Lissajous Curve (3, 2)

Template: 2d-parametric-chart

Gincker Type: Open

Discription: In mathematics, a Lissajous curve is a graph of a system of parametric equations that describe complex harmonic motion. The appearance of the curve is highly sensitive to the ratio of a/b .

Link: Click this link or the right image to see the live chart or shape.

(z^2+1)^2/(z^5+z)

Template: complex-domain-coloring

Gincker Type: Open

Discription: Domain coloring is a technique for visualizing complex functions. It represents the phase with a color hue value and the magnitude by brightness or saturation.

Link: Click this link or the right image to see the live chart or shape.

(z^a-1)*(z-2-i)^b/(z^c+2+2*i)

Template: complex-domain-coloring

Gincker Type: Open

Discription: Domain coloring is a technique for visualizing complex functions. It represents the phase with a color hue value and the magnitude by brightness or saturation.

Link: Click this link or the right image to see the live chart or shape.

3D helicoid line

Template: 3d-line

Gincker Type: Open

Discription: This template creates a 3d helicoid line using a set of parametric equations.

Link: Click this link or the right image to see the live chart or shape.

3D Line 2

Template: 3d-line

Gincker Type: Open

Discription: This templates creates a 3D parametric curve.

Link: Click this link or the right image to see the live chart or shape.

3D Line 3

Template: 3d-line

Gincker Type: Open

Discription: This templates creates a 3D parametric curve.

Link: Click this link or the right image to see the live chart or shape.

a/(b+z^2)

Template: complex-3d-chart

Gincker Type: Open

Discription: 3D chart for magnitude, real part, imaginary part, or phase of a specified complex-variable function over a complex plan.

Link: Click this link or the right image to see the live chart or shape.

Archemedean Spiral

Template: 2d-parametric-chart

Gincker Type: Open

Discription: The Archemedean spiral is a spiral named after Greek mathematician Archimedes. It is the locus of points corresponding to the locations over time of a point moving away from a fixed point with a constant speed along a line rotates with constant angular velocity.

Link: Click this link or the right image to see the live chart or shape.

asin(z)

Template: complex-3d-chart

Gincker Type: Open

Discription: 3D chart for magnitude, real part, imaginary part, or phase of a specified complex-variable function over a complex plan.

Link: Click this link or the right image to see the live chart or shape.

asinh(z)

Template: complex-3d-chart

Gincker Type: Open

Discription: 3D chart for magnitude, real part, imaginary part, or phase of a specified complex-variable function over a complex plan.

Link: Click this link or the right image to see the live chart or shape.

atan(z)

Template: complex-3d-chart

Gincker Type: Open

Discription: 3D chart for magnitude, real part, imaginary part, or phase of a specified complex-variable function over a complex plan.

Link: Click this link or the right image to see the live chart or shape.

atanh(z)

Template: complex-3d-chart

Gincker Type: Open

Discription: 3D chart for magnitude, real part, imaginary part, or phase of a specified complex-variable function over a complex plan.

Link: Click this link or the right image to see the live chart or shape.

Bean

Template: 2d-parametric-chart

Gincker Type: Open

Discription: Bean shape created using 2D parametric equations.

Link: Click this link or the right image to see the live chart or shape.

Bouligand Cushion

Template: 3d-parametric-chart

Gincker Type: Open

Discription: This template creates a parametric Bouligand cushion surface with a set of parametric equations.

Link: Click this link or the right image to see the live chart or shape.

Bouligand Cushion

Template: 3d-parametric-shape

Gincker Type: Open

Discription: This template creates a parametric Bouligand cushion shape with a set of parametric equations.

Link: Click this link or the right image to see the live chart or shape.

Bullet Nose

Template: 3d-parametric-chart

Gincker Type: Open

Discription: This template creates a parametric bullet nose surface with a set of parametric equations.

Link: Click this link or the right image to see the live chart or shape.

Butterfly

Template: 2d-parametric-chart

Gincker Type: Open

Discription: Butterfly shape created using 2D parametric equations.

Link: Click this link or the right image to see the live chart or shape.

Circled Helicoid

Template: 3d-parametric-chart

Gincker Type: Open

Discription: The circled helicoid can be generated by the helical movement of a circle. This surface is created by extending a sphere along a diameter and then twisting.

Link: Click this link or the right image to see the live chart or shape.

Circled Helicoid

Template: 3d-parametric-shape

Gincker Type: Open

Discription: The circled helicoid can be generated by the helical movement of a circle. This surface is created by extending a sphere along a diameter and then twisting.

Link: Click this link or the right image to see the live chart or shape.

Circles

Template: 2d-parametric-chart

Gincker Type: Open

Discription: Circles created using 2D parametric equations.

Link: Click this link or the right image to see the live chart or shape.

Circular

Template: 2d-parametric-chart

Gincker Type: Open

Discription: Circular shape created using 2D parametric equations.

Link: Click this link or the right image to see the live chart or shape.

Complex 28

Template: complex-iterated-function

Gincker Type: Open

Discription: Complex 28 patterns created based on the domain coloring for a complex function. Various patterns can be created by specifying different colormaps.

Link: Click this link or the right image to see the live chart or shape.

Complex 29

Template: complex-iterated-function

Gincker Type: Open

Discription: Complex 29 patterns created based on the domain coloring for a complex function. Various patterns can be created by specifying different colormaps.

Link: Click this link or the right image to see the live chart or shape.

