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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Show that at some time the hour hand of the first clock points to the tip of the hour hand of the second clock

Consider two round clocks of different sizes lying on a table: As shown on the picture, the clocks can be oriented differently but they are both set to the same time. The problem is to show that at some time of the day, the hour hand of the first…
Wrap
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A question about angles in the Euclidean plane

It has long been known that an arbitrary angle (in the Euclidean plane) cannot be trisected using only ruler and compass, but that this can be done using a mechanical linkage. Given any positive integer $n$ greater than 1, does there always exist a…
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how many spheres can all touch a single one?

In Euclidian space, one sphere can be touched by how many equal-sized spheres simultaneously? Intuitively, the answer is 12. Is there a (geometrical) proof of this?
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Isosceles triangle has the least perimeter among triangles on the same base with same area?

Prove that of all triangles on the same base with same area, the isosceles triangle has the least perimeter (without trigonometry). I could prove this with trigonometry but couldn't do the same with elementary geometry. I can see that if AB is the…
Soham
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Minimum radius of N congruent circles on a sphere, placed optimally, such that the sphere is covered by the circles?

What is the minimum (radius/radii/range of such) of N congruent circles that are placed (optimally) on a sphere in such a way that they cover the entire surface of the sphere? For 2 circles, a easier visualization would be having two points, growing…
Malady
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A question about a curve on the surface of a sphere

Let the three points A,B,C be the vertices of a moving spherical triangle on the surface of a sphere. The triangle moves so that while the vertices A,B remain fixed, the angle BCA at the vertex C stays constant. What is the locus of the moving…
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Is there such thing as a rotation about a plane in higher dimensions?

As far as I know right now, a rotation of something in 3D-Euclidean space is always defined by an axis and an angle. However, in higher dimensions, is there any such thing as a rotation that can be defined by a plane and an angle, or is the…
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Why use CPCTC instead of just "Definition of Congruent Figures"?

Why use CPCTC (Corresponding Parts of Congruent Triangles are Congruent) instead of just "Definition of Congruent Figures" especially since definitions are biconditional? I'm working on high-school level Geometry and specifically "reasons" in…
tuna
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Intersection of two moving objects

There are two objects. The first object moves with speed $U_1$ from known point $A$ to known point $B$. The second object has speed $U_2$ and starts from known point $C$. What is the direction the second object must have in order to "collide" with…
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How to find x that defined in the picture?

$O$ is center of the circle that surrounds the ABC triangle. $|EF| // |BC|$ we only know $a,b,c$ $(a=|BC|, b=|AC|,c=|AB|)$ $x=|EG|=?$ Could you please give me hand to see an easy way to find the x that depends on given a,b,c?
Mathlover
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Euler line of triangle $ABC$ is parallel to side $BC$ $\implies$ $\tan B \tan C = 3$

I'm having some trouble on this exercise from Geometry Revisited: On triangle $ABC$, the Euler line is parallel to $BC$. Prove that $\tan B \tan C = 3$. Here is the solution given: (in this context, $D$ is the base of the altitude from $A$, $O$…
Lucky
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Inscribed angle is always the same and twice the central angle -- is this absolute?

We all know that in Euclidean geometry a) the inscribed angle is always the same b) it's half of the central angle. Can we prove either of these without presuming the parallel postulate?
chx
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Velociraptor escape

This is a mock test problem from xkcd. I think that he should run at the angle bisecting two of the dinosaurs, but then again, one is wounded.
Jimmy360
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Prove that: $S_{XYZ}\geq \frac{1}{4}S_{ABC}$

$\triangle ABC$. Let $X\in BC; Y\in CA, Z\in AB$ such that $\angle YXZ= \angle BAC, \angle XZY=\angle ACB, \angle ZYX=\angle CBA$. Prove that: $S_{XYZ}\geq \frac{1}{4}S_{ABC}$ P/s: I have proved that the length of circumscribed circles of…
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Extremely hard geometric problem

Given a triangle ABC. BL is the bisector of angle ABC, H is the orthocenter and P is the mid-point of AC. PH intersects BL at Q. If $\angle ABC= \beta $, find the ratio $PQ:HQ$.If $QR\perp BC$ and $QS \perp AB$, prove that the orthocenter lies on…
Adam
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