slant distance

简明释义

斜距

英英释义

例句

1.In navigation, understanding the slant distance 斜距 can help in plotting accurate courses.

在导航中，理解slant distance 斜距 可以帮助绘制准确的航线。

2.To find the slant distance 斜距 of the hill, we used a clinometer.

为了找到山的slant distance 斜距，我们使用了一个测斜仪。

3.The slant distance 斜距 from the top of the tower to the ground is crucial for safety calculations.

从塔顶到地面的slant distance 斜距 对于安全计算至关重要。

4.The pilot calculated the slant distance 斜距 to the runway before descending.

飞行员在下降之前计算了到跑道的slant distance 斜距。

5.When surveying, the engineer measured the slant distance 斜距 between two points.

在测量时，工程师测量了两点之间的slant distance 斜距。

作文

In the study of geometry and physics, the concept of slant distance plays a crucial role in understanding various spatial relationships. The term slant distance refers to the shortest distance between two points measured along a straight line that is not perpendicular to the base or the ground. This measurement is particularly important in fields such as architecture, engineering, and even navigation. For instance, when constructing a building, architects must consider the slant distance when designing roofs, ramps, and other features that require an incline. To illustrate the importance of slant distance, consider a simple example of a triangular structure. If we have a right triangle where one leg represents the height of the triangle and the other leg represents the base, the slant distance would be the hypotenuse of this triangle. This distance gives us insight into how far one would need to travel if moving diagonally from one point to another, rather than following the horizontal or vertical paths alone. Thus, understanding slant distance allows for more efficient planning and execution of various projects.Furthermore, in the realm of physics, the concept of slant distance is essential when analyzing projectile motion. When an object is launched at an angle, the path it travels can be described using the slant distance in relation to the height it reaches and the distance it covers horizontally. This relationship is vital for calculating trajectories and ensuring accuracy in fields such as sports science and aerodynamics.In addition, the application of slant distance extends beyond theoretical concepts into practical applications. For example, in surveying, professionals use instruments to measure the slant distance between points on uneven terrain. This information is crucial for creating accurate maps and understanding land topography. By measuring the slant distance, surveyors can determine not just the horizontal distance but also how elevation changes affect the overall layout of the land.Moreover, in everyday life, we encounter scenarios where slant distance becomes relevant. When hiking up a hill, the slant distance from the base to the summit is longer than the vertical distance climbed, which can impact the time and energy required to reach the top. This understanding is not only important for hikers but also for those involved in outdoor activities that require navigation and route planning.In conclusion, the concept of slant distance is multifaceted and deeply embedded in various disciplines. From architecture to physics and even recreational activities, recognizing the significance of slant distance enhances our ability to analyze and interpret spatial relationships effectively. By mastering this concept, individuals can apply it to improve their understanding of the world around them, making informed decisions in both professional and personal contexts. As we continue to explore the implications of slant distance, it becomes evident that its relevance transcends mere calculations; it shapes our perception of space and movement in profound ways.

在几何和物理学的研究中，斜距的概念在理解各种空间关系方面起着至关重要的作用。术语斜距指的是沿着一条不与基底或地面垂直的直线测量的两个点之间的最短距离。这种测量在建筑、工程甚至导航等领域尤为重要。例如，在建造建筑时，建筑师必须在设计屋顶、坡道和其他需要倾斜的特征时考虑斜距。为了说明斜距的重要性，考虑一个简单的三角形结构。如果我们有一个直角三角形，其中一条边代表三角形的高度，而另一条边代表底边，则斜距将是这个三角形的斜边。这个距离使我们了解到，如果从一个点移动到另一个点，沿着对角线旅行所需的距离，而不是单独沿水平或垂直路径。因此，理解斜距可以更有效地规划和执行各种项目。此外，在物理学领域，斜距的概念在分析抛体运动时至关重要。当一个物体以某个角度发射时，它所经过的路径可以用斜距来描述，这与它达到的高度和水平上覆盖的距离有关。这种关系对于计算轨迹和确保在体育科学和空气动力学等领域的准确性至关重要。此外，斜距的应用超越了理论概念，进入了实际应用。例如，在测量中，专业人员使用仪器测量不平坦地形上点与点之间的斜距。这些信息对于创建准确的地图和理解土地的地形至关重要。通过测量斜距，测量员不仅可以确定水平距离，还可以了解海拔变化如何影响土地的整体布局。而且，在日常生活中，我们会遇到一些场景，其中斜距变得相关。当在山上远足时，从基地到山顶的斜距比爬升的垂直距离要长，这可能会影响到达到顶部所需的时间和精力。这种理解不仅对远足者重要，而且对那些涉及导航和路线规划的户外活动参与者也很重要。总之，斜距的概念是多方面的，深深植根于各个学科。从建筑到物理学，甚至是休闲活动，认识到斜距的重要性增强了我们有效分析和解释空间关系的能力。通过掌握这一概念，个人可以将其应用于提高对周围世界的理解，从而在职业和个人背景中做出明智的决策。随着我们继续探索斜距的影响，其相关性显然超越了单纯的计算；它深刻地塑造了我们对空间和运动的感知。