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Variety of cartons. The folding carton created the packaging industry as it is known today, beginning in the late 19th century. [1] [2] [3] The process involves folding carton made of paperboard that is printed, laminated, cut, then folded and glued.
Code or text folding, or less commonly holophrasting, [1] is a feature of some graphical user interfaces that allows the user to selectively hide ("fold") or display ("unfold") parts of a document. This allows the user to manage large amounts of text while viewing only those subsections that are currently of interest.
Other names include fan-fold paper, sprocket-feed paper, burst paper, lineflow (New Zealand), tractor-feed paper, and pin-feed paper. It can be single-ply (usually woodfree uncoated paper) or multi-ply (either with carbon paper between the paper layers, or multiple layers of carbonless copy paper), often described as multipart stationery or ...
COVID-19 Vaccination Record Card: Image title: COVID-19 Vaccination Record Card: Author: CDC/NCIRD: Software used: Adobe InDesign CC 13.0 (Windows) Conversion program: Adobe PDF Library 15.0: Encrypted: no: Page size: 348 x 294 pts: Version of PDF format: 1.4
Ray Stanton Avery (January 13, 1907 – December 12, 1997) was an American inventor, [1] most known for creating self-adhesive labels (modern stickers).Using a $100 loan from his then-fiancé Dorothy Durfee, and combining used machine parts with a saber saw, he created and patented the world's first self-adhesive (also called pressure sensitive) die-cut labeling machine.
Crease pattern for a Miura fold. The parallelograms of this example have 84° and 96° angles. The Miura fold is a rigid fold that has been used to pack large solar panel arrays for space satellites, which have to be folded before deployment. Robert J. Lang has applied rigid origami to the problem of folding a space telescope. [7]
The major question about such crease patterns is whether a given crease pattern can be folded to a flat model, and if so, how to fold them; this is an NP-complete problem. [32] Related problems when the creases are orthogonal are called map folding problems. There are three mathematical rules for producing flat-foldable origami crease patterns ...
There are eight ways to fold a 2 × 2 map along its creases, counting each different vertical sequence of folded squares as a distinct way of folding the map: [5] However, the general problem of counting the number of ways to fold a map remains unsolved. The numbers of ways of folding an n × n map are known only for n ≤ 7. They are: