quadratic curve - traduzione in russo
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In questa pagina puoi ottenere un'analisi dettagliata di una parola o frase, prodotta utilizzando la migliore tecnologia di intelligenza artificiale fino ad oggi:

  • come viene usata la parola
  • frequenza di utilizzo
  • è usato più spesso nel discorso orale o scritto
  • opzioni di traduzione delle parole
  • esempi di utilizzo (varie frasi con traduzione)
  • etimologia

quadratic curve - traduzione in russo

Bezigon; Beziergon; Polybezier; Polybézier; Composite Bezier curve; Bézigon; Quadratic Bézier curve; Quadratic Bézier curves
  • [[Sinc]] function approximated using a smooth Bézier spline, i.e., a series of smoothly-joined Bézier curves

quadratic curve         
  • The [[paraboloid]] shape of [[Archeocyathid]]s produces conic sections on rock faces
  • Standard forms of a hyperbola
  • Standard forms of a parabola
  • Standard forms of an ellipse
  • Diagram from Apollonius' ''Conics'', in a 9th-century Arabic translation
  • Development of the conic section as the eccentricity ''e'' increases
  • L}} (''e'' = ∞). The red circle (''e'' = 0) is included for reference; it does not have a directrix in the plane.
  • Parallelogram method for constructing an ellipse
  • Conic parameters in the case of an ellipse
  • Definition of the Steiner generation of a conic section
  • Cyclopaedia]]'', 1728
  • 4: [[Hyperbola]]}}
CURVE OBTAINED BY INTERSECTING A CONE AND A PLANE
Conic sections; Conic; Conics; Latus rectum; Conic Sections; Quadratic curve; Conic Sections in Polar Coordinates; Semilatus rectum; Semilatus Rectum; Semi-latus rectum; Conics intersection; Focal parameter; Focal Parameter; Conic Section; Latus Rectum; Dual conic; Directrix (conic section); Directrix of a conic section; Quadratic plane curve; Conic equation; Conic parameter

общая лексика

кривая второго порядка

focal parameter         
  • The [[paraboloid]] shape of [[Archeocyathid]]s produces conic sections on rock faces
  • Standard forms of a hyperbola
  • Standard forms of a parabola
  • Standard forms of an ellipse
  • Diagram from Apollonius' ''Conics'', in a 9th-century Arabic translation
  • Development of the conic section as the eccentricity ''e'' increases
  • L}} (''e'' = ∞). The red circle (''e'' = 0) is included for reference; it does not have a directrix in the plane.
  • Parallelogram method for constructing an ellipse
  • Conic parameters in the case of an ellipse
  • Definition of the Steiner generation of a conic section
  • Cyclopaedia]]'', 1728
  • 4: [[Hyperbola]]}}
CURVE OBTAINED BY INTERSECTING A CONE AND A PLANE
Conic sections; Conic; Conics; Latus rectum; Conic Sections; Quadratic curve; Conic Sections in Polar Coordinates; Semilatus rectum; Semilatus Rectum; Semi-latus rectum; Conics intersection; Focal parameter; Focal Parameter; Conic Section; Latus Rectum; Dual conic; Directrix (conic section); Directrix of a conic section; Quadratic plane curve; Conic equation; Conic parameter

математика

фокальный параметр

latus rectum         
  • The [[paraboloid]] shape of [[Archeocyathid]]s produces conic sections on rock faces
  • Standard forms of a hyperbola
  • Standard forms of a parabola
  • Standard forms of an ellipse
  • Diagram from Apollonius' ''Conics'', in a 9th-century Arabic translation
  • Development of the conic section as the eccentricity ''e'' increases
  • L}} (''e'' = ∞). The red circle (''e'' = 0) is included for reference; it does not have a directrix in the plane.
  • Parallelogram method for constructing an ellipse
  • Conic parameters in the case of an ellipse
  • Definition of the Steiner generation of a conic section
  • Cyclopaedia]]'', 1728
  • 4: [[Hyperbola]]}}
CURVE OBTAINED BY INTERSECTING A CONE AND A PLANE
Conic sections; Conic; Conics; Latus rectum; Conic Sections; Quadratic curve; Conic Sections in Polar Coordinates; Semilatus rectum; Semilatus Rectum; Semi-latus rectum; Conics intersection; Focal parameter; Focal Parameter; Conic Section; Latus Rectum; Dual conic; Directrix (conic section); Directrix of a conic section; Quadratic plane curve; Conic equation; Conic parameter

общая лексика

фокальный параметр

Definizione

Bezier curve
<graphics> A type of curve defined by mathematical formulae, used in computer graphics. A curve with coordinates P(u), where u varies from 0 at one end of the curve to 1 at the other, is defined by a set of n+1 "control points" (X(i), Y(i), Z(i)) for i = 0 to n. P(u) = Sum i=0..n [(X(i), Y(i), Z(i)) * B(i, n, u)] B(i, n, u) = C(n, i) * u^i * (1-u)^(n-i) C(n, i) = n!/i!/(n-i)! A Bezier curve (or surface) is defined by its control points, which makes it invariant under any affine mapping (translation, rotation, parallel projection), and thus even under a change in the axis system. You need only to transform the control points and then compute the new curve. The control polygon defined by the points is itself affine invariant. Bezier curves also have the variation-diminishing property. This makes them easier to split compared to other types of curve such as Hermite or B-spline. Other important properties are multiple values, global and local control, versatility, and order of continuity. [What do these properties mean?] (1996-06-12)

Wikipedia

Composite Bézier curve

In geometric modelling and in computer graphics, a composite Bézier curve or Bézier spline is a spline made out of Bézier curves that is at least C 0 {\displaystyle C^{0}} continuous. In other words, a composite Bézier curve is a series of Bézier curves joined end to end where the last point of one curve coincides with the starting point of the next curve. Depending on the application, additional smoothness requirements (such as C 1 {\displaystyle C^{1}} or C 2 {\displaystyle C^{2}} continuity) may be added.

A continuous composite Bézier is also called a polybezier, by similarity to polyline, but whereas in polylines the points are connected by straight lines, in a polybezier the points are connected by Bézier curves. A beziergon (also called bezigon) is a closed path composed of Bézier curves. It is similar to a polygon in that it connects a set of vertices by lines, but whereas in polygons the vertices are connected by straight lines, in a beziergon the vertices are connected by Bézier curves. Some authors even call a C 0 {\displaystyle C^{0}} composite Bézier curve a "Bézier spline"; the latter term is however used by other authors as a synonym for the (non-composite) Bézier curve, and they add "composite" in front of "Bézier spline" to denote the composite case.

Perhaps the most common use of composite Béziers is to describe the outline of each letter in a PostScript or PDF file. Such outlines are composed of one beziergon for open letters, or multiple beziergons for closed letters. Modern vector graphics and computer font systems like PostScript, Asymptote, Metafont, OpenType, and SVG use composite Bézier curves composed of cubic Bézier curves (3rd order curves) for drawing curved shapes.

Traduzione di &#39quadratic curve&#39 in Russo