Complex 30

Template: complex-iterated-function

Gincker Type: Open

Discription: Complex 30 patterns created based on the domain coloring for a complex function. Various patterns can be created by specifying different colormaps.

Link: Click this link or the right image to see the live chart or shape.

Complex 31

Template: complex-iterated-function

Gincker Type: Open

Discription: Complex 31 patterns created based on the domain coloring for a complex function. Various patterns can be created by specifying different colormaps.

Link: Click this link or the right image to see the live chart or shape.

Complex 32

Template: complex-iterated-function

Gincker Type: Open

Discription: Complex 32 patterns created based on the domain coloring for a complex function. Various patterns can be created by specifying different colormaps.

Link: Click this link or the right image to see the live chart or shape.

Complex 33

Template: complex-iterated-function

Gincker Type: Open

Discription: Complex 33 patterns created based on the domain coloring for a complex function. Various patterns can be created by specifying different colormaps.

Link: Click this link or the right image to see the live chart or shape.

Complex 34

Template: complex-iterated-function

Gincker Type: Open

Discription: Complex 34 patterns created based on the domain coloring for a complex function. Various patterns can be created by specifying different colormaps.

Link: Click this link or the right image to see the live chart or shape.

Complex 35

Template: complex-iterated-function

Gincker Type: Open

Discription: Complex 35 patterns created based on the domain coloring for a complex function. Various patterns can be created by specifying different colormaps.

Link: Click this link or the right image to see the live chart or shape.

Cosine-Sine Shape

Template: 3d-parametric-shape

Gincker Type: Open

Discription: This template creates a 3D surface with a set of parametric cosine-sine equations

Link: Click this link or the right image to see the live chart or shape.

Cosine-Sine Surface

Template: 3d-parametric-chart

Gincker Type: Open

Discription: This template creates a 3D surface with a set of parametric cosine-sine equations

Link: Click this link or the right image to see the live chart or shape.

Cross Gap

Template: 3d-parametric-shape

Gincker Type: Open

Discription: Cross-gap is a representation of the projective plane. It is like a shrinked torus where there is no middle hole and the side has been pinched together in such a way that the top cross to the bottom.

Link: Click this link or the right image to see the live chart or shape.

Cross-Gap Surface

Template: 3d-parametric-chart

Gincker Type: Open

Discription: Cross-gap is a representation of the projective plane. It is like a shrinked torus where there is no middle hole and the side has been pinched together in such a way that the top cross to the bottom.

Link: Click this link or the right image to see the live chart or shape.

Cycloids (1, 3)

Template: 2d-parametric-chart

Gincker Type: Open

Discription: Cycloid is the trace of a point on a circle rolling upon another circle without slipping. When a circle is rolling externally upon a fixed circle - in the same manner a coin rolls around another - we have epicycloid. When the rolling is internal, we have hypocycloid.

Link: Click this link or the right image to see the live chart or shape.

Cycloids (1, -6)

Template: 2d-parametric-chart

Gincker Type: Open

Discription: Cycloid is the trace of a point on a circle rolling upon another circle without slipping. When a circle is rolling externally upon a fixed circle - in the same manner a coin rolls around another - we have epicycloid. When the rolling is internal, we have hypocycloid.

Link: Click this link or the right image to see the live chart or shape.

Cycloids (2, -7)

Template: 2d-parametric-chart

Gincker Type: Open

Discription: Cycloid is the trace of a point on a circle rolling upon another circle without slipping. When a circle is rolling externally upon a fixed circle - in the same manner a coin rolls around another - we have epicycloid. When the rolling is internal, we have hypocycloid.

Link: Click this link or the right image to see the live chart or shape.

Cycloids (3, -7)

Template: 2d-parametric-chart

Gincker Type: Open

Discription: Cycloid is the trace of a point on a circle rolling upon another circle without slipping. When a circle is rolling externally upon a fixed circle - in the same manner a coin rolls around another - we have epicycloid. When the rolling is internal, we have hypocycloid.

Link: Click this link or the right image to see the live chart or shape.

Cycloids (5, 1)

Template: 2d-parametric-chart

Gincker Type: Open

Discription: Cycloid is the trace of a point on a circle rolling upon another circle without slipping. When a circle is rolling externally upon a fixed circle - in the same manner a coin rolls around another - we have epicycloid. When the rolling is internal, we have hypocycloid.

Link: Click this link or the right image to see the live chart or shape.

Cycloids (6, 5)

Template: 2d-parametric-chart

Gincker Type: Open

Discription: Cycloid is the trace of a point on a circle rolling upon another circle without slipping. When a circle is rolling externally upon a fixed circle - in the same manner a coin rolls around another - we have epicycloid. When the rolling is internal, we have hypocycloid.

Link: Click this link or the right image to see the live chart or shape.

Cycloids (8, -21)

Template: 2d-parametric-chart

Gincker Type: Open

Discription: Cycloid is the trace of a point on a circle rolling upon another circle without slipping. When a circle is rolling externally upon a fixed circle - in the same manner a coin rolls around another - we have epicycloid. When the rolling is internal, we have hypocycloid.

Link: Click this link or the right image to see the live chart or shape.

Dini Shape

Template: 3d-parametric-shape

Gincker Type: Open

Discription: Dini shape is a surface with constant negative curvature that can be created by twisting a pseudosphere. It is named after Ulisse Dini.

Link: Click this link or the right image to see the live chart or shape.

Dini Surface

Template: 3d-parametric-chart

Gincker Type: Open

Discription: Dini surface is a surface with constant negative curvature that can be created by twisting a pseudosphere. It is named after Ulisse Dini.

