh:

By making faces transparent, the internal structure of a 3D ConvexHullMesh can be seen:

Individual cells can be highlighted using their cell index:

Or by the cell itself:

PlotTheme (2)

Use a theme with grid lines and a legend:

Use a theme to draw a wireframe:

Applications (2)

The convex hull of a compound of five tetrahedra is a dodecahedron:

Compute the convex hull of a cow:

Visualize convex hull and cow:

Properties & Relations (3) Wolfram Research (2014), ConvexHullMesh, Wolfram Language function, https://reference.wolfram.com/language/ref/ConvexHullMesh.html (updated 2020). Text Wolfram Research (2014), ConvexHullMesh, Wolfram Language function, https://reference.wolfram.com/language/ref/ConvexHullMesh.html (updated 2020).CMS Wolfram Language. 2014. "ConvexHullMesh." Wolfram Language & System Documentation Center. Wolfram Research. Last Modified 2020. https://reference.wolfram.com/language/ref/ConvexHullMesh.html.APA Wolfram Language. (2014). ConvexHullMesh. Wolfram Language & System Documentation Center. Retrieved from https://reference.wolfram.com/language/ref/ConvexHullMesh.htmlBibTeX @misc{reference.wolfram_2025_convexhullmesh, author="Wolfram Research", title="{ConvexHullMesh}", year="2020", howpublished="\url{https://reference.wolfram.com/language/ref/ConvexHullMesh.html}", note=[Accessed: 12-July-2025 ]}BibLaTeX @online{reference.wolfram_2025_convexhullmesh, organization={Wolfram Research}, title={ConvexHullMesh}, year={2020}, url={https://reference.wolfram.com/language/ref/ConvexHullMesh.html}, note=[Accessed: 12-July-2025 ]}

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