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** In Starship Troopers Robert A. Heinlein describes a state in which citizens must earn voting rights and the right to hold electoral office and certain civil service jobs by completing a period of federal service.
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** and Starship
** Starship Troopers
** Aircraft Description: Starship Enterprise
** The Starship UK was simply a habitable shell constructed around a captured and enslaved Star Whale which provided the actual propulsion, in the episode The Beast Below.
** Starship officers, such as Commander Adama and Colonel Tigh, who are outfitted in blue uniforms with silver trim and black boots.
** In Starship Troopers, Robert A. Heinlein describes a future Earth in which a world government is run by military veterans who despise the previous " social scientists " that ran the world.
** and Troopers
** VR Troopers ( Desponda via Jikuu Senshi Spielban footage )
** X Troopers Award of the Year ( 2010 )
** and Robert
** Robert of Molesme
** Elena Sanz de Limantour ( 1922 – 1979 ), married in 1949 to Robert Borgs, and had issue:
** Robert of Hesbaye
** Robert ( 1219 – 1228 )
** Robert II ( 996 – 1031 )
** Robert ( 1309 – 1343 )
** Robert ( 1318 – 1322 )
** Robert ( 1333 – 1364 )
** Robert I ( 1032 – 1076 )
** Robert II ( 1272 – 1306 )
** Robert Darwin ( 1766 – 1848 ), physician, father of Charles Darwin ( 1809 – 1882 )
** Robert Waring Darwin of Elston ( 1724 – 1816 ), author of Principia Botanica
** Joan of Arc by Robert Southey ( 1796 )
** Thalaba the Destroyer by Robert Southey ( 1801 )
** Madoc by Robert Southey ( 1805 )
** The Curse of Kehama by Robert Southey ( 1810 )
** Roderick the Last of the Goths by Robert Southey ( 1814 )
** The Ring and the Book by Robert Browning ( 1868-69 )
** Eros and Psyche by Robert Bridges ( 1885 )
** Robert the Pious, 996-1027
** Robert of Newminster
** Robert F. Kennedy, Senator from New York, Presidential candidate in 1968
** Natural rights theories, such that of John Locke or Robert Nozick, which hold that human beings have absolute, natural rights.
** Robert ( 15 March 119018 March 1190 )
** Robert Wolfall, Presbyter ( commemoration, Anglican Church of Canada )
** and .
** Eunectes murinus, the green anaconda, the largest species, is found east of the Andes in Colombia, Venezuela, the Guianas, Ecuador, Peru, Bolivia, Brazil and on the island of Trinidad.
** Eunectes notaeus, the yellow anaconda, a smaller species, is found in eastern Bolivia, southern Brazil, Paraguay and northeastern Argentina.
** Eunectes deschauenseei, the dark-spotted anaconda, is a rare species found in northeastern Brazil and coastal French Guiana.
** Eunectes beniensis, the Bolivian anaconda, the most recently defined species, is found in the Departments of Beni and Pando in Bolivia.
** Well-ordering theorem: Every set can be well-ordered.
** Tarski's theorem: For every infinite set A, there is a bijective map between the sets A and A × A.
** Trichotomy: If two sets are given, then either they have the same cardinality, or one has a smaller cardinality than the other.
** The Cartesian product of any family of nonempty sets is nonempty.
** König's theorem: Colloquially, the sum of a sequence of cardinals is strictly less than the product of a sequence of larger cardinals.
** Every surjective function has a right inverse.
** Zorn's lemma: Every non-empty partially ordered set in which every chain ( i. e. totally ordered subset ) has an upper bound contains at least one maximal element.
** Hausdorff maximal principle: In any partially ordered set, every totally ordered subset is contained in a maximal totally ordered subset.
** Tukey's lemma: Every non-empty collection of finite character has a maximal element with respect to inclusion.
** Antichain principle: Every partially ordered set has a maximal antichain.
** Every vector space has a basis.
** Every unital ring other than the trivial ring contains a maximal ideal.
** For every non-empty set S there is a binary operation defined on S that makes it a group.
** The closed unit ball of the dual of a normed vector space over the reals has an extreme point.
** Tychonoff's theorem stating that every product of compact topological spaces is compact.
** In the product topology, the closure of a product of subsets is equal to the product of the closures.
** If S is a set of sentences of first-order logic and B is a consistent subset of S, then B is included in a set that is maximal among consistent subsets of S. The special case where S is the set of all first-order sentences in a given signature is weaker, equivalent to the Boolean prime ideal theorem ; see the section " Weaker forms " below.
** Any union of countably many countable sets is itself countable.
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