It is discontinuous everywhere.

It is differentiable everywhere.

It is continuous everywhere but differentiable nowhere.

It is differentiable at sharp points.

It is highly applicable in engineering.

It is a simple set of parametric equations.

It is a fractal curve.

It is used in calculus of variations.

Using one control point.

Using three control points.

Using two control points.

Using four control points.

Creating random shapes.

Designing fonts and complex shapes.

Simulating physical phenomena.

Optimizing energy consumption.

To optimize energy consumption.

To analyze the path swept by a point.

To determine the shortest path.

To create circular paths.

Time taken for an object to slide between two points.

Potential energy of a system.

Kinetic energy of a moving object.

Distance between two points.

Potential energy.

Total energy.

Time of travel.

Kinetic energy.

The longest path between two points on a surface.

The shortest path between two points on a surface.

A path that maximizes potential energy.

A path that minimizes kinetic energy.

Under rotational transformations.

Under linear transformations.

Under smooth transformations.

Under any transformation.

They describe the path of photons in spacetime.

They describe the path of light in a vacuum.

They describe the path of electrons.

They describe the path of sound waves.