Questions tagged [geometry]

For questions about geometric shapes, congruences, similarities, transformations, as well as the properties of classes of figures, points, lines, and angles.

Geometry is one of the classical disciplines of math. It is derived from two Latin words, "geo" + "metron" meaning earth & measurement. Thus it is concerned with the properties and relations of points, lines, surfaces, solids, and higher dimensional analogs. Since its earliest days, geometry has served as a practical guide for measuring lengths, areas, and volumes, and geometry is still used for this purpose today. Geometry is important because the world is made up of different shapes and spaces.

Geometry has applications to many fields, including art, architecture, physics, as well as to other branches of mathematics.

Sub-fields of contemporary geometry:

$1.\quad$ Algebraic geometry – is a branch of geometry studying zeroes of multivariate polynomials. It includes the linear and polynomial algebraic equations used for finding these sets of zeros. The applications of algebraic geometry include cryptography, string theory, etc.

$2.\quad$ Discrete geometry – is concerned with the relative positions of simple geometric objects, such as points, lines, triangles, circles etc.

$3.\quad$ Differential geometry – uses techniques of algebra and calculus for problem-solving. The applications of differential geometry include general relativity in physics, etc.

$4.\quad$ Euclidean geometry – The study of plane and solid figures on the basis of axioms and theorems including points, lines, planes, angles, congruence, similarity, solid figures. It has a wide range of applications in computer science, modern mathematics problem solving, crystallography etc.

$5.\quad$ Convex geometry – includes convex shapes in Euclidean space using techniques of real analysis. It has application in optimization and functional analysis in number theory.

$6.\quad$ Topology – is concerned with properties of space under continuous mapping. Its application includes consideration of compactness, completeness, continuity, filters, function spaces, grills, clusters and bunches, hyperspace topologies, initial and final structures, metric spaces, metrization, nets, proximal continuity, proximity spaces, separation axioms, and uniform spaces.

$7.\quad$ Plane geometry – This wing of geometry deals with flat shapes which can be drawn on a piece of paper. These include lines, circles & triangles of two dimensions.

$8.\quad$ Solid geometry – It deals with $3$-dimensional objects like cubes, prisms, cylinders & spheres.

Reference:

https://en.wikipedia.org/wiki/Geometry

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Compute the Centroid of a $3D$ Planar Polygon Without Projecting It To Specific Planes

Given a list of coordinates of a coplanar plane $\left(pt_1, pt_2, pt_3, \cdots \right)$, how to compute the centroid of the coplanar plane? One way to do it is to project the plane onto $XY$ and $YZ$ plane, but I don't really favor this approach as…
Graviton
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Find the minimum sum of distances of a point in x-y plane.

I want to find the minimum sum of distances of a point(x, y) from other points which lies in the x-y plane. There are 8 cells which are 1 unit far from any given cell. Here distance between two points is not meant to calculate manhattan distance…
ravi
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How to test if a point is inside the convex hull of two circles?

Following my previous question, I'm wondering how I can determine if a point is within the convex hull of two circles (a boolean value). There's no problem testing if the point is in either of the two circles, but it can also be "between" them and I…
Trillian
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Are circles and lines in two-space one-dimensional?

Circles and lines are normally regarded as one-dimensional objects. However, when embedded in two-space, they require two coordinates $(x,y)$ to specify a point within them. Are they still considered one-dimensional, and why? This is somewhat…
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Angle between chord and tangent

I am not getting this theorem: Angle between chord AB and tangent at A is the same as subtended by segment AB at any point on the circumference. How to prove this theorem?
Quixotic
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The area of the region bounded by three mutually-tangent circles

Here 3 circles are touching each other. Now how can one find the area of the blue shaded region in the given picture?
mehedi
  • 79
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Prove it is the incenter.

Let $\triangle ABC$ be an acute-angled triangle. Let $H$ be the foot of the perpendicular from A to BC. Let $K$ be the foot of the the perpendicular of $H$ to $AB$, let $L$ be the foot of the perpendicular from $H$ to $AC$. Let $AH$ intersect the…
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Area common to two equal ellipses with same centre but axes rotated by an acute angle

Been some time since I did this kind of geometry and it seems to have me stumped already but looks so innocent. Any help would be most welcomed. The answer is quoted to be : $2ab \arctan\left(\dfrac{2ab}{(a^2 - b^2) \sin\theta}\right)$
Callie12
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Distance between a circle and a line segment

My math is a little rusty here but I'm trying to come up with a formula which I can then turn into a python program I'm writing. Given I have a circle located at $(cx,cy)$ with radius $r$ and I have a line segment between points $p_1= (x_1,y_1)$…
Jeef
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How many lines are needed to create 6 triangles on W?

Basically, the question started with a little argument I had with my friend. My friend said he thinks it's possible to draw only 2 lines on the letter "W" and make 6 triangles, and I played around with it, but I couldn't really do it, so I told him…
user98235
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Can someone explain this paragraph from Griffiths and Harris to me?

(page 17) ...It follows that the projection (of tangent spaces, respectively real, complexified and holomorphic, at $p$ to a complex manifold $M$) $$T_{\mathbb{R},p}(M)\longrightarrow T_{\mathbb{C},p}(M)\longrightarrow T_{p}'(M) $$ is an…
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Prove that $ABC$ is equilateral

Let $D,E,F$ be points on the sides BC,CA,AB respectively of a triangle $ABC$ such that $BD=CE=AF$ and $\angle BDF=\angle CED=\angle AFE$.Prove that $\triangle ABC$ is equilateral. My attempt - Using sine rule in triange $\triangle AFE$ ,$\triangle…
Snehil Sinha
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Prove $OD$ is the angle bisector of the angle BOC

Let $ABC$ be a non-isosceles triangle and $I$ be the intersection of the three internal angle bisectors. Let $D$ be a point of BC such that $ID\perp BC$ and $O$ be a point on AD such that $IO\perp A$D . Prove $OD$ is the angle bisector of the angle…
Phi Linh
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Are all equiangular odd polygons also equilateral?

In standard Euclidean geometry, are all equiangular polygons with an odd number of sides also equilateral? It is easy to prove that all equiangular triangles are also equilateral using basic trogonometric rules. On the other hand, it is easy to…
Peter Olson
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Smallest area of polygon with $n$ sides all of length $1$

Given an odd number $n$, consider all non-self-intersecting polygons with $n$ sides, all of length $1$. What is the infimum of their areas? We can approach $\sqrt 3/4$ by approximating an equilateral triangle of side $1$, like this: Can we do…
TonyK
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