Examples of 'hyperbola' in a sentence
Meaning of "hyperbola"
hyperbola (noun): In mathematics, a hyperbola is a type of smooth curve that results from the intersection of a plane and a double cone. It is characterized by its two separate and symmetric branches
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- A conic section formed by the intersection of a cone with a plane that intersects the base of the cone and is not tangent to the cone. The function y(x) = 1/x draws a hyperbola.
How to use "hyperbola" in a sentence
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hyperbola
A hyperbola with given asymptotes through a point.
The asymptote of a hyperbola can be found as follows.
This constant is the eccentricity of the hyperbola.
An equilateral hyperbola constructed through four points.
Now the line of the centres is a hyperbola.
But a hyperbola is very close in formula to this.
Now let us think about the hyperbola.
So a hyperbola usually looks something like this.
What are the two asymptotes of the hyperbola.
This is a hyperbola passing through the origin.
This is therefore the centre of the hyperbola.
Construct a hyperbola with this focus.
There are two general equations for a hyperbola.
Construct a hyperbola through this point.
Line of flight in this case is similar to hyperbola.
See also
But this hyperbola looks something like this.
Select the first focus of the new hyperbola.
But a hyperbola would look something like this.
The four branches of the hyperbola in two dimension.
Hyperbola has established packaging guidelines.
Select the second focus of the new hyperbola.
A hyperbola can degenerate into two intersecting lines.
Select a point for the new hyperbola to go through.
So the hyperbola is going to look like this.
Today we will discuss the hyperbola.
A hyperbola consists of two separate branches.
So that lets us know that we are dealing with a hyperbola.
Let me draw the hyperbola itself.
The lines in this model are represented as branches of a hyperbola.
It would also be a rectangular hyperbola but at a lower state.
This definition is analogous to the definition of a planar hyperbola.
That will make a hyperbola segment.
Let us visualize the circle and the hyperbola.
A hyperbola constructed by its focuses and a point that pertains to it.
So those are both points on this hyperbola.
Any diameter of the original hyperbola is reflected to a conjugate diameter.
Those are not the actual hyperbola.
Hyperbola centered in the origin.
You can graph your hyperbola.
In the case of the hyperbola only a single branch was considered.
He is remembered for his work on quadrature of the hyperbola.
Is the center of this hyperbola is at the point x is equal to minus one.
Left and right points on a hyperbola.
This one is a hyperbola because you have this negative here.
The graph forms a rectangular hyperbola.
A special case of the hyperbola occurs when its asymptotes are perpendicular.
Inverting the equation of an ellipse or hyperbola.
Find the equation of the hyperbola satisfying the given conditions.
The points at which the hyperbola.
The asymptotes of this hyperbola are the lines y is equal to plus or minus b over a.
