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Theoretical mathematical outline of fundamental method for finding deflections by geometry, rather than by law of conservation of energy or principle of least work; rules of geometrical analysis illustrated by methods for calculating influence lines for arches and trusses; tabulation of influence lines for 2-hinged arch, computation of fixed beam moments, and deflections of simple truss. (See also - discussions v 63 n 2 Feb p 410-4, n 4 Apr p 757-62, n 5 May p 992-5 and n 9 Nov p 1804-6)
Theoretical mathematical outline of fundamental method for finding deflections by geometry, rather than by law of conservation of energy or principle of least work; rules of geometrical analysis illustrated by methods for calculating influence lines for arches and trusses; tabulation of influence lines for 2-hinged arch, computation of fixed beam moments, and deflections of simple truss. (See also - discussions v 63 n 2 Feb p 410-4, n 4 Apr p 757-62, n 5 May p 992-5 and n 9 Nov p 1804-6)
Deflections by geometry
Am Soc Civ Engrs -- Proc
Hall, D.B. (author)
1936
13 pages
Article (Journal)
English
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| ASCE | 2021
Discussion of “McGaw on Deflections by Geometry”
| ASCE | 2021
Closure to “Hall on Deflections by Geometry”
| ASCE | 2021
Engineering Index Backfile | 1894
| Engineering Index Backfile | 1959