Euclidean in a sentence

(1) Euclidean geometry is based on five postulates.

(2) Euclidian geometry is a non-Euclidean geometry.

(3) The octonion algebra is not a Euclidean domain.

(4) Euclidean space is also known as Cartesian space.

(5) Euclidean geometry is a branch of plane geometry.

(6) Euclidean transformations preserve distances and angles.

(7) The Euclidean norm of a vector is its length or magnitude.

(8) Euclidean distance is often used in clustering algorithms.

(9) Euclidean geometry assumes that space is flat and infinite.

(10) Euclidean geometry is still widely taught in schools today.

Euclidean sentence

(11) The incenter is an important concept in Euclidean geometry.

(12) Euclidean geometry is based on logical reasoning and axioms.

(13) Geometricians explore the intricacies of Euclidean geometry.

(14) Euclidean division is a fundamental concept in number theory.

(15) Euclidean geometry is the foundation of classical mathematics.

(16) The Euclidean norm of a vector is always a non-negative value.

(17) The Pythagorean theorem is a cornerstone of Euclidean geometry.

(18) Euclidean distance is often used in machine learning algorithms.

(19) The acute triangle is an important concept in Euclidean geometry.

(20) Euclidean space can be extended to include additional dimensions.

Euclidean make sentence

(21) The subspace of a manifold is a subset that is locally Euclidean.

(22) Naturals can be used to define the concept of Euclidean algorithm.

(23) Euclidean geometrie is the most commonly studied form of geometry.

(24) Isometry is a key concept in the study of non-Euclidean geometries.

(25) Euclidean geometry is considered the foundation of modern geometry.

(26) The non-euclidean architecture of the museum was a sight to behold.

(27) Euclidean division is the process of dividing one number by another.

(28) Euclidean distance is a measure of dissimilarity between two points.

(29) The non-euclidean patterns on the fabric were mesmerizing to look at.

(30) The isosceles triangle is a fundamental concept in Euclidean geometry.

Sentence of euclidean

(31) Non-Euclidean geometry offers new perspectives on the nature of space.

(32) Euclidean geometry is used in surveying to measure and map land areas.

(33) The Pythagorean theorem is a fundamental concept in Euclidean geometry.

(34) The concept of polytopes extends beyond traditional Euclidean geometry.

(35) The software program can factorize by means of the Euclidean algorithm.

(36) Non-Euclidean geometry challenges traditional notions of parallel lines.

(37) The concept of polytopes can be generalized to non-Euclidean geometries.

(38) The Pythagorean theorem is a fundamental principle in Euclidean geometry.

(39) Euclidean distance can be used to measure similarity between data points.

(40) Euclidean geometry is named after the ancient Greek mathematician Euclid.

Euclidean meaningful sentence

(41) The Frobenius norm of a matrix is its Euclidean distance from the origin.

(42) The axiomatisations of Euclidean geometry are well-known and widely used.

(43) Euclidean space is a mathematical concept used to describe physical space.

(44) The non-euclidean nature of this puzzle makes it particularly challenging.

(45) The classical school of thought in mathematics follows Euclidean geometry.

(46) Euclidean geometry was developed by the ancient Greek mathematician Euclid.

(47) The concept of non-Euclidean space revolutionized the field of mathematics.

(48) The metric space of square matrices is an example of a non-Euclidean space.

(49) The isoperimetric inequality can be generalized to non-Euclidean geometries.

(50) The non-euclidean geometry of the universe is still a mystery to scientists.

Euclidean sentence examples

(51) Euclidean space is a mathematical abstraction used to model physical reality.

(52) The non-euclidean world of dreams often defies the laws of physics and logic.

(53) The non-euclidean rules of the game made it difficult to predict the outcome.

(54) The concept of coprime numbers is closely related to the Euclidean algorithm.

(55) The Euclidean algorithm is named after the ancient Greek mathematician Euclid.

(56) The study of non-Euclidean geometry requires a departure from Euclid's axioms.

(57) Non-Euclidean geometry allows for the existence of lines that never intersect.

(58) The non-euclidean design of the garden created a sense of wonder and intrigue.

(59) The mathematician's theorem revolutionized the field of non-euclidean geometry.

(60) Euclidean geometry allows us to calculate the area and volume of various shapes.

Sentence with euclidean

(61) Nonclassical mathematics explores non-Euclidean geometries and abstract algebra.

(62) Euclidean geometry provides a systematic approach to proving geometric theorems.

(63) Euclidean geometry is the study of shapes and figures in two or three dimensions.

(64) The collinear configuration of the points is a key concept in Euclidean geometry.

(65) Euclidean geometry allows us to prove theorems and establish mathematical truths.

(66) The non-euclidean patterns in this artwork create a sense of movement and energy.

