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mathematical sculptures by MO-Labs Logo
  • gifts
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  • materials
    • strong and flexible
    • multiple color sandstone
    • precious metal
    • steel
  • people
    • A-F
      • Werner Boy
      • Arthur Cayley
      • Alfred Clebsch
    • G-K
      • Olaus Henrici
      • Felix Klein
      • Ernst Eduard Kummer
    • L-R
      • August Ferdinand Möbius
      • Carl Rodenberg
    • S-Z
      • Ludwig Schläfli
      • Eugenio Giuseppe Togliatti
      • Christian Wiener
  • subjects
    • algebraic geometry
      • cubic surfaces
        • Clebsch Diagonal Surface
      • quartic surfaces
      • quintic surface
      • sextic surface
      • discriminant surfaces
      • many singularities
    • differential geometry
      • curvature
      • constant-curvature
      • Minimal Surfaces
    • school math
      • 3d-graph
      • surface of revolution
    • space curves
      • algebraic space curve
      • sine / cosine based curves
    • topology
      • non-orientable surfaces
      • knots
  • series
    • math sculptures in context
    • speed curves series
    • 45 cubics series I (ball cut)
    • 45 cubics series II (cylinder cut)
  • in public
    • exhibits
      • exhibit “3d print studio” (Feb. 2017-)
      • exhibit “Forms and Formulas” (2012-16)
      • exhibit at “Dutch Math Days” (2016)
    • articles.books
      • article “Straight lines on models of curved surfaces” (2017)
  • cart
  • MO-Labs 45 cubics series II at Strasbourg, France
    45 cubics, series II (cylinder cut), 15cm
    Gallery

    45 cubics, series II (cylinder cut), 15cm

45 cubics, series II (cylinder cut), 15cm

The complete series of 45 types of cubic surfaces with only finitely many singularities and lines. We provide links to put a complete set of several cubic surface models into your shopping cart.

Oliver Labs2018-09-27T10:37:58+00:0045 cubics series II (cylinder cut), all, cubic surfaces, Ludwig Schläfli, strong and flexible|
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  • Space Curve in a cube with projections (1b) - a MO-Labs math model on Math-Sculpture.com
    Space curve in a cube with projections (1b)
    Gallery

    Space curve in a cube with projections (1b)

  • Space Curve in a cube with projections (1b) - a MO-Labs math model on Math-Sculpture.com Space Curve in a cube with projections (1b) - a MO-Labs math model on Math-Sculpture.com
  • Space Curve in a cube with projections (1b) - a MO-Labs math model on Math-Sculpture.com Space Curve in a cube with projections (1b) - a MO-Labs math model on Math-Sculpture.com

Space curve in a cube with projections (1b)

This space curve in a cube with projections (1b) is a math classic. Use a torch to compare the projections of the space curve (in the center) on a plane with the 3d-printed ones.

Oliver Labs2017-03-27T10:18:37+00:00algebraic space curve, algebraic space curve, all, Christian Wiener, for teachers, steel, strong and flexible|
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  • MO-Labs 45 cubics series II at Strasbourg, France
    45 cubics, series II (cylinder cut), 12cm
    Gallery

    45 cubics, series II (cylinder cut), 12cm

45 cubics, series II (cylinder cut), 12cm

The complete series of 45 types of cubic surfaces with only finitely many singularities and lines. We provide links to put a complete set of several cubic surface models into your shopping cart.

Oliver Labs2018-09-27T10:27:11+00:0045 cubics series II (cylinder cut), all, cubic surfaces, Ludwig Schläfli, strong and flexible|
Read More
  • 45 cubics at the exhibit Forms and Formulas, Lisbon
    45 cubics, series I (ball cut)
    Gallery

    45 cubics, series I (ball cut)

45 cubics, series I (ball cut)

The complete series of 45 types of cubic surfaces with only finitely many singularities and lines. We provide links to put a complete set of several cubic surface models into your shopping cart.

Oliver Labs2018-09-27T10:40:31+00:0045 cubics series I (ball cut), all, cubic surfaces, exhibit "Forms and Formulas" (2012-2016, Lisbon), Ludwig Schläfli, strong and flexible|
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  • The Henrici cubic with three cusps
    Gallery

    The Henrici cubic with three cusps

The Henrici cubic with three cusps

In the 19th century, Olaus Henrici constructed a model of a quite symmetric cubic surface. This is a modern variant of it, allowing also to look "inside" of it from the bottom.

Oliver Labs2017-03-27T22:40:55+00:00all, cubic surfaces, Olaus Henrici, strong and flexible|
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Recent Posts

  • Equations for lines and circles
  • Equations and Shapes
  • A Quintic with 15 Cusps
  • 45 cubics, series II (cylinder cut), 15cm
  • A gyroid, round cut

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