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Euclidean geometry is a mathematical system attributed to the Alexandrian Greek mathematician Euclid, which he described in his textbook on geometry: the Elements. Euclid's method consists in assuming a small set of intuitively appealing axioms, and deducing many other propositions (theorems) from these.

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I came across this problem by trying to construct a "nice" triangle, e.g. for an illustration, from 3 distances $\lbrace\|A-O\|, \|B-O\|, \|C-O\|\rbrace$ and the fuzzy requirement that $O$ ...
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first the trivial facts: Non-degenerate n-dimensional simplices have $n+1$ corners and $\frac{(n+1)n}{2}$ edges. The center of the circum-hypersphere from which all $n+1$ corners are equidistant can ...
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Suppose we have the six points in the cartesian plane $(x_i, y_i)$ for $1 \leq i \leq 6$. Further suppose that we draw three circles through them, so that each circle passes through three of the ...
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Consider the Delaunay Triangulation $\mathcal{DT}(P)$ of a finite set $P$ of points in the euclidean plane. let $CH\subset P$ be all points of $P$ that are on $P$'s convex hull, and not just the ...
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I am looking for a counter example to, resp. a proof of the correctness of, the following conjecture: among all pairs points from a finite set in the euclidean plane, that are at maximal distance, ...
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Jerison and Kenig give the following two conditions (alongside an exterior corkscrew condition, which is not relevant to this discussion) in the definition of an $(M,r_0)$ nontangentially accessible ...
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It has recently been proven that the 2017 conjecture that all convex polyhedra $P$ are Rupert is false: "A convex polyhedron without Rupert's property," Jakob Steininger, Sergey Yurkevich. ...
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This is a variant of the 3D generalization of the well-known Thinking outside the box Nine dots problem I discussed in my previous MO post Optimal covering trails for every $k$-dimensional cubic ...
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Given a closed spatial polygon with fixed edgelengths $r_i, i=1..4$ (that is a cyclicly ordered 4-tuple of vectors $v_i\in \mathbb R^3$ with $|v_i|=r_i$ such that $\sum v_i=0$) one can associate a ...
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The following concerns the 1914 paper The Inscribed and Circumscribed Squares of a Quadrilateral and Their Significance in Kinematic Geometry of Hebbert. Context. Hebbert presents THEOREM I. In every ...
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When I tried to find a special case of Dao's theorem on conics, I found the following result. I am looking for a proof of it. Let $ABC$ and $A'B'C'$ be two homothety triangle with $P$ is the ...
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Note: I already posted the $3$-dimensional version of this question on Mathematics Stack Exchange, but no answer has been received so far, so I hope that MathOverflow can be a more suitable place in ...
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I am looking for a proof of a generalization of Newton–Gauss line as follows: Let ABC be a triangle, let a line $L$ meets $BC, CA, AB$ at three points $A', B', C'$ and let $A'', B'', C''$ be three ...
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I am looking for a proof for the following result: Given a convex quadrilateral $ABCD$, divide each of its sides into $n$ segments of equal length (where n is an integer number). Then, connect the ...
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Euclid's Elements, Book I, Proposition 47 is a statement and proof of the Pythagorean theorem, which involves the areas of squares adjacent to the three sides of a right triangle. In Euclid's Elements ...
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The universal compass and straightedge construction is the following. Start with two points in the plane—which we may as well think of as $0$ and $1$ on the horizontal axis—and iteratively carry out ...
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Euclid's Proposition I.32 says that the sum of the internal angles of any triangle is equal to the sum of two right angles. However, there is a gap in Euclid's proof -- it does not show that the ray $...
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The problem of determining the largest incircle of a convex polygon can be solved by constructing the Voronoi diagram of the polygon's edges and selecting the vertex of the diagram's graph with ...
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The construction of figures to produce special results in plane geometry is an interesting problem, attracting the attention not only of students but also of professional mathematicians. Pizza's ...
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Three points uniformly selected on the unit circle form a triangle containing a point $R$ at distance $r \in [0;1]$ from its center with probability $P(r) = \frac{1}{4} - \frac{3}{2 \pi^2}\textrm{Li}...
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In Elements (V, Def. 4), Euclid gives the following definition: Those magnitudes are said to have a ratio with respect to one another which, being multiplied, are capable of exceeding one another. ...
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The famous Hilbert's Axioms of Geometry include the Axiom I.7: If two planes have a common point, then they have another common point. Question 1. Was David Hilbert the first mathematician who ...
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This question is a follow-up to this question asked by Yaakov Baruch a few days ago. A double covering of the plane with lines is a set $\mathcal C$ of lines such that every point in the plane is ...
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In Peter Winkler's Mathematical Puzzles (2024), it is shown that $\mathbb{R}^2$ can be double covered by a set of lines containing at least 3 different slopes (double covered = each point lies on ...
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Using a computer, I found the following result. Now, I'm looking for a solution to prove this result: Let $A_{01}$, $A_{02}$, $A_{03}$, $A_{04}$, $A_{05}$, $A_{06}$ be six points in the plane, such ...
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The motivation of this question is finding an axiomatization of Euclidean geometry. I consider Tarski's axioms a satisfactory axiomatization of those parts of Euclidean geometry that do not include ...
