equilateral polygon

简明释义

等边多边形正多边形

英英释义

例句

1.To create a balanced logo, the designer used an equilateral polygon 等边多边形 as the main shape.

为了创建一个平衡的标志，设计师使用了一个equilateral polygon 等边多边形作为主要形状。

2.An equilateral polygon 等边多边形 can be inscribed in a circle, making it useful in various geometric constructions.

一个equilateral polygon 等边多边形可以被内切于一个圆中，这使其在各种几何构造中非常有用。

3.The architect designed a park with a central fountain surrounded by an equilateral polygon 等边多边形 of benches.

建筑师设计了一个公园，中央喷泉周围有一个equilateral polygon 等边多边形的长椅。

4.When studying regular shapes, students often focus on the properties of an equilateral polygon 等边多边形 like the square and equilateral triangle.

在研究规则形状时，学生们通常关注像正方形和等边三角形这样的equilateral polygon 等边多边形的性质。

5.In geometry class, we learned that a triangle is an example of an equilateral polygon 等边多边形 because all its sides are of equal length.

在几何课上，我们了解到三角形是一个例子，equilateral polygon 等边多边形，因为它的所有边长相等。

作文

In the realm of geometry, shapes and their properties play a crucial role in understanding the world around us. One fascinating category of shapes is that of the equilateral polygon, which refers to polygons where all sides have equal length. These shapes are not only aesthetically pleasing but also hold significant mathematical importance. Understanding equilateral polygons can enhance our comprehension of various geometric principles and their applications in real life.To begin with, let’s explore what constitutes an equilateral polygon. The term 'polygon' describes any two-dimensional shape formed by straight lines, while 'equilateral' indicates that all sides are of equal length. Common examples of equilateral polygons include equilateral triangles, squares, and regular pentagons. Each of these shapes exhibits unique characteristics that make them interesting to study.For instance, an equilateral triangle is a three-sided polygon where each side measures the same length. This equality of sides leads to each interior angle measuring 60 degrees, creating a perfectly symmetrical figure. The concept of symmetry is essential in many fields, including art, architecture, and nature. When we observe the beauty of a snowflake or the design of a building, we often find equilateral polygons at play, contributing to their visual harmony.Similarly, the square, another type of equilateral polygon, consists of four equal sides and four right angles. Squares are fundamental in both mathematics and everyday life. They serve as the basis for grid systems used in maps, computer screens, and architectural designs. The properties of squares allow for easy calculations of area and perimeter, making them practical for various applications.Moreover, equilateral polygons extend beyond just triangles and squares. Regular pentagons, hexagons, and octagons also fall under this category, each with their own unique properties. For example, a regular pentagon has five equal sides and five equal angles, each measuring 108 degrees. These shapes can be found in nature, such as in the structure of certain flowers and fruits, demonstrating how mathematics intertwines with the natural world.The significance of equilateral polygons is not limited to their geometric properties; they also have practical implications in engineering and design. Architects often utilize these shapes to create stable structures, while designers leverage their aesthetic appeal to create visually striking products. Understanding the principles behind equilateral polygons allows professionals in these fields to innovate and create functional yet beautiful designs.In conclusion, the study of equilateral polygons offers valuable insights into both mathematics and the world around us. From their symmetrical properties to their applications in various fields, these shapes demonstrate the interconnectedness of geometry and real-life scenarios. By appreciating the beauty and utility of equilateral polygons, we can deepen our understanding of the mathematical principles that govern our environment. Whether in nature, art, or engineering, equilateral polygons continue to inspire and intrigue us, reminding us of the elegance of mathematics in our daily lives.

在几何学的领域中，形状及其属性在理解我们周围的世界中扮演着至关重要的角色。一类引人入胜的形状是等边多边形，指的是所有边长相等的多边形。这些形状不仅在美学上令人愉悦，而且在数学上也具有重要意义。理解等边多边形可以增强我们对各种几何原理及其在现实生活中的应用的理解。首先，让我们探讨一下什么构成了等边多边形。术语“多边形”描述了由直线形成的任何二维形状，而“等边”则表示所有边的长度相等。常见的等边多边形示例包括等边三角形、正方形和正五边形。每种形状都展现出独特的特征，使它们值得研究。例如，等边三角形是一个三边的多边形，每条边的长度相同。这种边的相等性使得每个内角均为60度，形成一个完美对称的图形。对称的概念在许多领域中都是至关重要的，包括艺术、建筑和自然。当我们观察雪花的美丽或建筑的设计时，我们常常会发现等边多边形的存在，提升了它们的视觉和谐美感。同样，正方形作为另一种等边多边形，由四条相等的边和四个直角组成。正方形在数学和日常生活中都是基础。它们作为地图、计算机屏幕和建筑设计中网格系统的基础。正方形的性质使得面积和周长的计算变得简单，使其在各种应用中非常实用。此外，等边多边形不仅限于三角形和正方形。正五边形、正六边形和正八边形也属于这一类别，每一种都有自己独特的性质。例如，正五边形有五条相等的边和五个相等的角，每个角为108度。这些形状可以在自然界中找到，例如某些花朵和水果的结构，展示了数学与自然世界之间的交织。等边多边形的重要性不仅限于它们的几何属性；它们在工程和设计中也具有实际意义。建筑师经常利用这些形状来创建稳定的结构，而设计师则利用它们的美学吸引力来创造视觉上引人注目的产品。理解等边多边形背后的原理使得这些领域的专业人士能够创新，创造功能与美观兼具的设计。总之，研究等边多边形为我们提供了对数学和周围世界的宝贵见解。从它们的对称属性到它们在各个领域的应用，这些形状展示了几何学与现实场景之间的相互联系。通过欣赏等边多边形的美丽和实用性，我们可以加深对支配我们环境的数学原理的理解。无论是在自然、艺术还是工程中，等边多边形继续激励和吸引我们，提醒我们数学在日常生活中的优雅。