tetragon

简明释义

英[ˈtetrəˌɡɒn]美[ˈtetrəɡɒn]

n. [数] 四角形

英英释义

单词用法

同义词

反义词

例句

1.Give me an old-fashioned tetragon on a central pivot every time.

每次都给我看一个建在中轴上的四角大楼吧。

2.Combining with the condition of C-partition and tetragon 2-factor, we give new classes of upper-embeddable graphs.

联系图的顶点划分和四边形2因子的条件，本文给出了新的上可嵌入的图类。

3.Combining with the condition of C-partition and tetragon 2-factor, we give new classes of upper-embeddable graphs.

联系图的顶点划分和四边形2因子的条件，本文给出了新的上可嵌入的图类。

4.And the shapes vary to hexagon, tetragon, acicular and odd different colors are available.

形状有六角形，四角形，长条针形和不规则形状，并有多种颜色可供选择。

5.In art class, we created a collage using various Tetragons (四边形) to form interesting patterns.

在美术课上，我们用各种Tetragons（四边形）制作拼贴，以形成有趣的图案。

6.The architect designed a modern building in the shape of a Tetragon (四边形) to maximize space efficiency.

建筑师设计了一座现代建筑，形状为Tetragon（四边形），以最大化空间效率。

7.In geometry class, we learned that a Tetragon (四边形) is a polygon with four edges and four vertices.

在几何课上，我们了解到Tetragon（四边形）是一个具有四条边和四个顶点的多边形。

8.A square is a special type of Tetragon (四边形) where all sides are equal in length.

正方形是一种特殊类型的Tetragon（四边形），其所有边长相等。

9.To calculate the area of a Tetragon (四边形), you can use various formulas depending on the type of quadrilateral.

要计算Tetragon（四边形）的面积，可以根据不同类型的四边形使用各种公式。

作文

In the realm of geometry, shapes play a crucial role in understanding the world around us. One such shape that is fundamental to both mathematics and art is the tetragon. A tetragon is defined as a four-sided polygon, which can take various forms such as squares, rectangles, trapezoids, and rhombuses. The versatility of the tetragon makes it an essential topic in the study of geometry, as it serves as a building block for more complex shapes and concepts.The study of tetragons begins with their properties. Each tetragon has four edges and four vertices, and the sum of its interior angles always equals 360 degrees. This property is not only fascinating but also practical, as it helps architects and engineers design structures that are both stable and aesthetically pleasing. For instance, when designing a building, architects often rely on the principles of tetragons to ensure that the walls meet at right angles, providing strength and support to the overall structure.Moreover, tetragons can be classified into different categories based on their sides and angles. A square, for example, is a special type of tetragon where all sides are equal, and all angles are right angles. This regularity makes squares particularly appealing in design and architecture. On the other hand, a rectangle, another type of tetragon, has opposite sides that are equal, which allows for greater flexibility in design while still maintaining a sense of order.Trapezoids, yet another form of tetragons, are characterized by having at least one pair of parallel sides. This unique feature gives trapezoids a dynamic appearance, making them popular in modern architectural designs. The use of tetragons in art and design extends beyond just functional aspects; they also evoke emotions and convey messages. Artists often utilize the symmetry and balance found in tetragons to create visually striking compositions.In addition to their artistic and practical applications, tetragons also have significance in various fields such as computer graphics and game design. In these areas, tetragons serve as fundamental shapes that can be manipulated and transformed to create complex images and environments. Understanding how to work with tetragons is essential for designers and developers who aim to create immersive experiences for users.Furthermore, the concept of the tetragon can be extended to other disciplines, including nature and biology. Many natural forms exhibit tetragonal characteristics, such as the way certain crystals grow or how leaves are arranged on a stem. By studying these patterns, scientists can gain insights into the underlying principles that govern growth and structure in the natural world.In conclusion, the tetragon is much more than just a simple geometric shape; it is a fundamental element that connects various disciplines, from mathematics to art and science. Its versatility and significance make it a subject worth exploring. By understanding the properties and applications of tetragons, we can appreciate the beauty and complexity of the world around us, as well as enhance our skills in design, engineering, and problem-solving. The tetragon is indeed a powerful shape that deserves recognition and study in our quest for knowledge and creativity.

在几何学的领域中，形状在理解我们周围的世界中起着至关重要的作用。一个在数学和艺术中都至关重要的形状是四边形。四边形被定义为一种四边的多边形，它可以呈现出各种形式，例如正方形、矩形、梯形和菱形。四边形的多样性使其成为几何学研究中的一个基本主题，因为它作为更复杂形状和概念的构建块。对四边形的研究始于它们的特性。每个四边形都有四条边和四个顶点，其内角之和总是等于360度。这一特性不仅令人着迷，而且具有实用性，因为它帮助建筑师和工程师设计出既稳定又美观的结构。例如，在设计一座建筑时，建筑师通常依赖于四边形的原理，以确保墙壁以直角相交，从而为整体结构提供强度和支持。此外，四边形可以根据其边和角进行分类。例如，正方形是四边形的一种特殊类型，其中所有边都相等，所有角都是直角。这种规则性使得正方形在设计和建筑中尤为吸引人。另一方面，矩形是另一种四边形，它的对边相等，这在设计上允许更大的灵活性，同时仍然保持一定的秩序。梯形，又一种四边形，的特点是至少有一对平行边。这一独特的特征赋予了梯形动态的外观，使其在现代建筑设计中颇受欢迎。在艺术和设计中，四边形的运用不仅限于功能方面；它们还唤起情感并传达信息。艺术家们常常利用四边形中所体现的对称性和平衡感来创造视觉上引人注目的作品。除了艺术和实用应用外，四边形在计算机图形学和游戏设计等多个领域也具有重要意义。在这些领域，四边形作为基本形状，可以被操控和变换，以创建复杂的图像和环境。理解如何使用四边形对那些旨在为用户创造沉浸式体验的设计师和开发者来说至关重要。此外，四边形的概念可以扩展到其他学科，包括自然和生物学。许多自然形式表现出四边形的特征，例如某些晶体的生长方式或叶子在茎上的排列方式。通过研究这些模式，科学家可以获得关于自然界中生长和结构的基本原理的见解。总之，四边形不仅仅是一个简单的几何形状；它是连接各种学科的基本元素，从数学到艺术再到科学。它的多样性和重要性使其成为值得探索的主题。通过理解四边形的属性和应用，我们可以欣赏到周围世界的美丽和复杂性，并提升我们在设计、工程和解决问题方面的技能。四边形确实是一个值得认可和研究的强大形状，值得我们在追求知识和创造力的过程中深入探讨。