What type of conic section was formed when the plane intersects both double napped cone to the axis of revolution?

Conic sections are obtained by the intersection of the surface of a cone with a plane, and have certain features.

Describe the parts of a conic section and how conic sections can be thought of as cross-sections of a double-cone

• A conic section (or simply conic) is a curve obtained as the intersection of the surface of a cone with a plane; the three types are parabolas, ellipses, and hyperbolas.
• A conic section can be graphed on a coordinate plane.
• Every conic section has certain features, including at least one focus and directrix. Parabolas have one focus and directrix, while ellipses and hyperbolas have two of each.
• A conic section is the set of points

  $P$

  whose

  distance to the focus is a constant multiple of the distance from

  $P$

  to the directrix of the conic.

• vertex: An extreme point on a conic section.
• asymptote: A straight line which a curve approaches arbitrarily closely as it goes to infinity.
• locus: The set of all points whose coordinates satisfy a given equation or condition.
• focus: A point used to construct and define a conic section, at which rays reflected from the curve converge (plural: foci).
• nappe: One half of a double cone.
• conic section: Any curve formed by the intersection of a plane with a cone of two nappes.
• directrix: A line used to construct and define a conic section; a parabola has one directrix; ellipses and hyperbolas have two (plural: directrices).

Conic sections are generated by the intersection of a plane with a cone. If the plane is parallel to the axis of revolution (the

$y$

90∘90^{\circ}90∘

These properties that the conic sections share are often presented as the following definition, which will be developed further in the following section. A conic section is the locus of points

$P$

$P$

Discuss how the eccentricity of a conic section describes its behavior

• Eccentricity is a parameter associated with every conic section, and can be thought

  of as a measure of how much the conic section deviates from being circular.

• The eccentricity of a conic section is defined to be the distance from any point on the conic section to its focus, divided by the perpendicular distance from that point to the nearest directrix.
• The value of

  $e$

  can be used to determine the type of conic section. If

  $e=1$

  it is a parabola, if

  $e<1$

  it is an ellipse, and if 

  $e>1$

  it is a hyperbola.

• eccentricity: A parameter of a conic section that describes how much the conic section deviates from being circular.

$e$

The eccentricity of a conic section is defined to be the distance from any point on the conic section to its focus, divided by the perpendicular distance from that point to the nearest directrix. The value of

$e$

$e$

• If

  $e=1$

  , the conic is a parabola
• If

  $e<1$

  , it is an ellipse
• If

  $e>1$

  , it is a hyperbola

$1$

For an ellipse, the eccentricity is less than

$1$

Conversely, the eccentricity of a hyperbola is greater than

$1$

Discuss the properties of different types of conic sections

• Conic sections are a particular type of shape formed by the intersection of a plane and a right circular cone. Depending on the angle between the plane and the cone, four different intersection shapes can be formed.
• The types of conic sections are circles, ellipses, hyperbolas, and parabolas.
• Each conic section also has a degenerate form; these take the form of points and lines.

• degenerate: A conic section which does not fit the standard form of equation.
• asymptote: A line which a curved function or shape approaches but never touches.
• hyperbola: The conic section formed by the plane being perpendicular to the base of the cone.
• focus: A point away from a curved line, around which the curve bends.
• circle: The conic section formed by the plane being parallel to the base of the cone.
• ellipse: The conic section formed by the plane being at an angle to the base of the cone.
• eccentricity: A dimensionless parameter characterizing the shape of a conic section.
• Parabola: The conic section formed by the plane being parallel to the cone.
• vertex: The turning point of a curved shape.

$e$

$e$

• A vertex, which is the point at which the curve turns around
• A focus, which is a point not on the curve about which the curve bends
• An axis of symmetry, which is a line connecting the vertex and the focus which divides the parabola into two equal halves

All parabolas possess an eccentricity value

$e=1$

f(x)=x2f(x) = x^2f(x)=x2

• A center point
• A radius, which the distance from any point on the circle to the center point

All circles have an eccentricity

$e=0$

(x−h)2+(y−k)2=r2(x-h)^2 + (y-k)^2 = r^2(x−h)2+(y−k)2=r2

where

$(h,k)$

$r$

$0.5$

$1$

$2$

• A major axis, which is the longest width across the ellipse
• A minor axis, which is the shortest width across the ellipse
• A center, which is the intersection of the two axes
• Two focal points —for any point on the ellipse, the sum of the distances to both focal points is a constant

Ellipses can have a range of eccentricity values:

$0\le e<1$

$0$

$1$

(x−h)2a2+(y−k)2b2=1\displaystyle{ \frac{(x-h)^2}{a^2} + \frac{(y-k)^2}{b^2} = 1 }a2(x−h)2​+b2(y−k)2​=1

where

$(h,k)$

$2a$

$2b$

$a$

$b$

• Asymptote lines—these are two linear graphs that the curve of the hyperbola approaches, but never touches
• A center, which is the intersection of the asymptotes
• Two focal points, around which each of the two branches bend
• Two vertices, one for each branch

(x−h)2a2−(y−k)2b2=1\displaystyle{ \frac{(x-h)^2}{a^2} - \frac{(y-k)^2}{b^2} = 1 }a2(x−h)2​−b2(y−k)2​=1

where

$(h,k)$

$a$

The eccentricity of a hyperbola is restricted to

$e>1$

$+\infty$

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