Questions tagged [analytic-geometry]

Questions on the use of algebraic techniques for proving geometric facts. Analytic Geometry is a branch of algebra that is used to model geometric objects - points, (straight) lines, and circles being the most basic of these. It is concerned with defining and representing geometrical shapes in a numerical way.

Analytic geometry, also called coordinate geometry, mathematical subject in which algebraic symbolism and methods are used to represent and solve problems in geometry.

The importance of analytic geometry is that it establishes a correspondence between geometric curves and algebraic equations. This correspondence makes it possible to reformulate problems in geometry as equivalent problems in algebra, and vice versa; the methods of either subject can then be used to solve problems in the other.

Analytic geometry was introduced by René Descartes in $1637$ and was of fundamental importance in the development of the calculus by Sir Isaac Newton and G. W. Leibniz in the late $17^{th}$ cent. More recently it has served as the basis for the modern development and exploitation of algebraic geometry.

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Urgent - Find the equation of the lines tangent to a circle

Question: 'Find the equation of the lines from point $P(0,6)$ tangent to the circle $x^2+y^2=4x+4$. So what I did firstly is rewrite it to the form $(x-2)^2 + y^2 = 8$, and I saw that point $P$ is not on the circle. I learned that the equation of…
JohnPhteven
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Find an equation of plane that contains lines and is perpendicular to the plane

Find an equation of plane that contains line $x=-2+3t$, $y=4+2t$, $z=3-t$ and is perpendicular to the plane $x-2y+z=5$. Give final answer in the form of $ax+by+cz=d$.
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Generating lines of hyperboloid

A variable generator meets two generators of the system through the extremities $B$ and $B'$ of the principal elliptic section of the hyperboloid $$\frac{x^2}{a^2} + \frac{y^2}{b^2} -z^2c^2=1$$ in $P$ and $P'$. Prove $BP.B'P'=a^2+c^2$. I found the…
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If the points $(0,0),(a,11),(b,37)$ are vertices of equilateral triangle what is the value of ab?

If the points $(0,0),(a,11),(b,37)$ are vertices of equilateral triangle, find the value of $ab$
user373141
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Why does the substitution of the mirror coordinates in the line works

Problem Statement:- A ray of light is sent along the line $\ell_1\equiv x-2y+5=0$. Upon reaching the line $\ell_2\equiv3x+2y+7=0$ the ray is reflected from it. Find the equation of the line containing the reflected ray. I had initially thought of…
user350331
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Locus of motion when looking at a fixed point. Alternate Conics definition

A person P moves such that projection of his distance $ D$ to a fixed point C onto a fixed line L through C is proportional to distance left after removing constant length $L$ from C. Find his path. EDIT1 It may be of interest to note that 1/R is…
Narasimham
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The intersection of a line with a circle

Get the intersections of the line $y=x+2$ with the circle $x^2+y^2=10$ What I did: $y^2=10-x^2$ $y=\sqrt{10-x^2}$ or $y=-\sqrt{10-x^2}$ $ x+ 2 = y=\sqrt{10-x^2}$ If you continue, $x=-3$ or $x=1$ , so you get 2 points $(1,3)$, $(-3,-1)$ But then,…
JohnPhteven
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Analytic Geometry: Circle

Given is a line with parametric equation: $ x = 2 \lambda $ $ y = 1-\lambda $ Find out for which values of $\lambda$ the line is inside the circle of $x^2+4x+y^2-6x+5=0$ My attempt at solving this: $x^2+4x+y^2-6x+5=0$ $x^2-2x+y^2+5=0$ $ (x-1)^2 -1…
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As a result the equations of the lines to the canonical form?

As a result of these equations to the canonical form. According to the schedule, the first - it is an ellipse. But reduced to canonical form? $$(x^2+4y^2-4)\sqrt y = 0 $$ $$3y+2\sqrt{9-x^2} = 0 $$ I ask for your help!
Frip
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Trisectors in Apollonius Circle

Find parametric equations of trisectors of angle $ APB ( AP/PB= d_1/d_2= \lambda);\, AB, \lambda $ are constants of the Apollonius circle, and their envelopes. Trisectors in Apollonius Circle
Narasimham
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Tangents are drwan to the circle $x^2+y^2=a^2$

Tangents are drawn to the circle $x^2+y^2=a^2$ from a poiny which always lies on the line $lx+my=1$. Prove that the locus of the mid point of the chords of contact is $x^2+y^2-a^2(lx+my)=0$. My Attempt: Given circle is $x^2+y^2=a^2$ Let it be…
pi-π
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If $G$ be the centroid of...

If $G$ be the centroid of $\triangle ABC$, prove that $AB^{2} + BC^{2} + CA^{2} = 3(GA^{2}+GB^{2}+GC^{2}).$ Please help me. I couldn't get even to the first step. However, i guess centroid is the point of intersection of medians of triangle and…
pi-π
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Drawing of a surface

Does anyone know what is the drawing of the surface with equal: $xy=a$ and $zw=b$ where $(x,y,z,w) \in \mathbb R^4$ and $a,b \in \mathbb R$? I thought that it is something like an excessive cylinder but i am not sure.
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How do we write the derivation of distance formula of two points from two different quadrants in a cartesian plane?

I learnt the derivation of the distance formula of two points in first quadrant I.e., $d = \sqrt{(x_2 - x_1)^2 + (y_2 - y_1)^2}$ where it is easy to find the legs of the hypotenuse (distance between two points) since the first has no negative…
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Area of quadrilateral $OBMN$ which s inscribe in a $\triangle$

$\triangle OAB$ has virtices $A(0,12)\;\;,B(5,0)\;\;,O(0,0)$. There exists a line $l$ cutting $AB$ and $OA$ at $M$ and $N$ respectively such that thses circle can be inscribed in $\triangle AMN$ and quadrilateral $OBMN$ also these two circle are…
juantheron
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