(67) The scientist's research delved into the non-euclidean properties of black holes.

(68) The scientist's research explores the non-euclidean properties of time and space.

(69) A metric space is a generalization of the concept of distance in Euclidean space.

(70) Euclidean geometry is a fundamental tool in geometric proofs and problem-solving.

Use euclidean in a sentence

(71) The elliptic geometry is a non-Euclidean geometry used in many scientific fields.

(72) Non-Euclidean geometry has implications for the study of relativity and cosmology.

(73) Euclidean vectors are mathematical objects that have both magnitude and direction.

(74) The Euclidean distance between two points in a plane is the straight-line distance.

(75) The Euclidean algorithm is used to find the greatest common divisor of two numbers.

(76) Euclidean geometry is used in physics to describe the behavior of objects in space.

(77) The metric space is a generalization of the concept of distance in Euclidean space.

(78) The non-euclidean structure of this molecule makes it highly unstable and reactive.

(79) The non-euclidean patterns in this fabric design give it a dynamic and modern look.

(80) In Euclidean geometry, a straight line is the shortest distance between two points.

Sentence using euclidean

(81) Euclidean geometry allows us to calculate the area and perimeter of various shapes.

(82) The non-euclidean shapes of the clouds in the sky were a beautiful sight to behold.

(83) Non-Euclidean geometries have applications in computer graphics and virtual reality.

(84) Euclidean geometry is based on the concept of parallel lines, which never intersect.

(85) Squaring the circle is a problem that has no solution using only Euclidean geometry.

(86) The concept of non-euclidean geometry challenges traditional mathematical principles.

(87) The non-euclidean shapes of the building made it stand out from the rest of the city.

(88) The non-euclidean structure of the molecule was a breakthrough in chemistry research.

(89) The non-euclidean nature of this puzzle requires thinking outside the box to solve it.

(90) The mathematician's book on non-euclidean geometry became a seminal work in the field.

Euclidean example sentence

(91) Euclidean geometry is applicable to both two-dimensional and three-dimensional spaces.

(92) Euclidean geometry is based on the concept of a point, which has no size or dimension.

(93) Euclidean geometry is the most common type of geometry taught in schools and colleges.

(94) The Euclidean algorithm is an efficient method for finding the greatest common divisor.

(95) Euclidean geometry can be applied to both two-dimensional and three-dimensional spaces.

(96) The non-euclidean structure of this crystal lattice gives it unique optical properties.

(97) Non-Euclidean geometry is often used in physics to describe the curvature of spacetime.

(98) Euclidean geometry is taught in schools as part of the standard mathematics curriculum.

(99) Euclidean geometry provides a framework for understanding symmetry and transformations.

(100) The elliptic geometry is a non-Euclidean geometry that has many interesting properties.

Sentence with word euclidean

(101) Euclidean distance is a measure of the distance between two points in a plane or space.

(102) Non-Euclidean geometries have been used to study the behavior of waves in complex media.

(103) The mathematician's groundbreaking research introduced the world to non-euclidean spaces.

(104) Euclidean geometry is often used to solve problems involving angles, lines, and polygons.

(105) Euclidean rhythms are a type of musical rhythm that are based on the Euclidean algorithm.

(106) Euclidean geometry is a branch of mathematics that deals with shapes and their properties.

(107) Euclidean geometry is used in navigation and map-making to calculate distances and angles.

(108) The mathematician's proof of non-euclidean theorems earned them international recognition.

(109) Hilbert's axioms are a set of statements that define the properties of Euclidean geometry.

(110) Euclidean geometry is a non-Euclidean geometry that assumes a flat, two-dimensional space.

Sentence of euclidean

(111) Non-Euclidean geometries have been used to model the behavior of light in curved spacetime.

(112) Non-Euclidean geometries have been used to study the topology of higher-dimensional spaces.

(113) A finitedimensional manifold is a topological space that locally resembles Euclidean space.

(114) The non-euclidean nature of this equation requires advanced mathematical knowledge to solve.

(115) The non-euclidean architecture of this building pushes the boundaries of traditional design.

(116) The Euclidean algorithm is a method used to find the greatest common divisor of two numbers.

(117) Euclidean geometry is used in computer graphics to create realistic 3D models and animations.

(118) The professor's lecture on non-euclidean geometry left the students fascinated and intrigued.

(119) The non-euclidean nature of this problem challenges our understanding of space and dimension.

(120) The non-euclidean geometry of this fractal pattern creates intricate and mesmerizing visuals.

Euclidean used in a sentence

(121) Non-Euclidean geometries have implications for our understanding of the universe's structure.

(122) Squaring the circle is a problem that has no solution within the realm of Euclidean geometry.

(123) The Euclidean algorithm is a useful tool for finding coprime numbers quickly and efficiently.

