folding measure

简明释义

折尺

英英释义

例句

1.For the origami project, mastering the folding measure 折叠尺寸 was essential for achieving the desired shapes.

对于折纸项目，掌握folding measure 折叠尺寸对于实现所需形状至关重要。

2.When designing the new product, we had to consider the folding measure 折叠尺寸 to ensure it fits in standard packaging.

在设计新产品时，我们必须考虑到folding measure 折叠尺寸，以确保它适合标准包装。

3.The furniture designer incorporated a folding measure 折叠尺寸 to make the table more compact when not in use.

家具设计师采用了folding measure 折叠尺寸，使桌子在不使用时更加紧凑。

4.In sewing, understanding the folding measure 折叠尺寸 is crucial for creating accurate patterns.

在缝纫中，理解folding measure 折叠尺寸对制作准确的图案至关重要。

5.The architect used a folding measure 折叠尺寸 to determine how the walls would fold into the space efficiently.

建筑师使用了folding measure 折叠尺寸来确定墙壁如何有效地折叠进空间。

作文

In the realm of mathematics and geometry, various concepts are used to describe and analyze shapes, sizes, and dimensions. One such concept that has gained traction in recent years is the idea of a folding measure, which refers to a method of quantifying the way in which a geometric figure can be folded or manipulated. This notion is not only applicable in theoretical contexts but also finds practical applications in fields such as architecture, art, and design. Understanding the folding measure can enhance our comprehension of spatial relationships and the properties of different materials.To illustrate the significance of the folding measure, consider the process of origami, the traditional Japanese art of paper folding. Origami transforms a flat sheet of paper into intricate designs through a series of folds. Each fold alters the shape and structure of the paper, creating new angles and dimensions. The folding measure in this context helps artists quantify the complexity of their designs, allowing them to calculate the number of folds required to achieve a specific outcome. By understanding how each fold contributes to the overall design, artists can create more sophisticated and aesthetically pleasing pieces.Moreover, in architecture, the folding measure plays a crucial role in the design of innovative structures. Architects often use folding techniques to create dynamic and flexible spaces. For instance, the use of folding walls can transform a single room into multiple functional areas, enhancing the usability of the space. The folding measure allows architects to assess how these folds will impact the structural integrity and aesthetic appeal of their designs. By calculating the angles and lengths involved in each fold, architects can ensure that their creations are both beautiful and functional.In addition to art and architecture, the folding measure has implications in the field of engineering, particularly in the design of materials and products. Engineers often utilize folding mechanisms in the development of portable devices, such as smartphones and laptops. The folding measure assists in determining how much a device can be folded without compromising its functionality. By analyzing the folding patterns, engineers can innovate designs that maximize portability while maintaining performance.Furthermore, the folding measure extends beyond physical applications; it also has theoretical implications in mathematics. Researchers study the properties of folds in higher dimensions, exploring concepts such as topology and geometry. The mathematical analysis of folds can lead to new discoveries in various fields, including physics and computer science. Understanding how to quantify and manipulate folds can unlock new pathways for research and innovation.In conclusion, the concept of the folding measure is a multifaceted and valuable tool across various disciplines. Whether in art, architecture, engineering, or mathematics, the ability to understand and apply the folding measure enhances our ability to create, innovate, and explore the complexities of the world around us. As we continue to push the boundaries of design and technology, the folding measure will undoubtedly remain a key element in shaping our future.

在数学和几何的领域中，各种概念被用来描述和分析形状、大小和维度。其中一个近年来受到关注的概念是“折叠度量”的概念，它指的是量化几何图形如何被折叠或操纵的一种方法。这个概念不仅适用于理论背景，还在建筑、艺术和设计等领域找到了实际应用。理解折叠度量可以增强我们对空间关系和不同材料属性的理解。为了说明折叠度量的重要性，我们可以考虑折纸的过程，这是一种传统的日本纸张折叠艺术。折纸通过一系列的折叠将一张平坦的纸转变为复杂的设计。每一次折叠都会改变纸的形状和结构，创造出新的角度和维度。在这种情况下，折叠度量帮助艺术家量化他们设计的复杂性，使他们能够计算出实现特定结果所需的折叠次数。通过理解每个折叠如何影响整体设计，艺术家可以创造出更复杂且美观的作品。此外，在建筑学中，折叠度量在创新结构的设计中发挥着至关重要的作用。建筑师常常利用折叠技术来创建动态和灵活的空间。例如，使用折叠墙可以将一个房间转变为多个功能区域，从而增强空间的可用性。折叠度量使建筑师能够评估这些折叠如何影响设计的结构完整性和美学吸引力。通过计算每个折叠涉及的角度和长度，建筑师可以确保他们的创作既美观又实用。除了艺术和建筑，折叠度量在工程领域也有重要意义，特别是在材料和产品的设计中。工程师常常在可便携设备的开发中利用折叠机制，例如智能手机和笔记本电脑。折叠度量有助于确定设备在不影响其功能的情况下可以折叠的程度。通过分析折叠模式，工程师可以创新设计，最大限度地提高便携性，同时保持性能。此外，折叠度量不仅限于物理应用；它在数学中也具有理论意义。研究人员研究高维中的折叠属性，探索拓扑和几何等概念。对折叠的数学分析可能导致各个领域的新发现，包括物理学和计算机科学。理解如何量化和操作折叠可以为研究和创新开辟新路径。总之，折叠度量的概念是一个多面向且有价值的工具，适用于多个学科。无论是在艺术、建筑、工程还是数学中，理解和应用折叠度量的能力增强了我们创造、创新和探索周围世界复杂性的能力。随着我们继续推动设计和技术的边界，折叠度量无疑将在塑造我们未来的过程中发挥关键作用。