fuller's curve

简明释义

富勒式曲线

英英释义

例句

1.In our design meeting, we discussed the importance of the fuller's curve 富勒曲线 in creating a more efficient packaging solution.

在我们的设计会议上，我们讨论了富勒曲线fuller's curve在创造更高效的包装解决方案中的重要性。

2.By applying the fuller's curve 富勒曲线, the team was able to enhance the structural integrity of the bridge.

通过应用富勒曲线fuller's curve，团队能够增强桥梁的结构完整性。

3.The architect referenced the fuller's curve 富勒曲线 when designing the new stadium to ensure optimal viewing angles.

建筑师在设计新体育场时参考了富勒曲线fuller's curve以确保最佳观赏角度。

4.The engineer explained how the fuller's curve 富勒曲线 is used to optimize the shape of the product for better aerodynamics.

工程师解释了如何使用富勒曲线fuller's curve来优化产品形状以提高气动性能。

5.The artist used the principles of the fuller's curve 富勒曲线 to create a visually appealing sculpture.

艺术家利用富勒曲线fuller's curve的原理创作了一件视觉上吸引人的雕塑。

作文

The concept of fuller's curve is significant in the field of textiles and fabric manufacturing. It represents the relationship between the weight of the fabric and its width, illustrating how different types of fabrics behave under varying conditions. Understanding this curve is essential for manufacturers to produce textiles that meet specific requirements for strength, durability, and flexibility. The fuller's curve serves as a guideline for engineers and designers, helping them to choose the appropriate materials for their projects based on the desired characteristics of the final product. In practical applications, the fuller's curve can be observed when dealing with different types of fabrics such as cotton, polyester, or wool. Each type of fabric has its unique properties, which influence how it will respond to tension and pressure. For instance, a heavier fabric may not stretch as much as a lighter one, and this behavior can be plotted on the fuller's curve. By analyzing these curves, manufacturers can predict how a fabric will perform during production and use, thus minimizing waste and ensuring quality control. Furthermore, the fuller's curve is not only relevant in textiles but also finds applications in various engineering fields. In civil engineering, for example, understanding the material properties and their behaviors under load is crucial for designing structures that are both safe and efficient. The principles derived from the fuller's curve can aid engineers in selecting materials that will withstand specific loads while maintaining their integrity over time. Additionally, the fuller's curve is instrumental in the fashion industry. Designers rely on this knowledge to create garments that fit well and have the desired drape and flow. By understanding how different fabrics interact with the body and movement, designers can craft clothing that not only looks good but also feels comfortable and functions effectively. This understanding contributes to the overall aesthetic and practical aspects of fashion design, making the fuller's curve an invaluable tool in their repertoire. In conclusion, the fuller's curve is a fundamental concept that impacts various industries, particularly textiles and engineering. Its ability to illustrate the relationship between fabric weight and width allows for better decision-making in material selection and product design. By mastering the principles behind the fuller's curve, professionals across fields can enhance their work, leading to improved products and satisfied customers. As technology advances and new materials are developed, the relevance of the fuller's curve will continue to grow, making it an essential area of study for anyone involved in material sciences and design.

“fuller's curve”这个概念在纺织和面料制造领域具有重要意义。它代表了面料的重量与宽度之间的关系，说明不同类型的面料在不同条件下的表现。理解这条曲线对于制造商生产符合特定强度、耐用性和柔韧性要求的纺织品至关重要。“fuller's curve”作为工程师和设计师的指导方针，帮助他们根据最终产品的期望特性选择合适的材料。在实际应用中，“fuller's curve”可以在处理不同类型的面料时观察到，例如棉、聚酯或羊毛。每种类型的面料都有其独特的属性，这些属性会影响它在拉伸和压力下的反应。例如，一种较重的面料可能不会像较轻的那样拉伸，这种行为可以在“fuller's curve”上绘制。通过分析这些曲线，制造商可以预测面料在生产和使用过程中的表现，从而减少浪费并确保质量控制。此外，“fuller's curve”不仅在纺织品中相关，还在各个工程领域找到了应用。在土木工程中，了解材料的特性及其在负载下的行为对于设计既安全又高效的结构至关重要。从“fuller's curve”得出的原则可以帮助工程师选择能够承受特定负载同时保持其完整性的材料。另外，“fuller's curve”在时尚行业中也起着重要作用。设计师依赖这一知识来创造合身且具有所需垂感和流动感的服装。通过理解不同面料如何与身体和运动相互作用，设计师可以制作出不仅外观良好，而且穿着舒适、功能有效的服装。这种理解有助于时尚设计的整体美学和实用性，使“fuller's curve”成为他们工具箱中不可或缺的工具。总之，“fuller's curve”是一个基本概念，影响着纺织和工程等多个行业。它能够说明面料重量与宽度之间的关系，从而使材料选择和产品设计的决策更加科学。通过掌握“fuller's curve”背后的原则，各个领域的专业人士都可以提升他们的工作，创造出更好的产品，满足客户的需求。随着科技的进步和新材料的发展，“fuller's curve”的相关性将继续增长，使其成为任何从事材料科学和设计的人必须学习的领域。