divisibility

简明释义

英[dɪˌvɪzɪˈbɪlɪti]美[dəˌvɪzəˈbɪləti]

n. 可分性；[数] 可除性

英英释义

单词用法

同义词

反义词

例句

1.Divisibility and fungibility.

可分性和可替代性。

2.In addition, our scheme supports divisibility and transferability of digital coins in a simpler way.

此外，本方案支持数字货币的可分性和可转移性。

3.We completely solve the divisibility problem of class Numbers a class of imaginary quadratic fields.

完整地解决了一类虚二次域类数的可除性问题。

4.The burden of proving divisibility of harm is on the defendant seeking to limit his liability.

证明伤害可分性的责任落在了被告人寻求对自身责任的限制上。

5.Any one unit of money is as good as any other, and indeed it is precisely for its homogeneity, divisibility, and recognizability that the market chooses gold as money in the first place.

一块钱到哪里都是一块钱，事实上正是由于高度的同质性、可被分割性、易识别性才使市场优先选择了黄金作为货币。

6.We completely solve the divisibility problem of class Numbers for a class of imaginary quadratic fields.

完整地解决了一类虚二次域类数的可除性问题。

7.In mathematics, we often discuss the concept of divisibility 可整除性 when determining if one number can be divided by another without a remainder.

在数学中，我们经常讨论 divisibility 可整除性 的概念，以确定一个数字是否可以被另一个数字整除而没有余数。

8.The rules of divisibility 可整除性 help students quickly identify factors of numbers during their math tests.

可整除性规则帮助学生在数学测试中快速识别数字的因子。

9.Understanding divisibility 可整除性 can simplify complex fraction problems in algebra.

理解可整除性可以简化代数中的复杂分数问题。

10.The teacher explained the divisibility 可整除性 rules for 2, 3, and 5 to her students.

老师向她的学生解释了2、3和5的可整除性规则。

11.A number's divisibility 可整除性 by 10 indicates that it ends with a zero.

一个数字的可整除性为10意味着它以零结尾。

作文

Divisibility is a fundamental concept in mathematics that deals with whether one integer can be divided by another without leaving a remainder. This concept is not only crucial for number theory but also plays a significant role in various applications such as cryptography, computer science, and even in everyday problem-solving. Understanding the rules of divisibility (可被整除性) can simplify complex problems and enhance our mathematical skills. To illustrate the importance of divisibility (可被整除性), let’s consider some basic rules. For instance, a number is divisible by 2 if it ends in an even digit (0, 2, 4, 6, or 8). Similarly, a number is divisible by 3 if the sum of its digits is divisible by 3. These simple rules allow us to quickly determine the divisibility (可被整除性) of a number without performing full division, which can be particularly useful when dealing with larger numbers. In practical terms, the concept of divisibility (可被整除性) is often applied in various fields. For example, in computer science, algorithms often require checking the divisibility (可被整除性) of numbers to optimize performance. In cryptography, prime numbers, which are defined by their lack of divisibility (可被整除性) by any other integers besides themselves and one, are essential for securing data. Thus, a solid grasp of divisibility (可被整除性) allows individuals to navigate these fields more effectively. Moreover, the study of divisibility (可被整除性) leads to deeper insights into the properties of numbers. For instance, the concept of prime factorization is closely tied to divisibility (可被整除性). Every integer greater than one can be expressed uniquely as a product of prime numbers. This relationship between primes and divisibility (可被整除性) is foundational in number theory and has profound implications in mathematics. In addition to theoretical applications, understanding divisibility (可被整除性) can aid in everyday tasks. For instance, when budgeting, knowing how to determine if a certain amount can be evenly distributed among a group of people can help in making fair decisions. Similarly, in cooking, adjusting recipes often requires knowledge of divisibility (可被整除性) to scale ingredients accurately. In conclusion, divisibility (可被整除性) is a key mathematical principle that extends beyond theoretical boundaries into practical applications. Mastering this concept enhances our ability to solve problems efficiently and understand the relationships between numbers. Whether in academic pursuits, professional endeavors, or daily life, the principles of divisibility (可被整除性) serve as valuable tools that empower us to approach challenges with confidence and clarity.