cuboidal
简明释义
adj. 骰子形的,立方形的
英英释义
形状类似于立方体;具有立方体的形状。 | |
Relating to or denoting a type of epithelial cell that is as wide as it is tall, typically found in glands and ducts. | 与一种上皮细胞有关或表示该细胞的形状宽度与高度相等,通常在腺体和导管中发现。 |
单词用法
立方体细胞 | |
立方体结构 | |
立方体上皮 | |
立方体形状 | |
立方体几何 | |
立方体排列 |
同义词
| 立方的 | 这个储物箱是立方形的。 | ||
| 方形的 | 这座新建筑有一个方形的设计,非常显眼。 | ||
| 矩形的 | The room is rectangular, making it easy to arrange furniture. | 这个房间是矩形的,方便布置家具。 |
反义词
例句
1.Simple cuboidal epithelium lining a tubule (longitudinal cut). Some of the cell boundaries between "blocks" or "cubes" here are quite distinct.
管腔纵切面:单层立方上皮衬于管腔内。一些立方细胞之间的边界相当清晰明显。
2.The cuboidal cells often extend valve-like cytoplasmic processes which give the channels a tortuous course.
立方形间皮细胞常伸出瓣膜状胞质突起,使腹膜下小管呈蜿蜒曲折状。
3.And the gland filaments consist of a single layer of cuboidal secretory cells and an inner layer of squamous cells adjacent to the intima which lines the lumen.
而毒腺则是由立方形分泌细胞形成的单细胞层,和平行于内腔,贴近内膜的单层鳞状细胞层共同构成。
4.Simple cuboidal epithelium is a single layer of cells whose width and height are approximately equal.
单层立方上皮由单层细胞组成,细胞的宽度和高度近似相等。
5.A tubule stained to show the pink basement membrane underlying the base of the simple cuboidal epithelium. stained with periodic acid schiff reagent (pas), which stains mucopolysaccharides.
特殊显示多糖和糖蛋白的染色方法染色显示单层立方上皮下方的粉红色基膜。
6.Results the human ovary epithelium was composed of cuboidal and flat cells.
结果在扫描电镜下,人类卵巢上皮细胞可区分为扁平细胞和立方细胞。
7.A tubule stained to show the pink basement membrane underlying the base of the simple cuboidal epithelium. stained with periodic acid schiff reagent (pas), which stains mucopolysaccharides.
特殊显示多糖和糖蛋白的染色方法染色显示单层立方上皮下方的粉红色基膜。
8.The cuboidal 立方体的 shape of the dice makes it easy to roll.
骰子的立方体的形状使其易于掷出。
9.In geometry, a cuboidal 立方体的 structure has equal length, width, and height.
在几何学中,立方体的结构具有相等的长度、宽度和高度。
10.In our biology class, we learned that cuboidal 立方体的 epithelial cells line the kidney tubules.
在我们的生物课上,我们了解到立方体的上皮细胞衬里肾小管。
11.The cells in this tissue are predominantly cuboidal 立方体的, which helps in secretion.
该组织中的细胞主要是立方体的,这有助于分泌。
12.The laboratory uses cuboidal 立方体的 containers for storing samples.
实验室使用立方体的容器来储存样本。
作文
In the realm of geometry, shapes play a crucial role in understanding the world around us. One such shape that often comes up in various fields, including architecture, biology, and mathematics, is the cuboidal shape. A cuboidal object is one that has six rectangular faces, where opposite faces are equal in size. This characteristic makes cuboidal shapes particularly interesting and important in both theoretical and practical applications.To illustrate, let’s consider the common cube, which is a specific type of cuboidal shape. A cube has all its faces as squares, making it a regular form of a cuboidal object. In real life, we encounter many cuboidal structures, from buildings to boxes and even certain biological cells. For instance, the human kidney contains cuboidal epithelial cells, which play a significant role in the organ's function. Understanding the cuboidal structure of these cells helps scientists comprehend how they contribute to the overall physiology of the body.In architecture, the cuboidal shape is often utilized due to its stability and efficiency in space utilization. Buildings designed with cuboidal elements can optimize both internal and external spaces, allowing for better functionality. The simplicity of the cuboidal design also means that it can be easily replicated and modified, making it a favorite among architects and builders alike.Moreover, in mathematics, the concept of volume is closely related to cuboidal shapes. The volume of a cuboidal object can be calculated by multiplying its length, width, and height. This formula is fundamental in various fields, including engineering and physics, where accurate measurements are critical. For students learning geometry, mastering the properties of cuboidal shapes lays the groundwork for more complex concepts, such as three-dimensional transformations and spatial reasoning.The significance of cuboidal shapes extends beyond mere aesthetics or practicality; they also embody principles of symmetry and balance. In nature, many organisms exhibit cuboidal forms, demonstrating how this geometric shape can be both functional and efficient for survival. For example, certain types of crystals form cuboidal structures, showcasing the beauty of geometry in the natural world.In summary, the cuboidal shape is an essential part of our understanding of geometry and its applications. Whether we are discussing the design of a building, the structure of biological cells, or mathematical calculations, cuboidal shapes provide a foundation for exploration and discovery. Their versatility and stability make them a vital component in various fields, highlighting the interconnectedness of geometry with the physical world. As we continue to study and innovate, the importance of cuboidal shapes will undoubtedly remain at the forefront of our endeavors, reminding us of the elegance and utility of geometry in our everyday lives.
在几何学的领域中,形状在理解我们周围的世界中起着至关重要的作用。其中一个常常出现在建筑、生物学和数学等多个领域的形状是立方体的形状。立方体的物体是指具有六个矩形面,其中对面相等的形状。这一特征使得立方体的形状在理论和实际应用中都显得特别有趣和重要。为了解释这一点,让我们考虑常见的立方体,它是立方体的一种特定类型。立方体的所有面都是正方形,使其成为一种规则的立方体的物体。在现实生活中,我们遇到许多立方体的结构,从建筑到箱子,甚至某些生物细胞。例如,人类肾脏包含立方体的上皮细胞,这些细胞在器官功能中发挥着重要作用。理解这些细胞的立方体的结构有助于科学家们理解它们如何对身体的整体生理产生影响。在建筑学中,由于其稳定性和空间利用效率,立方体的形状经常被采用。设计有立方体的元素的建筑可以优化内部和外部空间,使其更具功能性。立方体的设计的简单性也意味着它可以被轻松复制和修改,这使得它成为建筑师和建筑工人最喜欢的选择。此外,在数学中,体积的概念与立方体的形状密切相关。立方体的物体的体积可以通过乘以其长度、宽度和高度来计算。这个公式在工程和物理等多个领域中至关重要,因为准确的测量是关键。对于学习几何的学生来说,掌握立方体的形状的属性为更复杂的概念奠定了基础,例如三维变换和空间推理。立方体的形状的重要性不仅限于美学或实用性;它们还体现了对称和平衡的原则。在自然界中,许多生物呈现出立方体的形式,展示了这一几何形状在生存中的功能性和有效性。例如,某些类型的晶体形成立方体的结构,展示了自然界中几何学的美。总之,立方体的形状是我们理解几何及其应用的重要组成部分。无论我们是在讨论建筑设计、生物细胞的结构,还是数学计算,立方体的形状都为探索和发现提供了基础。它们的多功能性和稳定性使其在多个领域中成为重要组成部分,突显了几何学与物理世界的相互联系。随着我们继续研究和创新,立方体的形状的重要性无疑将继续处于我们努力的前沿,提醒我们几何学在日常生活中的优雅和实用性。
