additive volume
简明释义
添加剂伐积;
英英释义
例句
1.The recipe called for an additive volume of water to achieve the desired consistency.
这个食谱要求添加附加体积的水以达到所需的一致性。
2.During the experiment, we had to measure the additive volume of the reagents carefully.
在实验过程中,我们必须仔细测量试剂的附加体积。
3.The architect included the additive volume in the calculations to ensure the stability of the structure.
建筑师在计算中包含了附加体积以确保结构的稳定性。
4.The construction team calculated the additive volume to determine how much extra material they would need for the project.
施工团队计算了附加体积以确定他们需要多少额外材料用于项目。
5.In chemical engineering, understanding the additive volume is crucial for mixing different substances accurately.
在化学工程中,理解附加体积对于准确混合不同物质至关重要。
作文
In the field of mathematics and physics, the concept of volume is fundamental. It refers to the amount of space that an object occupies. However, when we talk about additive volume (加法体积), we are referring to a specific property of volumes that can be combined or added together. This principle is particularly useful in various applications, such as geometry, engineering, and even economics.To understand additive volume (加法体积), let’s consider a simple example. Imagine you have two different boxes. The first box has a length of 2 meters, a width of 3 meters, and a height of 4 meters. The second box has a length of 1 meter, a width of 2 meters, and a height of 3 meters. To find the total volume of these two boxes, you would calculate the volume of each box individually and then add them together. The volume of the first box is calculated as follows:Volume = length × width × height = 2m × 3m × 4m = 24 cubic meters.The volume of the second box is:Volume = length × width × height = 1m × 2m × 3m = 6 cubic meters.Now, to find the total volume, you simply add the two volumes together:Total Volume = 24 cubic meters + 6 cubic meters = 30 cubic meters.This process illustrates the principle of additive volume (加法体积). It shows that when calculating the volume of multiple objects, their individual volumes can be summed to find the total volume. This principle is not only applicable to simple geometric shapes but also extends to more complex structures in engineering and architecture.In engineering, understanding the additive volume (加法体积) is crucial when designing components that need to fit together. For instance, when creating a new machine, engineers must ensure that the total volume of all parts does not exceed the available space. This requires careful calculations and a thorough understanding of how the volumes of different components interact.Moreover, in the realm of economics, the concept of additive volume (加法体积) can also be applied. For example, when analyzing market volumes, businesses often look at the total sales volume of different products to gauge overall performance. By adding the individual sales volumes, companies can better understand their market position and make informed decisions about inventory and marketing strategies.In conclusion, the idea of additive volume (加法体积) is an essential aspect of understanding how volumes can be combined. Whether in mathematics, engineering, or economics, this principle helps us analyze and solve problems effectively. By mastering the concept of additive volume (加法体积), we can apply it in various fields and enhance our problem-solving skills.
在数学和物理学领域,体积的概念是基础。它指的是一个物体所占据的空间量。然而,当我们谈论加法体积时,我们指的是一种特定的体积属性,可以相互结合或相加。这一原则在几何、工程甚至经济学等各种应用中尤其有用。为了理解加法体积,让我们考虑一个简单的例子。想象一下,你有两个不同的箱子。第一个箱子的长度为2米,宽度为3米,高度为4米。第二个箱子的长度为1米,宽度为2米,高度为3米。要找到这两个箱子的总容量,你需要分别计算每个箱子的体积,然后将它们加在一起。第一个箱子的体积计算如下:体积 = 长度 × 宽度 × 高度 = 2米 × 3米 × 4米 = 24立方米。第二个箱子的体积是:体积 = 长度 × 宽度 × 高度 = 1米 × 2米 × 3米 = 6立方米。现在,要找到总的体积,你只需将两个体积相加:总容量 = 24立方米 + 6立方米 = 30立方米。这个过程说明了加法体积的原理。它表明,在计算多个物体的体积时,可以将它们各自的体积相加以找到总体积。这个原理不仅适用于简单的几何形状,还扩展到工程和建筑中的更复杂结构。在工程学中,理解加法体积至关重要,因为它涉及到设计需要相互配合的组件。例如,在创建一台新机器时,工程师必须确保所有部件的总体积不超过可用空间。这需要仔细的计算和对不同组件的体积如何相互作用的透彻理解。此外,在经济学领域,加法体积的概念也可以应用。例如,在分析市场容量时,企业通常会查看不同产品的总销售量,以评估整体表现。通过添加各自的销售量,公司可以更好地理解其市场地位,并就库存和营销策略做出明智的决策。总之,加法体积的概念是理解体积如何组合的重要方面。无论是在数学、工程还是经济学中,这一原则帮助我们有效地分析和解决问题。通过掌握加法体积的概念,我们可以在各个领域中应用它,增强我们的解决问题的能力。
相关单词
