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Western diamondback rattlesnake, Crotalus atrox Add To Light Table Emerald tree boa.  Emerald tree boas are nocturnal, finding and striking birds and small mammals in complete darkness.  They have infrared heat receptors around their faces that allow them to locate warm blooded prey in the dark, sensitive to as little as 0.4 degrees of Fahrenheit temperature differences, Corralus caninus Add To Light Table Emerald tree boa.  Emerald tree boas are nocturnal, finding and striking birds and small mammals in complete darkness.  They have infrared heat receptors around their faces that allow them to locate warm blooded prey in the dark, sensitive to as little as 0.4 degrees of Fahrenheit temperature differences, Corralus caninus Add To Light Table
Western diamondback rattlesnake.
Image ID: 12819  
Species: Western diamondback rattlesnake, Crotalus atrox
 
Emerald tree boa. Emerald tree boas are nocturnal, finding and striking birds and small mammals in complete darkness. They have infrared heat receptors around their faces that allow them to locate warm blooded prey in the dark, sensitive to as little as 0.4 degrees of Fahrenheit temperature differences.
Image ID: 13965  
Species: Emerald tree boa, Corralus caninus
 
Emerald tree boa. Emerald tree boas are nocturnal, finding and striking birds and small mammals in complete darkness. They have infrared heat receptors around their faces that allow them to locate warm blooded prey in the dark, sensitive to as little as 0.4 degrees of Fahrenheit temperature differences.
Image ID: 13966  
Species: Emerald tree boa, Corralus caninus
 
Gunthers whipsnake.  These tree-dwelling snakes eat only fish.  As a fish swims past, they strike it, delivering a mild venom that renders the fish immobile, Ahaetulla fronticincta Add To Light Table Gunthers whipsnake.  These tree-dwelling snakes eat only fish.  As a fish swims past, they strike it, delivering a mild venom that renders the fish immobile, Ahaetulla fronticincta Add To Light Table African rock python.  The largest of the African snakes, this python can measure up to 28 feet (8.5m) in length Add To Light Table
Gunthers whipsnake. These tree-dwelling snakes eat only fish. As a fish swims past, they strike it, delivering a mild venom that renders the fish immobile.
Image ID: 13967  
Species: Gunther's whipsnake, Ahaetulla fronticincta
 
Gunthers whipsnake. These tree-dwelling snakes eat only fish. As a fish swims past, they strike it, delivering a mild venom that renders the fish immobile.
Image ID: 13968  
Species: Gunther's whipsnake, Ahaetulla fronticincta
 
African rock python. The largest of the African snakes, this python can measure up to 28 feet (8.5m) in length.
Image ID: 13976  
 
Box turtle.  Box turtles are famous for their hinged shells, which allow them to retract almost completely into their bony armor, Terrapene Add To Light Table Box turtle.  Box turtles are famous for their hinged shells, which allow them to retract almost completely into their bony armor, Terrapene Add To Light Table Unidentified pelagic zooplankton, San Diego, California Add To Light Table
Box turtle. Box turtles are famous for their hinged shells, which allow them to retract almost completely into their bony armor.
Image ID: 13987  
Species: Box turtle, Terrapene
 
Box turtle. Box turtles are famous for their hinged shells, which allow them to retract almost completely into their bony armor.
Image ID: 13988  
Species: Box turtle, Terrapene
 
Unidentified pelagic zooplankton.
Image ID: 02493  
Location: San Diego, California, USA
 
Unidentified species of gelatinous zooplankton, San Diego, California Add To Light Table Detail within the Mandelbrot set fractal.  This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features.  Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself.  Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves.  Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns.  The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set, Mandelbrot set Add To Light Table Detail within the Mandelbrot set fractal.  This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features.  Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself.  Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves.  Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns.  The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set, Mandelbrot set Add To Light Table
Unidentified species of gelatinous zooplankton.
Image ID: 03769  
Location: San Diego, California, USA
 
Detail within the Mandelbrot set fractal. This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features. Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself. Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves. Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns. The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set.
Image ID: 10376  
Species: Mandelbrot Fractal, Mandelbrot set
 
Detail within the Mandelbrot set fractal. This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features. Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself. Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves. Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns. The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set.
Image ID: 10377  
Species: Mandelbrot Fractal, Mandelbrot set
 
Detail within the Mandelbrot set fractal.  This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features.  Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself.  Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves.  Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns.  The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set, Mandelbrot set Add To Light Table Detail within the Mandelbrot set fractal.  This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features.  Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself.  Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves.  Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns.  The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set, Mandelbrot set Add To Light Table Detail within the Mandelbrot set fractal.  This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features.  Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself.  Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves.  Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns.  The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set, Mandelbrot set Add To Light Table
Detail within the Mandelbrot set fractal. This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features. Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself. Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves. Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns. The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set.
Image ID: 10379  
Species: Mandelbrot Fractal, Mandelbrot set
 
