## A Quintic with 15 Cusps

The quintic with 15 cusps is a so-called world record surface: To our knowledge, it is not known if there may be a quintic with more than 15 cusps although it is known that a quintic cannot have more than 20 cusps.

The quintic with 15 cusps is a so-called world record surface: To our knowledge, it is not known if there may be a quintic with more than 15 cusps although it is known that a quintic cannot have more than 20 cusps.

Oliver Labs
2018-01-19T11:42:03+00:00
all, many singularities, quintic surface, strong and flexible|

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 Labs
2017-11-14T09:44:19+00:00
45 cubics series II (cylinder cut), all, cubic surfaces, Ludwig Schläfli, strong and flexible|

The gyroid is a modern classic. It is a so-called minimal surface. Our object is an approximation of it in terms of sine and cosine. This one shows more tunnels than our other version.

The Moebius Strip is a mathematical classic, and even for rings it has been used for many decades at least. Our version of the Moebius Strip ring, however, is special. Its shape is defined by a mathematical formula!

Oliver Labs
2017-04-03T12:27:49+00:00
all, August Ferdinand Möbius, for art lovers, for mathematicians, for teachers, non-orientable surfaces, precious metal, rings|

The Moebius Strip is a mathematical classic, and even for pendants it has been used for many decades at least. Our version of the Moebius Strip pendant, however, is special. Its shape is defined by a mathematical formula!

Oliver Labs
2017-04-03T12:27:15+00:00
all, August Ferdinand Möbius, non-orientable surfaces, pendants, precious metal|

The Moebius Strip is a mathematical classic, and even for rings it has been used for many decades at least. Our version of the Moebius Strip pendant, however, is special. Its shape is defined by a mathematical formula!

Oliver Labs
2017-04-03T12:27:35+00:00
acrylic glass, all, August Ferdinand Möbius, for art lovers, for mathematicians, for teachers, non-orientable surfaces, pendants, precious metal, precious plated metal, steel, strong and flexible|

A math vase of degree 3 without bottom. It has been created by rotating a graph of a polynomial of degree 3 about an axis.

Oliver Labs
2017-03-30T09:05:28+00:00
algebraic surface of revolution, all, cubic surfaces, strong and flexible, surface of revolution|

A math vase of degree 3. It has been creating by rotating a graph of a polynomial of degree 3 about an axis.

Oliver Labs
2017-03-30T09:05:07+00:00
algebraic surface of revolution, all, cubic surfaces, strong and flexible, surface of revolution|

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 Labs
2017-03-27T10:18:37+00:00
algebraic space curve, algebraic space curve, all, Christian Wiener, for teachers, steel, strong and flexible|

This space curve in a cube is a math classic. To view its projections on a plane, just take a torch (or your cell phone lamp).

Oliver Labs
2017-03-27T09:36:56+00:00
algebraic space curve, algebraic space curve, all, Christian Wiener, curvature, for teachers, strong and flexible|

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