{"id":4529,"date":"2023-06-16T01:42:48","date_gmt":"2023-06-16T01:42:48","guid":{"rendered":"https:\/\/content.one.lumenlearning.com\/quantitativereasoning\/?post_type=chapter&p=4529"},"modified":"2024-10-18T20:53:50","modified_gmt":"2024-10-18T20:53:50","slug":"fractal-basics-apply-it-2","status":"web-only","type":"chapter","link":"https:\/\/content.one.lumenlearning.com\/quantitativereasoning\/chapter\/fractal-basics-apply-it-2\/","title":{"raw":"Fractal Basics: Apply It 2","rendered":"Fractal Basics: Apply It 2"},"content":{"raw":"

Navigating the Intricate World of Fractals Cont.<\/h2>\r\nAfter her break, Alessandra begins working on a new art piece. Alessandra decides to create a fractal painting. To begin, she hands you an image of a triangle (initiator) and shows you a generator pattern that involves adding a smaller triangle to the midpoint of each side.\r\n\r\n
[ohm2_question hide_question_numbers=1]9546[\/ohm2_question]<\/section>Alessandra keeps working on her new fractal painting. She wants to scale one of its geometric components by a specific factor. She asks you to enlarge a square element of the painting from [latex]2[\/latex]cm to [latex]5[\/latex]cm using the scaling dimension relation.\r\n\r\n
[ohm2_question hide_question_numbers=1]9547[\/ohm2_question]<\/section>After finishing the day's work, Alessandra takes a step back to admire the fractal painting she has been working on. Curious, she asks you to calculate the fractal dimension of the shape she painted. Remember, the shape is a Sierpinski triangle. The Sierpinski triangle is formed by taking an equilateral triangle (or any other shape) and continually shrinking it down and placing it in an iterative pattern. In this fractal, with each iteration, the original triangle is divided into four new, smaller triangles, but the middle one is removed.\r\n\r\n
[ohm2_question hide_question_numbers=1]9548[\/ohm2_question]<\/section>Today, you've embarked on a fascinating journey through the world of art and mathematics. You've learned about self-similarity in nature, created a fractal shape, scaled a geometric object, and calculated the fractal dimension of a beautiful pattern. In the process, you've seen firsthand how these principles can bring depth, complexity, and beauty to Alessandra's art. As you continue to explore these mathematical concepts, consider the various ways they manifest in the world around you. Who knows \u2013 you might just start seeing art and nature through the lens of a mathematician!","rendered":"

Navigating the Intricate World of Fractals Cont.<\/h2>\n

After her break, Alessandra begins working on a new art piece. Alessandra decides to create a fractal painting. To begin, she hands you an image of a triangle (initiator) and shows you a generator pattern that involves adding a smaller triangle to the midpoint of each side.<\/p>\n