(124) The non-euclidean world of virtual reality allows for limitless possibilities and exploration.

(125) Non-Euclidean geometries can be difficult to visualize due to their unconventional properties.

(126) Non-Euclidean geometry provides a framework for understanding the geometry of curved surfaces.

(127) The study of Euclidean geometry can help develop logical reasoning and problem-solving skills.

(128) Euclidean geometry is used in physics to describe the motion and behavior of objects in space.

(129) Euclidean geometry is used in physics to model the behavior of particles and objects in space.

(130) Euclidean geometry provides a framework for understanding the properties of shapes and figures.

Euclidean sentence in English

(131) Euclidean geometry is characterized by its adherence to the five postulates outlined by Euclid.

(132) Euclidean geometry allows us to calculate the angles of a triangle using the angle sum theorem.

(133) The artist's use of non-euclidean perspective in this photograph creates a sense of distortion.

(134) Non-Euclidean geometries have been applied to the study of black holes and gravitational waves.

(135) Euclidean geometry is used in surveying and land measurement to determine distances and angles.

(136) The non-euclidean nature of this problem requires a different approach than traditional methods.

(137) Non-Euclidean geometries provide alternative frameworks for understanding spatial relationships.

(138) Non-Euclidean geometry can be used to describe the geometry of surfaces with negative curvature.

(139) Non-Euclidean geometries have been used to model the behavior of particles in quantum mechanics.

(140) Non-Euclidean geometry provides a framework for understanding the geometry of non-flat surfaces.

(141) Euclidean geometry provides a framework for understanding the properties of circles and spheres.

(142) Hilbert's axioms for geometry provided a rigorous framework for the study of Euclidean geometry.

(143) Euclidean space is a mathematical concept that describes the three-dimensional world we live in.

(144) Non-Euclidean geometry allows for the existence of infinite parallel lines through a given point.

(145) The non-euclidean nature of the puzzle made it challenging for even the most experienced players.

(146) Euclidean division is a method used to divide two integers and find their quotient and remainder.

(147) Non-Euclidean geometry provides a framework for understanding the geometry of hyperbolic surfaces.

(148) Non-Euclidean geometries have been used to study the behavior of particles in high-energy physics.

(149) Higher-dimensional manifolds are objects with locally Euclidean properties in multiple dimensions.

(150) Euclidean geometry allows us to calculate the volume and surface area of three-dimensional shapes.

(151) The non-euclidean landscape of the planet was unlike anything the astronauts had ever seen before.

(152) Euclidean geometry is essential for architects and engineers in designing structures and buildings.

(153) Euclidean geometry is used in surveying and land measurement to determine distances and boundaries.

(154) The non-euclidean structure of this molecule allows it to bond with other compounds in unique ways.

(155) Euclidean geometry is used in art and design to create visually pleasing compositions and patterns.

(156) Euclidean geometry is still widely taught in schools as a fundamental part of mathematics education.

(157) The axiomatization of Euclidean geometry has been influential in the study of spatial relationships.

(158) The principles of Euclidean geometry were first developed by the ancient Greek mathematician Euclid.

(159) Euclidean geometry is used in art and design to create visually appealing compositions and patterns.

(160) Euclidean geometry is used in astronomy to calculate distances and angles between celestial objects.

(161) Euclidean geometry provides a set of rules for measuring angles and determining their relationships.

(162) Euclidean geometry is a branch of plane geometry named after the ancient Greek mathematician Euclid.

(163) Euclidean geometry provides a logical and systematic approach to understanding spatial relationships.

(164) The non-euclidean landscape in the video game created a surreal and immersive experience for players.

(165) Euclidean geometry is based on five postulates that serve as the foundation for all geometric proofs.

(166) Euclidean geometry is a branch of mathematics that studies the properties of flat shapes and figures.

(167) Euclidean geometry is a branch of mathematics that deals with the study of points, lines, and planes.

(168) The principles of Euclidean geometry were first established by the ancient Greek mathematician Euclid.

(169) The artist's use of non-euclidean shapes and lines in this painting creates a sense of disorientation.

(170) By applying the Euclidean algorithm, we can factorize by means of finding the greatest common divisor.

(171) Euclidean geometry is used in cryptography to secure communications and protect sensitive information.

(172) Euclidean geometry is a branch of mathematics that focuses on the study of shapes and their properties.

(173) Geometricians investigate the concept of non-Euclidean geometry and its implications for curved spaces.

(174) Euclidean geometry is still widely taught in schools as the basis for understanding geometric concepts.

(175) In Euclidean geometry, a line is defined as a straight path that extends infinitely in both directions.

(176) Euclidean geometry is used in manufacturing and machining to ensure precise measurements and alignments.

(177) The mathematician studied the geometries of non-Euclidean spaces for years before making a breakthrough.

