equiangular hyperbola in Vietnamese

1. Degenerate Conic A Conic which is not a parabola, ellipse, circle, or hyperbola

2. Similarly the centre of an ellipse or a hyperbola is where the axes intersect.

Tương tự, trung tâm của một elip hoặc hyperbol là giao điểm của hai trục.

3. Asymptote The x-axis and y-axis are Asymptotes of the hyperbola xy = 3

4. Angulate definition: having angles or an angular shape synonyms: angular, three-cornered, cuspated, cuspidal, square-shaped, unicuspid, tricuspid, equiangular

5. The graph of y = Cosh(x) is a hyperbola with a local minimum at (0,1)

6. A geometric surface formed by rotating a parabola, ellipse, or hyperbola about one axis adjective Also: Conoidal (kəʊˈnɔɪdəl)

7. This Conic equation identifier helps you identify Conics by their equations eg circle, parabolla, elipse and hyperbola

8. For e=1 the Conic is a parabola, whereas when e>1 the Conic is a hyperbola

9. If the plane is parallel to the axis of revolution (the y-axis), then the Conic section is a hyperbola

10. A geometric surface formed by rotating a parabola, ellipse, or hyperbola about one axis adjective also: Conoidal (kəʊˈnɔɪdəl), Conoidic (kəʊˈnɔɪdɪk), Conoidical (kəʊˈnɔɪdɪkəl)

11. Geometrically the sum is taken along a 'hyperbola' XY = ab and we consider this as defining an algebraic curve over the finite field with p elements.

12. The foci of the ellipse x^2/16 + y^2/b^2 = 1 and the hyperbola (x^2/144) - (y^2/81) = 1/25 Coincide

13. If 0≤β<α, then the plane intersects both nappes and the Conic section so formed is known as a hyperbola (represented by the orange curves)

14. Conic sections are generated by the intersection of a plane with a cone ().If the plane is parallel to the axis of revolution (the y-axis), then the Conic section is a hyperbola

15. Apollonius was a Greek mathematician known as 'The Great Geometer'. His works had a very great influence on the development of mathematics and his famous book Conics introduced the terms parabola, ellipse and hyperbola

16. Conic sections are generated by the intersection of a plane with a cone (Figure 7.44).If the plane is parallel to the axis of revolution (the y-axis), then the Conic section is a hyperbola

17. For example, if the Antiparallels are concurrent at P and the three Euler lines are concurrent at Q, then the loci of P and Q are respectively the tangent to the Jerabek hyperbola at the Lemoine : 9

18. The Chambered nautilus, Nautilus pompilius, also called the pearly nautilus, is the best-known species of nautilus.The shell, when cut away, reveals a lining of lustrous nacre and displays a nearly perfect equiangular spiral, although it is not a golden spiral.The shell exhibits countershading, being light on the bottom and dark on top.This is to help avoid predators, because when seen from

19. Projective Conic sectionsThe Conic sections (ellipse, parabola, and hyperbola) can be generated by projecting the circle formed by the intersection of a cone with a plane (the reality plane, or RP) perpendicular to the cone's central axis.The image of the circle is projected onto a plane (the projective plane, or PP) that is oriented at the same angle as the cutting plane (Ω) passing through

20. So also each Conic has a "typical" equation form, sometimes along the lines of the following: parabola: Ax 2 + Dx + Ey = 0 circle: x 2 + y 2 + Dx + Ey + F = 0 ellipse: Ax 2 + Cy 2 + Dx + Ey + F = 0 hyperbola: Ax 2 – Cy 2 + Dx + Ey + F = 0 These equations can be rearranged in various ways, and each Conic has its own special form that you'll need to learn to recognize, but some