(2) (PDF) Architectural space density – The effect of enclosure. This gives a moreextensive interpretation on the prospect-refuge theory of Appleton. We hypothesised that not only refuge, butescape also is a strategy for survival-advantageous behaviour. Refuge preferences are extensivelyinterpreted by the survival-advantageous behaviour of human ancestors, therefore wewere looking for interpretation in this field. We found a strong negative correlation (r=-0.66 p‹0.001) between ASD andthe level of activity (MET) of people taking place. We examined the effect of space density (enclosure) onactivity through re-analysis by an ArchiCAD API-program of three psychologicalobservations of the use of space published by Canter, Demirbas and Demirkan, andKamino. We hypothesised that in more closed space lessintensive activities are preferred. This is an integral along the perceived surface, what is (mathematically)reached for a subject with the average of the surface distances (d) in each direction iscalculated logarithmically (ASD e-d). In previousstudy we made enclosure measurable, we developed a new index called architecturalspace density. N this study we explore the effect of the form of space on people. Toshiyuki Meguro in the (Japanese-language) publication ‘Oru’ and in the newsletter of the ‘Origami Tanteidan’, a Japanese association of origami designers. Although he describes the algorithms in the form he is familiar with, similar techniques have been described by Dr. In this article, the author describes two powerful algorithms for origami design that he has successfully applied to the design of fish, crustacea, insects, and numerous other origami models. The goal of many origami aficionados is to design new origami figures and for many, the pursuit of origami mathematics is a search for tools leading to ever more complex or sophisticated designs. As befits a young and expanding field, much of the scientific analysis is circulated informally (notably over the origami-1 mailing list on the Internet: to join, send the message “subscribe origami-1 yourname” to listservnstn.ns.ca). They include Peter Engel and the author in America, and many folders in Japan, including Husimi, Meguro, Maekawa, and Kawahata. (Kasahara, 1988) and (Engel, 1989) however a large number of folders have attacked the problem of systematic/mathematical origami design. A sampling of the work of mathematical folders is to be found in recent mainstream publications, e.g. In recent years, a number of mathematical aspects of origami have been published in books and journals. Although hundreds of years old, the Japanese art of origami has only recently become the subject of mathematical scrutiny.
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