A Quote by Ma Yansong
A pool at the edge of the ocean is the simplest geometry, yet you feel connected to the sea. In a forest with the mountains in the background, you also feel the connection to nature, yet it's a very complex geometry. I think architecture is about controlling these feelings.
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The concept of congruence in Euclidean geometry is not exactly the same as that in non-Euclidean geometry. ..."Congruent" means in Euclidean geometry the same as "determining parallelism," a meaning which it does not have in non-Euclidean geometry.
Analytical geometry has never existed. There are only people who do linear geometry badly, by taking coordinates, and they call this analytical geometry. Out with them!
One of the high points of my life was when I suddenly realized that this dream I had in my late adolescence of combining pure mathematics, very pure mathematics with very hard things which had been long a nuisance to scientists and to engineers, that this combination was possible and I put together this new geometry of nature, the fractal geometry of nature.
Metrical geometry is thus a part of descriptive geometry, and descriptive geometry is all geometry.
Photography is all about capturing a mood, a feeling. I feel a special connection with nature, often very powerful. This late afternoon was phenomenal. Standing on the edge of the ocean, I gasped in awe as the holy light illuminated this cathedral window. Witnessing such a moment and capturing it is what I live for. Mother Nature is so powerful, I never underestimate Her.
The bones of my architecture are very much related to the structure, to the physical fact of how a building can stand up; it's also related to geometry and a certain understanding of the architecture in which there is a balance between expression and function.
Geometry enlightens the intellect and sets one's mind right. All of its proofs are very clear and orderly. It is hardly possible for errors to enter into geometrical reasoning, because it is well arranged and orderly. Thus, the mind that constantly applies itself to geometry is not likely to fall into error. In this convenient way, the person who knows geometry acquires intelligence.
The purely formal language of geometry describes adequately the reality of space. We might say, in this sense, that geometry is successful magic. I should like to state a converse: is not all magic, to the extent that it is successful, geometry?
An American is a complex of occasions, themselves a geometry of spatial nature.
I conceived, developed and applied in many areas a new geometry of nature, which finds order in chaotic shapes and processes. It grew without a name until 1975, when I coined a new word to denote it, fractal geometry, from the Latin word for irregular and broken up, fractus. Today you might say that, until fractal geometry became organized, my life had followed a fractal orbit.
The ocean is the source of life. We all come from there. I think about these one-celled creatures, and I think about the planet. It is related to my obsession with biology, even if it's only a layperson's obsession. The way I visualise what's at the bottom of the ocean is very much to do with how I feel when I'm swimming in the sea.
In fact, Gentlemen, no geometry without arithmetic, no mechanics without geometry... you cannot count upon success, if your mind is not sufficiently exercised on the forms and demonstrations of geometry, on the theories and calculations of arithmetic ... In a word, the theory of proportions is for industrial teaching, what algebra is for the most elevated mathematical teaching.
Forest restoration is a challenging and complex undertaking of raising young trees, transplanting them, and then cultivating them year in, year out in the face of harsh challenges of nature; it is a gigantic nature transformation project to turn all the mountains of the country into 'treasure mountains,' into 'gold mountains.'
It's either I have to be in the trees or in the ocean, otherwise I lose my mind. I have to get connected with nature, otherwise I don't feel very good. And that's what life's about, feeling good, so nature knows best for me.
It turns out that hyperbolic structures are very common in nature, and the place where lots of people encounter them is coral reefs. Sea slugs, and a lot of other organisms with frilly forms, are biological manifestations of hyperbolic geometry, which is also found in the structure of lettuce leaves and kales, and some species of cactus.
A proposition of geometry does not compete with life; and a proposition of geometry is a fair and luminous parallel for a work of art. Both are reasonable, both untrue to the crude fact; both inhere in nature, neither represents it.
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