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

50021 questions
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What is the average distance of point in hypercube to its center?

How do I compute the average distance of point inside an hypercube to the center of the hypercube as a function of the dimensionality of the space? Here I consider the hypercube defined as $C_n=\{x\in\mathbb{R}^n: -\frac{1}{2}\leq…
gota
  • 911
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Center of a polygon inside the polygon

What is the name of the point(s) in a polygon, calculated by "shrinking" the polygon until there's no surface left? Example (the light areas): Also, of possible, it would be cool to have an algorithm to calculate this in a reasonable time, given…
Attila O.
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Smallest 3d grid cell shape that is "faithful" under isometries of the grid

This is a question I came up with while playing tetris, not any homework assignment. I tried thinking about it myself but it seems very complicated, and so I thought it would be a good idea to post the question here. I do not have the precise…
wilkersmon
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In an isosceles triangle $ABC$ show that $PM+PN$ does not depend on the position of the chosen point P.

Let $ABC$ be a triangle such that $AB = AC$. Let $P$ be a point in $BC$. Let $M, N$ be the feet of the perpendiculars from $P$ to $AB$ and $AC$ respectively. Show that the value of the sum $PM+PN$ does not depend on the position of the chosen point…
Trobeli
  • 3,242
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Two equal angles

Let $\triangle ABC$ be a triangle with circumcircle (O) P is on BC, PA is tangent to (O). $E \in PO$, $D \in BE$,$AD \bot AB$. Prove that $\angle EAB=\angle ACD$. Please provide an elementary proof for this. and $$\angle CBF =\angle DCA…
qsa
  • 123
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Surface area of a sphere sliced by two orthogonal planes

I'm a programmer doing a graphics effect, and I've arrived at a math problem that my old dumb brain can't quite figure out the best way to solve. Here's the problem: take a sphere and slice off a bit of it with a plane. You get a sphere cap and…
Oskar
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Finding the ratio

How to find the ratio between the area of the big regular pentagon $ABCDE$ and the small regular pentagon $PQRST$
Frank
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One dimension equivalent to area

Some say that length is the $\mathbb R^1$ equivalent of $\mathbb R^2$ area or $\mathbb R^3$ volume but you can substract areas or have intersections of areas. I need to do the same in one dimension but I don't which term to use. Is length really the…
Winter
  • 926
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Car racing: How to calculate the radius of the racing line through a turn of varying length

I am in the process of designing a board game involving car chases, and I am stumped by the following problem: A car will have a maximum speed through a constant radius speed turn, giving a maximum safe cornering speed for a given turn radius. But,…
LeZerp
  • 63
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Concyclic points in $\mathbb{Z}^2$

So I just came up with this question that I thought would be interesting to share: Consider $\mathbb{Z}^2$ as a subset of $\mathbb{R}^2$ and for a circumference $C$ in $\mathbb{R}^2$, let $f(C)=|C\cap\mathbb{Z}^2|$, i.e. the number of points of the…
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Let $a, b$ and $c$ be the lengths of the sides of an arbitrary triangle. Pick out the true statements.

Let $a, b$ and $c$ be the lengths of the sides of an arbitrary triangle. Define $$x =\frac{ab + bc + ca}{a^2 + b^2 + c^2}.$$ Pick out the true statements. (a) $1/2 ≤ x ≤ 2$. (b) $1/2 ≤ x ≤ 1$. (c) $1/2 < x ≤ 1$. How can I able to solve this…
abul
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Prove that 2 of 3 triangles sharing one side overlap

Let $C, D, E$ be three non-degenerate triangles in $\mathbb R^2$. Let $c, a, b$ be the vertices of $C$, let $d, a, b$ be the vertices of $D$, and let $e, a, b$ be the vertices of $E$. I want to show that there is one point contained in the interior…
echoone
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A surface such that any two triangles on it are not congruent.

Does a surface such that any two different triangles on it are not congruent exist? Added:Suppose that surfaces are defined by some continuous function:$R^2\rightarrow R$ and a triangle is a set of three non collinear points connected by three…
user53216
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2 answers

There is no such regular polyhedron whose volume is equal to the difference between the volumes of its circumsphere and its insphere

Based on my previous two questions (here and here) I found it safe to conjecture that: There is no such regular polyhedra whose volume is equal to the difference between the volumes of its circumsphere and its insphere. Now this should be…
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Sum of distances of points

Given 3 points on a plane, all 3 at the same semi-plane defined by a line (e), find a point P on the line (e) for which the sum of lengths of the 3 segments that are defined (by each of the 3 points and the point on the line), is minimal. I think…
Tom Galle
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