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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Finding the equation of the normal to the parabola $y^2=4x$ that passes through $(9,6)$

Let $L$ be a normal to the parabola $y^2 = 4x$. If $L$ passes through the point $(9, 6)$, then $L$ is given by (A) $\;y − x + 3 = 0$ (B) $\;y + 3x − 33 = 0$ (C) $\;y + x − 15 = 0$ (D) $\;y − 2x + 12 = 0$ My attempt: Let $(h,k)$ be the point on…
aarbee
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Given an ellipse and two points inside it (other than its foci) construct another ellipse tangent to the given one, using the 2 points as foci.

I´m interested in solving this problem, preferably by a synthetic method (including conics): Given an ellipse and two points inside it (other than its foci) construct another ellipse tangent to the given one, using the two points as foci. I…
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If the normal to the point P on the ellipse intersects the major and minor axis and $G$ and $g$, then find the relation ...

If the normal to the point P on the ellipse intersects the major and minor axis and $G$ and $g$, then find the relation between $CG$, $Cg$, $a$ and $b$, where C is centre The normal at $P(x_1,y_1)$ is $$\frac{a^2x}{x_1}-\frac{b^2y}{y_1}=a^2-b^2$$…
Aditya
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Focal chords of a hyperbola.

While going through a reference book, I happened to stumble on this question. If PSQ and PS'R are the focal chords of a hyperbola having foci S and S' such that $|\frac{\text{PS}}{\text{SQ}}-\frac{\text{PS'}}{\text{S'R}}| = 4$, then show that the…
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Find the equation of the director circle of the hyperbola $4x^2-3y^2=12$

A very easy question. The director circle is of the form $x^2+y^2=a^2-b^2$ So $$x^2+y^2=3-4=-1$$ Does this mean the circle doesn’t exist? I don’t understand the implications of this result. I checked the graph for the hyperbola, but found no reason…
Aditya
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locus of point $P,$ If sum of slopes of normal is constant

If the sum of the slopes of the normals from a point $P$ on hyperbola $xy=c^2$ is constant $k(k>0),$ Then the locus of point $P$ is what i try Let coordinates of point be $\displaystyle P\bigg(ct,\frac{c}{t}\bigg)$ $$xy'+y=0\Rightarrow…
jacky
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What is the angle between the asymptotes of the hyperbola $5x^2-2\sqrt 7 xy-y^2-2x+1=0$?

What is the angle between the asymptotes of this hyperbola? $$5x^2-2\sqrt 7 xy-y^2-2x+1=0$$ I used $S+\lambda=0$ and used straight line condition to find combined equation to asymptotes. Then how to find angle between them?
Equation_Charmer
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How we can differentiate between the shapes of a parabola and a hyperbola?

How we can differentiate between the shapes of the conics hyperbolas and parabolas?
DSP_CS
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Parametric form of the equation of normal to a parabola

The equation of normal to a parabola is $y+ tx = 2at + at^3$ . This is a cubic equation in terms of $t$. That means we'll arrive at $3$ roots for $t$. But doesn't that mean that the normal will have $3$ intersection points with the parabola? How can…
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Finding the eccentricity/focus/directrix of ellipses and hyperbolas under some rotation

Suppose I have an ellipse/hyperbola rotated about the origin by some angle $\theta$. Am I right in saying that the following general process will find the eccentricity $e$ of these conics? Find $a$, the length of the semi-major axis. For ellipse,…
Alex
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The general equation of a conic section in the plane of the conic

In my Calculus book it says: We have shown that planes are represented by first-degree equations and cones by second-degree equations. Therefore, all conics can be represented analytically (in terms of Cartessian coordinates $x$ and $y$ in the…
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Rotated Ellipse

It is well known that the equation $$\frac {(x\cos\alpha+y\sin\alpha)^2}{a^2}+\frac {(x\sin\alpha-y\cos\alpha)^2}{b^2}=1\tag{1}$$ (where $\beta\neq\alpha$) represents an ellipse centred at the origin with semimajor/minor axes $a,b$, and rotated by…
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Equation of chord of a parabola whose midpoint is given

How to prove $$ T = S1 $$ $$ i.e \qquad yy_1 - 2a(x+x_1) = y_1^2 - 4ax_1=0$$ as the equation of chord for a parabola y$^2$ = 4ax whose midpoint (x$_1,y_1$) is given. $$$$ I couldn't understand how the equation of chord, can be the same as the…
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Translating points in hyperbolic geometry

The hyperboloid given by: $$ x^2 + y^2 - z^2 = -1 $$ can be parameterized as: $$ \begin{align} x &= \sinh(r)\ \cos(\theta)\\ y &= \sinh(r)\ \sin(\theta)\\ z &= \cosh(r)\\ \end{align} $$ Conversely, given $(x, y, z)$ we can find $(r,…
thndrwrks
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Prove that the conic $x^2 - 4xy + y^2 -2x -20y -11 = 0$ is a hyperbola and find the centre $(h,k)$

I have to prove that the conic $$x^2 - 4xy + y^2 -2x -20y -11 = 0$$ is a hyperbola and find the centre $(h,k)$. I proved it is a hyperbola using discriminant $b^2-4ac $ and the answer was greater than zero hence a hyperbola. But I cannot seem to…
Helena
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