multiplication ratio

简明释义

倍增系数

英英释义

例句

1.The multiplication ratio 乘法比率 of the population growth indicates that the city is expanding rapidly.

人口增长的multiplication ratio 乘法比率表明该城市正在快速扩张。

2.The multiplication ratio 乘法比率 in this experiment shows a significant increase in yield.

这个实验中的multiplication ratio 乘法比率显示出产量显著增加。

3.In a financial analysis, we calculated the multiplication ratio 乘法比率 to determine how much our investment would grow over time.

在财务分析中，我们计算了multiplication ratio 乘法比率以确定我们的投资将如何随时间增长。

4.To assess the performance, we analyzed the multiplication ratio 乘法比率 of each department's output.

为了评估表现，我们分析了每个部门产出的multiplication ratio 乘法比率。

5.We used the multiplication ratio 乘法比率 to compare the efficiency of two different marketing strategies.

我们使用multiplication ratio 乘法比率来比较两种不同营销策略的效率。

作文

In the realm of mathematics, particularly in the study of ratios and proportions, the term multiplication ratio plays a crucial role. A multiplication ratio is defined as the factor by which one quantity must be multiplied to obtain another quantity. This concept is not only fundamental in mathematics but also extends its significance to various fields such as economics, engineering, and even everyday life decisions. Understanding the multiplication ratio can help individuals make better choices based on proportional relationships.For instance, consider a simple scenario where a recipe requires 2 cups of flour to make 12 cookies. If someone wants to make 24 cookies, they need to determine the appropriate amount of flour. Here, the multiplication ratio is 2:1, meaning that for every 12 cookies, the flour requirement doubles for 24 cookies. Thus, the individual must multiply the original amount of flour (2 cups) by the multiplication ratio of 2 to arrive at the necessary 4 cups of flour. This example illustrates how the multiplication ratio can simplify calculations in practical situations.Furthermore, in the field of economics, understanding the multiplication ratio is essential for analyzing financial data. For instance, if a company’s revenue increased from $100,000 to $150,000, the multiplication ratio of the revenue growth can be calculated as 1.5. This means the revenue has multiplied by a factor of 1.5, indicating a 50% increase. Investors and business analysts often rely on such ratios to evaluate company performance and make informed investment decisions. The multiplication ratio thus serves as a vital tool in financial analysis, helping stakeholders understand growth trends and profitability.Moreover, engineers frequently utilize the concept of multiplication ratio in design and construction projects. When scaling models or blueprints, engineers must maintain the correct proportions to ensure functionality and aesthetics. For example, if a model of a bridge is built at a multiplication ratio of 1:10, every measurement in the model is ten times smaller than the actual bridge. This ratio is critical in ensuring that the model accurately reflects the dimensions and structural integrity of the full-scale project. Without understanding the multiplication ratio, engineers could easily miscalculate dimensions, leading to potential failures in real-world applications.In conclusion, the multiplication ratio is a foundational concept that permeates various aspects of life. Whether in cooking, finance, or engineering, recognizing and applying the multiplication ratio allows individuals to make informed decisions and perform accurate calculations. By mastering this concept, one can enhance their analytical skills and improve problem-solving abilities in both academic and practical settings. The importance of the multiplication ratio cannot be overstated, as it serves as a bridge between theoretical mathematics and real-world applications.

在数学领域，尤其是在比率和比例的研究中，术语乘法比率起着至关重要的作用。乘法比率被定义为一个数量必须乘以的因子，以获得另一个数量。这个概念不仅在数学中是基础的，而且在经济学、工程学以及日常生活决策等多个领域也具有重要意义。理解乘法比率可以帮助个人根据比例关系做出更好的选择。例如，考虑一个简单的场景，其中一个食谱需要2杯面粉来制作12个饼干。如果有人想制作24个饼干，他们需要确定适当的面粉量。在这里，乘法比率是2:1，这意味着每12个饼干，面粉的需求翻倍以制作24个饼干。因此，个人必须将原始面粉量（2杯）乘以乘法比率2，以得出所需的4杯面粉。这个例子说明了如何在实际情况下使用乘法比率简化计算。此外，在经济学领域，理解乘法比率对于分析财务数据至关重要。例如，如果一家公司的收入从100,000美元增加到150,000美元，则收入增长的乘法比率可以计算为1.5。这意味着收入乘以1.5的因子，表明增长了50%。投资者和商业分析师通常依赖这样的比率来评估公司表现并做出明智的投资决策。因此，乘法比率作为财务分析中的重要工具，帮助利益相关者理解增长趋势和盈利能力。此外，工程师在设计和施工项目中经常利用乘法比率的概念。在缩放模型或蓝图时，工程师必须保持正确的比例，以确保功能性和美观性。例如，如果一座桥的模型按1:10的乘法比率建造，则模型中的每个测量值都比实际桥小十倍。这个比率在确保模型准确反映全尺寸项目的尺寸和结构完整性方面至关重要。如果不理解乘法比率，工程师可能会轻易地误算尺寸，从而导致现实应用中的潜在失败。总之，乘法比率是一个基础概念，渗透到生活的各个方面。无论是在烹饪、金融还是工程中，识别和应用乘法比率使个人能够做出明智的决策并进行准确的计算。通过掌握这一概念，人们可以提高分析技能，改善学术和实践环境中的问题解决能力。乘法比率的重要性不容低估，因为它在理论数学与现实应用之间架起了一座桥梁。