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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One of the diagonals in a hexagon cuts of a triangle of area $\leq 1/6^{th}$ of the hexagon

Problem: Show that, in a convex hexagon, there exists a diagonal which cuts off a triangle of area not more than one-sixth of the hexagon. My attempt: Suppose we have a hexagon $ABCD$. There are two possible cases: either the main diagonals are…
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Right Triangle's Proof

A right triangle has all three sides integer lengths. One side has length 12. What are the possibilities for the lengths of the other two sides? Give a proof to show that you have found all possibilities. EDIT: I figured out that there are a total…
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Intersection between a cylinder and an axis-aligned bounding box

Given a 3D axis-aligned bounding box (represented as its minimum point and maximum point) and a 3D cylinder of infinite length, what's the best way to test for intersection?
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Can "Taxicab geometry" be given a Hilbert-style axiomatization?

Hilbert's axioms provide a synthetic system for Euclidean geometry. Is it possible to do the same thing for the Taxicab plane? It would seem that one would only need to alter the axioms for congruence, since all the other properties are the same as…
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Collections of points containing only isosceles triangles

I've just been thinking about for what values of n we can place n points in the plane so that any three of those points define an isosceles triangle. A triangle, square and pentagon work for 3,4 and 5, and to get 6 just place a point in the centre…
nolion
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A box contained within larger box has a smaller surface area than the larger box?

Suppose we have a box (parallelepiped) A completely contained within another box B. Is the surface area of A nessecarily less than the surface area of the B? Edit: note that the sides of A are not nessecarily parallel to the sides of B. I happen to…
math_lover
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How to change a $9\times 16$ rectangle to $12\times 12$ square?

Given a $9\times 16$ sq. unit rectangle. You have one change, you can cut the $9\times 16$ sq. unit rectangle only once and join the two parts to get a square of dimension $12\times 12$ sq. unit. Note : $9\times 16=12\times12$ I don't have any…
Singh
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Interesting puzzle about a sphere and some circles

Suppose I have a sphere and I choose a point $P$ on it. Then I draw $N\ge 3$ circles on the sphere passing through that point in a manner such that all the intersection points of the final result involve $\ge 3$ circles. Why then must there be a…
Jon M
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How to tell if 3 connected points are connected clockwise or counter-clockwise?

I have three points: p1(x1,y1) p2(x2,y2) and p3(x3,y3). I am connecting p1 to p2 to p3. how can I tell if the triangle was drawn clockwise or counter-clockwise? How can I generalize this for n points? (you pass through a point exactly once, and no…
Michael Seltenreich
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An inequality on Cevians

Let $\displaystyle AD$, $\displaystyle BE$, $\displaystyle CF$ be three cevians concurrent at $\displaystyle P$ inside the $\displaystyle \Delta ABC$. Prove or disprove that: $$\displaystyle \dfrac{AD}{AP} + \dfrac{BE}{BP} + \dfrac{CF}{CP} \ge…
Robert
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Visualising extra dimensions

What is the : most useful prettiest way to visualise extra dimensions in shapes and charts?
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Given a solid sphere of radius R, remove a cylinder whose central axis goes through the center of the sphere.

Given a solid sphere of radius R, remove a cylinder whose central axis goes through the center of the sphere. Let h denote the height of the remaining solid. Calculate the volume of the remaining solid.
smoke
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A problem is almost similar with the famous "Ceva's theorem"

Let $\bigodot O_{1},\bigodot O_{2}$ and $\bigodot O_{3}$ be internal tangents to $\bigodot O$ at $A, B$ and $C$, respectively, and mutually intersecting at $D,E,F$ respectively. (As shown in Figure) Assume that $GH,IJ,KL$ are external common…
math110
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Does there exist a 4D torus with a spherical cross-section, analogous to a circle for the 3D case?

I don't mean to be a bother. It seems as though the answer may be obvious, but then, seemingly simple math questions can have surprising answers. I should also like any pointers re: the general case for the torus. Thanks in advance for any…
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Trisecting an angle

In this Numberphile video it is stated that trisecting an angle is not possible with only a compass and a straight edge. Here's a way I came up with: Let the top line be A and bottom line be B, and the point intersecting P. 1. Use the compass and…