hyperbola in Arabic

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.

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

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

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

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

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

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

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

10. 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.

11. 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

12. 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)

13. 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

14. 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

15. 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

16. 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

17. 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

18. 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