circular error probability

简明释义

概率误差圆

英英释义

例句

1.Military analysts use circular error probability to compare different weapon systems under various conditions.

军事分析人员使用圆形误差概率来比较不同武器系统在各种条件下的表现。

2.In radar technology, a lower circular error probability means better tracking accuracy of moving objects.

在雷达技术中，较低的圆形误差概率意味着对移动物体的跟踪精度更高。

3.When evaluating the performance of drones, engineers often look at the circular error probability to assess their targeting capabilities.

在评估无人机性能时，工程师通常会查看圆形误差概率来评估其打击能力。

4.The circular error probability of the new artillery system has significantly improved compared to older models.

与旧型号相比，新型炮兵系统的圆形误差概率有了显著改善。

5.The missile system's effectiveness is often measured by its circular error probability, which indicates how accurately it can hit a target.

导弹系统的有效性通常通过其圆形误差概率来衡量，这表明它能多准确地击中目标。

作文

In the field of navigation and targeting, understanding the concept of circular error probability is crucial. The term refers to a statistical measure that defines the accuracy of a weapon system or navigation device. Specifically, it is the radius of a circle within which a certain percentage of shots or measurements will fall. For instance, if we say that a missile has a circular error probability of 50 meters, it means that 50% of the time, the missile will land within a 50-meter radius of the intended target. This concept is vital for military operations, as it helps in assessing the effectiveness of different weapons and their likelihood of hitting the target.The circular error probability is often represented by a circular area, hence the name. It provides a clear visual representation of precision and accuracy. In practice, a smaller circular error probability indicates higher accuracy, while a larger one suggests more variability in the results. This distinction is essential for military planners who need to evaluate the performance of various systems under different conditions.In addition to military applications, the circular error probability also plays a significant role in civilian aviation and surveying. For pilots, understanding the circular error probability of their navigation systems can influence flight safety and efficiency. Similarly, surveyors rely on this measure to ensure that their equipment provides accurate location data, which is critical for construction projects and land assessments.Moreover, advancements in technology have led to improved circular error probability metrics. Modern GPS systems, for example, have significantly reduced the circular error probability compared to older systems, allowing for more precise navigation and targeting. This enhancement not only benefits military applications but also enhances everyday technologies, such as smartphones and personal navigation devices.Understanding the implications of circular error probability extends beyond just numbers and statistics. It reflects the ongoing pursuit of precision in technology and its impact on various fields. For instance, in autonomous vehicles, a lower circular error probability can lead to safer navigation and reduced accidents, showcasing how this concept is intertwined with innovation and safety.In conclusion, the circular error probability is a fundamental concept that illustrates the accuracy of targeting systems and navigation devices. Its relevance spans across military, aviation, and civilian sectors, highlighting its importance in ensuring safety and effectiveness in various applications. As technology continues to evolve, the significance of circular error probability will undoubtedly grow, shaping the future of navigation and targeting methodologies. By grasping this concept, professionals in diverse fields can better understand the capabilities and limitations of their systems, ultimately leading to improved outcomes and enhanced safety measures.

在导航和目标定位领域，理解“圆误差概率”这一概念至关重要。这个术语指的是一个统计测量，用于定义武器系统或导航设备的准确性。具体来说，它是一个圆的半径，在这个半径内，某个百分比的射击或测量将会落入。例如，如果我们说一枚导弹的“圆误差概率”为50米，这意味着50%的情况下，导弹将落在距离目标50米的范围内。这个概念对军事行动至关重要，因为它有助于评估不同武器的有效性及其击中目标的可能性。“圆误差概率”通常用一个圆形区域表示，因此得名。它清晰地展示了精度和准确性的可视化。在实际应用中，更小的“圆误差概率”意味着更高的准确性，而较大的则表明结果的变异性更大。这一区别对于军事规划者至关重要，他们需要在不同条件下评估各种系统的性能。除了军事应用外，“圆误差概率”在民用航空和测量中也发挥着重要作用。对于飞行员来说，理解导航系统的“圆误差概率”可以影响飞行安全和效率。同样，测量师依赖这一指标来确保他们的设备提供准确的位置数据，这对建筑项目和土地评估至关重要。此外，技术的进步使得“圆误差概率”指标得到了改善。现代GPS系统相比旧系统显著降低了“圆误差概率”，从而实现了更精确的导航和目标定位。这种提升不仅有利于军事应用，也增强了日常技术，例如智能手机和个人导航设备。理解“圆误差概率”的意义不仅仅局限于数字和统计。它反映了对技术精度的持续追求及其对各个领域的影响。例如，在自动驾驶汽车中，较低的“圆误差概率”可以导致更安全的导航和减少事故，展示了这一概念与创新和安全之间的紧密联系。总之，“圆误差概率”是一个基本概念，说明了目标系统和导航设备的准确性。它的重要性跨越了军事、航空和民用部门，突显了其在确保各种应用的安全性和有效性方面的重要性。随着技术的不断发展，“圆误差概率”的意义无疑会增加，塑造导航和目标定位方法的未来。通过掌握这一概念，各个领域的专业人士可以更好地理解其系统的能力和局限性，从而最终改善结果并增强安全措施。