Link: Click this link or the right image to see the live chart or shape.

Domain Coloring: a/(b+z^2)

Template: complex-domain-coloring

Gincker Type: Open

Discription: Domain coloring is a technique for visualizing complex functions. It represents the phase with a color hue value and the magnitude by brightness or saturation.

Link: Click this link or the right image to see the live chart or shape.

Domain Coloring: asin(z)

Template: complex-domain-coloring

Gincker Type: Open

Discription: Domain coloring is a technique for visualizing complex functions. It represents the phase with a color hue value and the magnitude by brightness or saturation.

Link: Click this link or the right image to see the live chart or shape.

Domain Coloring: asinh(z)

Template: complex-domain-coloring

Gincker Type: Open

Discription: Domain coloring is a technique for visualizing complex functions. It represents the phase with a color hue value and the magnitude by brightness or saturation.

Link: Click this link or the right image to see the live chart or shape.

Domain Coloring: atan(z)

Template: complex-domain-coloring

Gincker Type: Open

Discription: Domain coloring is a technique for visualizing complex functions. It represents the phase with a color hue value and the magnitude by brightness or saturation.

Link: Click this link or the right image to see the live chart or shape.

Domain Coloring: atanh(z)

Template: complex-domain-coloring

Gincker Type: Open

Discription: Domain coloring is a technique for visualizing complex functions. It represents the phase with a color hue value and the magnitude by brightness or saturation.

Link: Click this link or the right image to see the live chart or shape.

Domain Coloring: exp(z)

Template: complex-domain-coloring

Gincker Type: Open

Discription: Domain coloring is a technique for visualizing complex functions. It represents the phase with a color hue value and the magnitude by brightness or saturation.

Link: Click this link or the right image to see the live chart or shape.

Domain Coloring: log(z)

Template: complex-domain-coloring

Gincker Type: Open

Discription: Domain coloring is a technique for visualizing complex functions. It represents the phase with a color hue value and the magnitude by brightness or saturation.

Link: Click this link or the right image to see the live chart or shape.

Domain Coloring: sin(z)

Template: complex-domain-coloring

Gincker Type: Open

Discription: Domain coloring is a technique for visualizing complex functions. It represents the phase with a color hue value and the magnitude by brightness or saturation.

Link: Click this link or the right image to see the live chart or shape.

Domain Coloring: sinh(z)

Template: complex-domain-coloring

Gincker Type: Open

Discription: Domain coloring is a technique for visualizing complex functions. It represents the phase with a color hue value and the magnitude by brightness or saturation.

Link: Click this link or the right image to see the live chart or shape.

Domain Coloring: sqrt(z)

Template: complex-domain-coloring

Gincker Type: Open

Discription: Domain coloring is a technique for visualizing complex functions. It represents the phase with a color hue value and the magnitude by brightness or saturation.

Link: Click this link or the right image to see the live chart or shape.

Domain Coloring: tan(z)

Template: complex-domain-coloring

Gincker Type: Open

Discription: Domain coloring is a technique for visualizing complex functions. It represents the phase with a color hue value and the magnitude by brightness or saturation.

Link: Click this link or the right image to see the live chart or shape.

Domain Coloring: tanh(z)

Template: complex-domain-coloring

Gincker Type: Open

Discription: Domain coloring is a technique for visualizing complex functions. It represents the phase with a color hue value and the magnitude by brightness or saturation.

Link: Click this link or the right image to see the live chart or shape.

Domain Coloring: x^2+i*y^2

Template: complex-domain-coloring

Gincker Type: Open

Discription: Domain coloring is a technique for visualizing complex functions. It represents the phase with a color hue value and the magnitude by brightness or saturation.

Link: Click this link or the right image to see the live chart or shape.

Domain Coloring: z/(z^2+a*z+4)

Template: complex-domain-coloring

Gincker Type: Open

Discription: Domain coloring is a technique for visualizing complex functions. It represents the phase with a color hue value and the magnitude by brightness or saturation.

Link: Click this link or the right image to see the live chart or shape.

Drop Shape

Template: 3d-parametric-shape

Gincker Type: Open

Discription: This template creates a drop shape with a set of parametric equations.

Link: Click this link or the right image to see the live chart or shape.

Drop Surface

Template: 3d-parametric-chart

Gincker Type: Open

Discription: This template creates a drop surface with a set of parametric equations.

Link: Click this link or the right image to see the live chart or shape.

Elliptic Cone

Template: 3d-parametric-chart

Gincker Type: Open

Discription: An elliptic cone is a type of quadric surfaces. A quadric surface is a generalization of conic sections (ellipses, parabolas, and hyperbolas).

Link: Click this link or the right image to see the live chart or shape.

Elliptic Cone

Template: 3d-parametric-shape

Gincker Type: Open

Discription: An elliptic cone is a type of quadric surfaces. A quadric surface is a generalization of conic sections (ellipses, parabolas, and hyperbolas).

Link: Click this link or the right image to see the live chart or shape.

Elliptic Cyclide

Template: 3d-parametric-shape

Gincker Type: Open

Discription: Elliptic cyclide is a type of Dupin cyclides. Dupin cyclide is any geometric inversion of a standard torus, cylinder, or double cone. Dupin cyclides are natural objects in Lie sphere geometry.

Link: Click this link or the right image to see the live chart or shape.

Elliptic Cyclide

Template: 3d-parametric-chart

Gincker Type: Open

Discription: Elliptic cyclide is a type of Dupin cyclides. Dupin cyclide is any geometric inversion of a standard torus, cylinder, or double cone. Dupin cyclides are natural objects in Lie sphere geometry.

