semi-diameter augmented

简明释义

半径改正量

英英释义

例句

1.In the design of the new tank, we need to ensure that the semi-diameter augmented is properly measured to avoid overflow.

在新水箱的设计中，我们需要确保半径增大的测量正确，以避免溢出。

2.The astronomer noted that the semi-diameter augmented of the planet's rings affects their visibility from Earth.

天文学家指出，行星环的半径增大影响它们从地球的可见性。

3.For accurate satellite dish installation, the semi-diameter augmented must be taken into consideration.

为了准确安装卫星天线，必须考虑半径增大。

4.The engineer calculated the volume of the sphere using the formula that incorporates the semi-diameter augmented to account for the increased size.

工程师使用包含半径增大的公式计算了球体的体积，以考虑尺寸的增加。

5.The architect emphasized the importance of the semi-diameter augmented when discussing the curvature of the dome.

建筑师在讨论穹顶的曲率时强调了半径增大的重要性。

作文

In the realm of geometry and mathematics, terms often carry significant weight in their application and understanding. One such term is semi-diameter augmented, which can be crucial in various fields such as physics, engineering, and architecture. The concept of a semi-diameter refers to half of the diameter of a circle or sphere, essentially measuring the radius. When we augment this measurement, we are essentially increasing its value or altering it in some way to accommodate specific requirements in practical applications.To better understand the importance of semi-diameter augmented, let us consider its implications in real-world scenarios. For instance, in civil engineering, when designing tunnels or circular structures, engineers need to take into account not just the radius of these structures but also any modifications that may be necessary for safety and functionality. This is where the idea of augmenting the semi-diameter comes into play. By increasing the semi-diameter, engineers can ensure that there is adequate space for both structural integrity and the movement of vehicles or pedestrians within these spaces.Furthermore, in the field of optics, the concept of semi-diameter augmented becomes relevant when discussing lenses and their properties. Lenses are designed with specific diameters to focus light effectively. However, if the semi-diameter is augmented, it can lead to enhanced optical performance, allowing for better image quality and clarity. This principle is particularly important in the design of high-quality camera lenses, where even the slightest adjustment in diameter can have profound effects on the final image.The application of semi-diameter augmented is not limited to physical structures or optics; it also extends to the digital realm. In computer graphics, for example, the rendering of three-dimensional objects requires precise calculations of dimensions. Augmenting the semi-diameter of virtual objects can result in more realistic representations, enhancing the viewer's experience. Whether it’s in video games or animated films, the careful manipulation of dimensions plays a critical role in achieving lifelike visuals.Moreover, the concept of semi-diameter augmented can also be applied in the context of data visualization. When representing data points on a graph or chart, adjusting the semi-diameter of circles or other shapes can help emphasize certain data trends or outliers. This visual augmentation allows viewers to quickly grasp complex information and draw insights from it, thereby improving decision-making processes in business and research.In conclusion, the term semi-diameter augmented encapsulates a vital concept that transcends various disciplines, offering insights into the importance of measurements and their modifications. Whether it’s in engineering, optics, computer graphics, or data visualization, understanding how to effectively augment the semi-diameter can lead to improved designs, enhanced performance, and better communication of information. As we continue to explore the depths of geometry and its applications, the significance of such terms will only grow, highlighting the interconnectedness of mathematics and the world around us.

在几何和数学领域，术语往往在其应用和理解中具有重要的分量。一个这样的术语是半径增加，它在物理学、工程学和建筑学等多个领域中都至关重要。半径的概念是指圆或球的直径的一半，实质上是测量半径。当我们增加这一测量值时，我们实际上是在以某种方式增加其值或进行修改，以适应实际应用中的特定要求。为了更好地理解半径增加的重要性，让我们考虑它在现实场景中的影响。例如，在土木工程中，在设计隧道或圆形结构时，工程师需要考虑的不仅是这些结构的半径，还有任何可能出于安全和功能要求而进行的修改。这就是半径增加的概念发挥作用的地方。通过增加半径，工程师可以确保结构的完整性和车辆或行人通行的空间充足。此外，在光学领域，半径增加的概念在讨论镜头及其特性时变得相关。镜头的设计具有特定的直径，以有效聚焦光线。然而，如果半径被增加，这可能会导致光学性能的提升，从而提高图像质量和清晰度。这个原理在高质量相机镜头的设计中尤为重要，因为即使是直径的微小调整也会对最终图像产生深远的影响。半径增加的应用不仅限于物理结构或光学，它还扩展到数字领域。例如，在计算机图形学中，三维物体的渲染需要精确的尺寸计算。增加虚拟物体的半径可以导致更逼真的表现，增强观众的体验。无论是在视频游戏还是动画电影中，尺寸的精确操控在实现生动视觉效果方面都起着至关重要的作用。此外，半径增加的概念也可以应用于数据可视化的背景。当在图表或图形上表示数据点时，调整圆形或其他形状的半径可以帮助强调某些数据趋势或异常值。这种视觉上的增强使观众能够快速掌握复杂信息并从中提取见解，从而改善商业和研究中的决策过程。总之，术语半径增加概括了一个超越各个学科的重要概念，提供了对测量及其修改重要性的洞察。无论是在工程、光学、计算机图形学还是数据可视化中，理解如何有效地增加半径都可以导致更好的设计、增强的性能和更好的信息传达。随着我们继续探索几何及其应用的深度，这些术语的重要性只会增长，突显出数学与我们周围世界之间的相互联系。