Questions tagged [conic-sections]

For questions about circles, ellipses, hyperbolas, and parabolas. These curves are the result of intersecting a cone with a plane.

A conic section is a smooth planar curve that is the result of intersecting a cone with a plane. There are commonly four conic sections: circles, ellipses, parabolas, and hyperbolas.

We can construct these conic sections analytically. The solutions to the equation $x^2+y^2=z^2$ give us a cone in three-dimensional space. An plane in three-dimensional space that goes through a point $p=(x_0,y_0,z_0)$ and has normal vector $\langle a,b,c \rangle$ is given by the equation

$$a(x-x_0)+b(y-y_0)+c(z-z_0)=0\,.$$

Finding the common solutions to the equation of the cone and equation of the plane for various choices of $p$ and normal vector will—after a change in coordinates to write them as planar curves—lead you to the (potentially) familiar equations

  • Circle: $x^2+y^2 = r^2$
  • Ellipse: $ax^2 + b y^2 = r^2$, where $a,b>0$
  • Parabola: $ax^2 +by = r^2$, where $a\neq 0$
  • Hyperbola: $ax^2 - by^2 = r^2$, where $a,b>0$

There are also geometric constructions of the conic sections. For example, a circle is the set of all points that are a fixed distance from a given points. An ellipse is the set of all points .... The construction of Dandelin spheres (see Wikipedia) unifies the analytic and geometric constructions of conic sections.

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Tangents are drawn from the point $(\alpha,\beta)$ to the hyperbola $3x^2-2y^2=6$ and are inclined at angles $\theta$ and $\phi$ to the $x-$axis.

Tangents are drawn from the point $(\alpha,\beta)$ to the hyperbola $3x^2-2y^2=6$ and are inclined at angles $\theta$ and $\phi$ to the $x-$axis.If $\tan\theta.\tan\phi=2,$ prove that $\beta^2=2\alpha^2-7$ The equation of the pair of tangents from…
user1557
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how to find hyperbola equation knowing tangent line and point

I have a problem. A hyperbola passes through point $(3,2)$ and $9x+2y-15=0$ is a tangent line. Find the equation of hyperbola.
naomi
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Inversion across a general ellipse

This paper is very useful in how it explains the mapping of any coordinates $(x,y)$ across an ellipse with the function $$\frac{x^2}{a^2}+\frac{y^2}{b^2}=1$$ to $$\left(\frac{a^2b^2x}{a^2y^2+b^2x^2},\frac{a^2b^2y}{a^2y^2+b^2x^2}\right)$$ But what if…
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Finding the major axis of an ellipse given the angle of a tangent

Given the angle between the tangent and the line that connects the point of tangency to each foci, and you are given the distance from one of the foci to the point of tangency. You are given two angles and two distances can you calculate the length…
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Distance between feet of perpendiculars from focii of ellipse

$$Tangent\quad drawn\quad to\quad ellipse\quad { x }^{ 2 }+{ 2y }^{ 2 }=6\quad at\quad point\quad (2,1).If\quad A\\ and\quad B\quad are\quad the\quad feet\quad of\quad pependiculars\quad from\quad the\quad two\\ focii\quad on\quad the\quad…
user220382
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How to find smallest tangent ellipse giving multiple lines ?

This ellipse must be tangent to at least 4 lines and it must intersect the other lines. I've tried to use ellipses that are parallel to the x- and y-axis. I've done this by transforming the equation of this lines into a dual space: l: px + qy + r =…
Curious
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Tangents to the parabola

Quite a straightforward piece of maths I can't seem to get my head around here: The tangent to the parabola at the point $(4a, 4a)$ is given by what equation? Bearing in mind the parabola is $y^2 = 4ax$ and the general point $(at^2, 2at)$ lies on…
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How to measure the angle of the tangent to an ellipse?

If we consider the ellipse in the picture here How do we determine the angle $\lambda$ of the vector v (tangent at point x = 2 ,y = 3) with the line joining the center (10,0)and the point (2,3)? Edit: a = 10, b = 5 it seems impossible it is 80°,…
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Rolling of one ellipse on another ellipse of same size when initially touching each other at the end of their major axis.

I have a question related to conic section which i could not understood. The question is $E_1$:$ \frac{x^2}{a^2} +\frac{y^2}{b^2}=1(a>b)$ is a given ellipse. Another ellipse $E_2$: is of same size as that of $E_1$. Initially $E_1$ and $E_2$ are…
Pratyush
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Area of ellipse given foci?

Is it possible to get the area of an ellipse from the foci alone? Or do I need at least one point on the ellipse too?
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Why is the equation of an ellipse (x/a)^2 + (y/b)^2 = 1?

I've seen many proofs online, but I can't really wrap my mind around it. Being a generalization of the circle, I thought its equation would be as easy to understand as the circle's. Turns out I was wrong, or maybe I'm just too stupid to grasp the…
Matt24
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minimum number of points needed to define a unique 2 degree curve

as the title says to find minimum number of points needed to define a unique 2 degree. i did it by thinking that in general equation of 2 degree $Ax^2 + By^2 + 2Gx + 2Fy + 2Hxy + C $ there are 6 variables and there so minimum 6 points are needed to…
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Condition on x-coordinate of a point such that three distinct normals can be drawn to a parabola

The set of points on the axis of the parabola $2{(x−1)^2+(y−1)^2}=(x+y)^2$ from which three distinct normals can be drawn is the set of points (h,k) lying on the axis of the parabola such that h>3/2? How to prove this claim?I am not being able to…
user220382
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Curvature of Ellipse

We all know that the curvature of a circle is defined by the equation $$k=\frac{1}{r}$$ What about ellipses? In terms of major axis $a$, minor axis $b$, $x$ and $y$, what is the curvature of an ellipse? Thanks lots!
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Is there a link between parabola and hyperbola?

I've merely seen the hyperbola defined as the "set of all points in a plane such that the difference of the distances from two fixed points (foci) is constant.". Like here: https://people.richland.edu/james/lecture/m116/conics/hypdef.html However,…
mavavilj
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