Link: Click this link or the right image to see the live chart or shape.

exp(z)

Template: complex-3d-chart

Gincker Type: Open

Discription: 3D chart for magnitude, real part, imaginary part, or phase of a specified complex-variable function over a complex plan.

Link: Click this link or the right image to see the live chart or shape.

Extruded Bean Shape

Template: 3d-extruded-shape

Gincker Type: Open

Discription: 3D extruded beans shape created from a path shape using a set of parametric equations.

Link: Click this link or the right image to see the live chart or shape.

Extruded Circle

Template: 3d-extruded-shape

Gincker Type: Open

Discription: 3D extruded circle created from a path shape using a set of parametric equations.

Link: Click this link or the right image to see the live chart or shape.

Extruded Cyclide

Template: 3d-extruded-shape

Gincker Type: Open

Discription: Extruded cyclide created from a path shape using a set of parametric equations. You can create a variety of cyclides by specifying different sets of parameters.

Link: Click this link or the right image to see the live chart or shape.

Extruded Flower

Template: 3d-extruded-shape

Gincker Type: Open

Discription: Extruded flower shape created from a path shape using a set of parametric equations.

Link: Click this link or the right image to see the live chart or shape.

Extruded Heart

Template: 3d-extruded-shape

Gincker Type: Open

Discription: Extruded heart shape created from a path shape using a set of parametric equations.

Link: Click this link or the right image to see the live chart or shape.

Flower

Template: 2d-parametric-chart

Gincker Type: Open

Discription: Flower shape created using 2D parametric equations.

Link: Click this link or the right image to see the live chart or shape.

From Vector Potential: Two Current Wires

Template: vector-chart-from-vector-potential

Gincker Type: Open

Discription: Vector chart of the magnetic field distribution created using the vector potential for a pair of long parallel current wires.

Link: Click this link or the right image to see the live chart or shape.

From Vector Potential: Current Wire

Template: vector-chart-from-vector-potential

Gincker Type: Open

Discription: Vector chart of the magnetic field distribution created using the vector potential for a current wire.

Link: Click this link or the right image to see the live chart or shape.

Globoid Shape

Template: 3d-parametric-shape

Gincker Type: Open

Discription: The Globoid surface can be generated by rotation of an arc of the circle about the z-axis lying at the plane of the arc.

Link: Click this link or the right image to see the live chart or shape.

Globoid Surface

Template: 3d-parametric-chart

Gincker Type: Open

Discription: The Globoid surface can be generated by rotation of an arc of the circle about the z-axis lying at the plane of the arc.

Link: Click this link or the right image to see the live chart or shape.

Heatmap: a/(b+z^2)

Template: complex-heatmap

Gincker Type: Open

Discription: Heatmap chart for magnitude, real part, imaginary part, or phase of a specified complex-variable function over a complex plan.

Link: Click this link or the right image to see the live chart or shape.

Heatmap: asin(z)

Template: complex-heatmap

Gincker Type: Open

Discription: Heatmap chart for magnitude, real part, imaginary part, or phase of a specified complex-variable function over a complex plan.

Link: Click this link or the right image to see the live chart or shape.

Heatmap: asinh(z)

Template: complex-heatmap

Gincker Type: Open

Discription: Heatmap chart for magnitude, real part, imaginary part, or phase of a specified complex-variable function over a complex plan.

Link: Click this link or the right image to see the live chart or shape.

Heatmap: atan(z)

Template: complex-heatmap

Gincker Type: Open

Discription: Heatmap chart for magnitude, real part, imaginary part, or phase of a specified complex-variable function over a complex plan.

Link: Click this link or the right image to see the live chart or shape.

Heatmap: atanh(z)

Template: complex-heatmap

Gincker Type: Open

Discription: Heatmap chart for magnitude, real part, imaginary part, or phase of a specified complex-variable function over a complex plan.

Link: Click this link or the right image to see the live chart or shape.

Heatmap: exp(z)

Template: complex-heatmap

Gincker Type: Open

Discription: Heatmap chart for magnitude, real part, imaginary part, or phase of a specified complex-variable function over a complex plan.

Link: Click this link or the right image to see the live chart or shape.

Heatmap: log(z)

Template: complex-heatmap

Gincker Type: Open

Discription: Heatmap chart for magnitude, real part, imaginary part, or phase of a specified complex-variable function over a complex plan.

Link: Click this link or the right image to see the live chart or shape.

Heatmap: sin(z)

Template: complex-heatmap

Gincker Type: Open

Discription: Heatmap chart for magnitude, real part, imaginary part, or phase of a specified complex-variable function over a complex plan.

Link: Click this link or the right image to see the live chart or shape.

Heatmap: sinh(z)

Template: complex-heatmap

Gincker Type: Open

Discription: Heatmap chart for magnitude, real part, imaginary part, or phase of a specified complex-variable function over a complex plan.

Link: Click this link or the right image to see the live chart or shape.

Heatmap: sqrt(z)

Template: complex-heatmap

Gincker Type: Open

Discription: Heatmap chart for magnitude, real part, imaginary part, or phase of a specified complex-variable function over a complex plan.

Link: Click this link or the right image to see the live chart or shape.

Heatmap: tan(z)

Template: complex-heatmap

Gincker Type: Open

Discription: Heatmap chart for magnitude, real part, imaginary part, or phase of a specified complex-variable function over a complex plan.

