subdivision length

简明释义

分舱长度

英英释义

例句

1.The engineer recommended a shorter subdivision length for more efficient land use.

工程师建议采用更短的分区长度以实现更高效的土地利用。

2.In urban planning, the subdivision length can affect traffic flow and accessibility.

在城市规划中，分区长度会影响交通流量和可达性。

3.During the meeting, we discussed how the subdivision length impacts community layout.

在会议中，我们讨论了分区长度如何影响社区布局。

4.The architect calculated the subdivision length to ensure proper spacing between the buildings.

建筑师计算了分区长度以确保建筑物之间的适当间距。

5.Adjusting the subdivision length of the lots can increase the overall property value.

调整地块的分区长度可以提高整体物业价值。

作文

In the field of mathematics and engineering, understanding various concepts is crucial for effective problem-solving. One such concept is the subdivision length, which refers to the length of a segment created when a larger geometric figure is divided into smaller parts or subdivisions. This concept can be applied in various contexts, such as in computer graphics, architectural design, and even in urban planning. By grasping the idea of subdivision length (子分段长度), one can enhance their ability to work with complex shapes and structures. To illustrate the importance of subdivision length, consider a scenario where an architect is designing a new building. The architect must break down the overall design into manageable sections to ensure that every aspect of the structure is well-planned and functional. Each section can be thought of as a subdivision, and the subdivision length becomes a critical factor in determining how these sections fit together harmoniously. If the lengths of these subdivisions are not calculated accurately, the final structure may suffer from misalignments or aesthetic issues. In computer graphics, subdivision length plays a vital role in rendering smooth curves and surfaces. When creating a 3D model, artists often use subdivision techniques to refine their shapes. By dividing a polygonal mesh into smaller polygons, artists can achieve greater detail and smoother transitions between surfaces. Here, the subdivision length is essential because it dictates how finely the mesh is divided. A shorter subdivision length allows for more detail but requires more computational power, while a longer length simplifies the model but may sacrifice detail. Moreover, in urban planning, the concept of subdivision length can be applied when designing road networks or city layouts. Planners often divide large areas into smaller subdivisions to create efficient transportation routes and ensure accessibility. The subdivision length of roads and pathways impacts traffic flow and connectivity within the urban environment. If the lengths of these subdivisions are poorly planned, it could lead to congestion and inefficiencies in movement. Additionally, understanding subdivision length can aid in educational settings, particularly in teaching geometry. Students often struggle with visualizing how shapes can be subdivided and the implications of those subdivisions. By using practical examples and exercises involving subdivision length, educators can help students grasp the concept of area, perimeter, and volume more effectively. In conclusion, the concept of subdivision length (子分段长度) is integral to various fields, including architecture, computer graphics, and urban planning. Mastering this concept not only enhances one’s technical skills but also fosters a deeper understanding of how intricate designs and systems are developed. Whether one is an aspiring architect, a graphic designer, or a city planner, recognizing the significance of subdivision length will undoubtedly contribute to their success in creating functional and aesthetically pleasing outcomes.