proportional parts

简明释义

内插因子

英英释义

Proportional parts refer to components or segments that are related to each other in a way that maintains a consistent ratio or relationship, ensuring that as one part increases or decreases, the others do so in a corresponding manner.

比例部分是指相互之间保持一致比例或关系的组成部分或片段,确保当一个部分增加或减少时,其他部分也以相应的方式变化。

例句

1.When creating a budget, it's essential to allocate funds into proportional parts according to your priorities.

在制定预算时,按照你的优先事项将资金分配为成比例的部分是至关重要的。

2.In physics, the forces acting on an object can be resolved into proportional parts for easier analysis.

在物理学中,作用于物体的力可以被分解为更易分析的成比例的部分

3.The architect designed the building with proportional parts to ensure aesthetic balance.

建筑师设计这座建筑时采用了成比例的部分,以确保美学平衡。

4.To create a fair division of assets, we should allocate them in proportional parts based on each person's contribution.

为了公平分配资产,我们应该根据每个人的贡献以成比例的部分进行分配。

5.In this recipe, you need to mix the ingredients in proportional parts to achieve the right flavor.

在这个食谱中,你需要将配料以成比例的部分混合,以达到正确的味道。

作文

In mathematics and various fields of science, the concept of proportional parts plays a crucial role in understanding relationships between quantities. When we say that two or more quantities are in proportional parts, we mean that they maintain a constant ratio to each other. This idea is fundamental not only in math but also in real-world applications such as physics, economics, and engineering. For instance, consider the scenario of mixing ingredients for a recipe. If a cake recipe calls for flour, sugar, and eggs in the ratio of 2:1:1, it means that for every 2 cups of flour, you need 1 cup of sugar and 1 egg. Here, the ingredients are in proportional parts. If you decide to make a larger cake and use 4 cups of flour, you would then need 2 cups of sugar and 2 eggs to maintain the same flavor and texture. This example illustrates how proportional parts allow us to scale recipes while keeping the integrity of the dish intact.In the field of physics, proportional parts are equally significant. For example, when calculating the speed of an object, the relationship between distance, time, and speed can be expressed as a formula: speed = distance/time. If the distance is doubled, the time taken will also change proportionally, provided the speed remains constant. Understanding this relationship helps scientists and engineers design systems and predict outcomes accurately.Economics also heavily relies on the concept of proportional parts. When analyzing supply and demand, economists often look at how changes in price affect the quantity supplied and demanded. If the price of a product increases, the quantity demanded usually decreases, and the quantity supplied typically increases. This relationship can often be represented graphically, where the curves intersect at a point that reflects the market equilibrium. The slopes of these curves represent proportional parts of supply and demand, helping economists make predictions about market behavior.In engineering, especially in structural design, proportional parts are essential to ensure safety and functionality. When designing a bridge, engineers must consider the load distribution across different sections of the structure. Each part of the bridge must bear a certain load proportional to its size and materials used. Failure to maintain these proportional parts can lead to structural failure, which could have disastrous consequences.In conclusion, the concept of proportional parts is fundamental across various disciplines. Whether in cooking, physics, economics, or engineering, understanding the relationships between quantities helps us make informed decisions and predictions. By recognizing and applying the principles of proportional parts, we can effectively navigate complex problems and create solutions that are both efficient and effective. This understanding not only enhances our academic pursuits but also enriches our everyday lives, allowing us to approach challenges with a clearer perspective and a better grasp of the underlying relationships at play.

在数学和各种科学领域,比例部分的概念在理解数量之间的关系中发挥着至关重要的作用。当我们说两个或多个数量处于比例部分时,我们是指它们之间保持一个恒定的比率。这个思想不仅在数学中是基本的,而且在物理学、经济学和工程等现实应用中也是如此。例如,考虑一个混合食材的场景。如果一个蛋糕食谱要求面粉、糖和鸡蛋的比例为2:1:1,这意味着每2杯面粉需要1杯糖和1个鸡蛋。在这里,食材处于比例部分。如果你决定做一个更大的蛋糕,并使用4杯面粉,那么你就需要2杯糖和2个鸡蛋,以保持相同的风味和口感。这个例子说明了如何通过保持比例部分,来调整食谱的规模,同时保持菜肴的完整性。在物理学领域,比例部分同样重要。例如,在计算物体的速度时,距离、时间和速度之间的关系可以用一个公式表示:速度 = 距离/时间。如果距离加倍,所需的时间也会成比例地变化,前提是速度保持不变。理解这种关系有助于科学家和工程师设计系统并准确预测结果。经济学也在很大程度上依赖于比例部分的概念。当分析供需关系时,经济学家通常会考虑价格变化对供应量和需求量的影响。如果一种产品的价格上涨,需求量通常会减少,而供应量通常会增加。这种关系通常可以通过图形表示,其中曲线在一个点相交,反映出市场均衡。该曲线的斜率代表了供需的比例部分,帮助经济学家预测市场行为。在工程,尤其是在结构设计中,比例部分对于确保安全和功能至关重要。当设计一座桥梁时,工程师必须考虑负载在结构不同部分之间的分布。桥梁的每一部分都必须承受与其大小和所用材料成比例的特定负载。未能保持这些比例部分可能导致结构失效,这可能会造成灾难性的后果。总之,比例部分的概念在各个学科中都是基础的。无论是在烹饪、物理学、经济学还是工程中,理解数量之间的关系帮助我们做出明智的决策和预测。通过识别和应用比例部分的原则,我们可以有效地应对复杂的问题,并创造出既高效又有效的解决方案。这种理解不仅增强了我们的学术追求,还丰富了我们的日常生活,使我们能够以更清晰的视角和更好地掌握潜在的关系来处理挑战。