Link: Click this link or the right image to see the live chart or shape.

Heatmap: tanh(z)

Template: complex-heatmap

Gincker Type: Open

Discription: Heatmap chart for magnitude, real part, imaginary part, or phase of a specified complex-variable function over a complex plan.

Link: Click this link or the right image to see the live chart or shape.

Heatmap: z/(z^2+a*z+4)

Template: complex-heatmap

Gincker Type: Open

Discription: Heatmap chart for magnitude, real part, imaginary part, or phase of a specified complex-variable function over a complex plan.

Link: Click this link or the right image to see the live chart or shape.

Helicoid

Template: 3d-parametric-chart

Gincker Type: Open

Discription: A helicoid is a trace of a line. For any point on the surface, there is a line on the surface passing through it. Helicoids are shaped like screws and can be described be a set of parametric equations.

Link: Click this link or the right image to see the live chart or shape.

Helicoid

Template: 3d-parametric-shape

Gincker Type: Open

Discription: A helicoid is a trace of a line. For any point on the surface, there is a line on the surface passing through it. Helicoids are shaped like screws and can be described be a set of parametric equations.

Link: Click this link or the right image to see the live chart or shape.

Hyperboloid

Template: 3d-parametric-chart

Gincker Type: Open

Discription: In geometry, a hyperboloid is a type of quadric surfaces. A quadric surface is a generalization of conic sections (ellipses, parabolas, and hyperbolas).

Link: Click this link or the right image to see the live chart or shape.

Klein Bottle

Template: 3d-parametric-chart

Gincker Type: Open

Discription: A Klein bottle is an example of a non-orientable surface. It is a 2D manifold against which a system for determining a normal vector cannot be consistently defined. It is a one-side surface that, if traveled upon, could be followed back to the point of origin while flipping the traveler upside down.

Link: Click this link or the right image to see the live chart or shape.

Klein Bottle

Template: 3d-parametric-shape

Gincker Type: Open

Discription: A Klein bottle is an example of a non-orientable surface. It is a 2D manifold against which a system for determining a normal vector cannot be consistently defined. It is a one-side surface that, if traveled upon, could be followed back to the point of origin while flipping the traveler upside down.

Link: Click this link or the right image to see the live chart or shape.

Lattice(16, 19)

Template: 2d-parametric-chart

Gincker Type: Open

Discription: Lattice shape created using 2D parametric equations.

Link: Click this link or the right image to see the live chart or shape.

Lattice(2, 3)

Template: 2d-parametric-chart

Gincker Type: Open

Discription: Lattice shape created using 2D parametric equations.

Link: Click this link or the right image to see the live chart or shape.

Lattice(4, 7)

Template: 2d-parametric-chart

Gincker Type: Open

Discription: Lattice shape created using 2D parametric equations.

Link: Click this link or the right image to see the live chart or shape.

Lissajous Curve (5, 4)

Template: 2d-parametric-chart

Gincker Type: Open

Discription: In mathematics, a Lissajous curve is a graph of a system of parametric equations that describe complex harmonic motion. The appearance of the curve is highly sensitive to the ratio of a/b .

Link: Click this link or the right image to see the live chart or shape.

log(z)

Template: complex-3d-chart

Gincker Type: Open

Discription: 3D chart for magnitude, real part, imaginary part, or phase of a specified complex-variable function over a complex plan.

Link: Click this link or the right image to see the live chart or shape.

Moebius Surface

Template: 3d-parametric-chart

Gincker Type: Open

Discription: The Moebius strip is a surface with only one side. It has the mathematical property of being unorientable. It can be realized as a ruled surface. It has Euler characteristic of 0.

Link: Click this link or the right image to see the live chart or shape.

Monkey Saddle

Template: 3d-parametric-chart

Gincker Type: Open

Discription: The monkey saddle surface belongs to the class of saddle surfaces and its name derives from the observation that a saddle for a monkey requires three depressions: two for the legs, and one for the tail.

Link: Click this link or the right image to see the live chart or shape.

Peaks

Template: 3d-parametric-shape

Gincker Type: Open

Discription: This template creates a simple 3D shape for a mathematical peaks function with two parametric variables u and v.

Link: Click this link or the right image to see the live chart or shape.

Polar Chart: cos(a*t)^3 + sin(b*t)^2

Template: polar-chart

Gincker Type: Open

Discription: A polar chart is a circular plot on which data points are displayed using the angle (t), and the distance (r) from the center point.

Link: Click this link or the right image to see the live chart or shape.

Polar Chart: Log(Cosine), Log(Sine)

Template: polar-chart

Gincker Type: Open

Discription: A polar chart is a circular plot on which data points are displayed using the angle (t), and the distance (r) from the center point.

Link: Click this link or the right image to see the live chart or shape.

Polar Chart: Sine 10

Template: polar-chart

Gincker Type: Open

Discription: A polar chart is a circular plot on which data points are displayed using the angle (t), and the distance (r) from the center point.

Link: Click this link or the right image to see the live chart or shape.

Polar Chart: Sine40-39

Template: polar-chart

Gincker Type: Open

Discription: A polar chart is a circular plot on which data points are displayed using the angle (t), and the distance (r) from the center point.

Link: Click this link or the right image to see the live chart or shape.

Polar Chart: SIne50-49

Template: polar-chart

Gincker Type: Open

Discription: A polar chart is a circular plot on which data points are displayed using the angle (t), and the distance (r) from the center point.

Link: Click this link or the right image to see the live chart or shape.

