sheer curve

简明释义

脊弧曲线舷弧线

英英释义

例句

1.The car's design features a sheer curve that enhances its aerodynamic properties.

这款车的设计具有光滑曲线，增强了其空气动力学特性。

2.In her painting, she used a sheer curve to create a sense of movement.

在她的画作中，她使用了光滑曲线来创造一种动态感。

3.The architect designed the building with a stunning sheer curve to maximize natural light.

建筑师设计了这座建筑，采用了令人惊叹的光滑曲线以最大化自然光。

4.The fashion designer incorporated a sheer curve in the dress to flatter the silhouette.

时装设计师在裙子中融入了光滑曲线以修饰身形。

5.During the presentation, he highlighted the sheer curve of the graph to emphasize growth.

在演示中，他强调了图表的光滑曲线以突出增长。

作文

In the world of mathematics and design, curves play a significant role in shaping our understanding of various concepts. One such fascinating concept is the sheer curve, which represents a type of curve characterized by its steepness and dramatic changes in direction. The term 'sheer' often implies something that is very steep or almost vertical, and when applied to curves, it suggests a sudden transition that can be both visually striking and mathematically intriguing.To better understand the sheer curve, we can look at its applications in different fields. In architecture, for instance, the use of sheer curves can be seen in modern buildings where designers utilize these curves to create dynamic and engaging facades. These structures often feature sweeping lines that draw the eye upward, creating a sense of movement and fluidity. The sheer nature of these curves allows architects to break away from traditional straight lines, leading to innovative designs that challenge conventional aesthetics.In the realm of physics, sheer curves can be observed in the analysis of forces acting on objects. For example, when studying the trajectory of a projectile, the path it follows can exhibit characteristics of a sheer curve under certain conditions, particularly when influenced by gravitational forces. Understanding these curves helps scientists predict the behavior of various physical systems, making them essential in fields such as engineering and aerospace.Moreover, in the field of data visualization, sheer curves are often employed to represent complex relationships between variables. For instance, a graph depicting economic growth over time might feature a sheer curve to illustrate a sudden spike in growth due to external factors such as technological advancements or policy changes. By using sheer curves in visual representations, analysts can effectively communicate trends and insights that may not be immediately apparent through standard linear graphs.Additionally, the artistic realm also embraces the concept of sheer curves. Artists often incorporate these curves into their work to evoke emotions and convey movement. Whether it's in painting, sculpture, or digital art, the use of sheer curves can create a sense of dynamism and energy that captivates viewers. This artistic application highlights how mathematical concepts can transcend their technical origins and find expression in creative mediums.In conclusion, the sheer curve is a multifaceted concept that bridges mathematics, design, science, and art. Its steepness and dramatic transitions make it an intriguing subject of study across various disciplines. By exploring the applications of sheer curves, we gain a deeper appreciation for the interplay between form and function, as well as the beauty that can arise from mathematical principles. As we continue to innovate and explore new frontiers, the sheer curve will undoubtedly remain a vital element in our understanding of the world around us.

在数学和设计的世界中，曲线在塑造我们对各种概念的理解方面发挥着重要作用。一个这样的迷人概念是sheer curve，它代表了一种以陡峭和戏剧性方向变化为特征的曲线。术语“sheer”通常意味着某物非常陡峭或几乎垂直，当应用于曲线时，它暗示着突然的过渡，这可以既在视觉上引人注目又在数学上引人入胜。为了更好地理解sheer curve，我们可以看看它在不同领域的应用。例如，在建筑学中，现代建筑中使用sheer curves的案例比比皆是，设计师利用这些曲线创造出动态而引人入胜的外立面。这些结构通常具有流畅的线条，将视线吸引向上方，营造出一种运动和流动感。这些曲线的陡峭性质使建筑师能够打破传统的直线，导致挑战常规美学的创新设计。在物理学领域，sheer curves可以在分析作用于物体的力时观察到。例如，在研究抛射物的轨迹时，受到重力作用的情况下，其路径可能表现出sheer curve的特征。理解这些曲线有助于科学家预测各种物理系统的行为，使其在工程和航空航天等领域至关重要。此外，在数据可视化领域，sheer curves常用于表示变量之间复杂的关系。例如，描绘经济增长随时间变化的图表可能会采用sheer curve来说明由于技术进步或政策变化等外部因素导致的增长突然激增。通过在视觉表示中使用sheer curves，分析师能够有效地传达趋势和见解，这些见解通过标准线性图可能并不立即显现。此外，艺术领域也接受了sheer curves的概念。艺术家们常常将这些曲线融入他们的作品中，以唤起情感和传达运动。无论是在绘画、雕塑还是数字艺术中，使用sheer curves都能创造出一种动感和能量，吸引观众。这种艺术应用突显了数学概念如何超越其技术起源，在创造性媒介中找到表达。总之，sheer curve是一个多面的概念，它桥接了数学、设计、科学和艺术。它的陡峭和戏剧性的过渡使其成为各学科研究的迷人主题。通过探索sheer curves的应用，我们对形式与功能之间的相互作用以及从数学原理中产生的美感有了更深的欣赏。随着我们继续创新和探索新领域，sheer curve无疑将继续成为我们理解周围世界的重要元素。