error allowance

简明释义

容许误差

英英释义

例句

1.When budgeting for the project, we included a small error allowance to cover unforeseen costs.

在为项目预算时，我们包括了一个小的误差容许值以涵盖不可预见的费用。

2.The engineer explained that the error allowance for the measurements was crucial for accuracy.

工程师解释说，测量的误差容许值对准确性至关重要。

3.In quality control, we set an error allowance of 5% to account for minor defects.

在质量控制中，我们设定了5%的误差容许值以应对小缺陷。

4.During the experiment, we noted the error allowance to validate our findings.

在实验过程中，我们记录了误差容许值以验证我们的发现。

5.The error allowance in the calibration process ensures that results remain reliable.

校准过程中的误差容许值确保结果保持可靠。

作文

In today's fast-paced world, precision and accuracy are paramount in various fields such as engineering, mathematics, and data analysis. However, it is essential to recognize that no system or process is infallible. This brings us to the concept of error allowance, which refers to the permissible margin of error in measurements or calculations. Understanding this concept is crucial for professionals and students alike, as it helps them navigate the complexities of their respective disciplines. Firstly, let’s explore the significance of error allowance in engineering. Engineers often work with precise specifications when designing structures or machinery. However, due to factors such as material imperfections, environmental conditions, and human error, achieving absolute precision can be nearly impossible. Therefore, engineers must establish an error allowance to account for these potential discrepancies. For instance, in civil engineering, a bridge may be designed to support a specific load, but an error allowance might be included to ensure safety even if the actual load exceeds expectations. This practice not only enhances safety but also fosters trust in engineering solutions.Similarly, in the realm of mathematics, the concept of error allowance plays a critical role, especially in statistics and data analysis. When conducting experiments or surveys, researchers often encounter variability in their results. The error allowance allows them to determine how much deviation from the expected outcome is acceptable. For example, if a pharmaceutical company tests a new drug, they will establish an error allowance to account for variations in patient responses. This ensures that the drug is effective for a broad range of individuals, despite minor differences in reactions.Moreover, in everyday life, we often encounter situations where error allowance is applied, albeit unconsciously. For instance, when cooking, a chef might follow a recipe that calls for a specific amount of salt. However, the chef may allow for a small error allowance in the measurement, understanding that a pinch more or less will not significantly impact the dish's overall flavor. This flexibility is essential for creativity and adaptability in cooking, reflecting the broader application of error allowance in various contexts.Furthermore, the importance of error allowance extends to education. Educators often recognize that students learn at different paces and have varying levels of understanding. By incorporating an error allowance in assessments, teachers can provide students with the opportunity to demonstrate their knowledge without the fear of being penalized for minor mistakes. This approach encourages learning and growth, rather than discouraging students who may struggle with certain concepts.In conclusion, the concept of error allowance is vital across multiple domains, from engineering to everyday activities. It serves as a reminder that imperfection is a natural part of any process. By acknowledging and accommodating for potential errors, we can enhance safety, foster creativity, and promote a more inclusive learning environment. Whether in professional settings or personal endeavors, understanding and applying error allowance can lead to better outcomes and greater success. Therefore, it is crucial for all individuals to grasp this concept and apply it in their respective fields to navigate the complexities of life effectively.

在当今快节奏的世界中，精确性和准确性在工程、数学和数据分析等多个领域中至关重要。然而，必须认识到，没有任何系统或过程是万无一失的。这就引出了误差容许值的概念，它指的是测量或计算中允许的误差范围。理解这一概念对专业人士和学生来说都至关重要，因为它帮助他们应对各自学科的复杂性。首先，让我们探讨误差容许值在工程中的重要性。工程师在设计结构或机械时，通常会使用精确的规格。然而，由于材料缺陷、环境条件和人为错误等因素，实现绝对精确几乎是不可能的。因此，工程师必须设定误差容许值以考虑这些潜在的差异。例如，在土木工程中，一座桥梁可能被设计为承受特定的负载，但可能会包含误差容许值以确保安全，即使实际负载超过预期。这种做法不仅提高了安全性，还增强了人们对工程解决方案的信任。同样，在数学领域，尤其是在统计和数据分析中，误差容许值的概念也起着关键作用。当进行实验或调查时，研究人员经常会遇到结果的变异性。误差容许值使他们能够确定接受的期望结果偏差程度。例如，如果一家制药公司测试一种新药，他们将设定误差容许值以考虑患者反应的变化。这确保了尽管反应存在细微差异，该药物对广泛个体仍然有效。此外，在日常生活中，我们经常会遇到应用误差容许值的情况，尽管不自觉。例如，在烹饪时，厨师可能会按照配方制作，要求特定量的盐。然而，厨师可能会允许在测量上有一个小的误差容许值，理解稍微多或少一点不会对菜肴的整体风味产生重大影响。这种灵活性对于烹饪中的创造力和适应性至关重要，反映了误差容许值在各种背景下的更广泛应用。此外，误差容许值的重要性延伸到教育领域。教育工作者通常认识到，学生的学习节奏和理解水平各不相同。通过在评估中纳入误差容许值，教师可以为学生提供展示知识的机会，而不必担心因小错误而受到惩罚。这种方法鼓励学习和成长，而不是打击那些可能在某些概念上挣扎的学生。总之，误差容许值的概念在多个领域至关重要，从工程到日常活动。它提醒我们，不完美是任何过程的自然部分。通过承认和适应潜在的错误，我们可以提高安全性、促进创造力，并营造更具包容性的学习环境。无论是在专业环境中还是个人努力中，理解和应用误差容许值都能带来更好的结果和更大的成功。因此，所有人都应该掌握这一概念，并在各自领域中应用，以有效应对生活的复杂性。