Polar Rose

Template: polar-chart

Gincker Type: Open

Discription: In mathematics, a rose or rhodonea curve is a sinusoid plotted in polar coordinates. These curves can be expressed by a polar equation of the form r = cos(a*t/b). You can create various rose curves by changing parameters a and b.

Link: Click this link or the right image to see the live chart or shape.

Revolution: Bullet

Template: 3d-shape-of-revolution

Gincker Type: Open

Discription: Bullet shape created by rotating a plan curve described using a set of parametric equations around a rotation axis that lies on the same plan.

Link: Click this link or the right image to see the live chart or shape.

Revolution: cone

Template: 3d-shape-of-revolution

Gincker Type: Open

Discription: Cone shape created by rotating a plan curve described using a set of parametric equations around a rotation axis that lies on the same plan.

Link: Click this link or the right image to see the live chart or shape.

Revolution: Conical Frustrum

Template: 3d-shape-of-revolution

Gincker Type: Open

Discription: Conical frustrum shape created by rotating a plan curve described using a set of parametric equations around a rotation axis that lies on the same plan.

Link: Click this link or the right image to see the live chart or shape.

Revolution: Cosine

Template: 3d-shape-of-revolution

Gincker Type: Open

Discription: Cosine shape created by rotating a plan curve described using a set of parametric equations around a rotation axis that lies on the same plan.

Link: Click this link or the right image to see the live chart or shape.

Revolution: Cosine 2

Template: 3d-shape-of-revolution

Gincker Type: Open

Discription: Another cosine shape created by rotating a plan curve described using a set of parametric equations around a rotation axis that lies on the same plan.

Link: Click this link or the right image to see the live chart or shape.

Revolution: Cylinder

Template: 3d-shape-of-revolution

Gincker Type: Open

Discription: Cylinder shape created by rotating a plan curve described using a set of parametric equations around a rotation axis that lies on the same plan.

Link: Click this link or the right image to see the live chart or shape.

Revolution: Egg

Template: 3d-shape-of-revolution

Gincker Type: Open

Discription: Egg shape created by rotating a plan curve described using a set of parametric equations around a rotation axis that lies on the same plan.

Link: Click this link or the right image to see the live chart or shape.

Revolution: Eight Figure

Template: 3d-shape-of-revolution

Gincker Type: Open

Discription: Eight figure created by rotating a plan curve described using a set of parametric equations around a rotation axis that lies on the same plan.

Link: Click this link or the right image to see the live chart or shape.

Revolution: Hyperbolic

Template: 3d-shape-of-revolution

Gincker Type: Open

Discription: Hyperbolic shape created by rotating a plan curve described using a set of parametric equations around a rotation axis that lies on the same plan. Various shapes can be created by changing parameters.

Link: Click this link or the right image to see the live chart or shape.

Revolution: Parabola

Template: 3d-shape-of-revolution

Gincker Type: Open

Discription: Biquadrate parabola created by rotating a plan curve described using a set of parametric equations around a rotation axis that lies on the same plan.

Link: Click this link or the right image to see the live chart or shape.

Revolution: Parabolic Humming-Top

Template: 3d-shape-of-revolution

Gincker Type: Open

Discription: Parabolic Humming-top created by rotating a plan curve described using a set of parametric equations around a rotation axis that lies on the same plan. Various shapes can be created by changing parameters.

Link: Click this link or the right image to see the live chart or shape.

Revolution: Parabolic Log

Template: 3d-shape-of-revolution

Gincker Type: Open

Discription: Parabolic log created by rotating a plan curve described using a set of parametric equations around a rotation axis that lies on the same plan. Various shapes can be created by changing parameters.

Link: Click this link or the right image to see the live chart or shape.

Revolution: Pear

Template: 3d-shape-of-revolution

Gincker Type: Open

Discription: Pear created by rotating a plan curve described using a set of parametric equations around a rotation axis that lies on the same plan. Various shapes can be created by changing parameters.

Link: Click this link or the right image to see the live chart or shape.

Revolution: Sine Square

Template: 3d-shape-of-revolution

Gincker Type: Open

Discription: Sine square shape created by rotating a plan curve described using a set of parametric equations around a rotation axis that lies on the same plan. Various shapes can be created by changing parameters.

Link: Click this link or the right image to see the live chart or shape.

Revolution: Sphere

Template: 3d-shape-of-revolution

Gincker Type: Open

Discription: Sphere created by rotating a plan curve described using a set of parametric equations around a rotation axis that lies on the same plan. Various shapes can be created by changing parameters.

Link: Click this link or the right image to see the live chart or shape.

Revolution: Torus

Template: 3d-shape-of-revolution

Gincker Type: Open

Discription: Torus created by rotating a plan curve described using a set of parametric equations around a rotation axis that lies on the same plan. Various shapes can be created by changing parameters.

Link: Click this link or the right image to see the live chart or shape.

Simple Chart: Peaks

Template: 3d-simple-chart

Gincker Type: Open

Discription: This template creates a simple 3D chart for a mathematical peaks function with two variables or an x-y-z data set.

Link: Click this link or the right image to see the live chart or shape.

Simple Chart: Sinc

Template: 3d-simple-chart

Gincker Type: Open

Discription: This template creates a simple 3D chart for a mathematical sinc function with two variables or an x-y-z data set.

Link: Click this link or the right image to see the live chart or shape.

Simple Chart: SincXY

Template: 3d-simple-chart

Gincker Type: Open

Discription: This template creates a simple 3D chart for a mathematical sincXY function with two variables or an x-y-z data set.

