equilateral polygon

简明释义

等边多边形;正多边形

英英释义

例句

1.In geometry class, we learned that a triangle is a type of equilateral polygon 等边多边形 where all sides are equal.

在几何课上，我们了解到三角形是一种等边多边形 等边多边形，所有边都相等。

2.In computer graphics, equilateral polygons 等边多边形 are often used for modeling shapes and surfaces.

在计算机图形学中，等边多边形 等边多边形 通常用于建模形状和表面。

3.An equilateral polygon 等边多边形 can be used to create symmetrical designs in art.

在艺术中，等边多边形 等边多边形 可以用来创建对称的设计。

4.To calculate the area of an equilateral polygon 等边多边形, you can use specific formulas depending on the number of sides.

要计算等边多边形 等边多边形 的面积，可以根据边数使用特定的公式。

5.The architect chose an equilateral polygon 等边多边形 shape for the new building to enhance its aesthetic appeal.

建筑师选择了一个等边多边形 等边多边形 形状来增强新建筑的美感。

作文

In the world of geometry, shapes play a crucial role in understanding the principles of space and form. One particularly interesting category of shapes is the equilateral polygon, which is defined as a polygon with all sides of equal length. This characteristic not only contributes to the aesthetic appeal of the shape but also has significant implications in various fields such as architecture, engineering, and art. The most common examples of equilateral polygons are equilateral triangles, squares, and regular pentagons. Each of these shapes exhibits symmetry and balance, making them visually pleasing and structurally sound. Equilateral triangles, for instance, are often used in the design of bridges and roofs due to their inherent strength. The equal length of all three sides allows them to distribute weight evenly, which is essential for stability in construction. Similarly, squares, which are another type of equilateral polygon, are foundational in architectural design. Their right angles and equal sides make them ideal for creating uniform spaces, whether in residential buildings or large commercial complexes. Moreover, the concept of equilateral polygons extends beyond practical applications; it also permeates the realm of art and design. Artists often utilize these shapes to create harmonious compositions that draw the viewer's eye. For example, the use of equilateral polygons in modern art can be seen in the works of artists like Piet Mondrian, who employed geometric shapes to convey simplicity and order. Understanding equilateral polygons also opens the door to exploring more complex geometric concepts. For instance, when we consider the properties of regular polygons, we find that they not only have equal side lengths but also equal angles. This leads to fascinating discussions about symmetry, tessellation, and even fractals. In mathematics, the study of equilateral polygons can help students develop spatial reasoning skills, which are vital for problem-solving in various scientific fields. In conclusion, the study of equilateral polygons provides valuable insights into both the practical and theoretical aspects of geometry. Whether in the context of engineering, art, or education, these shapes serve as a fundamental building block for understanding the world around us. By appreciating the beauty and utility of equilateral polygons, we can enhance our comprehension of geometry and its applications in everyday life.

在几何学的世界中，形状在理解空间和形式的原则中扮演着关键角色。其中一个特别有趣的形状类别是等边多边形，它被定义为所有边长相等的多边形。这一特征不仅增加了形状的美学吸引力，还在建筑、工程和艺术等多个领域具有重要意义。最常见的等边多边形示例是等边三角形、正方形和规则五边形。每一种这些形状都展现出对称和平衡，使其在视觉上令人愉悦，并在结构上稳固。例如，等边三角形由于其固有的强度，常用于桥梁和屋顶的设计。三条边的等长使它们能够均匀分配重量，这对建筑的稳定性至关重要。同样，正方形作为另一种等边多边形，在建筑设计中也是基础。它们的直角和等长边使其成为创建统一空间的理想选择，无论是在住宅建筑还是大型商业综合体中。此外，等边多边形的概念超越了实际应用；它也渗透到艺术和设计的领域。艺术家们经常利用这些形状来创造和谐的构图，吸引观众的目光。例如，现代艺术中使用等边多边形的例子可以在皮特·蒙德里安的作品中看到，他运用几何形状来传达简单和秩序。理解等边多边形也为探索更复杂的几何概念打开了大门。例如，当我们考虑规则多边形的性质时，我们发现它们不仅具有相等的边长，而且具有相等的角度。这引发了关于对称性、镶嵌和甚至分形的迷人讨论。在数学中，研究等边多边形可以帮助学生发展空间推理能力，这对于在各种科学领域中的问题解决至关重要。总之，研究等边多边形提供了对几何学实际和理论方面的宝贵见解。无论是在工程、艺术还是教育的背景下，这些形状都是理解我们周围世界的基本构建块。通过欣赏等边多边形的美丽和实用性，我们可以增强对几何学及其在日常生活中应用的理解。