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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Derivation of sufficient condition(s) for a general 2nd degree equation to represent a parabola

Say we have a equation like $Ax²+Bxy+Cy²+2Dx+2Ey+F = 0$ What i thought was to first imply the condition that it does not represents a pair of straight line then if we consider the focus as $(a,b)$ and the directrix as $y=mx+c$ ,Now if we make the…
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It is known that the right vertex A of ellipse C intersects the straight line l at points M and N which makes a diameter through.

I was attempting to solve one question of maximum solution when something delusive occurred. It shall be the original question below. It is known ellipse C:$x^2/a^2+y^2/b^2=1$(a>b>0) passes through point P(2/3,2). The left and right focus points are…
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What is the definition of an "auxiliary circle"?

Context: Penguin Dictionary of Mathematics, 4th Edition (2008) ed. David Nelson. I'm studying this as a course of self-study. In the above dictionary we have this: auxiliary circle One of the two eccentric circles of an ellipse or hyperbola. It is…
Prime Mover
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Parabola Property Problem related to Focus and its images through tangents

A parabola $S = 0$ has its vertex at $\left( { - 9,3} \right)$ and it touches the x-axis at the origin then equation of axis of symmetry of the aforesaid parabola can be (A) $x-y+12=0$ (B) $x-2y+15=0$ (C) $2x-y+21=0$ (D) $x+y+6=0$ My approach is…
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Calculating the distance on an circle between two arbitrary points from a camera at an angle.

When viewing a circular target through a camera at an angle I see an elliptical shape as such: If I select two arbitrary points on the image is it possible to calculate the distance between the two points in millimetres? What we know: The $X$ and…
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Is there an equation to find the tangent of an inclined ellipse?

There is a point (x,y) in the elliptical orbit inclined at theta angle. I know the x, y coordinates and the center coordinates and Major Minor. In this case, is there an equation to find the tangent line?
Amour Math
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Why two eccentricities from equation of asymptotes?

If the equation of asymptotes of a hyperbola is $3 \mathrm{x}^2+10 \mathrm{xy}+3 \mathrm{y}^2+5 \mathrm{x}+6 \mathrm{y}+\mu=0$, then eccentricity of the hyperbola is/are (A) $\sqrt{5}$ (B) $\frac{\sqrt{5}}{2}$ (c) $\sqrt{3}$ (D)…
Wolgwang
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Intersection points of ellipses and spheres

I've already worked out the intersection of two circles, now I'm trying to expand / generalize that to the intersection of 2 ellipses (if the foci are coincident, then they're circles), and then to spheres / ellipsoids. I've been having a devil of a…
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Why does focal chord subtend obtuse angle at vertex in parabola?

PQ is the focal chord of parabola y^2=4ax. the tangents at P and Q meet at line y=2x+a. a>0. If chord subtends an angle theta at vertex of the parabola. find tan theta. I got the answer as 2√5/3 but it says -2√5/3, which means the angle is obtuse.…
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Finding hyperbola angle from quadratic equation for the conic section

Conic sections $$Ax^2 + 2Bxy + Cy^2 + 2Dx + 2Ey + F =0$$ can be classified as an ellipse, parabola, or hyperbola by looking at the determinant of a discriminant or as lines in the case the conic section is degenerate(see…
Kvothe
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Determining equation of hyberbola

Let's assume we have the foci of a hyperbola as $(6,1)$ and $(15,3)$ and that the length of the transverse axis is $2b$ units. Now since the foci and transverse axis are specified,the hyberbola is uniquely determined. Again we know the property that…
madness
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Finding dual conic

How do you find the dual conic associated with a conic and also a degenerated conic in matrix form? I have been attempting to find the intersection of two conics and the dual conic is a key step which I am having trouble figuring out.
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Parametrization of an arbitrary conic

Let's say we have a conic of the form $$ax^2 + bxy + cy^2 + dx + ey + f = 0$$ How can I parameterize it? For ellipses there is a great answer. But how can I extend it for parabolas and hyperbolas as well? I understand I will need different…
vidstige
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A variable chord $PQ$ of an ellipse centered in $0$ is such that $\angle POQ=\pi/2$. Show that $\dfrac1{OP^2}+\dfrac1{OQ^2}$ is a constant.

$PQ$ is variable chord of the ellipse $x^2 + 4y^2 = 1$. If $PQ$ subtends a right angle at the center of the ellipse, then $$\dfrac1{OP^2}+\dfrac1{OQ^2}$$ is equal to ? (‘$O$’ being the origin).
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Find standard form parameters for ellipse

I got this ellipse yesterday with center on x-axis going through points (0, p) and (0, -p) and touching unit circle twice (double contact) at x = t $$ x^2+y^2-1+\dfrac{1-p^2}{t^2}(x-t)^2=0 $$ Here is the context when I asked for the solution…
neslrac
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