bisected circle

简明释义

圆圈内加一横

英英释义

例句

1.In our design project, we incorporated a bisected circle (被平分的圆) to symbolize balance and harmony.

在我们的设计项目中，我们融入了一个被平分的圆，象征着平衡与和谐。

2.The artist created a beautiful painting featuring a bisected circle (被平分的圆) with contrasting colors on each side.

这位艺术家创作了一幅美丽的画作，画中有一个色彩对比鲜明的被平分的圆。

3.The mathematician demonstrated the properties of a bisected circle (被平分的圆) and how it relates to angles and arcs.

数学家展示了被平分的圆的性质，以及它与角度和弧线的关系。

4.During the presentation, the engineer explained how the tension in the structure changes when a bisected circle (被平分的圆) is used as a support.

在演示中，工程师解释了当使用被平分的圆作为支撑时，结构中的张力是如何变化的。

5.In geometry class, we learned how to calculate the area of a bisected circle (被平分的圆) by using the formula for the area of a circle.

在几何课上，我们学习了如何通过使用圆的面积公式来计算被平分的圆的面积。

作文

In the realm of geometry, shapes and figures hold significant importance in understanding the world around us. One such fascinating figure is the circle, a shape that has intrigued mathematicians and artists alike for centuries. Among various properties of a circle, the concept of a bisected circle is particularly interesting. A bisected circle refers to a circle that has been divided into two equal halves by a straight line, known as the diameter. This simple yet profound division not only illustrates symmetry but also lays the groundwork for numerous geometric principles.To visualize a bisected circle, imagine drawing a circle on a piece of paper. Now, take a ruler and draw a straight line through the center of the circle, extending it from one edge to the other. The result is two equal semicircles, each representing half of the original circle. This division highlights the fundamental property of circles: regardless of their size, they can always be perfectly bisected into two equal parts.The significance of a bisected circle extends beyond mere aesthetics. In mathematics, this concept is essential in understanding the properties of circles and their applications in various fields. For instance, in trigonometry, the unit circle—a circle with a radius of one—is often used to define sine and cosine functions. When this unit circle is bisected, it provides crucial reference points for determining the values of these trigonometric functions, thereby aiding in solving complex mathematical problems.Moreover, the idea of a bisected circle can also be applied in real-world scenarios. Architects and engineers frequently use circular designs in their work, and understanding how to effectively divide these circles can lead to innovative solutions in construction and design. For example, when designing a circular building or structure, being able to visualize and utilize the concept of a bisected circle can help in creating symmetrical and aesthetically pleasing designs.In art, the bisected circle can serve as a powerful tool for composition. Artists often employ geometric shapes to create balance and harmony within their works. By incorporating a bisected circle into their compositions, artists can achieve a sense of equilibrium, drawing the viewer's eye and enhancing the overall impact of the piece. This technique can be seen in various art movements, from classical to contemporary, showcasing the enduring relevance of geometric principles in artistic expression.Furthermore, the philosophical implications of a bisected circle are worth exploring. The act of dividing a circle can symbolize the duality of existence—the interplay between two opposing forces or ideas. This notion resonates in various cultures and philosophies, where the circle often represents wholeness and unity. By bisecting it, one acknowledges the complexities and contrasts inherent in life, prompting deeper reflection on the nature of balance and harmony.In conclusion, the concept of a bisected circle transcends its mathematical definition, permeating various aspects of life, art, and philosophy. Whether one is delving into the intricacies of geometry, designing innovative structures, or expressing creativity through art, the bisected circle serves as a reminder of the beauty and significance of symmetry and balance. Embracing this concept can enrich our understanding of the world and inspire us to explore the connections between mathematics, art, and the human experience.

在几何学的领域中，形状和图形在理解我们周围的世界中具有重要意义。其中一个引人入胜的图形是圆形，这种形状几个世纪以来一直吸引着数学家和艺术家的兴趣。在圆的各种属性中，bisected circle（被分割的圆）的概念尤其有趣。bisected circle指的是通过一条直线（称为直径）将圆分成两个相等的部分。这种简单而深刻的分割不仅展示了对称性，还为许多几何原理奠定了基础。要想象一个bisected circle，可以想象在纸上画一个圆。现在，拿起一个尺子，画一条直线穿过圆心，从一边延伸到另一边。结果是两个相等的半圆，每个半圆代表原始圆的一半。这种分割突显了圆的基本属性：无论其大小如何，圆总是可以被完美地分割成两个相等的部分。bisected circle的重要性超越了单纯的美学。在数学中，这个概念对于理解圆的性质及其在各个领域的应用至关重要。例如，在三角学中，单位圆（半径为1的圆）常用于定义正弦和余弦函数。当这个单位圆被bisected时，它提供了确定这些三角函数值的重要参考点，从而帮助解决复杂的数学问题。此外，bisected circle的概念也可以应用于现实场景。建筑师和工程师在工作中经常使用圆形设计，理解如何有效地分割这些圆可以为建筑和设计提供创新的解决方案。例如，在设计一个圆形建筑或结构时，能够想象和利用bisected circle的概念可以帮助创造出对称且美观的设计。在艺术中，bisected circle可以作为构图的强大工具。艺术家经常运用几何形状来创造作品中的平衡和和谐。通过将bisected circle融入他们的构图中，艺术家可以实现一种平衡感，吸引观众的目光，并增强作品的整体影响力。这种技巧可以在各种艺术运动中看到，从古典到当代，展示了几何原理在艺术表达中的持久相关性。此外，bisected circle的哲学意义也值得探讨。将一个圆分割的行为可以象征存在的二元性——两种对立力量或思想之间的相互作用。这一概念在各种文化和哲学中引起共鸣，其中圆往往代表完整和统一。通过将其分割，人们承认生活中固有的复杂性和对比，促使对平衡和和谐本质的更深入反思。总之，bisected circle的概念超越了其数学定义，渗透到生活、艺术和哲学的各个方面。无论是在深入研究几何的复杂性、设计创新结构还是通过艺术表达创造力，bisected circle都提醒我们对称和平衡的美与重要性。接受这一概念可以丰富我们对世界的理解，并激励我们探索数学、艺术与人类经验之间的联系。