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L is a line and E is a plane and L is not contained in E then L intersects E at exactly one point?
IncorrectThere is nothing in the above Statement of Conditions that indicate the orientation of the Line L to the plane E.Therefore: there are two possible solutions.If the Line is parallel to the plane they never intersect.If it is not parallel then the line would intersect at only one point.
If a right circular cone intersects a plane that runs parallel to the cone's axis but does not pass through its vertex?
If a right circular cone intersects a plane that runs parallel to the cone's axis but does not pass through its vertex, the resulting curve is a pair of hyperboles.
If a right circular cone intersects a plane that runs parallel?
Then the cross-section is a circle or a point.
If a right circular cone intersects a plane that runs parallel to the edge of the cone what will be the result?
The intersection of the cone and that particular plane is a parabola.
What if a right circular cone intersects a plane that passes through one of its nappes but the plane is not parallel to an edge of the cone?
Then the intersection is a hyperbola.
L is a line and E is a plane and L is not contained in E then L intersects E at exactly one point?
IncorrectThere is nothing in the above Statement of Conditions that indicate the orientation of the Line L to the plane E.Therefore: there are two possible solutions.If the Line is parallel to the plane they never intersect.If it is not parallel then the line would intersect at only one point.
If a right circular cone intersects a plane that runs parallel to the edge of the cone the resulting curve is?
The "conic section" that is produced when a right circular cone intersects a plane that runs parallel to the edge of the cone is a parabola. In the case where the plane also intersects the vertex of the cone, the parabola becomes two intersecting lines.
If a right circular cone intersects a plane that runs parallel to the cone's axis but does not pass through its vertex?
If a right circular cone intersects a plane that runs parallel to the cone's axis but does not pass through its vertex, the resulting curve is a pair of hyperboles.
How do you draw a line that intersects two nonintersecting planes?
If the planes are non-intersecting, then they're parallel. Any line that intersects one of them intersects both of them.
If a right circular cone intersects a plane that runs parallel?
Then the cross-section is a circle or a point.
If a right circular cone intersects a plane that runs parallel to the edge of the cone what will be the result?
The intersection of the cone and that particular plane is a parabola.
What if a right circular cone intersects a plane that passes through one of its nappes but the plane is not parallel to an edge of the cone?
Then the intersection is a hyperbola.
If a line intersects one of two parallel lines does it intersects the other?
Yes, it does. And it makes equal angles with both of them.(We're talking about straight lines, in a plane.)
If a line intersects a plane that does not contain the line then the intersection is exactly one point?
Yes.
A line in the plane of a circle that intersects a circle at exactly one point is called a?
tangent
If a right circular cone intersects a plane that passes through one of its nappes but the plane is neither parallel to the edge of the cone nor perpendicular to the cones axis the resulting curve will?
If a right circular cone intersects a plane that passes through one of its nappes, but the plane is not parallel to an edge of the cone, the resulting curve will bea(n) _____ . ellipse
If a right circular cone intersects a plane that runs parallel to the edge of the cone the resulting curve will be an?
A Parabola.
