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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convert elllipse conic representation to parametric representation

I have come across a pdf from cornell about ellipse fitting and in there it listed information on how to convert ellipse from conic representation to parametric representation. source:http://www.cs.cornell.edu/courses/cs422/2008sp/A6/Ellipse.pdf I…
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Dandelin sphere construction with hyperbola and ellipse intersection on same cone

When eccentricity of ellipse $\epsilon<1 $ sketch is often made in a standard disposition during proof by Dandelin with spheres inside a single nappe of cone and cutting plane touching spheres in their central section at foci of ellipses so…
Narasimham
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Prove Smaller Distance from Hyperbola to Asymptote

There is a canonical hyperbola $$\frac{x^2}{a^2}-\frac{y^2}{b^2}=1 $$ and the asymptote $$ y= \pm \frac{b}{a}x $$ Let us say that the value of hyperbola at $x$ is given as $$y=\frac{b}{a}\sqrt{x^2 - a^2}$$ and the value of asymptote at the same $x$…
Semar
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Problem on tangent to the parabola.

Let PQ be a focal chord of the parabola $y^2= 4ax$. The tangents to the parabola at P and Q meet at a point lying on the line $y = 2x + a, a > 0.$ If chord PQ subtends an angle $\theta$ at the vertex of $y^2= 4ax$, then tan$\theta= ?$ My attempt…
Abhishek Kumar
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Tangents to an ellipse

I was reading a section on conic sections in a book, and the author writes proofs that show that tangent lines to each of the three non-degenerate types of conic sections intersect at only one point. What's the point of doing this? I'm writing a…
joejacobz
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Parameters of an elliptic equation?

I know that an ellipse equation described by: $\frac {x^2} {a^2} + \frac {y^2} {b^2} =1$ My question is in the equation above how many parameters we need to estimate? Two or four? The unknows parameters are only a, b or are also x, y???
xkrpz
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Finding tangent angle

Finding the tangent angle between the negative $x$-axis and the parabola $$y=-ax^2+bx$$($a,b>0$) at $(x_0,y_0)$ : I am trying to find the tangent angle with negative $x $ axis for a parabolic curve. I assume the equation of tangent line will…
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Find equation of hyperbola, symmetric about the origin, traced by a point whose distance to point $(4,0)$ is twice its distance to line $x=1$.

The question is as follows: Find the equation of a hyperbola which is symmetrical about the origin traced by a point that moves so its distance from the point $(4,0)$ is twice as far as the point is from the line $x=1$. Find the equation of the…
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Diameter of an Ellipse at an Angle

A standard ellipse with semi-major axis $a$, semi-minor $b$ has a "diameter" of $2a$ in one dimension ($\phi=0$) and $2b$ in the other ($\phi=\pi/2$). Is there a function to find the diameter for an arbitrary angle $\phi$? By "diameter", I mean…
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Conic sections: Parabola - What is $p$?

Help my teacher says $p$ can't be negative because it's distance. I watched TOCT's tutorial (The Organic Chemistry Tutor) in YouTube about parabola and he said "$(x-h)^2 = 4p(y-k)$ if $p$ is positive the parabola opens upward, if negative parabola…
tenick
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Locus of the vertex of a variable parabola

A fixed parabola $y^2 = 4 ax$ touches a variable parabola. Find the equation to the locus of the vertex of the variable parabola. Assume that the two parabolas are equal and the axis of the variable parabola remains parallel to the x-axis. My…
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Find the locus of the foot of perpendicular from the centre of the ellipse.

Find the locus of the foot of perpendicular from the centre of the ellipse $${x^2\over a^2} +{y^2\over b^2} = 1$$ on the chord joining the points whose eccentric angles differ by $π/2.$ My approach is: Consider two points $P$ and $Q$ such that…
Tips
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The area of the triangle formed by the coordinate axes and tangent at vertex to the parabola whose focus is $(3,4)$

The area of the triangle formed by the coordinate axes and tangent at vertex to the parabola whose focus is $(3,4)$ and tangents at $x=0$ and $y=0$ is? I know how to do this, assume an equation for parabola with axis as $y=4/3 x$ and do all the…
Iceberry
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Radius of largest circle in an ellipse

Consider an ellipse whose major and minor axis of length $10$ and $8$ unit respectively. Then the radius of the largest circle which can be inscribed in such an ellipse if the circle's center is one focus of the ellipse. What I tried: Assuming that…
jacky
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How do I convert an expression in terms of the general equation of a conic section to one in the equation of an ellipse?

In a major assignment I am to determine the semi-major axis of an elliptic orbit for the star S2 around Sagittarius A*. I found some data that I have used to fit the points to an ellipse - however the equation I get is in terms of $ax^2 + bxy +…