Matches in Harvard for { <http://id.lib.harvard.edu/aleph/006171681/catalog> ?p ?o. }
Showing items 1 to 27 of
27
with 100 items per page.
- catalog alternative "General integrals of planetary motion".
- catalog contributor b8637635.
- catalog created "1874]".
- catalog date "1874".
- catalog date "1874]".
- catalog dateCopyrighted "1874]".
- catalog description "Canonical tranformations of the equations of motion -- Approximation to the required solutions by the variations of the arbitrary constants in a first approximate solution -- Formation of the Lagrangian coefficients (a[subscript]i, a[subscript]k), and reduction of the equations to a canonical form -- Fundamental relation between the cofficients of the time, b₁, b₂, etc., considered as functions of c₁, c₂, etc. -- Development of [omega], [omega][subscript]j, and [omega]ʹ[subscript]j -- Form of the second approximation -- General theorem.".
- catalog extent "vii, 31 p.".
- catalog hasFormat "On the general integrals of planetary motion.".
- catalog isFormatOf "On the general integrals of planetary motion.".
- catalog isPartOf "Publication (Smithsonian Institution) ; 281.".
- catalog isPartOf "Smithsonian Institution publication 281.".
- catalog isPartOf "Smithsonian contributions to knowledge ; [v. 21, art. 3]".
- catalog isPartOf "Smithsonian contributions to knowledge ; v. 21, art. 3.".
- catalog issued "1874".
- catalog issued "1874]".
- catalog language "eng".
- catalog publisher "[Washington, Smithsonian Institution,".
- catalog relation "On the general integrals of planetary motion.".
- catalog subject "Astronomy.".
- catalog subject "Perturbation (Astronomy)".
- catalog subject "Planetary theory.".
- catalog subject "Q11 .S68 vol. 21".
- catalog tableOfContents "Canonical tranformations of the equations of motion -- Approximation to the required solutions by the variations of the arbitrary constants in a first approximate solution -- Formation of the Lagrangian coefficients (a[subscript]i, a[subscript]k), and reduction of the equations to a canonical form -- Fundamental relation between the cofficients of the time, b₁, b₂, etc., considered as functions of c₁, c₂, etc. -- Development of [omega], [omega][subscript]j, and [omega]ʹ[subscript]j -- Form of the second approximation -- General theorem.".
- catalog title "General integrals of planetary motion".
- catalog title "On the general integrals of planetary motion, by Simon Newcomb.".
- catalog type "text".