axis of ordinate

简明释义

1. 纵轴; 2. Y轴;

英英释义

例句

1.The intersection of the axis of ordinate 纵轴 and the axis of abscissa 横轴 is the origin.

纵轴 axis of ordinate 和横轴 axis of abscissa 的交点是原点。

2.In a Cartesian coordinate system, the axis of ordinate 纵轴 represents the vertical direction.

在笛卡尔坐标系中，纵轴 axis of ordinate 代表垂直方向。

3.In this chart, the axis of ordinate 纵轴 shows the sales figures over the years.

在这个图表中，纵轴 axis of ordinate 显示了多年的销售数字。

4.To analyze the graph, focus on the values along the axis of ordinate 纵轴 for insights.

要分析图表，请关注纵轴 axis of ordinate 上的值以获取见解。

5.When plotting data points, always label the axis of ordinate 纵轴 to indicate what is being measured.

绘制数据点时，总是标注纵轴 axis of ordinate 以指明测量的内容。

作文

In the study of mathematics and science, one often encounters various terms that describe the components of graphs and charts. Among these terms, the axis of ordinate plays a crucial role in representing data visually. The axis of ordinate refers to the vertical line on a Cartesian coordinate system, which is used to denote the values of the dependent variable in a function or relationship. Understanding this concept is essential for interpreting graphs accurately and for performing data analysis effectively.To illustrate the importance of the axis of ordinate, consider a simple graph that depicts the relationship between temperature and time. On the horizontal axis, or the axis of abscissa, we plot time, while the axis of ordinate represents temperature. Each point on the graph corresponds to a specific temperature at a particular time. By analyzing the graph, one can easily observe trends, such as whether the temperature is increasing or decreasing over time.Moreover, the axis of ordinate is not limited to just mathematical functions; it is also widely used in various fields such as economics, biology, and social sciences. For instance, in an economic model, the axis of ordinate might represent the quantity of goods produced, while the axis of abscissa could represent the level of investment. This graphical representation allows economists to visualize the impact of investment on production levels, facilitating better decision-making.In addition to its practical applications, the axis of ordinate also serves as a foundation for more advanced mathematical concepts. For example, when studying calculus, students learn about the significance of the axis of ordinate in relation to integrals and derivatives. The area under a curve, which can be found using integration, is often calculated with respect to the axis of ordinate. This demonstrates how interconnected mathematical concepts are and how understanding the axis of ordinate can enhance one's comprehension of higher-level mathematics.Furthermore, the axis of ordinate is integral to creating effective visualizations. In data presentation, graphs that utilize the axis of ordinate can communicate complex information quickly and clearly. For example, in a bar chart, the height of each bar is determined by values plotted along the axis of ordinate. This makes it easier for viewers to compare different categories at a glance, highlighting significant differences and trends.In conclusion, the axis of ordinate is a fundamental component of graphical representations in mathematics and various scientific fields. It provides a framework for understanding relationships between variables, aids in data analysis, and enhances communication through visual means. Mastering the concept of the axis of ordinate not only helps in academic pursuits but also equips individuals with valuable skills applicable in real-world scenarios. By grasping the significance of the axis of ordinate, one can improve their analytical abilities and make informed decisions based on data-driven insights.

在数学和科学的研究中，人们经常会遇到各种术语，这些术语描述了图表和图形的组成部分。在这些术语中，纵轴在以可视化方式表示数据方面起着至关重要的作用。纵轴指的是笛卡尔坐标系中的垂直线，用于表示函数或关系中因变量的值。理解这一概念对于准确解读图表和有效进行数据分析至关重要。为了说明纵轴的重要性，考虑一个简单的图表，该图表描绘了温度与时间之间的关系。在水平轴或横轴上，我们绘制时间，而纵轴则表示温度。图表上的每个点都对应于特定时间的特定温度。通过分析图表，人们可以轻松观察趋势，例如温度是上升还是下降。此外，纵轴不仅限于数学函数，它还广泛应用于经济学、生物学和社会科学等各个领域。例如，在经济模型中，纵轴可能表示生产的商品数量，而横轴可能表示投资水平。这种图形表示法使经济学家能够直观地了解投资对生产水平的影响，从而促进更好的决策。除了实际应用外，纵轴也是更高级数学概念的基础。例如，在学习微积分时，学生会了解到纵轴在积分和导数中的重要性。曲线下的面积（可以通过积分计算）通常是相对于纵轴来计算的。这表明数学概念是如何相互关联的，以及理解纵轴如何增强人们对更高层次数学的理解。此外，纵轴对于创建有效的可视化至关重要。在数据展示中，利用纵轴的图表可以快速清晰地传达复杂信息。例如，在条形图中，每个条形的高度由沿纵轴绘制的值决定。这使得观众能够一目了然地比较不同类别，突出显著差异和趋势。总之，纵轴是数学和各个科学领域图形表示的基本组成部分。它为理解变量之间的关系提供了框架，帮助进行数据分析，并通过可视化手段增强沟通能力。掌握纵轴的概念不仅有助于学术追求，还使个人具备在现实世界场景中应用的宝贵技能。通过掌握纵轴的重要性，人们可以提高分析能力，并根据数据驱动的见解做出明智的决策。