quinary
简明释义
adj. 第五位的;五个一套的;五进制的
n. 五个一套或一组
复 数 q u i n a r i e s
英英释义
与五个部分或元素相关的。 | |
Involving a system based on the number five, especially in classification. | 涉及基于数字五的系统,尤其在分类中。 |
单词用法
五元系统 | |
五类分类 | |
五级结构 | |
五元关系 |
同义词
反义词
| 主要的 | 这个项目的主要目标是提高效率。 | ||
| 次要的 | Secondary education is crucial for a well-rounded development. | 中等教育对于全面发展至关重要。 |
例句
1.The invention relates to a quinary polymerization fluororesin containing hydroxy and a synthesis method of the quinary polymerization fluororesin.
本发明涉及一种含羟基的五元共聚氟树脂及其合成方法。
2.This World Expo Shanghai Participating Nations' Pavilions Quinary Medallion Set is made by authorization of the Bureau of Shanghai World Expo Coordination.
“世博展馆奇观五枚套章”经上海世博会事务协调局授权制造发行。
3.This World Expo Shanghai Participating Nations' Pavilions Quinary Silver Medallion Set is made by authorization of the Bureau of Shanghai World Expo Coordination.
“世博展馆奇观五枚银质套章”经上海世博会事务协调局授权制造发行。
4.The quinary sector also includes domestic activities such as those performed by stay-at-home parents or homemakers.
五部门的还包括国内的活动,如由呆在家里父母或家庭主妇。
5.This World Expo Shanghai Participating Nations' Pavilions Quinary Silver Medallion Set is made by authorization of the Bureau of Shanghai World Expo Coordination.
“世博展馆奇观五枚银质套章”经上海世博会事务协调局授权制造发行。
6.This World Expo Shanghai Participating Nations' Pavilions Quinary Medallion Set is made by authorization of the Bureau of Shanghai World Expo Coordination.
五枚纪念章双面图案“世博展馆奇观五枚套章”经上海世博会事务协调局授权制造发行。
7.In chemistry, the study of quinary 五元的 compounds can reveal complex interactions.
在化学中,研究五元的化合物可以揭示复杂的相互作用。
8.The classification system includes a quinary 五级的 hierarchy of species.
这个分类系统包括一个五级的物种层级。
9.In mathematics, a quinary 五进制的 numeral system is based on five symbols.
在数学中,五进制的数字系统基于五个符号。
10.The artist used a quinary 五种颜色的 palette to create depth in her painting.
这位艺术家使用了一个五种颜色的调色板来为她的画作增添深度。
11.The quinary 五级的 structure of the organization allows for efficient communication.
该组织的五级的结构允许高效沟通。
作文
In the realm of mathematics and science, we often encounter various systems of classification and organization. One such system that is not commonly discussed in everyday conversation is the concept of a quinary system. The term quinary refers to a base-5 numeral system, which uses five distinct digits: 0, 1, 2, 3, and 4. This system contrasts with the more familiar decimal system, which is base-10 and uses ten digits (0 through 9). Understanding the quinary system can provide insights into different ways of counting and organizing information.The quinary system has its roots in various cultures and is particularly significant in anthropology and history. For instance, some indigenous tribes have utilized a quinary counting method in their daily lives. This counting system allows for efficient communication and transaction, especially in communities where resources are limited and need to be accounted for meticulously. By employing a quinary approach, these groups can manage their resources effectively without the complexities introduced by larger numerical systems.Moreover, the quinary system is not only limited to counting but also extends to various fields such as computer science and data representation. In computing, different base systems are used to encode information. While binary (base-2) and hexadecimal (base-16) systems are more prevalent, understanding the quinary system can help programmers and mathematicians develop algorithms that may require alternative counting methods. For example, when working with certain types of data structures or databases, utilizing a quinary framework can lead to more efficient data retrieval processes.Interestingly, the quinary system also finds applications in nature and biology. Some researchers have identified patterns in animal behavior and plant growth that align with quinary principles. For instance, certain species exhibit behaviors that can be classified into five distinct categories, echoing the fundamental structure of the quinary system. This connection between mathematics and the natural world emphasizes the importance of interdisciplinary study, where concepts from one field can illuminate and enhance our understanding of another.Furthermore, the quinary system can serve as an educational tool. Teaching students about different numeral systems, including quinary, can foster a deeper appreciation for mathematics and its applications in real life. It encourages critical thinking and problem-solving skills as students learn to convert numbers from one base to another. This knowledge not only aids in academic pursuits but also equips individuals with the cognitive tools necessary to navigate a world increasingly driven by data and technology.In conclusion, the quinary system, while not as widely recognized as the decimal or binary systems, plays a vital role in various aspects of life, culture, and science. Its implications stretch far beyond mere counting; it offers a unique perspective on how we organize and interpret information. Embracing the quinary system can enrich our understanding of mathematics, enhance our problem-solving abilities, and connect us to the natural world in profound ways. As we continue to explore the complexities of different numeral systems, the quinary system stands as a testament to the diversity and richness of human thought and creativity.
在数学和科学领域,我们经常会遇到各种分类和组织系统。其中一个不常在日常对话中讨论的概念是quinary(五进制)系统。quinary一词指的是一种基数为5的数字系统,使用五个不同的数字:0、1、2、3和4。这个系统与更为熟悉的十进制系统(基数为10,使用数字0到9)形成对比。理解quinary系统可以提供关于计数和组织信息的不同方式的见解。quinary系统根植于各种文化,在人类学和历史上尤其重要。例如,一些土著部落在日常生活中采用了quinary计数方法。这种计数系统使得有效的沟通和交易成为可能,特别是在资源有限且需要仔细核算的社区中。通过采用quinary方法,这些群体能够有效管理资源,而不必面对更大数字系统带来的复杂性。此外,quinary系统不仅限于计数,还扩展到计算机科学和数据表示等多个领域。在计算中,不同的基数系统用于编码信息。虽然二进制(基数为2)和十六进制(基数为16)系统更为普遍,但理解quinary系统可以帮助程序员和数学家开发可能需要替代计数方法的算法。例如,在处理某些类型的数据结构或数据库时,利用quinary框架可以导致更高效的数据检索过程。有趣的是,quinary系统也在自然和生物学中找到了应用。一些研究人员发现动物行为和植物生长中存在与quinary原则一致的模式。例如,某些物种表现出可以分为五个不同类别的行为,呼应了quinary系统的基本结构。这种数学与自然世界之间的联系强调了跨学科研究的重要性,在这种研究中,一个领域的概念可以照亮并增强我们对另一个领域的理解。此外,quinary系统还可以作为教育工具。教学生了解不同的数字系统,包括quinary,可以培养他们对数学及其在现实生活中应用的更深刻欣赏。这鼓励批判性思维和解决问题的能力,因为学生学习将数字从一个基数转换到另一个基数。这种知识不仅有助于学术追求,还使个人具备了在一个日益驱动于数据和技术的世界中导航所需的认知工具。总之,quinary系统虽然没有十进制或二进制系统那么广为人知,但在生活、文化和科学的各个方面发挥着重要作用。它的影响远不止于简单的计数;它提供了一种独特的视角,让我们组织和解释信息。接受quinary系统可以丰富我们对数学的理解,提高我们的解决问题的能力,并以深刻的方式将我们与自然世界联系起来。当我们继续探索不同数字系统的复杂性时,quinary系统作为人类思想和创造力多样性与丰富性的证明,值得我们重视。
