vertical angle

简明释义

直角

英英释义

例句

1.To enhance the performance of the telescope, we adjusted the vertical angle 垂直角度 to get a clearer view of the stars.

为了提高望远镜的性能，我们调整了垂直角度以获得更清晰的星星视图。

2.The climber had to adjust his position based on the vertical angle 垂直角度 of the cliff he was scaling.

登山者必须根据他正在攀爬的悬崖的垂直角度调整自己的位置。

3.When measuring the height of a building, you need to calculate the vertical angle 垂直角度 from your observation point.

在测量建筑物的高度时，你需要从你的观察点计算出垂直角度。

4.The architect used a protractor to find the vertical angle 垂直角度 of the roof for better drainage.

建筑师使用量角器来找出屋顶的垂直角度以便更好地排水。

5.In trigonometry, the vertical angle 垂直角度 is important for solving problems related to height and distance.

在三角学中，垂直角度对于解决与高度和距离相关的问题非常重要。

作文

In the study of geometry, understanding the concept of vertical angle is crucial for solving various problems related to angles and triangles. The term vertical angle refers to the angles that are opposite each other when two lines intersect. These angles are always equal in measure, which is a fundamental property of intersecting lines. For instance, if two lines cross each other and form an angle of 30 degrees on one side, the angle directly opposite to it will also measure 30 degrees. This equality of vertical angles is not just a coincidence; it is a result of the way angles are formed in a plane.To visualize this, imagine two roads crossing each other at a traffic intersection. The angles formed by the crossing roads can be labeled as A, B, C, and D. If angle A measures 50 degrees, then angle C, which is opposite to angle A, must also measure 50 degrees. This relationship between vertical angles can be very useful in various applications, such as construction, engineering, and even in everyday problem-solving scenarios.One practical application of vertical angles can be found in architecture. When designing buildings, architects often need to ensure that certain angles are equal for aesthetic and structural integrity. By applying the principle of vertical angles, they can create balanced designs that are both functional and visually appealing. Additionally, this concept helps in determining the heights of objects when measuring from a distance, using the angles formed between the observer's line of sight and the ground.Moreover, understanding vertical angles is essential for students who are preparing for standardized tests that include geometry sections. Many math problems involve identifying and calculating the measures of angles formed by intersecting lines. By mastering the concept of vertical angles, students can solve these problems more efficiently and accurately.In conclusion, the concept of vertical angles plays a significant role in the field of geometry. Its properties not only help in theoretical mathematics but also have practical implications in various fields such as architecture and engineering. By recognizing the importance of vertical angles, students and professionals alike can enhance their understanding of geometric principles and apply them in real-world situations. Therefore, mastering this concept is vital for anyone looking to excel in mathematics or related disciplines.

在几何学的研究中，理解对顶角的概念对于解决与角和三角形相关的各种问题至关重要。术语对顶角是指当两条直线相交时，彼此对立的角。这些角的度数总是相等，这是相交直线的一个基本特性。例如，如果两条直线交叉并在一侧形成一个30度的角，那么与之直接相对的角也将是30度。这种对顶角的相等性并不是偶然的；它是角在平面内形成方式的结果。为了更好地理解这个概念，可以想象两条道路在交通十字路口交叉。交叉道路所形成的角可以标记为A、B、C和D。如果角A的度数为50度，那么与角A相对的角C的度数也必须为50度。这种对顶角之间的关系在许多应用中非常有用，例如建筑、工程，甚至在日常问题解决场景中。对顶角的一个实际应用可以在建筑设计中找到。当建筑师设计建筑物时，他们通常需要确保某些角度相等，以达到美观和结构完整性的目的。通过应用对顶角的原则，他们可以创建既实用又具有视觉吸引力的平衡设计。此外，这个概念还帮助在远处测量物体高度时，利用观察者视线与地面之间形成的角度。另外，理解对顶角对于准备标准化考试的学生来说至关重要，这些考试通常包括几何部分。许多数学问题涉及识别和计算由相交直线形成的角的度数。通过掌握对顶角的概念，学生可以更高效、更准确地解决这些问题。总之，对顶角的概念在几何学领域中发挥着重要作用。它的特性不仅有助于理论数学，还有在建筑和工程等多个领域的实际应用。通过认识到对顶角的重要性，学生和专业人士都可以增强对几何原理的理解，并将其应用于现实世界的情况。因此，掌握这一概念对任何希望在数学或相关学科中取得优异成绩的人来说都是至关重要的。