combination rate

简明释义

联运费率

英英释义

例句

1.The restaurant's combination rate 组合率 for meals has increased due to the introduction of combo deals.

由于推出了套餐优惠，餐厅的组合率 组合率有所增加。

2.In the latest marketing campaign, we aimed to improve our combination rate 组合率 by bundling services together.

在最新的营销活动中，我们旨在通过将服务捆绑在一起来提高我们的组合率 组合率。

3.The company reported an increase in the combination rate 组合率 of their new product lines, indicating higher customer satisfaction.

公司报告他们的新产品线的组合率 组合率有所上升，表明客户满意度提高。

4.Analysts are closely watching the combination rate 组合率 of different investment strategies to maximize returns.

分析师正在密切关注不同投资策略的组合率 组合率以最大化回报。

5.To enhance user engagement, the app developers focused on improving the combination rate 组合率 of features.

为了增强用户参与度，应用开发者专注于提高功能的组合率 组合率。

作文

In the world of mathematics and statistics, the term combination rate is often used to describe the ratio at which different elements can be combined to form unique sets or groups. Understanding the combination rate is essential in various fields, including probability theory, combinatorial optimization, and even in everyday decision-making. For instance, when selecting a team from a larger group, knowing the combination rate allows us to calculate how many different teams can be formed based on the number of members available. This concept becomes particularly useful in competitive scenarios, such as sports or project management, where the optimal selection can significantly influence outcomes.The combination rate is mathematically represented using the binomial coefficient, often denoted as C(n, k), where 'n' is the total number of items to choose from, and 'k' is the number of items to be chosen. The formula for calculating the combination rate is given by:C(n, k) = n! / (k! * (n - k)!)This formula illustrates that the combination rate not only depends on the number of items available but also on how many we wish to select. For example, if we have 5 different fruits and want to know how many ways we can choose 3 of them, we can apply the formula to find that there are 10 unique combinations.The implications of understanding the combination rate extend beyond theoretical exercises. In business, companies often analyze combination rates to optimize their product offerings. By understanding which combinations of features or products are most appealing to customers, businesses can tailor their marketing strategies more effectively. Similarly, in genetics, researchers study the combination rate of alleles to predict the traits of offspring, which can have significant implications for breeding programs.Moreover, the combination rate plays a crucial role in game theory, where players must make strategic decisions based on potential combinations of moves. The ability to assess these rates helps players devise winning strategies, whether in board games, card games, or real-life negotiations. In conclusion, the combination rate is a fundamental concept that permeates various aspects of life, from mathematics and science to business and strategy. Its versatility and applicability make it a vital tool for analysis and decision-making. As we continue to explore the complexities of our world, mastering the combination rate will undoubtedly enhance our understanding and improve our ability to navigate diverse challenges. Ultimately, grasping the significance of the combination rate empowers individuals and organizations alike to make informed choices, optimize resources, and achieve desired outcomes. Whether in forming teams, launching products, or strategizing in competitive environments, the combination rate serves as a guiding principle that underscores the importance of combinations in achieving success.

在数学和统计学的世界中，术语组合率通常用于描述不同元素组合成独特集合或组的比率。理解组合率在多个领域中至关重要，包括概率论、组合优化，甚至日常决策。例如，在从较大群体中选择团队时，了解组合率可以让我们计算出可以根据可用成员数量形成多少不同的团队。这个概念在竞争场合中尤为有用，比如体育或项目管理，因为最佳选择可以显著影响结果。组合率在数学上用二项式系数表示，通常用C(n, k)表示，其中'n'是要选择的总项数，而'k'是要选择的项数。计算组合率的公式为：C(n, k) = n! / (k! * (n - k)!)这个公式表明，组合率不仅依赖于可用项的数量，还依赖于我们希望选择的数量。例如，如果我们有5种不同的水果，并想知道可以选择其中3种的方式有多少种，我们可以应用该公式发现有10种独特的组合。理解组合率的意义超出了理论练习。在商业中，公司通常分析组合率以优化其产品供应。通过了解哪些功能或产品组合对客户最具吸引力，企业可以更有效地调整其市场营销策略。类似地，在遗传学中，研究人员研究等位基因的组合率以预测后代的特征，这对育种计划有重大影响。此外，组合率在博弈论中也起着至关重要的作用，玩家必须根据潜在的移动组合做出战略决策。评估这些比率的能力帮助玩家制定获胜策略，无论是在棋盘游戏、纸牌游戏还是现实生活中的谈判中。总之，组合率是一个基本概念，渗透到生活的各个方面，从数学和科学到商业和战略。它的多样性和适用性使其成为分析和决策的重要工具。随着我们继续探索世界的复杂性，掌握组合率无疑将增强我们的理解，并改善我们应对各种挑战的能力。最终，掌握组合率的重要性使个人和组织能够做出明智的选择，优化资源，实现预期的结果。无论是在组建团队、推出产品还是在竞争环境中制定战略，组合率都作为指导原则，强调了组合在实现成功中的重要性。