Detail within the Mandelbrot set fractal. This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features. Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself. Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves. Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns. The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set.
Image ID: 10380  
Species: Mandelbrot Fractal, Mandelbrot set
 
Detail within the Mandelbrot set fractal. This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features. Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself. Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves. Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns. The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set.
Image ID: 10381  
Species: Mandelbrot Fractal, Mandelbrot set
 
Detail within the Mandelbrot set fractal.  This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features.  Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself.  Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves.  Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns.  The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set, Mandelbrot set Add To Light Table Detail within the Mandelbrot set fractal.  This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features.  Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself.  Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves.  Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns.  The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set, Mandelbrot set Add To Light Table Detail within the Mandelbrot set fractal.  This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features.  Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself.  Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves.  Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns.  The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set, Mandelbrot set Add To Light Table
Detail within the Mandelbrot set fractal. This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features. Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself. Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves. Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns. The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set.
Image ID: 10382  
Species: Mandelbrot Fractal, Mandelbrot set
 
Detail within the Mandelbrot set fractal. This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features. Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself. Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves. Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns. The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set.
Image ID: 10384  
Species: Mandelbrot Fractal, Mandelbrot set
 
Detail within the Mandelbrot set fractal. This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features. Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself. Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves. Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns. The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set.
Image ID: 10385  
Species: Mandelbrot Fractal, Mandelbrot set
 
Detail within the Mandelbrot set fractal.  This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features.  Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself.  Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves.  Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns.  The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set, Mandelbrot set Add To Light Table Detail within the Mandelbrot set fractal.  This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features.  Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself.  Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves.  Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns.  The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set, Mandelbrot set Add To Light Table Detail within the Mandelbrot set fractal.  This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features.  Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself.  Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves.  Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns.  The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set, Mandelbrot set Add To Light Table
Detail within the Mandelbrot set fractal. This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features. Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself. Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves. Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns. The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set.
Image ID: 10386  
Species: Mandelbrot Fractal, Mandelbrot set
 
Detail within the Mandelbrot set fractal. This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features. Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself. Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves. Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns. The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set.
Image ID: 10387  
Species: Mandelbrot Fractal, Mandelbrot set
 
Detail within the Mandelbrot set fractal. This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features. Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself. Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves. Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns. The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set.
Image ID: 10388  
Species: Mandelbrot Fractal, Mandelbrot set
 
Detail within the Mandelbrot set fractal.  This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features.  Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself.  Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves.  Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns.  The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set, Mandelbrot set Add To Light Table Detail within the Mandelbrot set fractal.  This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features.  Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself.  Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves.  Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns.  The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set, Mandelbrot set Add To Light Table Detail within the Mandelbrot set fractal.  This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features.  Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself.  Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves.  Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns.  The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set, Mandelbrot set Add To Light Table
Detail within the Mandelbrot set fractal. This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features. Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself. Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves. Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns. The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set.
Image ID: 10389  
Species: Mandelbrot Fractal, Mandelbrot set
 
Detail within the Mandelbrot set fractal. This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features. Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself. Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves. Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns. The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set.
Image ID: 10390  
Species: Mandelbrot Fractal, Mandelbrot set
 
Detail within the Mandelbrot set fractal. This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features. Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself. Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves. Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns. The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set.
Image ID: 10392  
Species: Mandelbrot Fractal, Mandelbrot set
 
Detail within the Mandelbrot set fractal.  This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features.  Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself.  Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves.  Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns.  The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set, Mandelbrot set Add To Light Table Detail within the Mandelbrot set fractal.  This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features.  Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself.  Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves.  Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns.  The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set, Mandelbrot set Add To Light Table Detail within the Mandelbrot set fractal.  This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features.  Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself.  Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves.  Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns.  The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set, Mandelbrot set Add To Light Table
Detail within the Mandelbrot set fractal. This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features. Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself. Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves. Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns. The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set.
Image ID: 10393  
Species: Mandelbrot Fractal, Mandelbrot set
 
Detail within the Mandelbrot set fractal. This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features. Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself. Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves. Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns. The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set.
Image ID: 10394  
Species: Mandelbrot Fractal, Mandelbrot set
 
Detail within the Mandelbrot set fractal. This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features. Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself. Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves. Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns. The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set.
Image ID: 10396  
Species: Mandelbrot Fractal, Mandelbrot set
 
Detail within the Mandelbrot set fractal.  This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features.  Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself.  Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves.  Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns.  The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set, Mandelbrot set Add To Light Table Detail within the Mandelbrot set fractal.  This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features.  Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself.  Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves.  Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns.  The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set, Mandelbrot set Add To Light Table Detail within the Mandelbrot set fractal.  This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features.  Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself.  Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves.  Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns.  The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set, Mandelbrot set Add To Light Table
Detail within the Mandelbrot set fractal. This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features. Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself. Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves. Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns. The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set.
Image ID: 10397  
Species: Mandelbrot Fractal, Mandelbrot set
 
