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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What is the more complete/correct formulation of this dumb question? $ \mathcal{L}_{\bar{v} - \bar{u}}(\bar{u})$ implies $ r + s = 1$

A line is parametrized by: $ \mathcal{L}_{\bar{u}}(\bar{p}) = \{ \bar{p} + r\bar{u} \}.$ In an informal conversation I had to show that $ \mathcal{L}_{\bar{v} - \bar{u}}(\bar{u})$ implies $ r + s = 1$ for all $\bar{v} , \bar{u}.$ It is simple, as $ …
Trux
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What's the intersection point of two lines given in canonical form?

I hope someone can help me with this: What's the intersection point of two lines given in canonical form? $ D1 : \frac{x}{2} = \frac{y}{-3} = \frac{z}{1} $ $ D2 : \frac{x+1}{3} = \frac{y+5}{2} = \frac{z}{1} $
Edward B
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Determine the envelope to the family of curves

Please help me by verifying my answer. I'm trying to teach myself here and I don't know if I got this whole envelope to family of curves thing right. Determine the envelope to the family of curves: $ (1-C^2)x + 2Cy -a =0 $ ,where C is a real…
EButa
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Determine the equation for a plane P that goes through a line D1 and is parallel to another line D2

Looking forward to seeing if any of you can help me with this. Determine the equation for a plane P that goes through a line $ D_1 = \frac{x+1}{2} = \frac{y-1}{-1} = \frac{z-2}{3}$ and is parallel to another line $ D_2 = \frac{x}{-1} =…
Edward B
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Determine the surface area of a parallelogram constructed on 2 vectors

Please, help me with this. Determine the surface area of a parallelogram constructed on 2 vectors given as adjacent sides: $ v1 = a + 2b $ and $ v2 = a - 3b $ ( 'a' and 'b' being also vectors ) Also: $ |a| = 5 $ , $|b| = 3 $ , $m(a,b) = pi/6$ Now,…
Edward B
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Analytic equation of plane

If we want to specify the equation of a plane that goes through 3 different points we have the following determinant: $$\begin{vmatrix}x-a1&y-a2&z-a3\\b1-a1&b2-a2&b3-a3\\c1-a1&c2-a2&c3-a3 \end{vmatrix}=0$$ which comes from the mixed product of the…
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Clothoid parallel to clothoid

I wanted to ask the question "Can clothoids be made parallel with other clothoids" I have come across statements that this is not possible, but no proof. A previous poster "Jean Marie" states that: "You may know that in general, parallel curves of…
twa14
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Find the Point Through which the Variable Line Passes

I'll state the question from my textbook, with the hint given, below. A variable line passes through a fixed point $P$. The algebraic sum of the perpendiculars drawn from the points $(2, 0)$, $(0, 2)$ and $(1, 1)$ on the line is zero. Find the…
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Show that two straight lines through the origin, which makes an angle of

Show that two straight lines through the origin, which makes an angle of $\frac{\pi}{4} $ with the line $px+qy+r=0$ are given by $(p^2-q^2)(x^2-y^2)+4pqxy=0$ My Attempt: Let $y-m_1x=0$ and $y-m_2x=0$ be two straight lines passing through origin. The…
pi-π
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I need to get an equation of a plane

Find equation of a plane which passes through the point M(2,-1,-1) and is normal with the planes 3x+2y-z+4=0 and x+y+z-3=0....? How can i get equation of required plane?
HaAr
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Find the equations of two lines represented by the equation

Find the equations of the two lines represented by the equation $$2x^2+3xy+y^2+5x+2y-3=0$$. My Attempt: $$2x^2+3xy+y^2+5x+2y-3=0$$ $$2x^2+2xy+xy+y^2+5x+2y-3=0$$ $$2x(x+y)+y(x+y)+5x+2y-3=0$$ $$(x+y)(2x+y)+5x+2y-3=0$$ how do I complete it without…
pi-π
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Circumscription of elliptic torus in a spheroid

I am trying to get a half an elliptic torus lie along half a spheroid so that they meet at a curve along the whole surface. I need a general way to find such intersecting surfaces. By elliptic torus, I mean that a circle goes travels through the…
user477818
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The origin is a corner of a square and two of its sides are $y+2x=0$ and $y+2x=3$.

The origin is a corner of a square and two of its sides are $y+2x=0$ and $y+2x=3$. Find the equation of other sides. My Attempt: Let $OA$ and $CB$ be the sides of the square $OABC$ with equations $y+2x=0$ and $y+2x=3$. The equation of line $OC$…
pi-π
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How to determine a rhombus knowing its center and the two slopes of its sides in analytic geometry

I am new to coordinate geometry. I am not able to solve this question, as I have no idea, from where to start. Question: Two sides of a rhombus $ ABCD $ are parallel to the lines $ y = x+2 $ and $ y=7x+3 $ . if the diagonals of the rhombus intersect…
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Rotation of sphere about one of its diameters.

Find the equation of the diameter of the sphere $x^2+y^2+z^2=29$ such that a rotation about it will transfer the point $(4, -3, 2)$ to the point $(5, 0, -2)$ along a great circle of the sphere. Find also the angle through which the sphere must be so…
yathish
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