angle gain

简明释义

增斜;

英英释义

例句

1.The pilot adjusted the aircraft's trajectory to maximize the angle gain 角度增益 during the ascent.

飞行员调整了飞机的轨迹，以在爬升过程中最大化角度增益。

2.The athlete trained hard to improve his angle gain 角度增益 for better performance in the high jump.

运动员努力训练，以提高他的角度增益，以便在跳高比赛中表现更好。

3.In photography, finding the right angle gain 角度增益 can dramatically improve the composition of your shot.

在摄影中，找到合适的角度增益可以显著改善你的拍摄构图。

4.During the engineering meeting, they discussed how to achieve better angle gain 角度增益 in the design of the new product.

在工程会议上，他们讨论了如何在新产品设计中实现更好的角度增益。

5.The architect's innovative design allowed for a significant angle gain 角度增益 in natural light.

建筑师的创新设计使自然光的角度增益显著增加。

作文

Understanding the concept of angle gain is crucial in both mathematics and various practical applications. In geometry, angle gain refers to the increase in the measure of an angle when certain transformations or rotations are applied. This concept can be particularly useful in fields such as engineering, architecture, and even computer graphics, where precise measurements and angles are essential for creating accurate designs and models.To illustrate the importance of angle gain, consider a scenario in which an architect is designing a building. The angles at which different elements of the structure meet can significantly affect the building's stability and aesthetic appeal. By understanding how to calculate angle gain, the architect can make informed decisions about the design, ensuring that the angles contribute positively to the overall integrity of the building.In mathematics, angle gain can also be analyzed through the lens of trigonometry. For example, when studying right triangles, the relationship between the angles and the sides can reveal how changing one angle affects the others. This is especially relevant in physics, where understanding the forces acting on an object often requires knowledge of the angles involved. A small change in an angle can lead to a significant effect on the outcome, illustrating the power of angle gain in real-world applications.Furthermore, angle gain is not limited to static situations; it also plays a vital role in dynamic systems. For instance, in robotics, the movement of joints and limbs can be described using angles. When a robot arm moves, the angles at which it operates can change, leading to a phenomenon known as angle gain. By optimizing these angles, engineers can enhance the efficiency and precision of robotic movements, which is critical in manufacturing and other automated processes.Moreover, the concept of angle gain can be applied in sports, particularly in activities like golf or basketball. Athletes must understand how their body angles affect their performance. For example, a golfer must adjust their swing angle to achieve maximum distance and accuracy. Similarly, a basketball player must consider the angle at which they shoot the ball to increase their chances of scoring. By mastering angle gain, athletes can refine their techniques and improve their overall performance.In conclusion, the term angle gain encompasses a wide range of applications across various disciplines. Whether in architecture, mathematics, robotics, or sports, understanding how angles interact and change can lead to better designs, improved performance, and enhanced outcomes. As we continue to explore the intricacies of angles and their gains, it becomes evident that this concept is not just a theoretical idea but a practical tool that can be harnessed for success in many fields. Thus, mastering angle gain is essential for anyone looking to excel in areas that require precision and strategic thinking.

理解角度增益的概念在数学和各种实际应用中至关重要。在几何学中，角度增益是指在施加某些变换或旋转时角度测量的增加。这个概念在工程、建筑甚至计算机图形学等领域特别有用，因为精确的测量和角度对于创建准确的设计和模型至关重要。为了说明角度增益的重要性，考虑一个建筑师设计建筑的场景。结构中不同元素相遇的角度可以显著影响建筑的稳定性和美观。通过了解如何计算角度增益，建筑师可以做出明智的设计决策，确保这些角度对建筑的整体完整性产生积极影响。在数学中，角度增益也可以通过三角学的视角进行分析。例如，在研究直角三角形时，角度与边之间的关系可以揭示改变一个角度如何影响其他角度。这在物理学中尤为相关，因为理解作用于物体的力往往需要了解相关的角度。一个小的角度变化可能会导致结果的显著变化，这表明角度增益在现实世界应用中的强大。此外，角度增益不仅限于静态情况；它在动态系统中也发挥着至关重要的作用。例如，在机器人技术中，关节和肢体的运动可以用角度来描述。当机器人手臂移动时，它操作的角度可能会发生变化，从而产生一种现象，称为角度增益。通过优化这些角度，工程师可以提高机器人的运动效率和精确度，这在制造和其他自动化过程中至关重要。此外，角度增益的概念还可以应用于体育，尤其是在高尔夫或篮球等活动中。运动员必须理解他们的身体角度如何影响他们的表现。例如，高尔夫球手必须调整他们的挥杆角度以实现最大距离和准确性。同样，篮球运动员必须考虑他们投篮时的角度，以增加得分的机会。通过掌握角度增益，运动员可以完善他们的技术，提高整体表现。总之，术语角度增益涵盖了跨越多个学科的广泛应用。无论是在建筑、数学、机器人技术还是体育中，理解角度如何相互作用和变化都可以导致更好的设计、改进的表现和增强的结果。随着我们继续探索角度及其增益的复杂性，显然这个概念不仅仅是一个理论思想，而是一个可以在许多领域中利用的实用工具。因此，掌握角度增益对于任何希望在需要精确和战略思维的领域中脱颖而出的人来说都是至关重要的。