The Work of M.C. Escher
A detailed Summary of The Work of M.C. Escher
1.) M.C. Escher, whose real name is Maurits Cornelius Escher, was born in Leeuwaren, Netherlands in 1898. He created intriguing works of art, that explore and exhibit a wide range of mathematical ideas. While he was in school, his family had intended for him to follow his fathers footsteps and pursue a career in architecture. But a desire for drawing and design eventually lead Escher into a career in graphic arts. Unfortunately, his work went unnoticed for several years. By 1956, he gave his first important exhibition which was written up in Time Magazine. This acquired a world-wide reputation for Escher. Among his greatest admirers were mathematicians who recognized an extraordinary visualization of mathematical principles. This was quite odd because Escher had no mathematical concept beyond secondary school.
He was inspired by the mathematical ideas he read about. He worked directly from structures in plane and projective geometry. Escher's work encompasses two broad areas of math, the geometry of space, and the logic of space.
An example of the geometry of space would be a tessellation, which many of Escher's masterpieces have been derived. A tessellation is a regular division of a pl
One would wonder if Escher is truly an artist or a mathematician? Or perhaps both? Escher once stated, "I have felt closer to people who work scientifically (though I certainly do not do so myself) than to my fellow artists."
From a mathematical point of view, the most important of Escher's work deal with the nature of space itself. In Escher's woodcut "Three Intersecting Planes," it exemplifies a concern with the dimensionality of space and the mind's ability to discern three-dimensionality in a two-dimensional representation. This created astonishing visual effects. One example of Escher's work which is believed as intriguing is the famous, "The Impossible Triangle," from which he creates from using the above mentioned technique.
Regular polygon- A polygon that satisfies the following conditions: 1.) all sides have the same length. 2.) all interior angles are equal
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Approximate Word count = 898
Approximate Pages = 4 (250 words per page double spaced)
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