fundamental operation

简明释义

基本运算

英英释义

例句

1.The fundamental operation 基本运算 in computer programming often involves data manipulation and processing.

计算机编程中的基本运算 基本运算通常涉及数据操作和处理。

2.In mathematics, addition is considered a fundamental operation 基本运算 that forms the basis for other complex calculations.

在数学中，加法被认为是一个基本运算 基本运算，它构成了其他复杂计算的基础。

3.Understanding the fundamental operation 基本运算 of subtraction is crucial for solving algebraic equations.

理解减法的基本运算 基本运算对于解决代数方程至关重要。

4.Multiplication is another fundamental operation 基本运算 that is essential in both math and science.

乘法是另一个在数学和科学中都必不可少的基本运算 基本运算。

5.In programming, the fundamental operation 基本运算 of looping allows for repeating tasks efficiently.

在编程中，循环的基本运算 基本运算允许有效地重复任务。

作文

In the realm of mathematics, understanding the fundamental operation is crucial for students as they build their foundation in this subject. The term fundamental operation refers to the basic mathematical processes that form the backbone of arithmetic: addition, subtraction, multiplication, and division. These operations are not just isolated skills; they are interconnected and serve as the building blocks for more complex mathematical concepts. When students first encounter these operations, they may find them challenging. However, grasping the essence of each fundamental operation can significantly enhance their problem-solving abilities. For instance, addition is the process of combining two or more quantities to obtain a total. It is often the first operation that children learn, as it relates to everyday activities like counting objects or combining groups. Subtraction, on the other hand, is the process of taking away one quantity from another. This operation helps students understand the concept of 'less' and is essential for tasks such as calculating change or determining how many items are left after some have been removed. Together, addition and subtraction form a complementary relationship, where one can often be used to check the work of the other. Multiplication, considered a more advanced fundamental operation, is essentially repeated addition. It allows students to solve problems involving groups of equal size quickly. For example, if a student wants to find out how many legs are on three dogs, knowing that each dog has four legs, they can use multiplication (3 times 4) instead of adding 4 + 4 + 4. This efficiency is what makes multiplication an indispensable tool in mathematics. Division, the final fundamental operation, is the process of distributing a quantity into equal parts. It is the inverse of multiplication and helps students understand sharing and partitioning. For instance, if there are twelve cookies and four friends, division allows them to figure out how many cookies each person gets (12 divided by 4 equals 3). This operation reinforces the importance of fairness and equality in everyday situations. As students progress in their mathematical journey, they will encounter more complex operations and concepts that build upon these fundamental operations. For example, fractions, decimals, and percentages all rely on a solid understanding of addition, subtraction, multiplication, and division. Without mastering these basics, students may struggle with higher-level math and real-world applications. Moreover, the fundamental operation extends beyond pure mathematics. In science, for example, calculations often require the application of these operations to analyze data and draw conclusions. In finance, understanding how to add, subtract, multiply, and divide is essential for budgeting, investing, and managing expenses. Thus, these operations play a vital role in various fields and everyday life. In conclusion, the fundamental operation serves as the cornerstone of mathematical understanding. By mastering addition, subtraction, multiplication, and division, students not only prepare themselves for advanced studies but also equip themselves with essential skills for life. It is important for educators to emphasize the significance of these operations and provide students with ample opportunities to practice and apply them in diverse contexts. This approach will ensure that students develop a strong mathematical foundation that will benefit them throughout their educational and professional journeys.

在数学领域，理解基本运算对学生建立这一学科的基础至关重要。术语基本运算指的是构成算术基础的基本数学过程：加法、减法、乘法和除法。这些运算不仅仅是孤立的技能；它们是相互关联的，并且作为更复杂数学概念的构建块。当学生首次接触这些运算时，他们可能会觉得有挑战性。然而，掌握每个基本运算的本质可以显著增强他们的问题解决能力。例如，加法是将两个或多个数量结合以获得总和的过程。它通常是孩子们学习的第一个运算，因为它与日常活动相关，如计数物体或组合组。另一方面，减法是从另一数量中减去一个数量的过程。这个运算帮助学生理解“少”的概念，并且对于计算找零或确定在一些物品被移除后还剩多少物品是必不可少的。加法和减法共同形成一种互补关系，其中一个运算通常可以用来检查另一个运算的工作。乘法，被认为是更高级的基本运算，本质上是重复加法。它允许学生快速解决涉及相等大小组的问题。例如，如果一名学生想要找出三只狗的腿有多少，知道每只狗有四条腿，他们可以使用乘法（3乘以4），而不是加4 + 4 + 4。这种效率使得乘法成为数学中不可或缺的工具。除法，最后一个基本运算，是将一个数量分配到相等部分的过程。它是乘法的逆运算，并帮助学生理解分享和分配。例如，如果有十二块饼干和四个朋友，除法可以让他们找出每个人得到多少饼干（12除以4等于3）。这个运算加强了公平和平等在日常生活中的重要性。随着学生在数学旅程中的进步，他们将遇到更多复杂的运算和概念，这些都建立在这些基本运算之上。例如，分数、小数和百分比都依赖于对加法、减法、乘法和除法的扎实理解。如果没有掌握这些基础，学生在高阶数学和现实应用中可能会遇到困难。此外，基本运算超越了纯数学。在科学中，例如，计算通常需要应用这些运算来分析数据和得出结论。在金融中，理解如何加、减、乘和除对于预算、投资和管理开支至关重要。因此，这些运算在各个领域和日常生活中发挥着重要作用。总之，基本运算是数学理解的基石。通过掌握加法、减法、乘法和除法，学生不仅为高级学习做好准备，还为生活中必需的技能做好了装备。教育者强调这些运算的重要性，并为学生提供充分的机会在不同环境中练习和应用它们，这一点非常重要。这种方法将确保学生建立强大的数学基础，从而在他们的教育和职业生涯中受益。