Fractal Art Gallery

2011

Home

Art

Math

Business

This year I have extended what I started in 2009...all of the equations that generate
the images are tricomposite functions [but not in the traditional sense, f(g(h(x)))].
Here, a certain function is applied, call it f(z), and the output from that function
goes into a second function, call it g(z), and its output goes into a third function,
call it h(z), then goes back into f(z) repeating the cycle, subject to the customary
parameters...once again some intriguing results...hope you like them...

Thumbnails are 24-bit JPEG; larger images are 8-bit GIF.
Images within each series are arranged to be contrasting, yet randomly.

Please understand that these online size-reduced GIF images may show banding --
the original high resolution images are all continuous tones...and way nicer too...

N Series Overview Part 1 (144 Images) --- 2011 (:50)
N Series Overview Part 2 (144 Images) --- 2011 (:50)
N Series Overview Part 3 (168 Images) --- 2011 (:50)

N Series 1-6 Thumbnails (36 Images) --- 2011 (:30)
N Series 7-12 Thumbnails (36 Images) --- 2011 (:30)
N Series 13-18 Thumbnails (36 Images) --- 2011 (:30)
N Series 19-24 Thumbnails (36 Images) --- 2011 (:30)
N Series 25-30 Thumbnails (36 Images) --- 2011 (:30)
N Series 31-36 Thumbnails (36 Images) --- 2011 (:30)
N Series 37-42 Thumbnails (36 Images) --- 2011 (:30)
N Series 43-48 Thumbnails (36 Images) --- 2011 (:30)
N Series 49-54 Thumbnails (36 Images) --- 2011 (:30)
N Series 55-60 Thumbnails (36 Images) --- 2011 (:30)
N Series 61-66 Thumbnails (36 Images) --- 2011 (:30)
N Series 67-72 Thumbnails (36 Images) --- 2011 (:30)
N Series 73-76 Thumbnails (24 Images) --- 2011 (:20)

N Series 1 --- 2011
N Series 39 --- 2011
N Series 2 --- 2011
N Series 40 --- 2011
N Series 3 --- 2011
N Series 41 --- 2011
N Series 4 --- 2011
N Series 42 --- 2011
N Series 5 --- 2011
N Series 43 --- 2011
N Series 6 --- 2011
N Series 44 --- 2011
N Series 7 --- 2011
N Series 45 --- 2011
N Series 8 --- 2011
N Series 46 --- 2011
N Series 9 --- 2011
N Series 47 --- 2011
N Series 10 --- 2011
N Series 48 --- 2011
N Series 11 --- 2011
N Series 49 --- 2011
N Series 12 --- 2011
N Series 50 --- 2011
N Series 13 --- 2011
N Series 51 --- 2011
N Series 14 --- 2011
N Series 52 --- 2011
N Series 15 --- 2011
N Series 53 --- 2011
N Series 16 --- 2011
N Series 54 --- 2011
N Series 17 --- 2011
N Series 55 --- 2011
N Series 18 --- 2011
N Series 56 --- 2011
N Series 19 --- 2011
N Series 57 --- 2011
N Series 20 --- 2011
N Series 58 --- 2011
N Series 21 --- 2011
N Series 59 --- 2011
N Series 22 --- 2011
N Series 60 --- 2011
N Series 23 --- 2011
N Series 61 --- 2011
N Series 24 --- 2011
N Series 62 --- 2011
N Series 25 --- 2011
N Series 63 --- 2011
N Series 26 --- 2011
N Series 64 --- 2011
N Series 27 --- 2011
N Series 65 --- 2011
N Series 28 --- 2011
N Series 66 --- 2011
N Series 29 --- 2011
N Series 67 --- 2011
N Series 30 --- 2011
N Series 68 --- 2011
N Series 31 --- 2011
N Series 69 --- 2011
N Series 32 --- 2011
N Series 70 --- 2011
N Series 33 --- 2011
N Series 71 --- 2011
N Series 34 --- 2011
N Series 72 --- 2011
N Series 35 --- 2011
N Series 73 --- 2011
N Series 36 --- 2011
N Series 74 --- 2011
N Series 37 --- 2011
N Series 75 --- 2011
N Series 38 --- 2011
N Series 76 --- 2011