(178) Non-Euclidean geometries have implications for the study of general relativity and the nature of gravity.

(179) Euclidean geometry is used in navigation and map-making to determine distances and angles between points.

(180) The non-euclidean world of science fiction often features futuristic technologies and alternate realities.

(181) Non-Euclidean geometry challenges the assumption that all triangles have angles that add up to 180 degrees.

(182) Euclidean geometry is essential in computer graphics and animation for rendering three-dimensional objects.

(183) The automorphism group of a regular tiling of the plane is isomorphic to a subgroup of the Euclidean group.

(184) Euclidean geometry is a deductive system, meaning that conclusions are derived from a set of logical steps.

(185) Non-Euclidean geometries have been used to study the behavior of electromagnetic fields in curved spacetime.

(186) Euclidean geometry is used in architecture and engineering to design and construct buildings and structures.

(187) The non-euclidean geometry of this optical illusion tricks the eye into perceiving depth where there is none.

(188) Non-Euclidean geometries challenge the assumption that the sum of angles in a triangle is always 180 degrees.

(189) Submanifolds provide a framework for studying geometric objects that are locally similar to Euclidean spaces.

(190) Euclidean transformations are a type of geometric transformation that preserve the shape and size of objects.

(191) Non-Euclidean geometry allows for the existence of triangles with angles that add up to more than 180 degrees.

(192) Non-Euclidean geometry allows for the existence of triangles with angles that add up to less than 180 degrees.

(193) Non-Euclidean geometry challenges the assumption that the shortest path between two points is a straight line.

(194) Euclidean geometry is used in navigation and cartography to determine distances and angles on maps and globes.

(195) Euclidean geometry is often used to solve real-world problems involving measurements and spatial relationships.

(196) Euclidean geometry is the study of geometric transformations, such as translations, rotations, and reflections.

(197) Non-Euclidean geometrie is a type of geometry that does not follow the traditional rules of Euclidean geometry.

(198) Euclidean geometry is based on the concept of symmetry, which is the balance and harmony of shapes and patterns.

(199) Euclidean geometry is a fundamental tool in calculus and mathematical analysis for studying curves and surfaces.

(200) Euclidean geometry is used in computer graphics to render three-dimensional objects on a two-dimensional screen.

(201) The automorphism group of a regular tessellation of the plane is isomorphic to a subgroup of the Euclidean group.

(202) Non-Euclidean geometry challenges the assumption that the shortest distance between two points is a straight line.

(203) Euclidean geometry allows for the construction of various geometric figures using only a compass and straightedge.

(204) Euclidean geometry is based on a set of axioms that were first proposed by the ancient Greek mathematician Euclid.

(205) Minkowski's geometry of numbers is a branch of mathematics that studies the geometry of lattices in Euclidean space.

(206) The geometer, who had studied the principles of Euclidean geometry, was able to solve the complex problem with ease.

(207) Euclidean geometry is often contrasted with non-Euclidean geometries, which explore different axioms and assumptions.

(208) The Pythagorean theorem is a fundamental concept in Euclidean geometry that relates to the sides of a right triangle.

(209) Minkowski's geometry of numbers is a branch of mathematics that studies the properties of lattices in Euclidean space.

(210) Spherical trigonometry is based on the principles of Euclidean geometry but adapted for the curved surface of a sphere.

(211) Euclidean geometry is based on the concept of congruence, which means that two figures are identical in shape and size.

(212) Euclidean geometry is the foundation for understanding the properties of triangles, quadrilaterals, and other polygons.

(213) The concept of congruence is important in Euclidean geometry, as it refers to shapes that have the same size and shape.

(214) Euclidean geometry is often contrasted with non-Euclidean geometries, which explore curved spaces and different axioms.

(215) Euclidean geometry is used extensively in architecture and engineering to design and construct buildings and structures.

(216) Euclidean geometry is based on the concept of a plane, which is a flat surface that extends infinitely in all directions.

(217) Euclidean geometry provides a framework for understanding the properties of triangles, circles, and other geometric shapes.

(218) Euclidean geometry provides a framework for understanding the properties of angles, including acute, obtuse, and right angles.

(219) Euclidean geometry is based on a set of axioms and postulates that define the relationships between points, lines, and shapes.

(220) Euclidean geometry is a timeless and universal mathematical system that continues to be studied and applied in various fields.

(221) Euclidean geometry is the basis for understanding the properties of regular polygons, such as squares, triangles, and hexagons.

(222) Euclidean geometry is the foundation for understanding the properties of lines, including perpendicular and intersecting lines.

(223) Euclidean geometry is a timeless and universal branch of mathematics that continues to be studied and applied in various fields.

The word usage examples above have been gathered from various sources to reflect current and historical usage of the word Euclidean. They do not represent the opinions of TranslateEN.com.