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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Find an equation of the sphere that passes through the origin and whose center is (5, 10, -9). Help with Calculus III

I have never seen a problem like this before, so I was wondering if anyone could give me help getting started. I'm studying for a quiz on Wednesday. Find an equation of the sphere that passes through the origin and whose center is (5, 10, -9). ___ =…
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Coordinate of a division point.

Given that the line which connects the points $(-6,2)$ and $(-7,5)$ is externally divided by a point in ratio of $2:3$, find out the coordinate of the division point.
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Given $\Vert \vec{u} \Vert$ and $\Vert \vec{v} \Vert$ and $\angle 120^\circ$ find volume with sides $\vec{u} \times \vec{v}$, $\vec{u}$ and $\vec{v}$

I am given the following problem: Knowing that $\Vert \vec{u} \Vert = 3$ and $\Vert \vec{v} \Vert = 4$ and also $\angle (\vec{u}, \vec{v}) = 120^\circ$ find the volume of the parallelepiped with sides $\vec{u} \times \vec{v}$, $\vec{u}$ and…
bru1987
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Find the centre of a circle circumscribing the triangle whose angular points are $(1,1), (2,3), (-2,2)$

The main question is as follows : Find the point $P$, such that $P$ is the centre of a circle circumscribing the triangle whose angular points are $(1,1), (2,3), (-2,2)$. My method : I am completely new to Coordinate geometry of higher level. I…
user351709
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Given the tethraedron $OABC$ find ratio between its Volume and $\vert \vec{OM} \cdot \vec{ON} \times \vec{OP} \vert$

Given the tethraedron $OABC$ where $\vec{OA} = \vec{a}$, $\vec{OB} = \vec{b}$ and $\vec{OC} = \vec{c}$ and the points $M$, $N$ and $P$, which are the midpoints of segments $\vec{AC}$, $\vec{AB}$ and $\vec{BC}$ respectively, find the ratio between…
bru1987
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Given that $ \{ \vec{u}, \vec{v} \}$ are l.i. prove that if $ \vec{w} \times \vec{u} = \vec{w} \times \vec{v} = \vec{0}$ then $\vec{w} = \vec{0}$

I am asked to elaborate on the following proof: Given that $ \{ \vec{u}, \vec{v} \}$ are linearly independent prove that if $ \vec{w} \times \vec{u} = \vec{w} \times \vec{v} = \vec{0}$ then $\vec{w} = \vec{0}$. How would you interpret it…
bru1987
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Analytical geometry - Finding the coordinates of point M

I've been practicing analytical geometry lately and I've come to a problem. I solved the problem a few times but I can't get the right result. Here is the math problem: Point M whose distance from the line (I don't know if it is called line in…
Gigaxel
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2D AABB count vector for not having collision after movement

I hope it is correct here, I feel like this question is more math related than programming. Table of Contents Introduction What is question about / problem description What way I figured out Other Introduction I have a mathematical problem (more…
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To find the centre of the inner circle that is tangent to the unit circle and the x-axis

We have a unit circle $C:x^2+y^2=1$. Let $l:y=m(x+1)$. We consider a circle $C'$ at a centre on $l$ that is inscribed to an upper semi-circle, i.e., a circle that is tangent to the circle $C$ and the $x$-axis. How can I describe the centre of $C'$…
NothingInSense
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Distance of closest aproach

A particle is kept at rest at origin. Another particle starts from $(5,0)$ with a velocity of $-4i+3j$. Find the closest distance of approach.
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Problem solving on Co-ordinate Geometry.

Two fixed straight line $OX$ and $OY$ are cut by a variable line in the points $A$ and $B$ respectively and $P$ and $Q$ are the feet of the perpendiculars drawn from $A$ and $B$ upon the lines $OBY$ and $OAX$. Show that , if $AB$ passes through a…
mnulb
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Proof that if two lines are parallel then $A_1$ = $A_2$ and $B_1$ = $B_2$?

Let two lines to be parallel in their general form. $L_1$ : $A_1 x$ + $B_1 y$ + $C_1$ $L_2$ : $A_2 x$ + $B_2 y$ + $C_2$ Now i wish to prove $A_1$ = $A_2$ and $B_1$ = $B_2$ But i can only think of the prove in my head, not sure how to write it…
user312097
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Coordinates of incentre without finding side lengths

If I am given the equations of sides of a triangle and I need to find incentre what is the shortest method ? Is it possible without having to find lengths of sides of triangle?
user220382
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If center of rhombus is $(\pi, e)$. FInd the equation of diagonal

Two sides of rhombus are parallel to $3x+4y+17=0$ and $4x+3y+16=0$. Center of rhombus is $(\pi, e)$, find the equation of its diagonal. Is data in this question sufficient to find required diagonal?
H.P. Das
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Find the coordinates of E, G and H, and calculate the area of shape OFEH

Currently I am looking at a graph of a circle. The diameter is y=2x+3 Tangent at point E cuts the x-axis at F (12;0) 1. find the coordinates of E 2. find the coordinates of G and H (H being the centre) You'll find the image useful! enter image…