radices

简明释义

英[ˈrædɪsiːz]美[ˈredɪsiz]

n. 根；基数；词根（radix 的复数形式）

英英释义

单词用法

同义词

反义词

例句

1.The disquisition pilot study about the computer assisted optimization design of a screw spring of many radices using math layout theory conjoint to computer programmer method with a exemplity.

笔者将数学规划理论与计算机程序设计方法相结合，通过实例对多股螺旋弹簧的计算机辅助优化设计进行了初步探讨。

2.This article will give brief introduction on the recent research work relating to radices pueraria s main composition, pharmacologic effect and clinical application.

本文介绍了葛根的主要化学成分，并对其药理作用和临床应用等方面的研究进展进行综述。

3.The effects of aqueous decoction of peony radices cortex(ADPRC) on C.

研究牡丹皮水煎剂对体外白念珠菌生物膜的影响。

4.This paper summarized the resources and varieties, the chemical compounds and functions of radices puerarire, analyzed the current status on research and exploitation of the food of radices puerarire.

对葛根的资源与品种、化学成分及其功能等作一综述，并对葛根在食品中的研究与开发现状进行了分析。

5.This paper summarized the resources and varieties, the chemical compounds and functions of radices puerarire, analyzed the current status on research and exploitation of the food of radices puerarire.

对葛根的资源与品种、化学成分及其功能等作一综述，并对葛根在食品中的研究与开发现状进行了分析。

6.Usually easy to buy materials such as cinnamon, etc, also have good radices effect, citizens can buy cognition, or tea with the dishes cooked, and can be.

平常易买到的药材如肉桂、丹参片等，也有好的温阳效果，市民可以买来含，或泡茶、熬煮、入菜均可。

7.It is practice meanings to design the screw spring of many radices at faster speed and increase design qualities.

对加快多股螺旋弹簧的设计过程，提高设计质量具有一定的实际意义。

8.The number control machine can process the cored and coreless spiral springs of many radices with high accuracy and quality, and meet the requirement of enterprise.

该机床能够加工出高精度、高质量的有芯或无芯的多股螺旋弹簧，满足了企业的需求。

9.The radices of various logarithmic scales can greatly affect the outcome of calculations.

各种对数尺度的radices会极大影响计算的结果。

10.The radices of a polynomial can be found by analyzing its roots.

通过分析多项式的根，可以找到其radices。

11.In computer science, binary and hexadecimal are two commonly used radices.

在计算机科学中，二进制和十六进制是两种常用的radices。

12.In mathematics, the term radices refers to the bases of number systems, such as binary or decimal.

在数学中，术语radices指的是数字系统的基数，例如二进制或十进制。

13.When converting numbers between different bases, understanding their radices is crucial.

在不同进制之间转换数字时，理解它们的radices至关重要。

作文

In mathematics, the concept of roots is fundamental, and it often leads us to explore deeper ideas. One such term that arises in various mathematical contexts is radices, which refers to the plural form of the word 'radix.' The term 'radix' itself originates from Latin, meaning 'root,' and it has significant implications in number theory and algebra. Understanding radices is essential for students who wish to delve into advanced mathematical concepts, as it lays the groundwork for topics such as logarithms and base conversions.To illustrate the importance of radices, consider the different number systems we use daily. The decimal system, which is base 10, is perhaps the most familiar to us. Each digit in a number represents a power of 10, depending on its position. For example, in the number 345, the digit 3 represents 3 hundreds (or 3 times 10^2), the digit 4 represents 4 tens (or 4 times 10^1), and the digit 5 represents 5 units (or 5 times 10^0). The radices of these numbers determine how we interpret their value.Now, let's explore another common base: binary, which is base 2. In binary, each digit can only be 0 or 1. The radices here dictate that each position in a binary number represents a power of 2. For instance, the binary number 1011 translates to decimal as follows: 1 times 2^3 (which is 8) plus 0 times 2^2 (which is 0) plus 1 times 2^1 (which is 2) plus 1 times 2^0 (which is 1), resulting in the decimal number 11. This conversion process showcases how understanding radices is crucial in switching between different number systems.Furthermore, radices play a vital role in the realm of logarithms. The logarithm of a number is essentially the exponent to which a base (or radix) must be raised to produce that number. For example, if we take the logarithm base 10 of 100, we find that it equals 2 because 10 raised to the power of 2 is 100. In this case, the radix is 10, illustrating how deeply interconnected these concepts are.In computer science, understanding radices becomes even more critical. Computers operate using binary code, which means that all data is ultimately represented in base 2. However, programmers often need to work with hexadecimal (base 16) or octal (base 8) systems as well. Each of these systems has its own radices, and knowing how to convert between them is essential for tasks such as memory addressing and data representation.In conclusion, the term radices encapsulates a fundamental aspect of mathematics and its applications in various fields. From number systems to logarithmic functions and computer programming, a solid grasp of radices enhances our ability to understand and manipulate numerical information effectively. As we continue to explore the vast world of mathematics, let us remember the significance of these roots and how they connect different concepts, enriching our knowledge and problem-solving skills.

在数学中，根的概念是基础性的，它常常引导我们探索更深层次的思想。一个在各种数学背景下出现的术语是radices，它指的是“radix”的复数形式。“radix”这个词本身起源于拉丁语，意思是“根”，在数论和代数中具有重要的意义。理解radices对希望深入研究高级数学概念的学生至关重要，因为它为对数和进制转换等主题奠定了基础。为了说明radices的重要性，我们考虑一下我们日常使用的不同数字系统。十进制系统，即基数10，可能是我们最熟悉的。数字中的每一位都代表着10的某个幂，具体取决于其位置。例如，在数字345中，数字3代表3百（或3乘以10^2），数字4代表4十（或4乘以10^1），而数字5代表5个单位（或5乘以10^0）。这些数字的radices决定了我们如何解释它们的值。现在，让我们探讨另一个常见的基数：二进制，即基数2。在二进制中，每个数字只能是0或1。这里的radices决定了二进制数中每个位置表示2的某个幂。例如，二进制数1011转化为十进制如下：1乘以2^3（即8）加上0乘以2^2（即0）加上1乘以2^1（即2）加上1乘以2^0（即1），最终得到十进制数11。这一转换过程展示了理解radices在不同数字系统之间切换时的重要性。此外，radices在对数领域中也扮演着至关重要的角色。一个数字的对数本质上是将一个基数（或radix）提高到什么指数才能产生该数字。例如，如果我们取100的10为底的对数，我们发现它等于2，因为10的2次方是100。在这种情况下，radix是10，说明这些概念是多么紧密相连。在计算机科学中，理解radices变得更加关键。计算机使用二进制代码进行操作，这意味着所有数据最终都以基数2表示。然而，程序员通常还需要处理十六进制（基数16）或八进制（基数8）系统。每一个系统都有其自己的radices，而知道如何在它们之间转换对于内存寻址和数据表示等任务至关重要。总之，术语radices概括了数学及其在各个领域应用的一个基本方面。从数字系统到对数函数，再到计算机编程，扎实掌握radices能够增强我们有效理解和处理数字信息的能力。当我们继续探索广阔的数学世界时，让我们记住这些根的重要性，以及它们如何连接不同的概念，丰富我们的知识和解决问题的技能。