senary
简明释义
adj. 六的;[数] 六进制的
英英释义
与数字六相关或基于数字六的。 | |
一种以六为基数的数字系统。 |
单词用法
六进制基数 | |
六进制计数 | |
转换为六进制 | |
六进制数字 |
同义词
| 六进制的 | The hexary numeral system is used in some computing applications. | 六进制数字系统在一些计算应用中被使用。 | |
| 六倍的 | 产量的六倍增长是意想不到的。 |
反义词
| 十进制 | 十进制系统在日常计数中被广泛使用。 | ||
| 十二进制 | Some cultures have utilized the duodecimal system for trade. | 一些文化在贸易中使用了十二进制系统。 |
例句
1.Social goals and academic achievement goals were senary relations.
社会目标和学业成就目标是序列关系。
2.Meihua Hotel locates in the quiet shore area, overlooking Xizi Lake, the senary is favorably endowed.
美华大酒店坐落在幽静的湖滨区,俯瞰西子湖,景色得天独厚。
3.Meihua Hotel locates in the quiet shore area, overlooking Xizi Lake, the senary is favorably endowed.
美华大酒店坐落在幽静的湖滨区,俯瞰西子湖,景色得天独厚。
4.The game incorporates a senary 六进制 scoring system to enhance player engagement.
这个游戏采用senary 六进制 评分系统以增强玩家的参与感。
5.The ancient civilization used a senary 六进制 counting method for trade.
这个古老的文明使用senary 六进制 计数方法进行交易。
6.In mathematics, a senary 六进制 system can simplify certain calculations.
在数学中,senary 六进制 系统可以简化某些计算。
7.When teaching children about numbers, introducing the senary 六进制 system can be a fun challenge.
当教孩子们数字时,引入senary 六进制 系统可以是一个有趣的挑战。
8.The number system used in this programming language is based on a senary 六进制 format.
这个编程语言使用的数字系统基于senary 六进制 格式。
作文
In the world of mathematics and number systems, the concept of base or radix is fundamental. Most people are familiar with the decimal system, which is a base-10 system. However, there are many other bases that have been used throughout history, one of which is the base-6 system, also known as the senary system. This system uses six digits: 0, 1, 2, 3, 4, and 5. Understanding the senary system can provide insight into how different cultures and civilizations have approached mathematics.The senary system is particularly interesting because it offers a unique perspective on counting and arithmetic. In a senary system, the number following 5 is not 6, as in the decimal system, but rather 10. This means that the number 6 in decimal is represented as 10 in senary. Similarly, the number 12 in decimal is represented as 20 in senary. This shift in representation can initially be confusing, but it highlights the flexibility and variety of numerical systems.One of the advantages of the senary system is its divisibility. The number 6 has several factors, namely 1, 2, 3, and 6, making it easier to perform certain calculations. For instance, when dividing a quantity into smaller groups, using a senary system can simplify the process compared to using a base like 10. This property has made the senary system useful in various practical applications, especially in ancient times when people needed efficient ways to manage resources.Historically, the senary system has been used by several cultures. For example, some Native American tribes employed a base-6 counting system for trade and resource management. Similarly, the ancient Egyptians utilized a form of senary counting in their mathematical practices. These examples illustrate how different societies have adapted their numerical systems to meet their specific needs.In modern times, while the senary system is not commonly used, it still holds relevance in certain fields such as computer science and coding theory. The concept of different bases is crucial for understanding how computers process information. Binary (base-2), octal (base-8), decimal (base-10), and hexadecimal (base-16) are more widely recognized, but exploring systems like senary can enhance our understanding of computational logic.Moreover, the study of alternative base systems, including senary, can foster critical thinking and problem-solving skills. By engaging with different ways of representing numbers, students can develop a deeper appreciation for mathematics as a whole. It encourages them to think outside the box and understand that there is often more than one way to approach a problem.In conclusion, the senary system is a fascinating example of how numerical bases can vary across cultures and applications. While it may not be as widely used today, understanding the principles behind senary counting can enrich our knowledge of mathematics and its history. As we continue to explore the world of numbers, let us remember the diverse systems that have shaped our understanding of mathematics, including the intriguing senary system.
在数学和数字系统的世界中,基数或基数的概念是基础。大多数人熟悉十进制系统,这是一个基数为10的系统。然而,历史上使用过许多其他基数,其中之一就是六进制系统,也称为senary系统。该系统使用六个数字:0、1、2、3、4和5。理解senary系统可以提供对不同文化和文明如何处理数学的深入了解。senary系统特别有趣,因为它提供了对计数和算术的独特视角。在senary系统中,5之后的数字不是6(如十进制系统),而是10。这意味着十进制中的数字6在senary中表示为10。同样,十进制中的数字12在senary中表示为20。这种表示法的转变最初可能令人困惑,但它突显了数字系统的灵活性和多样性。senary系统的一个优点是其可分性。数字6有几个因子,即1、2、3和6,这使得执行某些计算变得更容易。例如,在将数量分成较小组时,使用senary系统可以简化与使用基数为10的过程相比的过程。这一特性使得senary系统在古代人们需要有效管理资源时变得有用。历史上,多个文化曾使用senary系统。例如,一些美洲原住民部落在贸易和资源管理中采用了六进制计数系统。同样,古埃及人在他们的数学实践中利用了一种senary计数形式。这些例子说明不同社会如何根据其特定需求调整其数字系统。在现代,虽然senary系统不常用,但在计算机科学和编码理论等某些领域仍然具有相关性。不同基数的概念对于理解计算机如何处理信息至关重要。二进制(基数为2)、八进制(基数为8)、十进制(基数为10)和十六进制(基数为16)更为人所知,但探索像senary这样的系统可以增强我们对计算逻辑的理解。此外,研究替代基数系统,包括senary,可以培养批判性思维和解决问题的能力。通过接触不同的数字表示方式,学生可以对数学整体产生更深的欣赏。这鼓励他们跳出框架思考,并理解通常有不止一种方法来解决问题。总之,senary系统是一个迷人的例子,展示了数字基数如何在文化和应用中有所不同。尽管今天它可能不那么广泛使用,但理解senary计数背后的原则可以丰富我们对数学及其历史的知识。当我们继续探索数字的世界时,让我们记住曾经塑造我们数学理解的多样化系统,包括引人入胜的senary系统。