Detail within the Mandelbrot set fractal. This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features. Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself. Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves. Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns. The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set.
Image ID: 10398  
Species: Mandelbrot Fractal, Mandelbrot set
 
Detail within the Mandelbrot set fractal. This detail is found by zooming in on the overall Mandelbrot set image, finding edges and buds with interesting features. Fractals are complex geometric shapes that exhibit repeating patterns typified by self-similarity, or the tendency for the details of a shape to appear similar to the shape itself. Often these shapes resemble patterns occurring naturally in the physical world, such as spiraling leaves, seemingly random coastlines, erosion and liquid waves. Fractals are generated through surprisingly simple underlying mathematical expressions, producing subtle and surprising patterns. The basic iterative expression for the Mandelbrot set is z = z-squared + c, operating in the complex (real, imaginary) number set.
Image ID: 10399  
Species: Mandelbrot Fractal, Mandelbrot set
 


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Animal  >  Bird  >  Duck (Anatidae)  >  Wood Duck
Animal  >  Endangered / Threatened Species  >  Marine  >  Blue Whale
Animal  >  Fish  >  Fish Anatomy  >  Mouth
Animal  >  Fish  >  Marine Fish  >  Indo-Pacific  >  California / Baja California
Animal  >  Fish  >  Marine Fish  >  Ocean Sunfish - Mola mola
Animal  >  Mammal  >  Giraffe
Animal  >  Marine Invertebrate  >  Anemone  >  Zoanthid
Animal  >  Marine Invertebrate  >  Marine Invertebrate Anatomy  >  Polyp
Animal  >  Marine Invertebrate  >  Marine Invertebrate Behavior  >  Reproduction / Mating
Animal  >  Marine Invertebrate  >  Plankton
Animal  >  Marine Invertebrate  >  Plankton  >  Jellyfish
Animal  >  Marine Invertebrate  >  Plankton  >  Salp
Animal  >  Marine Invertebrate  >  Tunicates  >  Salp
Animal  >  Reptile  >  Lizard
Animal  >  Reptile  >  Reptile Anatomy  >  Rattle
Animal  >  Reptile  >  Snake
Animal  >  Reptile  >  Snake  >  Rattlesnake
Gallery  >  Anemone
Gallery  >  California
Gallery  >  Fractal
Gallery  >  Islas Coronado
Gallery  >  Man And Animal
Gallery  >  New Work August 2011
Gallery  >  New Work July 2011
Gallery  >  Ocean Sunfish
Location  >  Oceans  >  Pacific  >  California (USA) / Baja California (Mexico)
Location  >  Oceans  >  Pacific  >  California (USA) / Baja California (Mexico)  >  Coronado Islands
Location  >  USA  >  California  >  Rock Creek Canyon
Location  >  World  >  Mexico  >  Coronado Islands
Plant  >  Terrestrial Plant  >  Tree  >  Aspen Tree  >  Quaking Aspen
Subject  >  Abstracts and Patterns  >  Fractal
Subject  >  People  >  Underwater  >  Freediver / Snorkler
Subject  >  People  >  Underwater  >  Photographer
Subject  >  Technique  >  Underwater

Species Appearing Among These Images:
Acrantophis madagascariensis
Agkistrodon contortrix pictigaster
Ahaetulla fronticincta
Aix sponsa
Anas falcata
Bitis gabonica
Corralus caninus
Crotalus atrox
Crotalus durissus
Crotalus ruber ruber
Crotalus viridis helleri
Cyclosalpa affinis
Giraffa camelopardalis tippelskirchi
Mandelbrot set
Mola mola
Morelia amethistina
Phacellophora camtschatica
Populus tremuloides
Terrapene sp.
Trachydosaurus
Trimeresurus mcgregori

Natural History Photography Blog posts (20) related to Zoo
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Chironephthya, Fiji's "Other" Soft Coral
Aerial Photographic Survey of San Diego Marine Protected Areas for Lighthawk
Blue Whale Full Body Photo
Panorama Photo of the Open Ocean
The World's Greatest Photo Subjects
New Surf Photos?
Best Photos of 2011
Salps, Pelagic Tunicates, Cyclosalpa Affinis
Pacific White-Sided Dolphin Photos
Photography Travel Gear Checklist
Best Photos of 2010
Lady Bird Johnson Grove, Redwood National Park
Brown Bluff, Antarctica
Hammerhead Shark Cover Photo, Physiological and Biochemical Zoology
Southern Giant Petrel, Macronectes giganteus, Southern Ocean
Photography Gear for Antarctica, South Georgia and Falklands
The Aspen Tunnel
Natural History Photography with Infrared Light
Vogelsang High Sierra Camp, Yosemite National Park

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Updated: March 1, 2021