NetLogo Models Library:
Note: If you download the NetLogo application, every model in the Models Library is included.
This is a 3D version of the Sunflower model in the NetLogo Models Library. The interlocking spirals found in the seeds, petals and even branches of many plants occur naturally through the growth of the flower. This model attempts to demonstrate the growth of these naturally occurring spirals.
When a new seed emerges, the older ones grow slightly and move further from the center --- the source --- and the youngest seed finds the largest gap between existing seeds, in which it can grow. This gap can be found by turning counter clockwise. The angle made by this turn is a multiple of the golden ratio (1.618). The golden ratio, based on the Fibonacci series (1, 1, 2, 3, 5, 8, 13...), equals the limit of F(n)/F(n-1). Thus, these spirals can be mathematically generated, using the golden ratio.
For each clock-tick, a new turtle (can be seen as a seed or a petal) is created. As in nature, the turtle finds the appropriate position and begins growing. The 'appropriate position' is defined as the number of clock-ticks times the 'turn increment'. All of the other existing turtles move forward and grow slightly, with each clock-tick. If a turtle gets too close to the edge of the world, it dies.
The NUM-COLORS slider controls how many colors the turtles can be. (Using this will make some of the spirals stand out more, other stand out less.)
The STEP-SIZE slider controls how far away the turtle moves from the center, for each clock-tick.
The TURN-INCREMENT slider dictates the degree that each new turtle will turn to set its position in the spiral.
The SET TURN-INCREMENT buttons help to set the TURN-INCREMENT slider to specific values at and around the golden number. They are simply there to help achieve precision that can be difficult with the slider.
You can select different shapes using the FLOWER-TYPE chooser. For each shape the turtles move in different planes. In 2D-HORIZONTAL the turtles only move in the xy-plane, in 2D-VERTICAL they move in the yz-plane and they move in all three dimensions in both PINE CONE and SPIRAL.
If ROLL? is true turtles also rotate roll by TURN-INCREMENT.
Think about the spirals that you see. How many different ways can you make a pattern of spirals?
How does adding colors change the spirals you see? Does this change the phenomena, or only what you see?
Make the spirals go counter-clockwise.
Make the model draw your favorite flower's petal or seed pattern. For example, a buttercup or columbine could be made by creating 5 large petals of the appropriate colors.
In nature, real plants don't have the golden number "programmed" into them. Rather, the spirals form as the result of an emergent process, described in Conway and Guy's book (see below) and other sources. Can you extend this model to capture this emergent process?
Note in the code that the turtles
die when the reach the edge of the world. This is so that they don't wrap around and re-appear on the opposite side.
This is based on pp. 113-24 of John H. Conway and Richard K. Guy's "The Book of Numbers".
If you mention this model or the NetLogo software in a publication, we ask that you include the citations below.
For the model itself:
Please cite the NetLogo software as:
Copyright 2003 Uri Wilensky.
This work is licensed under the Creative Commons Attribution-NonCommercial-ShareAlike 3.0 License. To view a copy of this license, visit https://creativecommons.org/licenses/by-nc-sa/3.0/ or send a letter to Creative Commons, 559 Nathan Abbott Way, Stanford, California 94305, USA.
Commercial licenses are also available. To inquire about commercial licenses, please contact Uri Wilensky at firstname.lastname@example.org.
This is a 3D version of the 2D model Sunflower.
This model was created as part of the projects: PARTICIPATORY SIMULATIONS: NETWORK-BASED DESIGN FOR SYSTEMS LEARNING IN CLASSROOMS and/or INTEGRATED SIMULATION AND MODELING ENVIRONMENT. The project gratefully acknowledges the support of the National Science Foundation (REPP & ROLE programs) -- grant numbers REC #9814682 and REC-0126227.