multipliable

简明释义

英[ˈmʌltɪplaɪəbl]美[ˈmʌltəˌplaɪəbl]

adj. 可增加的；可乘的

英英释义

单词用法

同义词

反义词

例句

1.In mathematics, any two numbers that can be multiplied together are considered multipliable.

在数学中，任何两个可以相乘的数字被视为可相乘的。

2.The teacher explained that only integers are multipliable in this specific context.

老师解释说，在这个特定的上下文中，只有整数是可相乘的。

3.For the equation to hold true, both sides must contain multipliable terms.

为了使方程成立，两边必须包含可相乘的项。

4.During the workshop, we learned which fractions are multipliable with each other.

在研讨会上，我们学习了哪些分数彼此之间是可相乘的。

5.The software can only process multipliable values for its calculations.

该软件只能处理其计算中的可相乘的值。

作文

In mathematics, the concept of multiplication is fundamental to understanding various operations and solving complex problems. One key term associated with this concept is multipliable, which refers to the ability of a number or quantity to be multiplied by another. To grasp the significance of being multipliable, we must first consider the basic principles of multiplication itself. Multiplication is often described as repeated addition, where a number is added to itself a certain number of times. For example, if we take the number 5 and multiply it by 3, we are essentially adding 5 three times: 5 + 5 + 5 = 15. This simple operation lays the groundwork for more advanced mathematical concepts. The term multipliable is not just limited to whole numbers; it extends to fractions, decimals, and even algebraic expressions. Any quantity that can be multiplied by another is considered multipliable. For instance, in the case of fractions, 1/2 is multipliable by 4, resulting in 2. Similarly, decimals such as 0.5 are also multipliable, as they can be multiplied by integers or other decimals to yield meaningful results. Understanding the concept of multipliable is crucial in various fields, including science, engineering, and economics. In these disciplines, calculations often involve multiplying different variables to derive results. For example, in physics, the formula for calculating force is mass multiplied by acceleration (F = ma). Here, both mass and acceleration are multipliable quantities, and their product gives us the force acting on an object. Furthermore, the property of being multipliable allows for the exploration of ratios and proportions, which are essential in statistics and data analysis. When we analyze data sets, we often need to compare different quantities, and multiplication plays a vital role in these comparisons. For instance, if we want to determine the ratio of two populations, we might multiply each population by a common factor to simplify our calculations. This demonstrates how the concept of multipliable extends beyond mere arithmetic; it is a foundational element in analytical thinking. In everyday life, we encounter instances where being multipliable is beneficial. For example, when cooking, recipes often require us to multiply ingredients based on the number of servings needed. If a recipe calls for 2 cups of flour for 4 servings, and we want to make 8 servings, we can simply multiply the amount of flour by 2, resulting in 4 cups. This practical application of multiplication highlights the relevance of the term multipliable in our daily activities. In conclusion, the term multipliable encompasses the ability of numbers and quantities to be multiplied, forming a cornerstone of mathematical operations. Whether in theoretical contexts or practical applications, understanding what it means to be multipliable is essential for anyone engaging with mathematics. As we continue to explore the world of numbers, the significance of multiplication and the concept of multipliable will remain ever-present, guiding us through complex calculations and everyday tasks alike.

在数学中，乘法的概念对于理解各种运算和解决复杂问题至关重要。与这一概念相关的一个关键术语是可乘的，它指的是一个数字或量可以被另一个数字或量相乘的能力。要掌握可乘的的重要性，我们首先必须考虑乘法本身的基本原理。乘法通常被描述为重复加法，其中一个数字被加到自身一定次数。例如，如果我们取数字5并将其乘以3，我们实际上是在加5三次：5 + 5 + 5 = 15。这一简单操作为更高级的数学概念奠定了基础。 术语可乘的不仅限于整数；它扩展到分数、小数甚至代数表达式。任何可以被另一个数字相乘的量都被认为是可乘的。例如，在分数的情况下，1/2可以被4相乘，结果为2。同样，小数如0.5也属于可乘的，因为它可以与整数或其他小数相乘以产生有意义的结果。 理解可乘的概念在科学、工程和经济学等各个领域都是至关重要的。在这些学科中，计算通常涉及将不同变量相乘以得出结果。例如，在物理学中，计算力的公式是质量乘以加速度（F = ma）。在这里，质量和加速度都是可乘的量，它们的乘积给我们提供了作用于物体的力。 此外，可乘的特性使我们能够探索比率和比例，这在统计学和数据分析中至关重要。当我们分析数据集时，通常需要比较不同的量，而乘法在这些比较中发挥着重要作用。例如，如果我们想确定两个种群的比率，我们可能需要将每个种群乘以一个共同的因子来简化我们的计算。这表明可乘的概念超越了简单的算术；它是分析思维的基础元素。 在日常生活中，我们遇到的许多情况中，可乘的特性是有益的。例如，在烹饪时，食谱通常要求我们根据所需的份数来乘以材料。如果一个食谱要求4份使用2杯面粉，而我们想做8份，我们只需将面粉的量乘以2，结果为4杯。这种乘法的实际应用突显了可乘的一词在我们日常活动中的相关性。 总之，可乘的一词涵盖了数字和量之间可以相乘的能力，形成了数学运算的基石。无论是在理论背景还是实际应用中，理解什么是可乘的对于任何参与数学的人来说都是必不可少的。随着我们继续探索数字的世界，乘法的意义和可乘的概念将始终存在，指引我们通过复杂的计算和日常任务。