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I am looking for a proof a problem like Miquel's pentagram theorem as follows: Let $A_1$, $A_2$, $A_3$, $A_4$, $A_5$, $A_6$ lie on a circle such that $A_1A_4$, $A_2A_5$, $A_3A_6$ are concurrent. Let $...
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I am looking for a proof of the problem as follows: Let $A_1, A_2,\cdots, A_6$ lie on a circle with center $O$. Let the circle $(A_1OA_2)$ meets the circles $(A_3OA_4)$ again at $A_{23}$; the circle $(...
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"Quadratrix" (Wikipedia, 2024-11-14) writes: An accurate construction of the quadratrix would also allow the solution of two other classical problems known to be impossible with compass and ...
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We consider the space of $n$-dimensional Euclidean lattices. Define the $i$-th successive minimum of a lattice $\Lambda$ as $ \lambda_i(L) := \min \left\{ r \in \mathbb{R}_{>0} \mid \dim_{\mathbb{R}...
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Let $a(n)$ be the number of equivalence classes of $3$-dimensional central arrangements of $n$ hyperplanes in general position. I believe that $a(n)= 1$ for $n \leq 5$ and $a(6)=3$. Is this correct? ...
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I encountered the following relationship while exploring triangle area computations. Given a triangle with inradius $r$, exradii $r_a, r_b, r_c$, and semiperimeter $s$, the area $\Delta$ satisfies: $$ ...
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A duplicate of this: I am reading Mahler’s Lattice points in $n$-dimensional star bodies II (1946), in which he poses the following (then) open problems about the irreducibility of star bodies: Do ...
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My question concerns a simple observation I made recently while working on the Perspective Three-Point Problem. I am wondering if anybody has a reference for the claim I am about to make concerning ...
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General Problem: Inspect function $L(a)$ for $a\in \mathbb{R}^{n}$, given that: $$L(a)=\lim_{x\to 0_{+}}\frac{x^{a}}{F(x)}$$ Notation legends: $x=(x_1,\ldots,x_n),\ a=(a_1,...,a_n),\ x^a=x_{1}^{a_1}\...
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Does this result above six points follow have a name? Let $A$, $B$, $C$, $D$, $E$, $F$ be six points in the plane and $AB, CF, ED$ are concurrent and $BC, DA, FE$ are concurrent then $CD, EB, AF$ are ...
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Quoting myself from an earlier post: Pólya's orchard problem asks for which radius $r$ of trees at each lattice point within a distance $R$ of the origin block all lines of sight to the exterior of ...
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Question: given $k,\,k>n$ points in convex configuration and general position in $n$ dimensional Euclidean space, i.e. no $n+1$ points of which are co-hyperplanar, what can be said about how the ...
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Suppose $\Gamma$ is an analytic Jordan curve in the complex plane $\mathbb{C}$. What are ways to test whether $\Gamma$ is (contained in) an algebraic curve, i.e., whether there exists a real ...
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I've started looking into well-rounded Euclidean lattices and I was interested in learning whether their theta series have any interesting properties, but haven't found much in terms of bibliography ...
JBuck's user avatar
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In his recent book, Love Triangle, Matt Parker playfully complains that Heron's formula is an "opaque formula, and I feel like you just chuck in the side-lengths, turn a series of arbitrary ...
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The question listed above (in the context of the complex numbers, but it is a reasonable question to ask in any dimension) was asked by a student in my complex analysis class, and I did not have an ...
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What are the latest and best results on the asymptotic upper bound for the minimum angle between any pair of rays among $n$ rays in $\mathbb{R}^3$? Any helpful answer would be appreciated. Thank you!
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When talking about the condition for the three diagonals of a hexagon to be concurrent, we will think of Brianchon's theorem. Using software, I discovered a necessary and sufficient trigonometric ...
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Let a hexagon $AB'CA'BC'$ let $AB' \cap A'B=C''$, $BC' \cap B'C = A''$, $CA' \cap C'A = B''$ then three conditions as follows equivalent: Three lines $AA', BB', CC'$ are concurrent (let the point of ...
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Have You seen these result as follows before? In Figure 1: $AA'=BB'=tAB$; $CC'=DD'=tCD$, where t is real number then $ABCD$ is a cyclic quadrilateral iff $A'B'C'D'$ is a cyclic quadrilateral. In the ...
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"Circumcenter of mass" is a natural generalization of circumcenter to non-cyclic polygons. CCM(P) can be defined as the weighted average of the circumcenters of the triangles in any ...
Don Hatch's user avatar
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A face of a convex polytope $P$ is defined as $P$ itself, or a subset of $P$ of the form $P\cap h$, where $h$ is a hyperplane such that $P$ is fully contained in one of the closed half-spaces ...
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If we know the combinatorics of a polyhedron, and all but one of its dihedral angles, does that uniquely determine the remaining dihedral angle? I’m happy to assume the polyhedron is simply connected, ...
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Similarly Japanese theorem for cyclic quadrilaterals, Napoleon theorem, Thébault's theorem, I found a result as follows and I am looking for a proof that: Let $ABCD$ be a convex cyclic quadrilateral. ...
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