aliquot
简明释义
n. (化)试样,可分量;(数)整除数
v. 把……等分
adj. 能整除的
英英释义
A term used in mathematics and science to refer to a portion or part of a whole that is an exact divisor of the whole. | 在数学和科学中用于指代一个整体的部分或部分,且该部分是整体的一个精确除数。 |
单词用法
部分 | |
整体的部分 | |
一个部分样本 | |
分成若干部分 |
同义词
| 分数 | 样本被分成几个部分进行测试。 |
反义词
| 倍数 | 总量是整除部分的倍数。 | ||
| 非整除部分 | In this case, we have a non-aliquot remainder after division. | 在这种情况下,我们在除法后有一个非整除的余数。 |
例句
1.While stirring this concentrated suspension, a small aliquot is removed and transferred to the optical measurement cell containing the blank dispersing medium.
当搅拌该浓缩的悬浮液时,将等分试样转移至含有空白分散介质的光学测量比色皿中。
2.The aliquot of proteins was subjected to SDS-PAGE, followed by Western blot analysis in which individual sera were tested for primary antibody.
用肺癌患者及健康对照者的血清作第一抗体进行蛋白印迹检测。
3.Because of the paucity of well bleached sediments at Paleolithic sites in China, single-aliquot protocols are believed to be the best choice to establish a luminescence-based temporal framework.
由于我国旧石器遗址中大多缺乏彻底晒退的沉积物,单片技术可能在建立这些遗址的年代框架方面起到重要作用。
4.Because of the paucity of well bleached sediments at Paleolithic sites in China, single-aliquot protocols are believed to be the best choice to establish a luminescence-based temporal framework.
由于我国旧石器遗址中大多缺乏彻底晒退的沉积物,单片技术可能在建立这些遗址的年代框架方面起到重要作用。
5.The researcher divided the solution into several aliquots for further analysis.
研究人员将溶液分成几个样本分量以进行进一步分析。
6.To ensure accuracy, we need to take an aliquot from the larger batch.
为了确保准确性,我们需要从大批量中取出一个样本分量。
7.The lab technician prepared an aliquot of the sample for testing.
实验室技术员准备了一个样本分量用于测试。
8.An aliquot of the blood sample was sent to the laboratory for testing.
一份血液样本分量被送往实验室进行检测。
9.Each aliquot should be stored at the same temperature to maintain consistency.
每个样本分量都应该在相同的温度下存储以保持一致性。
作文
In mathematics, particularly in the field of number theory and fractions, the term aliquot refers to a portion of a whole that can be divided evenly into another number. For instance, if we consider the number 12, the aliquot parts of this number would include 1, 2, 3, 4, and 6, since each of these numbers can divide 12 without leaving a remainder. Understanding the concept of aliquot is essential not only for mathematical calculations but also for practical applications in various fields such as engineering, finance, and even cooking.When we think about fractions, the idea of aliquot becomes even more significant. In essence, an aliquot part is a fraction of a whole that maintains the integrity of the original number when multiplied back together. For example, if you take half of a pizza, you have an aliquot part of the whole pizza. If you were to add that aliquot part back to the remaining half, you would once again have the complete pizza.The concept of aliquot is not limited to just simple numbers; it extends to various applications in real life. For instance, in cooking, recipes often require aliquot measurements of ingredients. If a recipe calls for 2 cups of flour and you want to make half the recipe, you would need to measure out 1 cup, which is an aliquot part of the original 2 cups. This practical application helps to illustrate how aliquot parts are used in everyday scenarios.Moreover, in finance, understanding aliquot parts can assist in budgeting and financial planning. For example, if you have a monthly budget of $1200, you can break it down into aliquot parts such as $300 for groceries, $400 for rent, and $500 for other expenses. By dividing your total budget into aliquot portions, you can ensure that you are allocating your resources effectively.In conclusion, the term aliquot holds significant importance across various domains. Whether in mathematics, cooking, or finance, recognizing and utilizing aliquot parts can lead to better decision-making and a deeper understanding of how to manage whole entities. As we continue to explore the intricacies of numbers and their applications, the relevance of aliquot will undoubtedly remain a fundamental concept that aids us in achieving clarity and precision in our tasks. Thus, mastering the idea of aliquot is not just an academic exercise but a valuable skill that enhances our problem-solving capabilities in numerous aspects of life.
在数学中,特别是在数论和分数的领域,术语aliquot指的是可以被另一个数字均匀分割的整体的一部分。例如,如果我们考虑数字12,12的aliquot部分包括1、2、3、4和6,因为这些数字都能整除12而没有余数。理解aliquot的概念不仅对数学计算至关重要,而且在工程、金融甚至烹饪等各个领域都有实际应用。当我们考虑分数时,aliquot的概念变得更加重要。从本质上讲,aliquot部分是一个整体的分数,当乘回去时保持原始数字的完整性。例如,如果你拿走一个比萨饼的一半,你就得到了一个整体的aliquot部分。如果你将这个aliquot部分加回剩下的一半,你就会再次得到完整的比萨饼。aliquot的概念不仅限于简单的数字;它扩展到现实生活中的各种应用。例如,在烹饪中,食谱通常需要aliquot的成分测量。如果一个食谱需要2杯面粉,而你想做一半的食谱,你需要测量出1杯,这就是原始2杯的aliquot部分。这种实际应用帮助说明了aliquot部分如何在日常场景中使用。此外,在金融方面,理解aliquot部分可以帮助预算和财务规划。例如,如果你每月的预算是1200美元,你可以将其分解为aliquot部分,如300美元用于杂货、400美元用于租金和500美元用于其他费用。通过将总预算划分为aliquot部分,你可以确保有效地分配资源。总之,术语aliquot在各个领域具有重要意义。无论是在数学、烹饪还是金融中,识别和利用aliquot部分都能导致更好的决策和对如何管理整体实体的更深入理解。随着我们继续探索数字及其应用的复杂性,aliquot的相关性无疑将继续成为一个基本概念,帮助我们在任务中实现清晰和精确。因此,掌握aliquot的思想不仅是学术练习,而是一项宝贵的技能,增强我们在生活各个方面的问题解决能力。
