mean line
简明释义
中弧线
英英释义
例句
1.In this statistical analysis, we will use the mean line 均值线 to identify trends in the sales data.
在这项统计分析中,我们将使用mean line 均值线来识别销售数据中的趋势。
2.The graph shows that the data points fluctuate around the mean line 均值线, indicating a stable average.
图表显示数据点围绕mean line 均值线波动,表明平均值稳定。
3.To better understand the data distribution, we plotted the mean line 均值线 alongside the median.
为了更好地理解数据分布,我们将mean line 均值线与中位数一起绘制。
4.When creating a chart, it’s helpful to draw a mean line 均值线 to visualize the overall performance.
在创建图表时,绘制一条mean line 均值线有助于可视化整体表现。
5.The mean line 均值线 in this dataset is significantly affected by outliers.
该数据集中的mean line 均值线受到异常值的显著影响。
作文
In the realm of mathematics and geometry, the concept of a mean line plays a crucial role in understanding various relationships between different shapes and figures. A mean line is often defined as a line that represents the average or central tendency of a set of data or points. This concept can be applied in several fields, including statistics, physics, and even art. To illustrate its importance, let's explore how the mean line functions in different contexts.Firstly, in statistics, the mean line is typically associated with the average value of a dataset. When we plot a graph to represent this data, the mean line can be drawn across the graph to indicate the average point. For instance, if we have a set of test scores from a class, we can calculate the average score and draw a mean line on a bar graph, showing where most students fall in terms of their performance. This visual representation helps educators quickly identify how well the class is performing overall and whether any students are significantly above or below the average.In geometry, the mean line can refer to a line segment that bisects a shape, such as a triangle or a rectangle, into two equal parts. For example, if we take a triangle and draw a line from one vertex to the midpoint of the opposite side, this line can be considered a mean line because it divides the triangle into two smaller triangles of equal area. Understanding these properties allows architects and engineers to create balanced and aesthetically pleasing designs.Moreover, in the field of physics, the mean line can represent the average trajectory of an object in motion. When analyzing the path of a projectile, for instance, scientists may draw a mean line to depict the average height or distance traveled over time. This helps in predicting future movements and understanding the dynamics involved in various physical phenomena.Artists also utilize the concept of a mean line in their work. In visual arts, the mean line can serve as a guiding principle for composition. Artists often strive to create balance and harmony in their pieces by ensuring that elements are distributed evenly around a mean line. This not only enhances the aesthetic appeal of the artwork but also engages the viewer's eye in a more pleasant manner.In conclusion, the mean line is a versatile concept that transcends various disciplines. Whether in mathematics, physics, or art, it serves as a fundamental tool for analysis and understanding. By recognizing the significance of the mean line, we can better appreciate the underlying patterns and relationships that govern our world. This awareness not only enriches our knowledge but also enhances our ability to communicate complex ideas effectively. Therefore, embracing the idea of the mean line can lead to greater insights and a deeper understanding of both the quantitative and qualitative aspects of life.
在数学和几何领域,mean line(平均线)的概念在理解不同形状和图形之间的各种关系中发挥着至关重要的作用。mean line通常被定义为表示一组数据或点的平均值或中心趋势的线。这一概念可以应用于多个领域,包括统计学、物理学甚至艺术。为了说明其重要性,让我们探讨一下mean line在不同上下文中的功能。首先,在统计学中,mean line通常与数据集的平均值相关。当我们绘制图表来表示这些数据时,可以在图表上画出一条mean line以指示平均点。例如,如果我们有一班学生的考试成绩,我们可以计算出平均分,并在柱状图上绘制mean line,显示大多数学生的表现如何。这种可视化表示帮助教育工作者快速识别整个班级的表现,以及是否有任何学生的成绩显著高于或低于平均水平。在几何学中,mean line可以指将一个形状(如三角形或矩形)二分的线段。例如,如果我们取一个三角形并从一个顶点绘制一条线到对边的中点,这条线可以被视为mean line,因为它将三角形分成两个面积相等的小三角形。理解这些性质使建筑师和工程师能够创建平衡且美观的设计。此外,在物理学领域,mean line可以表示一个运动物体的平均轨迹。当分析一个抛射物的路径时,科学家们可能会绘制一条mean line来描绘随时间变化的平均高度或距离。这有助于预测未来的运动,并理解涉及各种物理现象的动态。艺术家在他们的作品中也利用mean line的概念。在视觉艺术中,mean line可以作为构图的指导原则。艺术家们常常努力通过确保元素均匀分布在mean line周围来创造平衡与和谐。这不仅增强了艺术作品的美感,还以更愉悦的方式吸引观众的目光。总之,mean line是一个跨越多个学科的多功能概念。无论是在数学、物理还是艺术中,它都是分析和理解的基本工具。通过认识到mean line的重要性,我们可以更好地欣赏支配我们世界的潜在模式和关系。这种意识不仅丰富了我们的知识,也增强了我们有效沟通复杂思想的能力。因此,接受mean line的理念可以带来更深刻的洞察力和对生活定量与定性方面的更深理解。
