equal angle

简明释义

等边角钢

英英释义

例句

1.When constructing a regular hexagon, each internal angle must be an equal angle (等角).

在构造一个正六边形时，每个内角必须是一个等角(equal angle)。

2.The architect designed the roof with equal angles (等角) to ensure proper drainage.

建筑师设计了屋顶，采用了等角(equal angles)以确保排水良好。

3.In geometry, a triangle with all sides of equal length has three equal angles (等角).

在几何学中，一个所有边长相等的三角形有三个等角(equal angles)。

4.In a circle, the angles at the center corresponding to equal arcs are equal angles (等角).

在一个圆中，对应于相等弧的中心角是等角(equal angles)。

5.For the best visual symmetry, use equal angles (等角) in your design.

为了获得最佳的视觉对称性，在设计中使用等角(equal angles)。

作文

In the realm of geometry, the concept of equal angle (等角) is fundamental to understanding various shapes and their properties. When we refer to equal angles, we are talking about angles that have the same measure. This idea is not only crucial in theoretical mathematics but also plays a significant role in practical applications such as engineering, architecture, and design.Consider the case of triangles, which are one of the simplest geometric figures. In an equilateral triangle, all three angles are equal angles (等角), each measuring 60 degrees. This property makes equilateral triangles unique and gives them symmetrical characteristics that are aesthetically pleasing. The fact that these angles are equal (相等) allows us to infer other properties of the triangle, such as the equality of its sides. As a result, when we know that a triangle has equal angles, we can conclude that it is also equiangular and equilateral.The significance of equal angles extends beyond triangles. In polygons, particularly regular polygons, all interior angles are equal angles (等角). For example, in a square, each angle measures 90 degrees, making them equal angles. This characteristic is what gives regular polygons their uniformity and balance. Understanding how equal angles function within these shapes helps mathematicians and architects create structures that are both functional and visually appealing.One of the most fascinating aspects of equal angles is their relationship with parallel lines. According to the properties of parallel lines cut by a transversal, alternate interior angles are equal angles (等角). This principle is not just a theoretical concept; it has real-world implications in fields such as construction and navigation. For instance, when building a bridge, engineers must ensure that certain components are aligned correctly, often relying on the concept of equal angles to maintain structural integrity.Moreover, the importance of equal angles can be seen in the world of art and design. Artists often use symmetry, which relies heavily on equal angles (等角), to create visually striking compositions. By ensuring that certain elements of their work have equal angles, artists can achieve a sense of harmony and balance that appeals to the viewer's eye. This principle is evident in various art forms, from painting to sculpture.In conclusion, the concept of equal angles (等角) is a vital part of geometry that transcends mere numbers. It is a principle that connects various disciplines, from mathematics to art, and enables us to understand the world around us more profoundly. Whether we are solving complex equations, designing a new building, or creating a beautiful piece of art, the notion of equal angles remains a cornerstone of our understanding. As we continue to explore the depths of geometry and its applications, we will undoubtedly encounter equal angles in many forms, reminding us of the beauty and order inherent in the universe.

在几何学领域，等角的概念是理解各种形状及其属性的基础。当我们提到等角时，我们指的是具有相同度数的角。这一思想不仅对理论数学至关重要，而且在工程、建筑和设计等实际应用中也发挥着重要作用。考虑三角形的情况，这是最简单的几何图形之一。在等边三角形中，三个角都是等角，每个角度为60度。这一特性使得等边三角形独特，并赋予它们对称的特征，令人赏心悦目。由于这些角是相等的，我们可以推断出三角形的其他属性，例如其边的相等。因此，当我们知道一个三角形具有等角时，我们可以得出它也是等角和等边的结论。等角的重要性超越了三角形。在多边形中，尤其是正多边形，所有内角都是等角。例如，在正方形中，每个角度为90度，使它们成为等角。这一特性赋予了正多边形其均匀性和平衡感。理解等角在这些形状中的作用，帮助数学家和建筑师创造出既实用又美观的结构。等角最迷人的方面之一是它们与平行线之间的关系。根据被横截线切割的平行线的性质，交替内角是等角。这一原理不仅是一个理论概念；它在建筑和导航等领域具有现实意义。例如，在建造桥梁时，工程师必须确保某些组件正确对齐，通常依赖于等角的概念来保持结构的完整性。此外，等角的重要性还体现在艺术和设计的世界中。艺术家经常使用对称性，这在很大程度上依赖于等角，以创造视觉上引人注目的作品。通过确保他们作品中的某些元素具有等角，艺术家可以实现一种和谐和平衡的感觉，吸引观众的眼球。这一原理在各种艺术形式中都显而易见，从绘画到雕塑。总之，等角是几何学中一个重要的概念，它超越了单纯的数字。它是连接各个学科的原则，从数学到艺术，使我们能够更深刻地理解周围的世界。无论我们是在解决复杂的方程式、设计新建筑，还是创作美丽的艺术作品，等角的概念始终是我们理解的基石。随着我们继续探索几何学及其应用的深度，我们无疑会以多种形式遇到等角，提醒我们宇宙中固有的美和秩序。