It was unknown for a long time whether other geometries exist, for which this sum is different. The influence of this problem on mathematics was particularly strong during the 19th century. Ultimately, the answer was proven to be positive: in other spaces (geometries) this sum can be greater or lesser, but it then must depend on the triangle. Its difference from 180° is a case of angular defect and serves as an important distinction for geometric systems.
Equivalence of the parallel postulate and the "sum of the angles equals to 180°" statement
In Euclidean geometry, the triangle postulate states that the sum of the angles of a triangle is two right angles. This postulate is equivalent to the parallel postulate.[1] In the presence of the other axioms of Euclidean geometry, the following statements are equivalent:[2]
Triangle postulate: The sum of the angles of a triangle is two right angles.
Playfair's axiom: Given a straight line and a point not on the line, exactly one straight line may be drawn through the point parallel to the given line.
Proclus' axiom: If a line intersects one of two parallel lines, it must intersect the other also.[3]
Equidistance postulate: Parallel lines are everywhere equidistant (i.e. the distance from each point on one line to the other line is always the same.)
Triangle area property: The area of a triangle can be as large as we please.
Three points property: Three points either lie on a line or lie on a circle.
Pythagoras' theorem: In a right-angled triangle, the square of the hypotenuse equals the sum of the squares of the other two sides.[1]
The sum of the angles of a hyperbolic triangle is less than 180°. The relation between angular defect and the triangle's area was first proven by Johann Heinrich Lambert.[4]
One can easily see how hyperbolic geometry breaks Playfair's axiom, Proclus' axiom (the parallelism, defined as non-intersection, is intransitive in an hyperbolic plane), the equidistance postulate (the points on one side of, and equidistant from, a given line do not form a line), and Pythagoras' theorem. A circle[5] cannot have arbitrarily small curvature,[6] so the three points property also fails.
The sum of the angles can be arbitrarily small (but positive). For an ideal triangle, a generalization of hyperbolic triangles, this sum is equal to zero.
Angles between adjacent sides of a triangle are referred to as interior angles in Euclidean and other geometries. Exterior angles can be also defined, and the Euclidean triangle postulate can be formulated as the exterior angle theorem. One can also consider the sum of all three exterior angles, that equals to 360°[7] in the Euclidean case (as for any convex polygon), is less than 360° in the spherical case, and is greater than 360° in the hyperbolic case.
^ ab Eric W. Weisstein (2003). CRC concise encyclopedia of mathematics (2nd ed.). p. 2147. ISBN1-58488-347-2. The parallel postulate is equivalent to the Equidistance postulate, Playfair axiom, Proclus axiom, the Triangle postulate and the Pythagorean theorem.
^ Keith J. Devlin (2000). The Language of Mathematics: Making the Invisible Visible. Macmillan. p. 161. ISBN0-8050-7254-3.
^Ratcliffe, John (2006), Foundations of Hyperbolic Manifolds, Graduate Texts in Mathematics, vol. 149, Springer, p. 99, ISBN9780387331973, That the area of a hyperbolic triangle is proportional to its angle defect first appeared in Lambert's monograph Theorie der Parallellinien, which was published posthumously in 1786.
^Defined as the set of points at the fixed distance from its centre.
^From the definition of an exterior angle, its sums up to the straight angle with the interior angles. So, the sum of three exterior angles added to the sum of three interior angles always gives three straight angles.
