In this article we will use some special triangles, to construct polygonal chains that describe the families of logarithmic spirals, among which the celebrated Golden Spiral, Spira solaris and Pheidia Spiral
This spiral (given in polar coordinates r, ) can be seen as a missing member of the set of known sp...
In his book Spirals: From Theodorus to Chaos, Philip J. Davis explores the recurrence relation z_(n+...
AbstractA one-parameter family of spirals that can match planar, two-point G1 Hermite data is presen...
In this article we will use some special triangles, to construct polygonal chains that describe the ...
In this article we will use some special triangles, to construct polygonal chains that describe the ...
A Kepler triangle is a right-angled triangle whose sides sa- tisfy a geometric progression whose mea...
Triangles placed on a series of polygons can be arranged in circles or spirals, often resulting in v...
Logarithmic spirals are isogonal trajectories of pencils of lines. From a series of geometric conseq...
Knowledge about curves, plane geometry, polygons and visual patternsPolygons are drawn so that their...
With the article “Polygonal Spirals with Manageable Inclination Full Version of the Discussion" I ha...
The approximation of a golden logarithmic spiral by quarter circles is well known. Starting from thi...
Phyllotaxis is the study of arrangements of leafs and florets. The topology of triangular spiral (mu...
©2012 by the authors. This work is licensed under a Creative Commons License. JHM is a bi-annual jou...
trigonometric functions, hyperbolas, parabolas, cardioids,lemniscates, logarithmic spiralSinusoidal ...
M.C. Escher\u27s use of dilation symmetry in Path of Life III gives rise to a pattern of logarithmic...
This spiral (given in polar coordinates r, ) can be seen as a missing member of the set of known sp...
In his book Spirals: From Theodorus to Chaos, Philip J. Davis explores the recurrence relation z_(n+...
AbstractA one-parameter family of spirals that can match planar, two-point G1 Hermite data is presen...
In this article we will use some special triangles, to construct polygonal chains that describe the ...
In this article we will use some special triangles, to construct polygonal chains that describe the ...
A Kepler triangle is a right-angled triangle whose sides sa- tisfy a geometric progression whose mea...
Triangles placed on a series of polygons can be arranged in circles or spirals, often resulting in v...
Logarithmic spirals are isogonal trajectories of pencils of lines. From a series of geometric conseq...
Knowledge about curves, plane geometry, polygons and visual patternsPolygons are drawn so that their...
With the article “Polygonal Spirals with Manageable Inclination Full Version of the Discussion" I ha...
The approximation of a golden logarithmic spiral by quarter circles is well known. Starting from thi...
Phyllotaxis is the study of arrangements of leafs and florets. The topology of triangular spiral (mu...
©2012 by the authors. This work is licensed under a Creative Commons License. JHM is a bi-annual jou...
trigonometric functions, hyperbolas, parabolas, cardioids,lemniscates, logarithmic spiralSinusoidal ...
M.C. Escher\u27s use of dilation symmetry in Path of Life III gives rise to a pattern of logarithmic...
This spiral (given in polar coordinates r, ) can be seen as a missing member of the set of known sp...
In his book Spirals: From Theodorus to Chaos, Philip J. Davis explores the recurrence relation z_(n+...
AbstractA one-parameter family of spirals that can match planar, two-point G1 Hermite data is presen...