Link: Click this link or the right image to see the live chart or shape.

Simple Chart: Sine & Exp

Template: 3d-simple-chart

Gincker Type: Open

Discription: This template creates a simple 3D sine and exponential chart for a mathematical function with two variables or an x-y-z data set.

Link: Click this link or the right image to see the live chart or shape.

sin(z)

Template: complex-3d-chart

Gincker Type: Open

Discription: 3D chart for magnitude, real part, imaginary part, or phase of a specified complex-variable function over a complex plan.

Link: Click this link or the right image to see the live chart or shape.

Sinc

Template: 3d-parametric-shape

Gincker Type: Open

Discription: This template creates a simple 3D shape for a mathematical sinc function with two variables u and v.

Link: Click this link or the right image to see the live chart or shape.

SincXY

Template: 3d-parametric-shape

Gincker Type: Open

Discription: This template creates a simple 3D shape for a mathematical sincXY function with two parametric variables u and v.

Link: Click this link or the right image to see the live chart or shape.

sinh(z)

Template: complex-3d-chart

Gincker Type: Open

Discription: 3D chart for magnitude, real part, imaginary part, or phase of a specified complex-variable function over a complex plan.

Link: Click this link or the right image to see the live chart or shape.

Soucoupoid Shape

Template: 3d-parametric-shape

Gincker Type: Open

Discription: This template creates a parametric soucoupoid surface with a set of parametric equations.

Link: Click this link or the right image to see the live chart or shape.

Soucoupoid Surface

Template: 3d-parametric-chart

Gincker Type: Open

Discription: This template creates a parametric soucoupoid surface with a set of parametric equations.

Link: Click this link or the right image to see the live chart or shape.

Sphere

Template: 3d-parametric-chart

Gincker Type: Open

Discription: This template creates a parametric sphere surface with a set of parametric equations.

Link: Click this link or the right image to see the live chart or shape.

Sphere

Template: 3d-parametric-shape

Gincker Type: Open

Discription: This template creates a parametric sphere surface with a set of parametric equations.

Link: Click this link or the right image to see the live chart or shape.

sqrt(z)

Template: complex-3d-chart

Gincker Type: Open

Discription: 3D chart for magnitude, real part, imaginary part, or phase of a specified complex-variable function over a complex plan.

Link: Click this link or the right image to see the live chart or shape.

tan(z)

Template: complex-3d-chart

Gincker Type: Open

Discription: 3D chart for magnitude, real part, imaginary part, or phase of a specified complex-variable function over a complex plan.

Link: Click this link or the right image to see the live chart or shape.

tanh(z)

Template: complex-3d-chart

Gincker Type: Open

Discription: 3D chart for magnitude, real part, imaginary part, or phase of a specified complex-variable function over a complex plan.

Link: Click this link or the right image to see the live chart or shape.

Torus

Template: 3d-parametric-chart

Gincker Type: Open

Discription: A torus is a surface of revolution generated by revolving a circle in 3D space about an axis coplanar with the circle. If the axis of revolution does not touch the circle, the surface has a ring shape and is called a torus.

Link: Click this link or the right image to see the live chart or shape.

Torus

Template: 3d-parametric-shape

Gincker Type: Open

Discription: A torus is a surface of revolution generated by revolving a circle in 3D space about an axis coplanar with the circle. If the axis of revolution does not touch the circle, the surface has a ring shape and is called a torus.

Link: Click this link or the right image to see the live chart or shape.

Trading Strategy: MA2 + NATR

Template: stock-backtest-crossover

Gincker Type: Open

Discription: The template uses MA2-NATR crossover strategy that combines the MA2 crossover with the average true range indicator. The MA crossover indicates the strength and direction of the market trend, while true-range indicator is used to identify whether the market is in the trending region or not.

Link: Click this link or the right image to see the live chart or shape.

Trading Strategy: Mean-reversion MA zscore

Template: stock-backtest-zscore

Gincker Type: Open

Discription: This template allows you to backtest the MA-Zscore strategy. This strategy uses the Bollinger band-like model based on the moving average.

Link: Click this link or the right image to see the live chart or shape.

Trading Strategy:CCI Mean-Reversion

Template: stock-backtest-zscore

Gincker Type: Open

Discription: This strategy is based on CCI indicator. CCI measures the current price level relative to an average price level over a given period of time. It can be used to identify overbought and oversold levels. .

Link: Click this link or the right image to see the live chart or shape.

Tube: Cone

Template: 3d-tube-shape

Gincker Type: Open

Discription: This template creates a 3D cone tube that extrudes along a 3D curve based on a set of parametric equations x(t), y(t), and z(t).

Link: Click this link or the right image to see the live chart or shape.

Tube: Figure Eight Knot

Template: 3d-tube-shape

Gincker Type: Open

Discription: This template creates a 3D figure eight knot tube that extrudes along a 3D curve based on a set of parametric equations x(t), y(t), and z(t).

Link: Click this link or the right image to see the live chart or shape.

Tube: Figure Eight knot 2

Template: 3d-tube-shape

Gincker Type: Open

Discription: This template creates another figure eight knot tube that extrudes along a 3D curve based on a set of parametric equations x(t), y(t), and z(t).

Link: Click this link or the right image to see the live chart or shape.

Tube: Figure Eight knot 3

Template: 3d-tube-shape

Gincker Type: Open

Discription: This template creates yet another figure eight knot tube that extrudes along a 3D curve based on a set of parametric equations x(t), y(t), and z(t).