January 01, 1970
angles, triangle, triangle, postulate, redirects, here, confused, with, triangle, inequality, angle, theorem, redirects, here, trigonometric, identities, concerning, sums, angles, list, trigonometric, identities, angle, difference, identities, euclidean, space. Triangle postulate redirects here Not to be confused with Triangle inequality Angle sum theorem redirects here For trigonometric identities concerning sums of angles see List of trigonometric identities Angle sum and difference identities In a Euclidean space the sum of angles of a triangle equals the straight angle 180 degrees p radians two right angles or a half turn A triangle has three angles one at each vertex bounded by a pair of adjacent sides It was unknown for a long time whether other geometries exist for which this sum is different The influence of this problem on mathematics was particularly strong during the 19th century Ultimately the answer was proven to be positive in other spaces geometries this sum can be greater or lesser but it then must depend on the triangle Its difference from 180 is a case of angular defect and serves as an important distinction for geometric systems Equivalence of the parallel postulate and the sum of the angles equals to 180 statement Contents 1 Cases 1 1 Euclidean geometry 1 2 Hyperbolic geometry 1 3 Spherical geometry 2 Exterior angles 3 In differential geometry 4 See also 5 ReferencesCases editEuclidean geometry edit In Euclidean geometry the triangle postulate states that the sum of the angles of a triangle is two right angles This postulate is equivalent to the parallel postulate 1 In the presence of the other axioms of Euclidean geometry the following statements are equivalent 2 Triangle postulate The sum of the angles of a triangle is two right angles Playfair s axiom Given a straight line and a point not on the line exactly one straight line may be drawn through the point parallel to the given line Proclus axiom If a line intersects one of two parallel lines it must intersect the other also 3 Equidistance postulate Parallel lines are everywhere equidistant i e the distance from each point on one line to the other line is always the same Triangle area property The area of a triangle can be as large as we please Three points property Three points either lie on a line or lie on a circle Pythagoras theorem In a right angled triangle the square of the hypotenuse equals the sum of the squares of the other two sides 1 Hyperbolic geometry edit Main article Hyperbolic triangle The sum of the angles of a hyperbolic triangle is less than 180 The relation between angular defect and the triangle s area was first proven by Johann Heinrich Lambert 4 One can easily see how hyperbolic geometry breaks Playfair s axiom Proclus axiom the parallelism defined as non intersection is intransitive in an hyperbolic plane the equidistance postulate the points on one side of and equidistant from a given line do not form a line and Pythagoras theorem A circle 5 cannot have arbitrarily small curvature 6 so the three points property also fails The sum of the angles can be arbitrarily small but positive For an ideal triangle a generalization of hyperbolic triangles this sum is equal to zero Spherical geometry edit See also Triangle Non planar triangles For a spherical triangle the sum of the angles is greater than 180 and can be up to 540 Specifically the sum of the angles is 180 1 4f where f is the fraction of the sphere s area which is enclosed by the triangle Note that spherical geometry does not satisfy several of Euclid s axioms including the parallel postulate This section needs expansion You can help by adding to it November 2013 Exterior angles edit nbsp The picture shows exterior angles along with interior ones for the rightmost vertex it is shown as Main article Internal and external angle Angles between adjacent sides of a triangle are referred to as interior angles in Euclidean and other geometries Exterior angles can be also defined and the Euclidean triangle postulate can be formulated as the exterior angle theorem One can also consider the sum of all three exterior angles that equals to 360 7 in the Euclidean case as for any convex polygon is less than 360 in the spherical case and is greater than 360 in the hyperbolic case In differential geometry editIn the differential geometry of surfaces the question of a triangle s angular defect is understood as a special case of the Gauss Bonnet theorem where the curvature of a closed curve is not a function but a measure with the support in exactly three points vertices of a triangle This section needs expansion You can help by adding to it November 2013 See also editEuclid s Elements Foundations of geometry Hilbert s axioms Saccheri quadrilateral considered earlier than Saccheri by Omar Khayyam Lambert quadrilateralReferences edit a b Eric W Weisstein 2003 CRC concise encyclopedia of mathematics 2nd ed p 2147 ISBN 1 58488 347 2 The parallel postulate is equivalent to the Equidistance postulate Playfair axiom Proclus axiom the Triangle postulate and the Pythagorean theorem Keith J Devlin 2000 The Language of Mathematics Making the Invisible Visible Macmillan p 161 ISBN 0 8050 7254 3 Essentially the transitivity of parallelism Ratcliffe John 2006 Foundations of Hyperbolic Manifolds Graduate Texts in Mathematics vol 149 Springer p 99 ISBN 9780387331973 That the area of a hyperbolic triangle is proportional to its angle defect first appeared in Lambert s monograph Theorie der Parallellinien which was published posthumously in 1786 Defined as the set of points at the fixed distance from its centre Defined in the differentially geometrical sense From the definition of an exterior angle its sums up to the straight angle with the interior angles So the sum of three exterior angles added to the sum of three interior angles always gives three straight angles Retrieved from https en wikipedia org w index php title Sum of angles of a triangle amp oldid 1221038173, wikipedia, wiki, book, books, library,
