axial angle

简明释义

轴间角

英英释义

例句

1.The axial angle (轴向角) of the robot's joints determines its range of motion.

机器人的关节的轴向角 (axial angle)决定了它的运动范围。

2.Engineers must consider the axial angle (轴向角) when designing gear systems to ensure efficiency.

工程师在设计齿轮系统时必须考虑轴向角 (axial angle)以确保效率。

3.In our study, we found that the axial angle (轴向角) significantly affects the airflow around the aircraft wings.

在我们的研究中，我们发现轴向角 (axial angle)显著影响飞机机翼周围的气流。

4.Adjusting the axial angle (轴向角) of the camera can help achieve better perspective in photography.

调整相机的轴向角 (axial angle)可以帮助在摄影中获得更好的视角。

5.The design of the turbine blades requires precise calculations of the axial angle (轴向角) to optimize performance.

涡轮叶片的设计需要精确计算轴向角 (axial angle)以优化性能。

作文

In the study of geometry and three-dimensional shapes, understanding the concept of axial angle is crucial. The axial angle refers to the angle formed between two intersecting lines or planes that share a common axis. This concept is particularly important in fields such as engineering, architecture, and physics, where precise measurements and spatial relationships are essential. For instance, when designing a bridge, engineers must consider the axial angle between various structural components to ensure stability and safety. To illustrate this further, let us consider a simple example involving a cone. The axial angle of a cone is determined by the angle between the axis of the cone and a line drawn from the apex to the edge of the base. This angle plays a significant role in determining the cone's properties, such as its volume and surface area. A smaller axial angle results in a taller and narrower cone, while a larger axial angle leads to a shorter and wider shape. Understanding these relationships helps in various applications, from manufacturing to design.Moreover, the axial angle is not limited to cones; it can also be applied to other geometric figures. For example, in the case of a cylinder, the axial angle can be analyzed to understand the relationship between the height and radius of the cylinder. By manipulating the axial angle, designers can create cylinders that fit specific needs, whether for storage, aesthetic purposes, or structural integrity.In addition to practical applications, the axial angle has theoretical implications as well. In mathematics, understanding the axial angle can aid in solving complex problems involving rotational symmetry and transformations. For instance, when rotating a shape around an axis, the axial angle can influence the final position of the shape in three-dimensional space. This knowledge is invaluable for mathematicians and scientists who seek to explore the intricacies of spatial relationships.Furthermore, in the realm of computer graphics and animation, the axial angle is used to manipulate the orientation of objects within a virtual environment. By adjusting the axial angle, animators can create realistic movements and interactions between objects, enhancing the overall visual experience. This application highlights the versatility of the axial angle across different fields, demonstrating its importance beyond traditional geometry.In conclusion, the axial angle is a fundamental concept that permeates various disciplines, from engineering to mathematics to computer graphics. Its significance lies in its ability to describe the relationship between different geometric entities and their orientations. By mastering the concept of the axial angle, one can gain a deeper understanding of spatial relationships and enhance problem-solving skills in both practical and theoretical contexts. Whether in designing structures, solving mathematical equations, or creating animations, the axial angle remains a vital element in the exploration of three-dimensional space.

在几何和三维形状的研究中，理解轴角的概念至关重要。轴角是指在共享一个公共轴的两个相交线或平面之间形成的角度。这个概念在工程、建筑和物理等领域尤其重要，因为精确的测量和空间关系是必不可少的。例如，在设计桥梁时，工程师必须考虑各种结构组件之间的轴角以确保稳定性和安全性。为了进一步说明这一点，让我们考虑一个涉及圆锥的简单例子。圆锥的轴角由圆锥的轴与从顶点到底边边缘的线之间的角度决定。这个角度在确定圆锥的属性（如体积和表面积）方面起着重要作用。较小的轴角会导致一个更高更窄的圆锥，而较大的轴角则导致一个更短更宽的形状。理解这些关系有助于在制造和设计等各种应用中。此外，轴角不仅限于圆锥；它还可以应用于其他几何图形。例如，在圆柱的情况下，可以分析轴角以理解圆柱的高度和半径之间的关系。通过操纵轴角，设计师可以创建适合特定需求的圆柱，无论是用于存储、美学目的还是结构完整性。除了实际应用外，轴角还有理论意义。在数学中，理解轴角可以帮助解决涉及旋转对称性和变换的复杂问题。例如，当围绕某个轴旋转一个形状时，轴角可以影响形状在三维空间中的最终位置。这一知识对于寻求探索空间关系复杂性的数学家和科学家来说是无价的。此外，在计算机图形和动画领域，轴角用于操纵虚拟环境中物体的方向。通过调整轴角，动画师可以创建物体之间的真实运动和交互，从而增强整体视觉体验。这一应用突显了轴角在不同领域的多样性，证明了它的重要性超越了传统几何。总之，轴角是一个基本概念，渗透到工程、数学和计算机图形等各个学科。它的重要性在于能够描述不同几何实体及其方向之间的关系。通过掌握轴角的概念，人们可以更深入地理解空间关系，并增强在实际和理论背景下的问题解决能力。无论是在设计结构、解决数学方程还是创建动画方面，轴角始终是探索三维空间的关键要素。