What is the most complicated fractal that we know?

What is the most complicated fractal that we know?  The complexity of a fractal can be difficult to quantify, as it depends on various factors such as the type of fractal, the specific formula used to generate it, and the level of detail that is considered. 

However, here are a few examples of fractals that are known for their high degree of complexity:      

 

The Mandelbrot Set: The Mandelbrot set is a famous fractal that is known for its intricate and never-ending patterns. It is generated using a simple formula, but the resulting set is extremely complex and can be zoomed into indefinitely without repeating.      

 

The Julia Set: The Julia set is a fractal that is related to the Mandelbrot set and is also known for its intricate patterns and complexity. It can be generated using various formulas, each resulting in a unique and complex pattern.      

 

The Lorenz Attractor: The Lorenz attractor is a fractal that is generated using a system of non-linear differential equations and is commonly used to model complex systems in physics and other fields.      

 

The Sierpinski Triangle: The Sierpinski triangle is a fractal that is generated by repeatedly dividing an equilateral triangle into four smaller triangles and removing the central one. Although simple to generate, the resulting pattern is extremely complex and can be zoomed into indefinitely.  These are just a few examples of the many complex fractals that exist. It's worth noting that fractals are often generated using complex mathematical algorithms, so the degree of complexity can be very high even for relatively simple-looking fractals.