Yes.
Technically, you can't. The Koch snowflake is self-similar. So the perimeter is infinity.
you find the area of a koch snowflake using z=(n-1)x/3
1904
It is a fractal: each enlargement of the snowflake is an identical image.
Yes - as you "zoom in" on the sides of the snowflake, the same pattern occurs infinitely.
an infinite number.
Either the koch snowflake or the Sierpinski triangle
It depends on what the side lengths are for the first triangle
A variety of such shapes can be constructed; a well-known example is the Koch snowflake. http://en.wikipedia.org/wiki/Koch_snowflake
yes! the best example would be the Koch snowflake.
Koch's snowflake is a fractal and a mathematical curve that starts with an equilateral triangle. Iteratively, each side of the triangle is divided into three equal segments, and an equilateral triangle is constructed on the middle segment, creating a star-like pattern. This process is repeated indefinitely, resulting in a shape with an infinitely increasing perimeter while enclosing a finite area. The snowflake exemplifies the concept of self-similarity and is a classic example in the study of fractals.
Sierpinski's Triangle Sierpinski's Carpet The Wheel of Theodorus Mandelbrot Julia Set Koch Snowflake ...Just to name a few(: