Wolfram Function Repository
Instant-use add-on functions for the Wolfram Language
Function Repository Resource:
Square
Get the coordinates of the points on a square spiral with sides parallel to the axes
Contributed by:
George Beck
ResourceFunction["SquareSpiralPoints"][n] gives the list of coordinate pairs on a square spiral with n sides starting at the origin. |
Details and Options
The list starts at the origin and goes up, left, down, right and repeats.
Examples
Basic Examples (4)
Here are the points on the first four sides of the spiral:
| In[1]:= | ![ResourceFunction["SquareSpiralPoints"][4]](https://www.wolframcloud.com/obj/resourcesystem/images/1e1/1e1f4028-3b61-4921-b8cf-bb494b8ee7db/6855e37154746ec6.png){kind=small} |
| Out[1]= |  |
This shows the sequence of points in order on the first six sides:
| In[2]:= | ![With[{s = ResourceFunction["SquareSpiralPoints"][6]}, Graphics[{{Pink, PointSize[.03], Point[s]}, Arrow@Partition[s, 2, 1]}]]](https://www.wolframcloud.com/obj/resourcesystem/images/1e1/1e1f4028-3b61-4921-b8cf-bb494b8ee7db/36528b2298ab723a.png) |
| Out[2]= |  |
Forty black sides with 20 red sides overlaid:
| In[3]:= | ![Graphics[{Line@ResourceFunction["SquareSpiralPoints"][40], Red, Line@ResourceFunction["SquareSpiralPoints"][20]}]](https://www.wolframcloud.com/obj/resourcesystem/images/1e1/1e1f4028-3b61-4921-b8cf-bb494b8ee7db/7a3082d18af83ced.png){kind=small} |
| Out[3]= |  |
The number of points in n sides:
| In[4]:= | ![Length@ResourceFunction["SquareSpiralPoints"]@# & /@ Range[0, 10]](https://www.wolframcloud.com/obj/resourcesystem/images/1e1/1e1f4028-3b61-4921-b8cf-bb494b8ee7db/69e22e4795631e9e.png){kind=small} |
| Out[4]= |  |
| In[5]:= | ![Table[Floor[(n + 1)^2/4] + 1, {n, 0, 10}]](https://www.wolframcloud.com/obj/resourcesystem/images/1e1/1e1f4028-3b61-4921-b8cf-bb494b8ee7db/27bc2c668bbf8c8e.png){kind=small} |
| Out[5]= |  |
Neat Examples (2)
This finds the coordinate pairs that are a prime distance along the square spiral:
| In[6]:= | ![UlamSquareSpiralPoints[n_] := ResourceFunction["SquareSpiralPoints"][n][[
Prime@Range@PrimePi[Floor[(n + 1)^2/4] + 1] ]]](https://www.wolframcloud.com/obj/resourcesystem/images/1e1/1e1f4028-3b61-4921-b8cf-bb494b8ee7db/1ebb3112772b0399.png){kind=small} |
The larger points correspond to the primes 2, 3, 5, 7, 11, 13:
| In[7]:= | ![With[{n = 6}, Graphics[{{LightGray, Line@ResourceFunction["SquareSpiralPoints"]@n},
Point@ResourceFunction["SquareSpiralPoints"]@n, PointSize[.08], Point@UlamSquareSpiralPoints@n}, ImageSize -> 100]]](https://www.wolframcloud.com/obj/resourcesystem/images/1e1/1e1f4028-3b61-4921-b8cf-bb494b8ee7db/25800df3b1cbcd29.png) |
| Out[7]= |  |
About 12% of the numbers up to 10101 are prime:
| In[8]:= | ![With[{n = 200}, Floor[(n + 1)^2/4] + 1]](https://www.wolframcloud.com/obj/resourcesystem/images/1e1/1e1f4028-3b61-4921-b8cf-bb494b8ee7db/712f738891cd598e.png){kind=small} |
| Out[8]= |  |
| In[9]:= |  |
| Out[9]= |  |
Here are the first 1240 primes plotted along the square spiral:
| In[10]:= |  |
| Out[10]= |  |
About 11% of the numbers to 10101 are lucky:
| In[11]:= | ![ResourceFunction["LuckyNumbers"]@10101 // Length](https://www.wolframcloud.com/obj/resourcesystem/images/1e1/1e1f4028-3b61-4921-b8cf-bb494b8ee7db/7c75e917a97e848b.png){kind=small} |
| Out[11]= |  |
This finds the coordinate pairs that are at lucky number distances along the square spiral:
| In[12]:= | ![LuckySquareSpiralPoints[n_] := ResourceFunction["SquareSpiralPoints"][n][[
ResourceFunction["LuckyNumbers"][Floor[(n + 1)^2/4] + 1]
]]](https://www.wolframcloud.com/obj/resourcesystem/images/1e1/1e1f4028-3b61-4921-b8cf-bb494b8ee7db/0633d6a246eded73.png) |
Here are the first 1130 lucky numbers plotted along the square spiral:
| In[13]:= |  |
| Out[13]= |  |
Publisher
Related Links
Requirements
Wolfram Language 11.3 (March 2018) or above
Version History
- 1.0.0 – 26 February 2019
Related Resources
Related Symbols
License Information
This work is licensed under a Creative Commons Attribution 4.0 International License