What does a snowflake have to do with math?
i do not know
due to it's shape
Google "mathematics of snowflakes".
Here's a few interesting links:
h t t p : / / g o o . g l / Q c 4 S 4
h t t p : / / g o o . g l / Y a H t z
h t t p : / / g o o . g l / v w 1 z z
In math, the term "snowflake" is often used to refer to a specific type of fractal called the Koch snowflake. Fractals are complex geometric shapes that can be divided into smaller parts, each of which is a reduced-scale copy of the whole shape.
The Koch snowflake is derived through a process known as iteration. To create it, you start with an equilateral triangle. Then, you divide each side of the triangle into three equal segments. Next, you remove the middle segment and replace it with two segments of the same length, forming an outward-facing V shape. You repeat this process for each remaining segment indefinitely.
The resulting shape has a self-similar pattern, meaning that smaller copies of the original shape can be found within it. It has an infinite perimeter, yet encloses a finite area, which is a fascinating mathematical property.
The Koch snowflake demonstrates concepts like infinite iteration, self-similarity, and the convergence of infinite geometric series. It's often used as an educational tool to introduce these mathematical ideas to students.