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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given a set of points in cartesian plane find the point which has shortest sum of distance from all points

This I have reduced to Given a set of n points find out a point X,Y such that the $\sum_{i=1,n} (x_{i}-X)^2 + (y_{i}-Y)^2$ is minimum. Now as per the comments I found out that this is wrong. Can someone tell me the right approach please?
Manoj R
  • 561
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Finding the affine transformation that will change a given ellipse into the unit circle $x^2$ + $y^2$ =1.

We are given that ellipse $E$ is given by $x^2+4y^2-2x+16y+1=0$ and we are asked to find $t_2 \in A(2)$ such that $t_2(E)$ is the unit circle.
HowardRoark
  • 1,638
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Sum of dihedral angles in Tetrahedron

I'd like to ask if someone can help me out with this problem. I have to determine what is the lower and upper bound for sum (the largest and smallest sum I can get) of dihedral angles in arbitrary Tetrahedron and prove that. I'm ok with hint for…
JosephK
  • 43
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$A,B,C,D$ on a circle. $\widehat{BAC}=\widehat{BDC}$

Points $A,B,C,D$ belong to a circle. What's a rigorous yet simple proof that $\widehat{BAC}=\widehat{BDC}$ ? Does this property have a name? I get that in the above figure: summing angles,…
fgrieu
  • 1,758
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Cannot prove a geometry area ratio between a triangle and a parallelogram

ABCD is a parallelogram. Prove the following: $\frac{BF}{FA} = \frac{AD}{AE}$ $\frac{S_{ADF}}{S_{AEF}} = \frac{AD}{AE}$ $S_{EBF} = S_{ADF}$ $S_{BCE} = \frac{1}{2}S_{ABCD}$ I solved the first 3, but could not solve the…
daedsidog
  • 997
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Why are glide reflections one of four isometries?

It says here that there are four types of Euclidean plane isometries which I am going to list below: Reflections Translations Rotations Glide Reflections $\textbf{Question:}$ Why are "glide reflections" considered to be different than the rest?…
W. G.
  • 1,766
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Show that $N$ is orthcenter of triangle $AYZ$

Triangle $ABC$ has height $BE,CF$.$M$ is the midpoint of $BC$. $EF$ and AM intersects at point $N$. Draw $NX\perp BC, XY\perp AB, XZ\perp AC(X\in BC, Y\in AB, Z\in AC)$.Show that $N$ is orthcenter of triangle $AYZ$. I can't find any lemma to solve…
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Can the median, angle bisector and the altitude of a triangle intersect to form an equilateral triangle?

On a sheet of paper, a blue triangle is drawn. A median, a bisector and an altitude of this triangle (not necessarily from three distinct vertices) are drawn red. The triangle dissects into several parts. Is it possible that one of these parts is an…
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Box in a box: will it fit? or whether or not I can take my couch to AK

Have "box A" (U-Haul shipping container) with dimensions length 95 inches, width 56 inches, height 83.5 inches and "box B" (couch) with dimensions length 96 inches, width 50 inches, height 34 inches. Will "box B" fit in "box A"? It has been a long…
MJ mj
  • 41
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Showing $(sp-bc)(sq-bc)=bc(s-b)(s-c)$, for $s$ the semiperimeter of a triangle, with $p$ and $q$ determined by a line tangent to the incircle

I've the following construction, as shown in the figure. The line $QP$ is tangent to the incircle of $\triangle ABC$. The triangle has side lengths given by $a,b,c$. I am trying to prove the result that $$(sp-bc)(sq-bc)=bc(s-b)(s-c)$$ where $s$ is…
user312437
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Overlapping spheres

Say you have two spheres that are partially overlapping. How would I find the volume of the portion of one of the spheres that is not overlapping with the other based on how far apart the two spheres are and the spheres' individual radii?
Waffle
  • 679
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How to prove that a given curve is actually a straight line

Given a curve, I have to prove or disprove that it is a straight line. How do I do this? I tried by finding and comparing slopes but I can see that this will not be a very computationally efficient way (as I am implementing this on a PC) ; I will…
gpuguy
  • 631
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What is an upper bound on the minimum angle between approximately equally spaced points on a n-dimensional unit hypersphere?

If we have a unit hypersphere, with "approximately" evenly spaced points$^1$, is there any good upper bound on the minimum angle between nearby points? On a unit circle, for $N$ equally spaced points, the minimum angle would be $2\pi/N$. For a unit…
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If A $\subset S^n$ has spherical diameter < $\pi$, then $S^n - A$ contains a closed semisphere.

Let $S^n$ be the $n$-dimensional unit sphere in $\mathbb R^{n+1}$. Let $X \subset S^n$ such that for any $x, y \in X$ the angle between $x$ and $y$ is smaller than $180°$. Then $S^n - X$ does contain a semisphere, i.e., something isometric to $S^n…
shuhalo
  • 7,485
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Is it possible to divide a isosceles triangle

We have an isosceles triangle and we divide it by two sections going out of one of three corners, hence we get three new triangles. Is it possible to make (puzzle) an isosceles triangle out of every two of three triangles that we got after dividing…