axiomatical

简明释义

英[ˌæksɪəˈmætɪkəl]美[ˌæksaɪˈmætɪkəl]

公理化的

英英释义

单词用法

同义词

反义词

例句

1.Conclusion After the axiomatical system of the pan-neighbourhood system and the net pan-convergence are simplified, a clearer demonstration and a more convenient appliance will be shown.

结论泛邻元系公理系统和网泛敛关系公理系统简化后，表述更清晰，应用更方便。

2.Conclusion After the axiomatical system of the pan-neighbourhood system and the net pan-convergence are simplified, a clearer demonstration and a more convenient appliance will be shown.

结论泛邻元系公理系统和网泛敛关系公理系统简化后，表述更清晰，应用更方便。

3.The paper points to the justification of the logic cycle and so called "anti-deduction" in the establishment of a axiomatical system.

它的本质在于用形式逻辑的方法处理辩证逻辑问题。本文指出逻辑循环和所谓“逆演绎”在建立公理系统中的合理性。

4.AimTo simplify the axiomatical system of the pan-neighbourhood system and the net pan-convergence relation.

目的简化格化拓扑中泛邻元系公理系统和网泛敛关系公理系统。

5.In mathematics, certain principles are considered axiomatical 公理的, forming the foundation for further theories.

在数学中，某些原则被视为公理的，构成进一步理论的基础。

6.The scientist proposed an axiomatical 公理的 framework to explain the behavior of particles at the quantum level.

这位科学家提出了一个公理的框架来解释量子层面上粒子的行为。

7.Her argument was based on axiomatical 公理的 truths that everyone accepted without question.

她的论点基于大家毫无疑问接受的公理的真理。

8.The axiomatical 公理的 nature of his assumptions made it easier to build upon his research.

他假设的公理的性质使得在他的研究基础上进行扩展变得更加容易。

9.Philosophers often debate the axiomatical 公理的 foundations of ethics and morality.

哲学家们常常讨论伦理和道德的公理的基础。

作文

In the realm of mathematics and logic, certain principles are considered to be self-evident truths. These principles serve as the foundation upon which more complex theories and concepts are built. The term axiomatical refers to these fundamental truths that do not require proof because their validity is universally accepted. Understanding the nature of axiomatical statements is crucial for anyone engaged in analytical thinking or problem-solving, as it allows for a clearer comprehension of how various ideas interconnect. For instance, in Euclidean geometry, one of the most famous axiomatical statements is that through any two points, there exists exactly one straight line. This statement is not only simple but also serves as a cornerstone for geometric reasoning. Without such axiomatical truths, the entire structure of geometry would collapse, leading to confusion and inconsistency. The significance of axiomatical principles extends beyond mathematics. In philosophy, many arguments are constructed upon axiomatical foundations. For example, the concept of 'all men are created equal' can be seen as an axiomatical assertion in the context of human rights discussions. It is a premise that does not need to be proven; rather, it is accepted as a starting point for further debate and exploration of justice and equality. Moreover, in everyday life, we often rely on axiomatical beliefs to navigate our decisions and interactions. For instance, the belief that honesty is the best policy is an axiomatical principle for many people. This belief shapes behaviors and influences moral judgments, making it a foundational element of personal integrity. However, the challenge arises when individuals encounter axiomatical statements that are not universally accepted. In such cases, what one person considers to be an axiomatical truth may be viewed as controversial or debatable by another. This divergence can lead to conflicts in opinions, especially in areas such as politics, religion, and ethics. Therefore, it is essential to approach discussions involving axiomatical beliefs with an open mind and a willingness to understand differing perspectives. In conclusion, the concept of axiomatical truths plays a vital role in various fields, from mathematics to philosophy and daily life. Recognizing and understanding these fundamental principles not only enhances our analytical skills but also fosters better communication and collaboration among individuals with differing viewpoints. As we navigate through complex issues, it is important to identify those axiomatical statements that can serve as common ground, enabling productive dialogue and mutual understanding. Embracing the essence of axiomatical reasoning can ultimately lead to a deeper appreciation of the complexities of knowledge and belief systems, guiding us toward more informed and thoughtful conclusions.

在数学和逻辑领域，某些原则被认为是自明的真理。这些原则构成了更复杂的理论和概念的基础。术语axiomatical指的是这些不需要证明的基本真理，因为它们的有效性被普遍接受。理解axiomatical陈述的性质对于任何从事分析性思维或解决问题的人来说都是至关重要的，因为这使得我们能够更清楚地理解各种思想之间的联系。 例如，在欧几里得几何中，一个最著名的axiomatical陈述是：通过任意两个点，可以存在一条直线。这个陈述不仅简单，而且作为几何推理的基石。如果没有这样的axiomatical 真理，整个几何结构将会崩溃，导致混乱和不一致。 axiomatical 原则的重要性超越了数学。在哲学中，许多论点是建立在axiomatical 基础之上的。例如，“所有人都是平等的”这一概念可以被视为在人权讨论中的一个axiomatical 断言。它是一个不需要证明的前提；相反，它被接受为进一步辩论和探索正义与平等的起点。 此外，在日常生活中，我们经常依赖于axiomatical 信念来指导我们的决策和互动。例如，诚实是最佳政策的信念对许多人来说是一种axiomatical 原则。这种信念塑造了行为并影响道德判断，使其成为个人诚信的基础元素。 然而，当个体遇到并非普遍接受的axiomatical 陈述时，挑战就出现了。在这种情况下，一个人认为是axiomatical 真理的东西可能被另一个人视为有争议或可辩论的。这种分歧可能导致意见冲突，特别是在政治、宗教和伦理等领域。因此，处理涉及axiomatical 信念的讨论时，持开放心态和愿意理解不同观点是至关重要的。 总之，axiomatical 真理的概念在多个领域发挥着重要作用，从数学到哲学再到日常生活。识别和理解这些基本原则不仅增强了我们的分析能力，还促进了不同观点之间的更好沟通与合作。当我们面对复杂问题时，识别那些可以作为共同基础的axiomatical 陈述，能够使我们进行富有成效的对话和相互理解。拥抱axiomatical 推理的本质最终可以引导我们更深入地欣赏知识和信仰体系的复杂性，帮助我们达成更明智和深思熟虑的结论。