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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Why are two intersections of parabolas making the to values of phi?

When you graph y=x^2-1 and x=y^2-1 you get 4 intersections, being: (-1;0), (0;-1), (-0.618...;-0.618...) and (1.618...; 1.618...) the last two intersections are equal to phi, can you explain why this happens? I have tried to solve these two…
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Planes cutting the conical surfaces

So , i have been learning about conics . My textbook gives three theorms 1) Cutting a double cone by a plane in any way , you would get curve , such that distance between any point of the curve from a fixed point is propotional to distance…
aryan bansal
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Cutting plane parallel to two generators

On the following website definitions are given for the three non-degenerate conic sections. They are defined differently based on the ways the cutting plane is parallel to the generators. While I understand the cases of ellipse and parabola, how can…
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Find the equation of the parabola for which the line $m^2(y-10)-mx-1=0$ is a tangent for all real values of $m$

I have the solution with me, but it looks wrong. Please help me out The given line is $$x=m(y-10)-\frac 1m$$ Comparing it with $$x-h=m(y-k)+\frac am$$ So $$h=0, ~ k=, ~ a=-1$$ Hence the equation is $$x^2=-4(y-10)$$ But the equation of tangent…
Aditya
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If $lx+my=1$ is the equation of the chord $PQ$ of $y^2=4ax$ whose focus is $S$. If PS andQS meet the parabola again at R and T, find the slope of RT

Let $P(t_1)$ and $Q(t_2)$ The slope of PQ is $$\frac{2}{t_1+t_2}=-\frac lm$$ Also $R(\frac{-1}{t_1})$ and $T(\frac{-1}{t_2})$ Slope of $RT$ $$\frac{-2}{\frac{1}{t_1}+\frac{1}{t_2}}$$ But I can’t eliminate the $t_1t_2$ term by simply substituting…
Aditya
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A normal to the hyperbola $\frac{x^2}{4}-\frac{y^2}{1}=1$ had equal intercepts on positive x and y axis...

A normal to the hyperbola $\frac{x^2}{4}-\frac{y^2}{1}=1$ had equal intercepts on positive x and y axis. If the normal touches the ellipse $\frac{x^2}{a^2}+\frac{y^2}{b^2}=1$, then find $a^2+b^2$ Using equation for normal of hyperbola $$m=-1$$ So…
Aditya
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If the equation of rectangular hyperbola is $2x^2+3xy-2y^2-6x+13y-36=0$ and the equation of its asymptote is $x+2y-5=0$, find the other asymptote

The second asymptote will be of the form $$2x-y+\lambda=0$$ because it is a rectangular hyperbola. I know it will pass through the centre of the hyperbola. But how do I find it? One guess was that we could use partial derivatives, but that method…
Aditya
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Degenerate conic parallel lines

I am trying to geometrically understand how a degenerate conic of a parabola can form a two parallel lines since I read here that such a conic is a line or two parallel lines. Can anyone explain how an intersection of a plane and a double cone can…
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Common slope to the hyperbola and its conjugate

The slope of the common tangent to the hyperbola $\frac{x^2}{9}-\frac{y^2}{16}=1$ & $\frac{y^2}{9}-\frac{x^2}{16}=1$ is (A) -2 (B) -1 (C) 2 (D) None of these My approach is as follow y=mx+c, For the hyperbola $\frac{x^2}{9}-\frac{y^2}{16}=1$ we get…
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Ellipse equation in xy plane

Find the distance between the focii of the ellipse $(3x – 9)^2 + 9y^2 = (x\sqrt{2}+y+1)^2 $. My approach is as follow. I have expanded the bracket $ 9x^2-54x+81+9y^2 =2x^2+y^2+1+2\sqrt{2}xy+2y+ 2\sqrt{2}x$ $…
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Concyclic Points on Hyperbola

If $\alpha$, $\beta$, $\gamma$, and $\delta$ are the eccentric angles of four concyclic points on a hyperbola, then prove that their sum is an even multiple of $\pi$. I tried doing this by writing a general second degree equation that will certainly…
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Find the equation of common tangent of the circle $x^2+y^2-8x=0$ and hyperbola $\frac{x^2}{9}-\frac{y^2}{4}=1$

Equation the condition of tangency of both the conics $$4m\pm \sqrt {9m^2-4}=4\sqrt {1+m^2}$$my problem is easy. Are there any tips to reduce such heavy calculations?
Aditya
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If the line $x-1=0$ is the directrix of the parabola $y^2-kx+8=0$, then find the value of k

The parabola is $$y^2=4\frac k4 (x-\frac 8k)$$ The directrix for this parabola is $$x-\frac 8k+\frac k4=0$$ Then $$\frac k4 -\frac 8k=1$$ $$k^2-4k-32=0$$ $$k=8,-4$$ But the answer given is 4. I checked my computation, but there doesn’t seem to be…
Aditya
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If the chord $y=mx+1$ of the circle $x^2+y^2=1$ subtends an angle $\frac{\pi}{4}$ at the major segment of the circle, then find $m$

By simple observations, it would be easy to deduce that $m=-1$ This can also be proved by the following figure Where the line $y=-x+1$ subtends $\frac{\pi}{2}$ at the centre. But the answer says $m=-1\pm \sqrt 2$ I found that the given value of m…
Aditya
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length of $SP$ in parabola $y^2=4x$ where $S$ is a focus and $P$ is an external point

If the length of tangents drawn from point $P$ to the parabola $y^2=4x$ with focus $S$ such that the length of tangents are $\sqrt{5}$ and $\sqrt{10}$ unit respectively.Then length of $SP$ equals What i try Let $Q(t^2_{1},2t_{1})$ and…
jacky
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