In mathematics, a hyperbola (listen) (adjective form hyperbolic, listen) (plural hyperbolas, or hyperbolae (listen)) is a type of smooth curve lying in a plane, defined by its geometric properties or by equations for which it is the solution set. A hyperbola has two pieces, called connected components or branches, that are mirror images of each other and resemble two infinite bows. The hyperbola is one of the three kinds of conic section, formed by the intersection of a plane and a double cone. (The other conic sections are the parabola and the ellipse. A circle is a special case of an ellipse.) If the plane intersects both halves of the double cone but does not pass through the apex of the cones, then the conic is a hyperbola.
Hyperbolas arise in many ways:
as the curve representing the function
y
(
x
)
=
1
/
x
{\displaystyle y(x)=1/x}
in the Cartesian plane,
as the path followed by the shadow of the tip of a sundial,
as the shape of an open orbit (as distinct from a closed elliptical orbit), such as the orbit of a spacecraft during a gravity assisted swing-by of a planet or, more generally, any spacecraft exceeding the escape velocity of the nearest planet,
as the path of a single-apparition comet (one travelling too fast ever to return to the solar system),
as the scattering trajectory of a subatomic particle (acted on by repulsive instead of attractive forces but the principle is the same),
in radio navigation, when the difference between distances to two points, but not the distances themselves, can be determined,and so on.
Each branch of the hyperbola has two arms which become straighter (lower curvature) further out from the center of the hyperbola. Diagonally opposite arms, one from each branch, tend in the limit to a common line, called the asymptote of those two arms. So there are two asymptotes, whose intersection is at the center of symmetry of the hyperbola, which can be thought of as the mirror point about which each branch reflects to form the other branch. In the case of the curve
y
(
x
)
=
1
/
x
{\displaystyle y(x)=1/x}
the asymptotes are the two coordinate axes.Hyperbolas share many of the ellipses' analytical properties such as eccentricity, focus, and directrix. Typically the correspondence can be made with nothing more than a change of sign in some term. Many other mathematical objects have their origin in the hyperbola, such as hyperbolic paraboloids (saddle surfaces), hyperboloids ("wastebaskets"), hyperbolic geometry (Lobachevsky's celebrated non-Euclidean geometry), hyperbolic functions (sinh, cosh, tanh, etc.), and gyrovector spaces (a geometry proposed for use in both relativity and quantum mechanics which is not Euclidean).
Using a domain of {x | -50 < x < 50} and a range of {y | 0 < y < 20}, determine the following types of equations that you could use to model the curved arch.
The equation of a hyperbola in the form , where b = 10. The lower arm of the hyperbola would represent the arch...
Your task is to design a curved arch similar to the a tunnel for cars. with a horizontal span of 100 m and a maximum height of 20 m.
Using a domain of {x:-50<=x<=50} and {y:0<=y<=20} determine the following types of equations that could be used to model the curved arch.
the equation of a...
hi i got this equation
y= x^2 - 2x + 1 / X^2 -x - 2
how do i sketch this finding all intercepts, and asymptotes with a gfx calculator? Please check if the steps i did below is right
what i did i factorised the equation so i got
y= (x-1)^2 / (x+1)(x-2)
ASYMPTOTES
the bottom line...
:cry: \frac {(x-1)^2} {9} - \frac {(y+2)^2} {25} = 1
I think this is a vertical hyperbola
with center (1,-2) a=5 b=3
Transversal length=10
Conjugate length =6
Vertex (1,-7) and (1,3)
Foci (1,sqrt(34)-2) and (1,-sqrt(34)-2)
Asymptotes y+2=5/3(x-1) and y+2=-5/3 (x-1)
I don't...
Find the equation of the hyperbola with centre at the origin and sketch the graph.
e. tranverse axis is on the y-axis and passes through the points R(4, 6) and S(1, -3)
How would I find a and b? I plugged in the coordinates in \frac{x^2}{a^2} - \frac{y^2}{b^2} = 1 and came up with two...
What is a conjugate hyperbola? I'm asked to find the equation of the conjugate hyperbola if the asymptotes are y = +/- 2x.
Would it be \frac{x^2}{1} + \frac{y^2}{4} = 1 or \frac{x^2}{1} + \frac{y^2}{4} = -1?
Find the area of the region bounded by the hyperbola 9x^2-4y^2 = 36 and the line x = 3.
I'm thinking that I have to integrate for x, so I'll have the sum of twice the area from 2 to 3.
The function will be + \sqrt {\frac {9x^2-36}{4}}
hence, the integral will be 2\int_2^3 {\sqrt {\frac...
|F||D|=1 is the simplest form of the law of lever in equilibrium.
If |F|=|x-y| and |D|=x+y then |x^2-y^2|=1 is an real hyperbola.
In this case the interaction is repulsive.
If |F|=x-iy and |D|=x+iy then x^2+y^2=1 is an real ellipse or imaginary hyperbola.
In this case the interaction is...
Hey everyone, I was having trouble with this question.
The graph of 1/x is a hyperbola, but it's equation does not fit the form (x-h)/(a^2) - (y-k)/(b^2) = 1. Rotate 1/x using polar coordinates, change it back into cartesian coordinates, and write the equation in standard hyberbola notation...