good geometry

简明释义

有利几何条件

英英释义

例句

1.In mathematics, understanding good geometry is crucial for solving complex problems.

在数学中，理解良好的几何形状对于解决复杂问题至关重要。

2.A designer should always consider good geometry when crafting furniture.

设计师在制作家具时应始终考虑良好的几何形状。

3.The architect emphasized the importance of good geometry in creating a visually appealing building.

建筑师强调了在创造视觉上吸引人的建筑中，良好的几何形状的重要性。

4.The artist's work reflects a mastery of good geometry that enhances the overall composition.

这位艺术家的作品反映出对良好的几何形状的掌握，从而增强了整体构图。

5.For effective communication, good geometry in diagrams can help convey ideas more clearly.

为了有效沟通，图表中的良好的几何形状可以更清晰地传达想法。

作文

Good geometry is an essential concept that transcends mere mathematical principles; it encompasses the beauty and balance found in nature, art, and architecture. When we think of good geometry, we often visualize perfect shapes and harmonious proportions that create aesthetically pleasing designs. This principle can be observed in various aspects of our daily lives, from the buildings we inhabit to the artwork we admire. In architecture, good geometry plays a crucial role in ensuring that structures are not only functional but also visually appealing. For instance, the Parthenon in Athens exemplifies good geometry through its use of symmetry and proportion. The building’s dimensions were meticulously calculated to create a sense of harmony that has captivated viewers for centuries. Similarly, modern architects often draw inspiration from these classical principles, incorporating good geometry into their designs to evoke a sense of stability and elegance. In nature, good geometry manifests in the intricate patterns found in flowers, shells, and even the arrangement of leaves on a stem. The Fibonacci sequence, for example, is a mathematical pattern that appears frequently in nature, showcasing how good geometry is not just a human-made concept but a fundamental aspect of the natural world. These patterns not only serve aesthetic purposes but also contribute to the survival and efficiency of living organisms. Moreover, in the realm of art, good geometry is pivotal in creating compositions that resonate with viewers. Artists like Leonardo da Vinci and Piet Mondrian utilized geometric shapes to convey deeper meanings and emotions within their work. Da Vinci’s use of perspective and proportion demonstrates how good geometry can guide the viewer's eye and create a sense of depth. On the other hand, Mondrian’s abstract compositions rely heavily on basic geometric forms to express balance and harmony, proving that good geometry can be both simple and profound. In education, understanding good geometry is vital for students as it lays the foundation for critical thinking and problem-solving skills. Geometry teaches students how to analyze shapes, understand spatial relationships, and apply logical reasoning. These skills are not only applicable in mathematics but also in fields such as engineering, computer science, and even everyday decision-making. By fostering an appreciation for good geometry, educators can inspire the next generation of thinkers and innovators. In conclusion, good geometry is a multifaceted concept that enriches our understanding of the world around us. Whether in architecture, nature, art, or education, the principles of good geometry provide us with tools to appreciate beauty, create functional designs, and develop critical thinking skills. As we continue to explore and embrace the significance of good geometry, we can enhance our creativity and problem-solving abilities, ultimately contributing to a more harmonious and aesthetically pleasing world.

良好的几何学是一个超越单纯数学原理的重要概念；它包含了自然、艺术和建筑中所体现的美感与平衡。当我们想到良好的几何学时，常常会想象出完美的形状和谐的比例，这些都创造了令人愉悦的设计。这一原则可以在我们日常生活的各个方面观察到，从我们居住的建筑到我们欣赏的艺术作品。在建筑中，良好的几何学起着至关重要的作用，确保结构不仅功能性强，而且视觉上也令人愉悦。例如，雅典的帕台农神庙通过对称和比例的使用，展示了良好的几何学。这座建筑的尺寸经过精心计算，创造了一种和谐感，几个世纪以来一直吸引着观众。同样，现代建筑师常常从这些经典原则中汲取灵感，将良好的几何学融入他们的设计中，以唤起一种稳定和优雅的感觉。在自然界中，良好的几何学体现在花朵、贝壳，甚至是叶子在茎上的排列中所发现的复杂图案中。例如，斐波那契数列是一个在自然界中频繁出现的数学模式，展示了良好的几何学不仅是人类创造的概念，也是自然世界的基本特征。这些模式不仅服务于美学目的，还促进了生物的生存和效率。此外，在艺术领域，良好的几何学对于创作与观众产生共鸣的作品至关重要。像达芬奇和蒙德里安这样的艺术家利用几何形状在他们的作品中传达更深层次的意义和情感。达芬奇对透视和比例的运用展示了良好的几何学如何引导观众的目光并创造深度感。另一方面，蒙德里安的抽象作品则严重依赖基本几何形状来表达平衡与和谐，证明了良好的几何学既可以简单又可以深刻。在教育中，理解良好的几何学对学生至关重要，因为它为批判性思维和解决问题的技能奠定了基础。几何学教会学生如何分析形状，理解空间关系，并应用逻辑推理。这些技能不仅适用于数学，还适用于工程、计算机科学，甚至是日常决策。通过培养对良好的几何学的欣赏，教育工作者可以激励下一代的思想家和创新者。总之，良好的几何学是一个多面的概念，丰富了我们对周围世界的理解。无论是在建筑、自然、艺术还是教育中，良好的几何学的原则为我们提供了欣赏美、创造功能性设计以及发展批判性思维技能的工具。当我们继续探索和拥抱良好的几何学的重要性时，我们可以增强我们的创造力和解决问题的能力，最终为一个更加和谐和美观的世界做出贡献。