parallel surface

简明释义

平行面

英英释义

例句

1.In woodworking, achieving a parallel surface is crucial for proper joint fitting.

在木工中，达到平行表面对正确的接合非常重要。

2.When machining metal, it’s important to maintain a parallel surface for accurate measurements.

在金属加工时，保持平行表面对于准确测量至关重要。

3.The engineer designed a machine with a parallel surface to ensure stability during operation.

工程师设计了一台具有平行表面的机器，以确保操作过程中的稳定性。

4.The architect specified that the walls must have a parallel surface for aesthetic reasons.

建筑师规定墙壁必须具有平行表面，以满足美观要求。

5.The designer used software to simulate the parallel surface of the product for better visualization.

设计师使用软件模拟产品的平行表面以便更好地可视化。

作文

In the realm of geometry and engineering, the concept of a parallel surface (平行面) plays a crucial role in understanding spatial relationships and designing various structures. A parallel surface is defined as a surface that maintains a constant distance from another surface throughout its extent. This means that every point on one surface is equidistant to the corresponding point on the other surface. Such properties are essential in fields like architecture, manufacturing, and computer graphics, where precision and accuracy are paramount.To illustrate the significance of parallel surfaces (平行面), consider the design of a modern skyscraper. Architects often use parallel surfaces to create aesthetic appeal as well as functionality. For instance, the glass panels of a building may be designed to be parallel surfaces to ensure uniform reflection and refraction of light, adding to the building's visual impact while also optimizing energy efficiency.Moreover, in mechanical engineering, parallel surfaces (平行面) are vital in the manufacturing of components that must fit together perfectly. For example, when creating parts for an engine, engineers must ensure that the mating surfaces are parallel surfaces to avoid wear and tear, which can lead to malfunction. The precision in achieving parallel surfaces (平行面) is often measured using specialized tools like calipers and surface plates, ensuring that the components will function as intended.In computer graphics, the representation of parallel surfaces (平行面) is equally important. When rendering 3D models, maintaining the correct proportions and distances between parallel surfaces ensures that the final image appears realistic. If the surfaces are not accurately represented as parallel surfaces (平行面), it can lead to visual distortions that detract from the overall quality of the graphic.Understanding the mathematical principles behind parallel surfaces (平行面) is also fundamental for students studying mathematics and physics. The equations that define parallel surfaces involve concepts such as vectors and planes, which are foundational in higher-level mathematics. Students learn to identify parallel surfaces (平行面) in different contexts, deepening their comprehension of spatial relationships and dimensional analysis.In conclusion, the concept of parallel surfaces (平行面) transcends various disciplines, highlighting its importance in practical applications and theoretical studies. Whether in architecture, engineering, or computer science, the ability to understand and manipulate parallel surfaces is essential for innovation and design. As we continue to explore new technologies and methodologies, the principles of parallel surfaces (平行面) will remain a cornerstone of our understanding of the physical world.

在几何和工程领域，平行面的概念在理解空间关系和设计各种结构方面起着至关重要的作用。平行面被定义为一条表面在其整个范围内与另一表面保持恒定距离。这意味着一个表面上的每一点与另一个表面上对应点的距离是相等的。这种特性在建筑、制造和计算机图形等领域中至关重要，因为这些领域要求精确和准确。为了说明平行面的重要性，考虑现代摩天大楼的设计。建筑师通常使用平行面来创造美观和功能性的结合。例如，建筑物的玻璃面板可能被设计成平行面，以确保光线的均匀反射和折射，从而增加建筑的视觉冲击力，同时优化能效。此外，在机械工程中，平行面在制造必须完美契合的组件时至关重要。例如，在为发动机创建零件时，工程师必须确保配合表面是平行面，以避免磨损，这可能导致故障。实现平行面的精度通常使用专用工具，如卡尺和表面板进行测量，以确保组件按预期功能工作。在计算机图形学中，平行面的表示同样重要。当渲染3D模型时，保持平行面之间的正确比例和距离确保最终图像看起来真实。如果表面没有被准确地表示为平行面，可能会导致视觉扭曲，从而影响图形的整体质量。理解平行面背后的数学原理对于学习数学和物理的学生来说也是基础。定义平行面的方程涉及向量和平面等概念，这些都是高等数学的基础。学生们学习在不同的背景下识别平行面，加深他们对空间关系和维度分析的理解。总之，平行面的概念跨越了多个学科，突显了它在实际应用和理论研究中的重要性。无论是在建筑、工程还是计算机科学中，理解和操作平行面的能力对创新和设计至关重要。随着我们继续探索新技术和方法，平行面的原理将始终是我们理解物理世界的基石。