1.
Mathematic Deduction of the Properties of NURBS Curves at the Beginpoint and the Endpoint;
NURBS曲线端点性质的数学推导
2.
Multidegree Reduction of Bézier Curves with Conditions of Endpoint Interpolations
带端点插值条件的Bézier曲线降多阶逼近
3.
The Bezier spline is always anchored at the two end points.
贝塞尔曲线总是锚定在两个端点。
4.
Bend the end of the wire back.
将这根金属线的末端向后挠曲。
5.
Curved line with an arrowhead at either end. Use the control handle to resize the line ends.
两端都带有箭头的曲线。使用控制手柄可调整端点形状的大小。
6.
Crank the engine for 5 seconds while monitoring the voltage at the coil positive terminal:
用曲柄发动引擎5秒钟,监视线圈正极端子电压:
7.
Curve A is skewed to the right, because it tails off toward the high end of the scale.
曲线A向右倾斜,因为它的尾部摇向高值一端。
8.
It is also required to discover and trace the curve containing all such points.
也要求发现并描出这条包括所有端点的曲线。
9.
Digital design of cylindrical end cam based on curve fitting and correction
基于曲线拟合修正的圆柱端面凸轮数字化设计
10.
Design of Cross Section for Counter-Rotating Twin-Screw Elements and Surface Reconstruction;
双螺杆挤出机端面曲线设计理论的研究与曲面重建
11.
A plane cubic curve having a single loop, a node, and two ends asymptotic to the same line.
平面立方曲线平面的立方曲线,具有一个拱形、一个交点和逐渐接近同一条线的两个端点
12.
The control points act as" magnets" to pull the curve away from the straight line between the two end points.
控制点承担“磁铁”的角色,它把曲线拉离两个端点之间的直线。
13.
Study on the Curve Radius Standards for the Divergent and Main Lines in and Adjoining Stations on High-speed Railway
京沪高速铁路车站内及站外两端的正线曲线半径标准的研究
14.
The theory of surfaces made a slow start. It began with the subject of geodesics on surfaces.
曲面理论也经历了一个漫长的开端,曲面理论是从曲面上的测地线的研究开始的。
15.
The curve theoretically formed by a perfectly flexible, uniformly dense, and inextensible cable suspended from its endpoints.
垂曲线理论上由一条极柔软、密度均匀且长度不变的缆绳从其两端间垂下而形成的曲线
16.
signal discriminator
信号鉴别器single-ended (工作于谐振曲线一侧的)单端鉴频器
17.
A string or garland, as of leaves or flowers, suspended in a loop or curve between two points.
花彩,花环如叶或花的两端悬挂在圆环或曲状物中的线或花彩
18.
A single two-dimensional Bezier spline is defined by four points- two end points and two control points.
一条单独的二维贝塞尔曲线由四个点定义——两个端点和两个控制点。