remainder; remaindership

简明释义

残留权[法律]

英英释义

Remainder refers to the part of something that is left after the other parts have been taken away, used, or dealt with.

余数是指在其他部分被取走、使用或处理后剩下的部分。

Remaindership is a legal term that describes the interest or ownership of a property that remains after a life estate or another temporary interest has ended.

余权是一个法律术语,描述在生命财产或其他临时权益结束后,剩余的财产的权益或所有权。

例句

1.The remaindership 余留权 allows the heir to receive the property after the life tenant passes away.

余留权 余留权允许继承人在生活租户去世后接收财产。

2.The remaindership 余留权 of the estate will pass to the children after the death of the current owner.

该财产的余留权 余留权将在现任所有者去世后传给孩子们。

3.In mathematics, the remainder 余数 of a division is what is left over after dividing.

在数学中,除法的余数 余数是除完后剩下的部分。

4.We divided the pizza into eight slices, and I took three, leaving a remainder 剩余部分 of five slices.

我们把披萨切成八片,我吃了三片,留下了五片的剩余部分 剩余部分

5.After paying off my debts, I used the remainder 剩余部分 of my savings to invest in stocks.

还清债务后,我用我的储蓄的剩余部分 剩余部分投资股票。

作文

In the realm of mathematics, the concept of a remainder (余数) is crucial when performing division. When one number is divided by another, the remainder is what is left over after the division process is complete. For instance, if we divide 10 by 3, we find that 3 goes into 10 three times, giving us 9, and the remainder is 1. This simple operation illustrates how the remainder serves as a fundamental component in understanding division and its applications. However, the idea of a remaindership (余数关系) extends beyond just arithmetic; it can be applied in various fields such as computer science, where algorithms often rely on remainders for operations like hashing and cryptography. In programming, the remaindership can help determine whether a number is even or odd, which is essential for many logical operations. For example, using the modulo operator (%) in many programming languages allows developers to efficiently manage remaindership when implementing loops or conditional statements.Moreover, the concept of remaindership can also be observed in real-life scenarios. Consider a scenario where a group of friends decides to share a pizza. If there are 8 slices and 3 friends, each friend would get 2 slices, and there would be a remainder of 2 slices left. This illustrates how remaindership plays a role in everyday decision-making and resource allocation.Understanding the implications of remainder and remaindership allows individuals to approach problems with a more analytical mindset. In academia, students encounter these concepts not only in mathematics but also in statistics and probability, where the analysis of data often leads to conclusions based on the remainder of certain calculations. For instance, when conducting surveys, researchers may find that a certain percentage of respondents fall into a particular category, leaving a remainder that could indicate a different demographic or opinion.Additionally, in the context of finance, the notion of remaindership can be seen in budgeting and accounting practices. When allocating funds, businesses often need to account for the remainder left after expenses have been paid. This allows them to make informed decisions regarding investments and savings. The ability to recognize and calculate remaindership is vital for maintaining financial health and ensuring that resources are utilized effectively.In conclusion, the terms remainder and remaindership are not merely confined to the domain of mathematics; they permeate various aspects of life and contribute to a deeper understanding of problem-solving and resource management. Whether in academic pursuits, programming, social situations, or financial planning, recognizing the significance of remainder and remaindership enhances our ability to navigate complexities and make informed decisions. By embracing these concepts, we equip ourselves with valuable tools for both personal and professional growth.

在数学领域,余数的概念在进行除法时至关重要。当一个数字被另一个数字除以时,余数是除法过程完成后剩下的部分。例如,如果我们将10除以3,我们发现3可以进入10三次,得到9,而余数是1。这个简单的操作说明了余数如何作为理解除法及其应用的基本组成部分。然而,余数关系的概念不仅限于算术;它可以应用于多个领域,如计算机科学,其中算法常常依赖于余数进行散列和加密等操作。在编程中,余数关系可以帮助确定一个数字是偶数还是奇数,这对许多逻辑操作至关重要。例如,在许多编程语言中使用取模运算符(%)允许开发人员在实现循环或条件语句时有效管理余数关系。此外,余数关系的概念也可以在现实生活场景中观察到。考虑一个场景,一群朋友决定分享一块披萨。如果有8片披萨和3个朋友,每个朋友会得到2片,剩下2片作为余数。这说明了余数关系在日常决策和资源分配中的作用。理解余数余数关系的影响使个人能够以更分析的思维方式解决问题。在学术界,学生不仅在数学中遇到这些概念,还在统计和概率中,数据分析往往基于某些计算的余数得出结论。例如,在进行调查时,研究人员可能发现某个百分比的受访者属于特定类别,留下的余数可能指示不同的人口统计或观点。此外,在金融背景下,余数关系的概念可以在预算和会计实践中看到。在分配资金时,企业通常需要计算支出支付后的余数。这使他们能够就投资和储蓄做出明智的决策。识别和计算余数关系的能力对于保持财务健康和确保资源有效利用至关重要。总之,余数余数关系这些术语并不仅仅局限于数学领域;它们渗透到生活的各个方面,并有助于更深入地理解解决问题和资源管理。无论是在学术追求、编程、社交场合还是财务规划中,认识到余数余数关系的重要性增强了我们应对复杂性的能力,并做出明智的决策。通过接受这些概念,我们为个人和职业成长提供了宝贵的工具。