azimuthai angle

简明释义

方位角;

英英释义

例句

1.The azimuthai angle is crucial for setting up antennas to ensure optimal signal reception.

为了确保最佳信号接收，方位角对设置天线至关重要。

2.When surveying land, engineers often use a compass to measure the azimuthai angle for accurate mapping.

在测量土地时，工程师通常使用罗盘测量方位角以确保地图的准确性。

3.Pilots calculate the azimuthai angle during flight to maintain their intended flight path.

飞行员在飞行过程中计算方位角以保持预定的飞行路径。

4.The navigator adjusted the ship's course by calculating the azimuthai angle to ensure it was heading in the right direction.

导航员通过计算方位角来调整船的航向，以确保它朝着正确的方向前进。

5.In astronomy, the azimuthai angle helps astronomers locate stars and planets in the night sky.

在天文学中，方位角帮助天文学家在夜空中定位星星和行星。

作文

The concept of the azimuthal angle is fundamental in various fields such as astronomy, navigation, and physics. To understand this term better, we must first define what an angle is. An angle is formed by two rays that share a common endpoint, known as the vertex. The azimuthal angle, specifically, refers to the angle between a reference direction (usually north) and the line connecting the observer to a point in space, measured in the horizontal plane. This measurement is typically expressed in degrees or radians, where 0 degrees corresponds to the north direction, 90 degrees to the east, 180 degrees to the south, and 270 degrees to the west.In astronomy, the azimuthal angle plays a crucial role in locating celestial objects. When astronomers want to observe a star or planet, they often use a coordinate system that includes the azimuthal angle. For instance, if an observer is positioned at a specific location on Earth, they can determine the position of a star by measuring its azimuthal angle from true north. This allows for precise navigation in the vast expanse of the night sky.Similarly, in navigation, the azimuthal angle is essential for pilots and sailors. By knowing their current location and the azimuthal angle to their destination, they can chart a course that takes them directly to their target. This is particularly important in situations where GPS signals may be weak or unavailable. The ability to calculate the azimuthal angle using a compass or other navigational tools ensures that travelers can find their way safely and efficiently.In physics, the azimuthal angle is often used in the study of wave phenomena, particularly in quantum mechanics. When dealing with spherical coordinates, the azimuthal angle helps describe the orientation of particles in space. Understanding how particles behave in relation to their azimuthal angle can provide insights into their energy states and interactions with other particles.Moreover, the azimuthal angle is not limited to just theoretical applications; it has practical implications as well. For example, in the field of architecture, understanding the azimuthal angle can help designers optimize natural lighting within a building. By calculating the azimuthal angle of the sun at different times of the year, architects can strategically place windows and other openings to maximize sunlight exposure and reduce reliance on artificial lighting.In conclusion, the azimuthal angle is a versatile concept that transcends multiple disciplines. Whether in astronomy, navigation, physics, or architecture, understanding this angle enhances our ability to navigate and interact with the world around us. As technology continues to advance, the importance of accurately measuring and interpreting the azimuthal angle will only grow, making it an essential skill for future generations of scientists, engineers, and explorers.

“方位角”这一概念在天文学、导航和物理等多个领域中都是基础的。要更好地理解这个术语，我们首先需要定义什么是角度。角度是由两条共享一个公共端点（称为顶点）的射线形成的。“方位角”特指参考方向（通常是北方）与连接观察者和空间中某一点之间的线所形成的角度，该角度在水平面内测量。这个测量通常以度或弧度表示，其中0度对应于北方，90度对应于东方，180度对应于南方，270度对应于西方。在天文学中，“方位角”在定位天体时发挥着至关重要的作用。当天文学家希望观察一颗星星或行星时，他们通常使用包括方位角的坐标系统。例如，如果观察者位于地球上的特定位置，他们可以通过测量该星星的“方位角”来确定其位置。这使得在浩瀚的夜空中进行精确导航成为可能。同样，在导航中，“方位角”对飞行员和水手来说至关重要。通过知道自己当前的位置和目的地的“方位角”，他们可以制定一条直接通往目标的航线。这在GPS信号可能较弱或不可用的情况下尤其重要。使用指南针或其他导航工具计算“方位角”的能力确保旅行者能够安全高效地找到自己的道路。在物理学中，“方位角”常用于波现象的研究，尤其是在量子力学中。当处理球坐标时，“方位角”有助于描述粒子在空间中的方向。理解粒子如何与其“方位角”相关联，可以提供关于其能量状态和与其他粒子相互作用的洞察。此外，“方位角”不仅限于理论应用；它也具有实际意义。例如，在建筑领域，了解“方位角”可以帮助设计师优化建筑内部的自然采光。通过计算一年中不同时间太阳的“方位角”，建筑师可以战略性地放置窗户和其他开口，以最大化阳光照射并减少对人工照明的依赖。总之，“方位角”是一个跨越多个学科的多功能概念。无论是在天文学、导航、物理学还是建筑中，理解这个角度都增强了我们在周围世界中导航和互动的能力。随着技术的不断进步，准确测量和解释“方位角”的重要性只会增加，使其成为未来科学家、工程师和探险者必备的技能。