partial division

简明释义

局部分隔

英英释义

例句

1.The company implemented a partial division to streamline its operations.

公司实施了一个部分划分以简化其运营。

2.The team worked on a partial division of tasks to improve efficiency.

团队对任务进行了部分划分以提高效率。

3.A partial division of the budget allowed for more focused spending in key areas.

预算的部分划分使得在关键领域的支出更加集中。

4.In mathematics, a partial division can help simplify complex fractions.

在数学中，部分划分可以帮助简化复杂的分数。

5.The project manager suggested a partial division of responsibilities among team members.

项目经理建议在团队成员之间进行部分划分职责。

作文

In mathematics, the concept of division is fundamental, and it can be approached in various ways. One such method is known as partial division, which plays a significant role in simplifying complex problems. To understand partial division, we must first grasp the basic principles of division itself. Division is essentially the process of determining how many times one number is contained within another. However, when dealing with larger numbers or polynomials, direct division can become cumbersome and inefficient. This is where partial division comes into play.Partial division involves breaking down the division process into smaller, more manageable parts. For example, when dividing a polynomial by a monomial, instead of attempting to divide the entire polynomial at once, we can separate it into individual terms. This allows us to simplify the calculation and arrive at the answer more easily. The essence of partial division lies in its ability to make complex problems simpler by dividing them into smaller components.Consider a practical example: suppose we want to divide the polynomial 2x^3 + 4x^2 + 6x by the monomial 2x. Using partial division, we can tackle each term separately. First, we divide 2x^3 by 2x, which gives us x^2. Next, we divide 4x^2 by 2x, resulting in 2x. Finally, we divide 6x by 2x, which yields 3. By combining these results, we find that (2x^3 + 4x^2 + 6x) ÷ (2x) = x^2 + 2x + 3. This illustrates the efficiency of partial division in handling polynomial expressions.Furthermore, partial division is not limited to polynomials. It can also be applied in various fields such as computer science and engineering, where algorithms often require the division of data into smaller segments for processing. For instance, in programming, when working with arrays or lists, we might need to divide a large dataset into smaller subsets for analysis. Utilizing partial division allows for a more organized approach, ensuring that each segment is processed without overwhelming the system.In conclusion, partial division is an invaluable technique that simplifies the division process by breaking it down into smaller parts. Whether in mathematics or other fields, this method enhances efficiency and clarity. By mastering partial division, students and professionals alike can tackle complex problems with confidence and precision. As we continue to explore the vast world of mathematics and its applications, embracing techniques like partial division will undoubtedly contribute to our overall understanding and success in the subject.

在数学中，除法的概念是基础性的，可以通过多种方式进行处理。其中一种方法被称为部分除法，它在简化复杂问题中起着重要作用。要理解部分除法，我们首先必须掌握除法本身的基本原理。除法本质上是确定一个数字包含另一个数字多少次的过程。然而，当处理更大的数字或多项式时，直接除法可能会变得繁琐且低效。这就是部分除法发挥作用的地方。部分除法涉及将除法过程分解为更小、更易管理的部分。例如，当将多项式2x^3 + 4x^2 + 6x除以单项式2x时，我们可以不试图一次性除去整个多项式，而是将其分开为各个项。这使我们能够简化计算，更容易得出答案。部分除法的本质在于通过将复杂问题分解为更小的组成部分，使其变得更简单。考虑一个实际的例子：假设我们想将多项式2x^3 + 4x^2 + 6x除以单项式2x。使用部分除法，我们可以分别处理每一项。首先，我们将2x^3除以2x，得到x^2。接下来，我们将4x^2除以2x，得到2x。最后，我们将6x除以2x，得到3。通过组合这些结果，我们发现(2x^3 + 4x^2 + 6x) ÷ (2x) = x^2 + 2x + 3。这说明了部分除法在处理多项式表达式中的效率。此外，部分除法并不限于多项式。它还可以应用于计算机科学和工程等多个领域，在这些领域中，算法通常需要将数据划分为更小的部分进行处理。例如，在编程中，当处理数组或列表时，我们可能需要将大型数据集划分为更小的子集进行分析。利用部分除法能够更有条理地进行处理，确保每个部分都能在不压倒系统的情况下进行处理。总之，部分除法是一种宝贵的技术，通过将除法过程分解为更小的部分来简化计算。无论是在数学还是其他领域，这种方法都提高了效率和清晰度。通过掌握部分除法，学生和专业人士都可以自信而准确地解决复杂问题。在我们继续探索数学及其应用的广阔世界时，接受像部分除法这样的技术无疑将有助于我们对这一学科的整体理解和成功。