triangularly
简明释义
英[traɪˈæŋɡjələli]美[traɪˈæŋɡjulərli]
adv. 成三角形地
英英释义
以与三角形有关或具有三角形形状的方式。 |
单词用法
三角形状的 | |
以三角形排列的 | |
基于三角形的 | |
三角形分布的 |
同义词
| 三角形的 | 这座建筑的三角形设计独特。 | ||
| 三边的 | 在几何中,三边的图形被称为三角形。 | ||
| 三元的 | The triadic relationship among the three variables is crucial for the study. | 这三个变量之间的三元关系对研究至关重要。 |
反义词
| 线性地 | 为了更清晰,数据可以线性表示。 | ||
| 循环地 | The process progresses circularly, returning to the starting point. | 这个过程是循环进行的,会返回到起点。 |
例句
1.Triangularly distributed load on an infinitely long strip-area.
三角形荷载作用在无限长的条形面积上。
2.Triangularly distributed load on an infinitely long strip-area.
三角形荷载作用在无限长的条形面积上。
3.The artist painted the landscape with three peaks that were positioned triangularly in the composition.
艺术家在画作中描绘了三座山峰,它们在构图中被三角形地排列。
4.The table was set triangularly for the dinner party, creating an inviting atmosphere.
晚宴的桌子被设置得三角形地,营造出一种温馨的氛围。
5.In the design meeting, the team arranged their chairs triangularly to foster collaboration.
在设计会议上,团队将椅子安排得三角形地以促进合作。
6.The three friends sat triangularly, making it easier to have a conversation.
三个朋友坐得三角形地,这样更容易进行对话。
7.During the game, the players formed a defense triangularly to block the opposing team's attack.
比赛中,球员们以三角形地的方式形成防线,以阻挡对方球队的进攻。
作文
In the world of geometry, shapes play a crucial role in understanding various concepts. One of the most fundamental shapes is the triangle. Triangles are not only simple to comprehend but also serve as the building blocks for more complex structures. When we think about how different shapes interact, we often find ourselves considering them in a triangularly arranged format. This arrangement can be seen in various aspects of life, from architecture to nature. For instance, many buildings utilize triangular supports to enhance stability and strength. The concept of arranging elements triangularly can lead to innovative designs that are both functional and aesthetically pleasing.Moreover, in the realm of mathematics, the properties of triangles are extensively studied. The Pythagorean theorem, which relates the lengths of the sides of a right triangle, is a classic example of how triangularly arranged figures can reveal deeper truths about numbers and their relationships. This theorem is not just an abstract concept; it has practical applications in fields such as engineering and physics. By understanding how to manipulate and apply these triangular relationships, professionals can solve complex problems in real-world scenarios.In addition to mathematics and architecture, the idea of triangularly organizing information can also be beneficial in communication. For example, when presenting ideas or arguments, structuring them in a triangular format can help clarify the points being made. This method allows for a clear hierarchy of information, making it easier for the audience to follow along. By placing the main idea at the top and supporting points triangularly below it, speakers can create a logical flow that enhances understanding and retention.Furthermore, the natural world provides numerous examples of triangularly structured systems. Consider the way that trees grow: their branches often extend outwards in a triangular pattern, maximizing sunlight exposure while maintaining structural integrity. This natural design showcases the efficiency of triangular arrangements, prompting us to consider how we might incorporate similar strategies into our own lives and work.In conclusion, the concept of being triangularly organized permeates various disciplines, highlighting its importance in both theoretical and practical contexts. Whether we are discussing geometric principles, architectural designs, effective communication, or natural phenomena, the triangle remains a symbol of strength and clarity. By embracing the idea of triangularly arranged elements, we can foster innovation and improve our understanding of the world around us. As we continue to explore and apply these concepts, we may discover new ways to harness the power of triangles in our everyday lives, leading to more effective solutions and creative breakthroughs.
在几何学的世界中,形状在理解各种概念中发挥着至关重要的作用。最基本的形状之一是三角形。三角形不仅简单易懂,而且还作为更复杂结构的构建块。当我们考虑不同形状如何相互作用时,我们常常会想到它们以三角形排列的格式出现。这种排列可以在生活的各个方面看到,从建筑到自然。例如,许多建筑利用三角形支撑来增强稳定性和强度。以三角形排列元素的概念可以导致既实用又美观的创新设计。此外,在数学领域,三角形的性质被广泛研究。毕达哥拉斯定理,它涉及直角三角形的边长关系,是一个经典的例子,展示了三角形排列的图形如何揭示数字及其关系的更深层次真理。这个定理不仅是一个抽象概念;它在工程和物理等领域有实际应用。通过理解如何操纵和应用这些三角关系,专业人士可以在现实场景中解决复杂问题。除了数学和建筑,三角形排列信息的思想在沟通中也很有益。例如,在呈现观点或论点时,以三角形格式组织它们可以帮助澄清所表达的要点。这种方法允许信息的明确层次,使观众更容易跟随。通过将主要思想放在顶部,并将支持点三角形排列在其下方,演讲者可以创建一个逻辑流,增强理解和记忆。此外,自然界提供了许多三角形排列系统的例子。考虑树木的生长方式:它们的枝条通常向外延伸,形成三角形模式,最大化阳光照射,同时保持结构完整性。这种自然设计展示了三角形排列的效率,促使我们思考如何将类似的策略融入自己的生活和工作中。总之,三角形排列的概念渗透到各个学科,突显其在理论和实践背景中的重要性。无论我们是在讨论几何原理、建筑设计、有效沟通还是自然现象,三角形始终是力量和清晰的象征。通过接受三角形排列元素的思想,我们可以促进创新,提高对周围世界的理解。当我们继续探索和应用这些概念时,我们可能会发现新的方法来利用三角形的力量,改善日常生活中的解决方案,带来创造性的突破。
