The four conic sections that I know of in mathematics are two dimensional shapes that can be made by getting the cross section of two cones that are inverted and share the same tip at a certain angle. For example, you can cut the cones horizontally to get a circle, cut it at a slight angle to get an ellipse, cut it at the same angle as the slant of the cone to get a parabola, or cut it vertically to get a hyperbola. There are also equations for the conic sections, which can all be found on Wikipedia, along with this information.
The types of conic sections are circles, parabolas, hyperbolas, and ellipses.
Circles, parabolas, ellipses, and hyperbolas are all conic sections. Out of these conic sections, the circle and ellipse are the ones which define a closed curve.
The conic sections of a building are the parts that take a conic shaped design some examples would be the Berlin Reichstag Dome and the Sony Center in Berlin.
The only thing I can think of is a lobbed shot at the basket will approximately follow the path of a parabola, which is one of the conic sections.
math and conic sections
cause they are awsome
Aerospace engineer\
Circles, ellipses, parabolas, and hyperbolas are called conic sections because they can be obtained as a intersection of a plane with a double- napped circular cone. If the plane passes through vertex of the double-napped cone, then the intersection is a point, a pair of straight lines or a single line. These are called degenerate conic sections. Because they are sections of a cone or a cone shaped object.
William Henry Drew has written: 'Solutions to problems contained in A geometrical treatise on conic sections' -- subject(s): Conic sections
a wheel
Ellipse circle
The cast of Conic Sections in Math - 1995 includes: Wes Hobby as Professor Mc Conical Harvey Silver as Woodrow