curve of constant bearing

简明释义

同位线

英英释义

例句

1.The pilot adjusted the flight path to follow a curve of constant bearing to avoid turbulence.

飞行员调整了航线，以遵循一条恒定方位曲线以避开颠簸。

2.In maritime navigation, understanding the curve of constant bearing is crucial for safe passage.

在海上导航中，理解恒定方位曲线对于安全通行至关重要。

3.When navigating through the archipelago, sailors often rely on the curve of constant bearing to maintain their course.

在穿越群岛时，水手们常常依靠恒定方位曲线来保持航向。

4.Using radar, the ship tracked another vessel along its curve of constant bearing to avoid collisions.

通过雷达，船只沿着其恒定方位曲线追踪另一艘船以避免碰撞。

5.The captain plotted a curve of constant bearing on the map to reach the destination efficiently.

船长在地图上绘制了一条恒定方位曲线以高效到达目的地。

作文

Navigating through the vast ocean can be a daunting task, especially for sailors who rely on traditional methods of navigation. Among the various techniques used, one important concept is the curve of constant bearing, which plays a crucial role in maritime navigation. This concept refers to the path a vessel takes when it maintains a consistent angle relative to a fixed point, such as a lighthouse or a buoy. Understanding this principle is essential for sailors to ensure they remain on course and avoid potential hazards. When a sailor sets out to sea, they often have a destination in mind. However, the journey is rarely straightforward due to changing weather conditions, currents, and other obstacles. By employing the curve of constant bearing, sailors can adjust their course while keeping their target in sight. This technique allows them to navigate effectively, even when faced with unpredictable elements. For instance, if a ship is approaching a harbor, the captain may choose to steer in such a way that the angle between the ship's heading and the harbor remains constant. This method not only simplifies navigation but also enhances safety by reducing the risk of collisions with other vessels or underwater hazards.The curve of constant bearing is not limited to maritime navigation; it is also applicable in aviation and land navigation. Pilots use similar principles when flying towards a destination, ensuring that they maintain a steady course despite the influence of wind and other factors. Similarly, hikers and drivers can apply this concept to stay oriented, particularly in unfamiliar terrain. By understanding how to maintain a constant bearing, individuals can improve their navigational skills and increase their confidence in reaching their destinations.In addition to practical applications, the curve of constant bearing has theoretical implications in the field of mathematics and physics. The concept can be related to the study of vectors and trajectories, where maintaining a constant angle can lead to predictable outcomes. This relationship between navigation and mathematics highlights the importance of interdisciplinary knowledge, allowing individuals to draw connections between different fields of study.Moreover, the curve of constant bearing serves as a metaphor for life’s journey. Just as sailors must remain focused on their destination while navigating through turbulent waters, individuals must also keep their goals in mind amidst the challenges they face. Life is filled with uncertainties, but by maintaining a clear vision and adjusting our paths accordingly, we can navigate through difficulties and reach our desired outcomes.In conclusion, the curve of constant bearing is a fundamental concept in navigation that extends beyond the maritime world. It provides valuable insights into how we can maintain direction and purpose in our lives. By understanding and applying this principle, we can enhance our navigational skills, whether on the sea, in the air, or on land. Ultimately, the ability to maintain a constant bearing is not just about reaching a destination; it is about the journey itself and the lessons we learn along the way.

在广阔的海洋中航行可能是一项艰巨的任务，尤其是对于依赖传统导航方法的水手来说。在各种使用的技术中，一个重要的概念是恒定方位曲线，它在海洋导航中发挥着至关重要的作用。这个概念指的是当船只相对于一个固定点（例如灯塔或浮标）保持一致的角度时所走的路径。理解这一原则对水手至关重要，以确保他们保持在正确的航线上，并避免潜在的危险。当水手出海时，他们通常心中有一个目的地。然而，由于天气条件、海流和其他障碍，旅程往往不是一帆风顺的。通过采用恒定方位曲线，水手可以在保持目标可见的同时调整航向。这种技术使他们能够有效地导航，即使面临不可预测的因素。例如，如果一艘船正在接近一个港口，船长可能会选择以一种方式操纵船只，使其航向与港口之间的角度保持不变。这种方法不仅简化了导航，而且通过减少与其他船只或水下危险发生碰撞的风险，提高了安全性。恒定方位曲线不仅限于海洋导航；它在航空和陆地导航中也适用。飞行员在飞往目的地时使用类似的原理，确保他们在风和其他因素的影响下保持稳定的航向。同样，徒步旅行者和司机也可以应用这一概念，以保持方向感，特别是在陌生的地形中。通过理解如何保持恒定的方位，个人可以提高自己的导航技能，并增强他们到达目的地的信心。除了实际应用外，恒定方位曲线在数学和物理学领域也具有理论意义。该概念可以与向量和轨迹的研究相关联，在这些研究中，保持恒定的角度可以导致可预测的结果。这种导航与数学之间的关系突显了跨学科知识的重要性，使个人能够在不同的学科之间找到联系。此外，恒定方位曲线作为人生旅程的隐喻。正如水手必须在动荡的水域中保持对目的地的关注一样，个人在面对挑战时也必须牢记自己的目标。生活充满了不确定性，但通过保持清晰的愿景并相应地调整我们的路径，我们可以在困难中航行并达到我们想要的结果。总之，恒定方位曲线是导航中的一个基本概念，超越了海洋世界。它为我们提供了关于如何在生活中保持方向和目标的宝贵见解。通过理解和应用这一原则，我们可以增强我们的导航技能，无论是在海上、空中还是陆地上。最终，保持恒定方位的能力不仅仅是为了到达目的地；更是关于旅程本身以及我们在过程中学习到的教训。