Tessellations: Geometric Harmony in Repetition

Categories: Math

Introduction

A tessellation, as defined by Billstein, Libeskind, and Lott (2010), is "the filling of a plane with repetitions of figures in such a way that no figures overlap and that there are no gaps." This fascinating concept involves creating intricate patterns using various geometric shapes, such as triangles, squares, trapezoids, parallelograms, or hexagons. Tessellations employ transformations, including translations, rotations, reflections, or glided reflections, to showcase the repetition of figures. This essay explores the art of tessellations, emphasizing their creation, transformation, and real-life applications.

Creating a Tessellation: A Fusion of Shapes and Colors

Any student, armed with an understanding of geometric shapes and transformations, can embark on the journey of creating their own original tessellation.

The process involves piecing together a variety of shapes in a repetitive pattern through transformations, either manually or digitally. In my tessellation, I chose to integrate hexagons, squares, and triangles. The strategic placement of squares and triangles around the hexagon ensures a complete tessellation without gaps or overlaps.

Get quality help now
RhizMan
RhizMan
checked Verified writer

Proficient in: Math

star star star star 4.9 (247)

“ Rhizman is absolutely amazing at what he does . I highly recommend him if you need an assignment done ”

avatar avatar avatar
+84 relevant experts are online
Hire writer

The addition of vibrant colors enhances the visual appeal, turning it into a visually stimulating piece of art.

The chosen transformation for this tessellation is translation, where each shape undergoes a straight-line movement from one point to another. This movement can be in any direction—up, down, left, right, or diagonally—while maintaining the integrity of the original shape. The use of different colors for hexagons highlights the repetition, showcasing the mesmerizing effect of translation in the tessellation.

Moreover, tessellations provide an excellent platform for exploring the interplay of shapes and colors.

Get to Know The Price Estimate For Your Paper
Topic
Number of pages
Email Invalid email

By clicking “Check Writers’ Offers”, you agree to our terms of service and privacy policy. We’ll occasionally send you promo and account related email

"You must agree to out terms of services and privacy policy"
Write my paper

You won’t be charged yet!

By experimenting with various combinations, students can discover the visual impact of different arrangements, leading to a deeper appreciation of geometric aesthetics. The process of creating a tessellation becomes a journey of artistic expression and mathematical exploration, merging creativity with precision.

Tessellations in the World: Soccer Balls to Kaleidoscopes

The allure of tessellations extends beyond the realm of artistic creations; they manifest in various real-life instances. Examples include the hexagonal pattern on soccer balls, the repetitive design of plaid clothing, the intricate structure of honeycombs, and the orderly arrangement of bricks in construction. These everyday occurrences demonstrate the prevalence and significance of tessellations in our surroundings.

Reflecting on childhood memories, one delightful encounter with tessellations was through a kaleidoscope. This simple yet captivating toy introduced the concept of tessellations in an interactive manner. As the kaleidoscope was rotated, the tessellated patterns shifted, creating a mesmerizing play of colors and shapes. Unbeknownst to many children, this toy served as an early introduction to the enchanting world of tessellations, leaving a lasting impression on their visual senses.

Furthermore, the ubiquity of tessellations in the natural world emphasizes their inherent beauty and efficiency. The hexagonal cells of a beehive represent a tessellation created by nature, optimizing space and resources. Observing these patterns in the environment enhances our understanding of the mathematical principles governing tessellations and their adaptive advantages in different contexts.

As a personal anecdote, tessellations became a source of joy during my childhood. The intricate patterns, whether observed in a kaleidoscope or encountered in everyday objects, sparked curiosity and wonder. This childhood fascination has evolved into an appreciation for the geometric harmony found in tessellations, emphasizing their enduring impact on both aesthetic and educational aspects of life.

Conclusion

In conclusion, tessellations stand as a testament to the fusion of art and mathematics, offering a visually captivating exploration of geometric harmony in repetition. The creation of tessellations involves a thoughtful arrangement of shapes through various transformations, resulting in intricate and mesmerizing patterns. Beyond artistic endeavors, tessellations find application in everyday life, contributing to the aesthetics of objects we encounter regularly. Whether it be the hexagonal cells of a beehive or the nostalgic joy induced by a kaleidoscope, tessellations leave an indelible mark on our perceptions of order and beauty.

Updated: Nov 30, 2023
Cite this page

Tessellations: Geometric Harmony in Repetition. (2016, Aug 19). Retrieved from https://studymoose.com/tessellation-in-real-life-essay

Tessellations: Geometric Harmony in Repetition essay
Live chat  with support 24/7

👋 Hi! I’m your smart assistant Amy!

Don’t know where to start? Type your requirements and I’ll connect you to an academic expert within 3 minutes.

get help with your assignment