geometry
简明释义
n. 几何,几何学;几何形状,几何构造;几何体系
复 数 g e o m e t r i e s
英英释义
单词用法
[数]分形几何;碎形几何;不规则碎片几何体 | |
微分几何 |
同义词
反义词
| 无序 | 派对后房间变得一片混乱。 | ||
| 混乱 | 城市街道的混乱让人感到不知所措。 |
例句
1.The boldly striped Ikea pillows pick up on the geometry of the windows.
还有这些粗线宜家牌枕头,让窗子的几何感更好了。
2.He recalled what Stephanie had said about the building's geometry.
他回忆起丝苔妮所说的关于这房子的几何学。
3.There is a review of elementary geometry below.
下面会有一个初等几何的回顾.
4.The boldly striped Ikea pillows pick up on the geometry of the windows.
还有这些粗线宜家牌枕头,让窗子的几何感更好了。
5.Use geometry or you need to set up for double integral of a surface.
总之,就是用几何方法或是在曲面上建立二重积分。
6.The two unequal shorter sides of the curvilinear trapezoid of each building change their geometry every two floors.
每隔两层,每幢建筑曲线梯形的两条不相等的短边就会改变其几何形状。
7.Men show a slight advantage in geometry, probability and statistics.
男性在几何,概率统计方面显示出微弱优势。
8.In art class, we learned how to use geometry 几何学 to create interesting shapes and patterns.
在艺术课上,我们学习了如何使用几何学来创造有趣的形状和图案。
9.Understanding geometry 几何学 is essential for solving problems in physics.
理解几何学对解决物理问题至关重要。
10.The architect used geometry 几何学 to design the new building's unique structure.
建筑师利用几何学设计了新建筑独特的结构。
11.The game involves a lot of geometry 几何学 as you need to navigate through various shapes and obstacles.
这个游戏涉及很多几何学,因为你需要穿越各种形状和障碍物。
12.In my math homework, I had to calculate the area of a triangle using geometry 几何学 formulas.
在我的数学作业中,我必须使用几何学公式计算三角形的面积。
作文
Geometry is a branch of mathematics that deals with the properties and relationships of points, lines, surfaces, and solids. It has been an essential part of human knowledge for centuries, influencing fields such as art, architecture, engineering, and even nature. Understanding geometry (几何) is crucial not just for mathematicians, but for anyone who engages with the physical world around them. In ancient times, the study of geometry (几何) can be traced back to civilizations like the Egyptians and Babylonians, who used geometric principles in their construction techniques and land surveying. The Greeks further advanced the field with the works of mathematicians like Euclid, whose book 'Elements' laid the groundwork for modern geometry (几何). This text systematically presented theorems and proofs, establishing a logical framework that is still taught today.One of the most fascinating aspects of geometry (几何) is its application in real life. For instance, architects rely on geometric principles to create structures that are not only functional but also aesthetically pleasing. The famous architect Frank Lloyd Wright utilized geometry (几何) to design buildings that harmonized with their surroundings, showcasing how mathematical concepts can enhance artistic expression.In addition to architecture, geometry (几何) plays a vital role in various scientific fields. In physics, understanding the shapes and volumes of objects can lead to better predictions of how they will behave under different forces. For example, the study of fluid dynamics often involves the application of geometry (几何) to understand how fluids move around objects. Similarly, in biology, the shapes of cells and organisms can be analyzed using geometric principles to gain insights into their functions and behaviors.Moreover, geometry (几何) is not limited to two-dimensional shapes; it extends into three-dimensional space and beyond. Concepts such as symmetry, congruence, and transformations are essential in higher-dimensional geometry, which has applications in computer graphics, robotics, and even artificial intelligence. For instance, when designing a video game, developers use geometry (几何) to create realistic environments that players can navigate through.In education, teaching geometry (几何) is fundamental for developing critical thinking and problem-solving skills. Students learn to visualize and manipulate shapes, which enhances their spatial reasoning abilities. These skills are not only applicable in math but are also beneficial in everyday life, from planning a garden layout to packing a suitcase efficiently.In conclusion, geometry (几何) is a rich and diverse field that intersects with many aspects of life and knowledge. Its historical significance, practical applications, and educational value make it an essential area of study. Whether one is an artist, scientist, or student, a solid understanding of geometry (几何) can lead to greater insights and innovations in their respective fields. As we continue to explore the universe, the principles of geometry (几何) will undoubtedly remain a cornerstone of our understanding.
几何是数学的一个分支,涉及点、线、面和固体的性质和关系。几个世纪以来,它一直是人类知识的重要组成部分,影响着艺术、建筑、工程甚至自然等领域。理解geometry(几何)对数学家来说至关重要,但对于任何与周围物理世界接触的人来说也同样重要。在古代,geometry(几何)的研究可以追溯到像埃及人和巴比伦人这样的文明,他们在建筑技术和土地测量中使用几何原理。希腊人进一步推动了这一领域的发展,著名数学家欧几里得的著作《几何原本》为现代geometry(几何)奠定了基础。这本书系统地呈现了定理和证明,建立了一个至今仍在教授的逻辑框架。Geometry(几何)最迷人的方面之一是它在现实生活中的应用。例如,建筑师依赖于几何原理来创造既功能性又美观的结构。著名建筑师弗兰克·劳埃德·赖特利用geometry(几何)设计与周围环境和谐共存的建筑,展示了数学概念如何增强艺术表现。除了建筑,geometry(几何)在多个科学领域中也发挥着重要作用。在物理学中,理解物体的形状和体积可以更好地预测它们在不同力量下的行为。例如,流体动力学的研究通常涉及应用geometry(几何)来理解流体如何绕过物体。同样,在生物学中,可以使用几何原理分析细胞和生物体的形状,从而深入了解其功能和行为。此外,geometry(几何)不仅限于二维形状;它还扩展到三维空间及更高维度的空间。对称性、全等和变换等概念在更高维度的几何中至关重要,这在计算机图形学、机器人技术甚至人工智能中都有应用。例如,在设计视频游戏时,开发人员使用geometry(几何)创建玩家可以导航的逼真环境。在教育中,教授geometry(几何)对培养批判性思维和解决问题的能力至关重要。学生学习可视化和操纵形状,这增强了他们的空间推理能力。这些技能不仅适用于数学,而且在日常生活中也非常有用,从规划花园布局到高效打包行李。总之,geometry(几何)是一个丰富多样的领域,与生活和知识的许多方面交叉。它的历史意义、实际应用和教育价值使其成为一项重要的研究领域。无论是艺术家、科学家还是学生,扎实理解geometry(几何)都能在各自的领域中带来更大的洞察力和创新。随着我们继续探索宇宙,geometry(几何)的原则无疑将继续成为我们理解的基石。