Link: Click this link or the right image to see the live chart or shape.

Tube: Heart

Template: 3d-tube-shape

Gincker Type: Open

Discription: This template creates a heart tube that extrudes along a 3D curve based on a set of parametric equations x(t), y(t), and z(t).

Link: Click this link or the right image to see the live chart or shape.

Tube: Helix

Template: 3d-tube-shape

Gincker Type: Open

Discription: This template creates a helix tube that extrudes along a 3D curve based on a set of parametric equations x(t), y(t), and z(t).

Link: Click this link or the right image to see the live chart or shape.

Tube: Polynomial Knot (3,1)

Template: 3d-tube-shape

Gincker Type: Open

Discription: This template creates a polynomial (3,1) knot tube that extrudes along a 3D curve based on a set of parametric equations x(t), y(t), and z(t).

Link: Click this link or the right image to see the live chart or shape.

Tube: Polynomial Knot (4,1)

Template: 3d-tube-shape

Gincker Type: Open

Discription: This template creates a polynomial (4,1) knot tube that extrudes along a 3D curve based on a set of parametric equations x(t), y(t), and z(t).

Link: Click this link or the right image to see the live chart or shape.

Tube: Slinky

Template: 3d-tube-shape

Gincker Type: Open

Discription: This template creates a slinky tube that extrudes along a 3D curve based on a set of parametric equations x(t), y(t), and z(t).

Link: Click this link or the right image to see the live chart or shape.

Tube: Sphere

Template: 3d-tube-shape

Gincker Type: Open

Discription: This template creates a sphere tube that extrudes along a 3D curve based on a set of parametric equations x(t), y(t), and z(t).

Link: Click this link or the right image to see the live chart or shape.

Tube: Torus

Template: 3d-tube-shape

Gincker Type: Open

Discription: This template creates a torus tube that extrudes along a 3D curve based on a set of parametric equations x(t), y(t), and z(t).

Link: Click this link or the right image to see the live chart or shape.

Vector Chart from Field: A Wire Current

Template: vector-chart-from-field

Gincker Type: Open

Discription: Vector chart created using the field components for a wire current (magnetic field distribution).

Link: Click this link or the right image to see the live chart or shape.

Vector Chart from Field: Cosine, Sine

Template: vector-chart-from-field

Gincker Type: Open

Discription: Vector chart created using the field components for a cosine-sine field.

Link: Click this link or the right image to see the live chart or shape.

Vector Chart from Field: Electric Dipole

Template: vector-chart-from-field

Gincker Type: Open

Discription: Vector chart created using the field components for an electric dipole field.

Link: Click this link or the right image to see the live chart or shape.

Vector Chart from Field: Point Charge

Template: vector-chart-from-field

Gincker Type: Open

Discription: Vector chart created using the field components for a point charge.

Link: Click this link or the right image to see the live chart or shape.

Vector Chart from Field: Wind Model

Template: vector-chart-from-field

Gincker Type: Open

Discription: Vector chart created using the field components for a wind model.

Link: Click this link or the right image to see the live chart or shape.

Vector Chart from Field: X-Y Field

Template: vector-chart-from-field

Gincker Type: Open

Discription: Vector chart created using the field components for an X-Y field.

Link: Click this link or the right image to see the live chart or shape.

Vector Chart from Potential: a*y*sin(x) + b*x*y^2

Template: vector-chart-from-potential

Gincker Type: Open

Discription: Vector chart created using potential for a potential function of a*y*sin(x) + b*x*y^2.

Link: Click this link or the right image to see the live chart or shape.

Vector Chart from Potential: Charge Rod

Template: vector-chart-from-potential

Gincker Type: Open

Discription: Vector chart created from potential for a charge rod.

Link: Click this link or the right image to see the live chart or shape.

Vector Chart from Potential: Electric Dipole

Template: vector-chart-from-potential

Gincker Type: Open

Discription: Vector chart created using potential for an electric dipole.

Link: Click this link or the right image to see the live chart or shape.

Vector Chart from Potential: Octupole

Template: vector-chart-from-potential

Gincker Type: Open

Discription: Vector chart created using the potential for an electric octupole.

Link: Click this link or the right image to see the live chart or shape.

Vector Chart from Potential: Point Charge

Template: vector-chart-from-potential

Gincker Type: Open

Discription: Vector chart created using potential for a point charge.

Link: Click this link or the right image to see the live chart or shape.

Vector Chart from Potential: Quadrupole

Template: vector-chart-from-potential

Gincker Type: Open

Discription: Vector chart created using the potential for an electric quadrupole.

Link: Click this link or the right image to see the live chart or shape.

Whiteney Umbrella

Template: 3d-parametric-chart

Gincker Type: Open

Discription: A Whitney umbrella is a self-intersecting surface placed in 3D space. It is the union of all straight lines that pass through points of a fixed parabola and are perpendicular to a fixed straight line, parallel to the axis of the parabola and lying on its perpendicular bisecting plane.

Link: Click this link or the right image to see the live chart or shape.

z/(z^2+a*z+4)

Template: complex-3d-chart

Gincker Type: Open

Discription: 3D chart for magnitude, real part, imaginary part, or phase of a specified complex-variable function over a complex plan.

Link: Click this link or the right image to see the live chart or shape.

Without the need to write a single line of code, Gincker makes chart and graphics creation as easy as using a calculator, and graphics delivery and sharing as simple as posting a Tweet.

With Gincker, you can perform technical analysis and backtest trading strategies in just one click.

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