cubically

简明释义

英[kjuːˈbɪkli]美[kjuˈbɪkli]

立方体地

英英释义

单词用法

同义词

反义词

例句

1.So, the execution time grows cubically as a function of the number of assets.

所以，执行时间随资产数量的三次方增长。

2.So, the execution time grows cubically as a function of the number of assets.

所以，执行时间随资产数量的三次方增长。

3.The volume of the cube increases cubically with the length of its sides.

立方体的体积随边长的增加而立方增长。

4.In physics, certain properties change cubically as temperature rises.

在物理学中，某些属性随着温度的升高而立方变化。

5.In engineering, the stress on materials can change cubically under certain conditions.

在工程学中，材料的应力在特定条件下可以立方变化。

6.The formula for calculating the volume of a sphere involves cubically scaling the radius.

计算球体体积的公式涉及到半径的立方缩放。

7.When modeling the growth of crystals, their size often increases cubically over time.

在模拟晶体生长时，它们的大小通常会随时间立方增长。

作文

In the world of mathematics and science, understanding geometric concepts is crucial for various applications. One such concept is volume, which is often measured in cubic units. When we think about how objects occupy space, we can describe their dimensions in different ways. For instance, a cube has equal sides, and its volume can be calculated by raising the length of one side to the power of three. This operation is referred to as measuring volume cubically (立方地), and it allows us to quantify the amount of space an object takes up. In practical terms, consider a box that measures 2 meters on each side. To find its volume, we would apply the formula: Volume = side × side × side. Thus, we calculate 2 × 2 × 2, which equals 8 cubic meters. This example illustrates how we can apply the concept of measuring cubically (立方地) to real-world scenarios, such as storage capacity or shipping logistics.Moreover, the concept of volume is not limited to cubes. Other three-dimensional shapes, like spheres and cylinders, also have volumes that can be calculated using specific formulas. For example, the volume of a sphere is derived from the formula (4/3)πr³, where r represents the radius. This again involves raising the radius to the third power, demonstrating the importance of measuring cubically (立方地) in various contexts.In architecture and engineering, the ability to calculate volume cubically (立方地) is essential. Architects must consider the volume of spaces when designing buildings to ensure they are functional and comfortable for occupants. For instance, a room with higher ceilings may feel more spacious, but if the volume is not calculated correctly, it could lead to issues with heating and cooling. Engineers also rely on these calculations when designing systems that require precise measurements, such as plumbing and HVAC systems.The concept of volume cubically (立方地) extends beyond physical objects. In the field of computer science, data storage is often measured in cubic units as well. For example, cloud storage solutions may offer a certain number of gigabytes or terabytes, which can be visualized as three-dimensional spaces filled with data. Understanding how to measure these volumes cubically (立方地) helps users choose the right plan for their needs.In conclusion, the term cubically (立方地) is not just a mathematical concept; it has far-reaching implications across various fields. From everyday situations like packing a suitcase to complex engineering designs, the ability to measure volume accurately is vital. As we continue to innovate and explore new technologies, the importance of understanding how to calculate and apply volume cubically (立方地) will only grow. Whether you are a student, a professional, or simply someone curious about the world, grasping this concept will enhance your comprehension of spatial relationships and improve your problem-solving skills.

在数学和科学的世界中，理解几何概念对于各种应用至关重要。其中一个概念是体积，通常以立方单位来测量。当我们考虑物体占用空间的方式时，可以用不同的方式描述它们的维度。例如，一个立方体的边长相等，其体积可以通过将一条边的长度提高到三次方来计算。这个操作被称为以立方地（cubically）测量体积，它使我们能够量化物体所占据的空间。在实际应用中，考虑一个每边长为2米的箱子。为了找到它的体积，我们将使用公式：体积 = 边长 × 边长 × 边长。因此，我们计算2 × 2 × 2，结果为8立方米。这个例子说明了我们如何将以立方地（cubically）测量的概念应用于现实场景，例如存储容量或运输物流。此外，体积的概念并不限于立方体。其他三维形状，如球体和圆柱体，也有特定的公式来计算其体积。例如，球体的体积由公式(4/3)πr³推导而来，其中r表示半径。这再次涉及到将半径提高到三次方，展示了在各种背景下以立方地（cubically）测量的重要性。在建筑和工程领域，准确计算体积立方地（cubically）是必不可少的。建筑师在设计建筑时必须考虑空间的体积，以确保它们对居住者功能齐全且舒适。例如，一个天花板较高的房间可能感觉更宽敞，但如果体积计算不正确，可能会导致供暖和制冷方面的问题。工程师在设计需要精确测量的系统（例如管道和暖通空调系统）时也依赖这些计算。体积的概念立方地（cubically）不仅限于物理对象。在计算机科学领域，数据存储也通常以立方单位进行测量。例如，云存储解决方案可能提供一定数量的千兆字节或太字节，这可以被视为充满数据的三维空间。理解如何以立方地（cubically）测量这些体积有助于用户选择适合自己需求的计划。总之，术语立方地（cubically）不仅仅是一个数学概念；它在各个领域都有广泛的影响。从日常情况，如打包行李，到复杂的工程设计，准确测量体积的能力至关重要。随着我们继续创新和探索新技术，理解如何准确计算和应用体积立方地（cubically）的重要性只会增加。无论你是学生、专业人士，还是只是对世界充满好奇的人，掌握这一概念将增强你对空间关系的理解，并提高你的问题解决能力。