ThePenrose triangle,also known as thePenrose tribar,theimpossible tribar,[1]or theimpossible triangle,[2]is a triangularimpossible object,anoptical illusionconsisting of an object which can be depicted in a perspective drawing. It cannot exist as a solid object in ordinary three-dimensional Euclidean space, although its surface can be embedded isometrically (bent but not stretched) in five-dimensional Euclidean space.[3]It was first created by the Swedish artistOscar Reutersvärdin 1934.[4]Independently from Reutersvärd, the triangle was devised and popularized in the 1950s by psychiatristLionel Penroseand his son, the mathematician and Nobel Prize laureateRoger Penrose,who described it as "impossibility in its purest form".[5]It is featured prominently in the works of artistM. C. Escher,whose earlier depictions of impossible objects partly inspired it.
Description
edit
The tribar/triangle appears to be asolidobject, made of three straight beams of square cross-section which meet pairwise at right angles at the vertices of thetrianglethey form. The beams may be broken, forming cubes or cuboids.
This combination of properties cannot be realized by any three-dimensional object in ordinaryEuclidean space.Such an object can exist in certain Euclidean3-manifolds.[6]A surface with the samegeodesic distancesas the depicted surface of the tribar, but without its flat shape and right angles, are to be preserved, can also exist in 5-dimensional Euclidean space, which is the lowest-dimensional Euclidean space within which this surface can be isometrically embedded.[3]There also exist three-dimensional solid shapes each of which, when viewed from a certain angle, appears the same as the 2-dimensional depiction of the Penrose triangle on this page (such as – for example – the adjacent image depicting a sculpture inPerth,Australia). The term "Penrose Triangle" can refer to the 2-dimensional depiction or the impossible object itself.
If a line is traced around the Penrose triangle, a 4-loopMöbius stripis formed.[7]
Depictions
edit
M.C. Escher'slithographWaterfall(1961) depicts a watercourse that flows in a zigzag along the long sides of two elongated Penrose triangles, so that it ends up two stories higher than it began. The resulting waterfall, forming the short sides of both triangles, drives awater wheel.Escher points out that in order to keep the wheel turning, some water must occasionally be added to compensate forevaporation.A third Penrose triangle lies between the other two, formed by two segments of waterway and a support tower.[8]
Sculptures
edit-
Impossible triangle sculpture as anoptical illusion,East Perth, Western Australia -
Impossible Triangle sculpture, Gotschuchen, Austria -
![Real Penrose Triangle, Stainless Steel, by W.A.Stanggaßinger, Wasserburg am Inn, Germany. This type of impossible triangle was first created in 1969 by the Soviet kinetic artist Vyacheslav Koleichuk.[9]](https://upload.wikimedia.org/wikipedia/commons/thumb/b/bf/Penrose_Triangle_auf_Ecke_stehend.jpg/240px-Penrose_Triangle_auf_Ecke_stehend.jpg)
Real Penrose Triangle, Stainless Steel, by W.A.Stanggaßinger, Wasserburg am Inn, Germany. This type of impossible triangle was first created in 1969 by the Soviet kinetic artistVyacheslav Koleichuk.[9]
![Real Penrose Triangle, Stainless Steel, by W.A.Stanggaßinger, Wasserburg am Inn, Germany. This type of impossible triangle was first created in 1969 by the Soviet kinetic artist Vyacheslav Koleichuk.[9]](/translate/en.m.wikipedia.org?u=https%3A%2F%2Fen.m.wikipedia.org%2Fwiki%2FFile%3APenrose_Triangle_auf_Ecke_stehend.jpg&t=vi)
See also
editReferences
edit- ^Pappas, Theoni(1989). "The Impossible Tribar".The Joy of Mathematics: Discovering Mathematics All Around You.San Carlos, California: Wide World Publ./Tetra. p. 13.
- ^Brouwer, James R.; Rubin, David C. (June 1979). "A simple design for an impossible triangle".Perception.8(3): 349–350.doi:10.1068/p080349.PMID534162.S2CID41895719.
- ^abZeng, Zhenbing; Xu, Yaochen; Yang, Zhengfeng; Li, Zhi-bin (2021)."An isometric embedding of the impossible triangle into the Euclidean space of lowest dimension"(PDF).In Corless, Robert M.; Gerhard, Jürgen; Kotsireas, Ilias S. (eds.).Maple in Mathematics Education and Research: 4th Maple Conference, MC 2020, Waterloo, Ontario, Canada, November 2–6, 2020, Revised Selected Papers.Springer International Publishing. pp. 438–457.doi:10.1007/978-3-030-81698-8_29.ISBN9783030816988.
- ^Ernst, Bruno (1986). "Escher's impossible figure prints in a new context". InCoxeter, H. S. M.;Emmer, M.;Penrose, R.;Teuber, M. L. (eds.).M. C. Escher Art and Science: Proceedings of the International Congress on M. C. Escher, Rome, Italy, 26–28 March, 1985.North-Holland. pp. 125–134.See in particular p. 131.
- ^Penrose, L. S.;Penrose, R.(February 1958). "Impossible objects: a special type of visual illusion".British Journal of Psychology.49(1): 31–33.doi:10.1111/j.2044-8295.1958.tb00634.x.PMID13536303.
- ^Francis, George K. (1988). "Chapter 4: The impossible tribar".A Topological Picturebook.Springer. pp. 65–76.doi:10.1007/978-0-387-68120-7_4.ISBN0-387-96426-6.See in particular p. 68, where Francis attributes this observation toJohn Stillwell.
- ^Gardner, Martin (August 1978). "Mathematical Games: A Möbius band has a finite thickness, and so it is actually a twisted prism".Scientific American.239(2): 18–26.doi:10.1038/scientificamerican1278-18.JSTOR24960346.
- ^M. C. Escher: The Graphic Work.Taschen. 2000. p. 16.ISBN9783822858646.
- ^Федоров, Ю. (1972)."Невозможное-Возможно".Техника Молодежи.4:20–21.