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Ceiling Function -- from Wolfram MathWorld
The function [x] which gives the smallest integer >=x, shown as the thick curve in the above plot. Schroeder (1991) calls the ceiling function symbols the "gallows" because of the similarity in appearance to the structure used for hangings. The name and symbol for the ceiling function were coined by K. E. Iverson (Graham et al. 1994). The ceiling function is implemented in the Wolfram Language as Ceiling[z], where it is generalized to complex values of z as illustrated above....
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Ceiling Function -- from Wolfram MathWorld
The function [x] which gives the smallest integer >=x, shown as the thick curve in the above plot. Schroeder (1991) calls the ceiling function symbols the "gallows" because of the similarity in appearance to the structure used for hangings. The name and symbol for the ceiling function were coined by K. E. Iverson (Graham et al. 1994). The ceiling function is implemented in the Wolfram Language as Ceiling[z], where it is generalized to complex values of z as illustrated above....
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Ceiling Function -- from Wolfram MathWorld
The function [x] which gives the smallest integer >=x, shown as the thick curve in the above plot. Schroeder (1991) calls the ceiling function symbols the "gallows" because of the similarity in appearance to the structure used for hangings. The name and symbol for the ceiling function were coined by K. E. Iverson (Graham et al. 1994). The ceiling function is implemented in the Wolfram Language as Ceiling[z], where it is generalized to complex values of z as illustrated above....
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23- titleCeiling Function -- from Wolfram MathWorld
- DC.TitleCeiling Function
- DC.CreatorWeisstein, Eric W.
- DC.DescriptionThe function [x] which gives the smallest integer >=x, shown as the thick curve in the above plot. Schroeder (1991) calls the ceiling function symbols the "gallows" because of the similarity in appearance to the structure used for hangings. The name and symbol for the ceiling function were coined by K. E. Iverson (Graham et al. 1994). The ceiling function is implemented in the Wolfram Language as Ceiling[z], where it is generalized to complex values of z as illustrated above....
- descriptionThe function [x] which gives the smallest integer >=x, shown as the thick curve in the above plot. Schroeder (1991) calls the ceiling function symbols the "gallows" because of the similarity in appearance to the structure used for hangings. The name and symbol for the ceiling function were coined by K. E. Iverson (Graham et al. 1994). The ceiling function is implemented in the Wolfram Language as Ceiling[z], where it is generalized to complex values of z as illustrated above....
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- og:titleCeiling Function -- from Wolfram MathWorld
- og:descriptionThe function [x] which gives the smallest integer >=x, shown as the thick curve in the above plot. Schroeder (1991) calls the ceiling function symbols the "gallows" because of the similarity in appearance to the structure used for hangings. The name and symbol for the ceiling function were coined by K. E. Iverson (Graham et al. 1994). The ceiling function is implemented in the Wolfram Language as Ceiling[z], where it is generalized to complex values of z as illustrated above....
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- twitter:titleCeiling Function -- from Wolfram MathWorld
- twitter:descriptionThe function [x] which gives the smallest integer >=x, shown as the thick curve in the above plot. Schroeder (1991) calls the ceiling function symbols the "gallows" because of the similarity in appearance to the structure used for hangings. The name and symbol for the ceiling function were coined by K. E. Iverson (Graham et al. 1994). The ceiling function is implemented in the Wolfram Language as Ceiling[z], where it is generalized to complex values of z as illustrated above....
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