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BROWSE ALPHABETICALLY LEVEL: Elementary Advanced Both INCLUDE TOPICS: Basic Math Algebra Analysis Biography Calculus Comp Sci Discrete Economics Foundations Geometry Graph Thry History Number Thry Phys Sci Statistics Topology Trigonometry	contrapositive – disjoint union contrapositive Given a conditional statement, i.e., a statement of the form “if A then B,” or “A implies B,” its contrapositive is “not B implies not A.” A conditional and its contrapositive are logically equivalent. Consequently, in mathematics, to prove a conditional it is a good strategy (and often easier) to prove its contrapositive instead. Cf. inverse statment, converse statement. converse relation If R is a relation, the relation R´ is called the converse relation of R if whenever xRy we have yR´x. converse statement Given a conditional, i.e., a statement of the form “if A then B,” or “A implies B,” its converse is “B implies A.” A conditional neither implies nor is implied by its converse. However, the converse of a conditional and its inverse are logically equivalent, since they are contrapositives of each other. convex Naively, a region of space is convex if the line segement joining any two points of the region lies wholly within it. Thus, a polygon is convex if every line segment joining any two points on its sides lies entirely within the polygon. (This is equivalent to the condition that all its interior angles be less than 180°.) More generally, a region in a real vector space is convex if whenever two points x and y are in the region then so is any point tx + (1 - t)y, where t lies in the interval [0, 1]. See the immediately following entries for additional uses of the descriptor “convex.” Cf. concave. convex set A subset X of a partially ordered set is convex if for any elements a, b in X such that a b, then all elements x satisfying a x b are also in X. countable A set is countable if it is finite, or if it is infinite and bijective to the set of natural numbers (finite ordinals), i.e., if there exists a complete one-to-one mapping of the set in question onto the set N. Sets that are both countable and infinite are sometimes called denumerable. Georg Cantor proved that sets may be uncountably infinite, for example the set of real numbers. Related MiniText: Infinity -- You Can't Get There From Here... countable chain condition See chain condition. countably infinite See countable cover Topology: a collection of sets which contains a given set. If the sets in the covering collection are open sets, the cover is called an open cover. Partially ordered sets: If x and y are elements of a partially ordered set such that x y, and such that there is no z such that x z y, then we say that x covers y. Graph Theory: An edge or vertex of a graph is said to cover (verb) those vertices or edges, respectively, that it is incident on. A set of edges or vertices is said to cover any vertex or edge covered by any element of that set. A set of edges or vertices that covers all the vertices or edges, respectively, of the graph is called a cover (noun), usually with a specification of whether it consists of edges or vertices. See edge cover, vertex cover. cube A regular polyhedron having six square faces. More generally, an n-dimensional cube in the first quadrant of a Euclidean space with one vertex at the origin is given by the collection of all n-tuples of the form (e₁,e₂, ... , e_n), with each e_i an element of the set {0,1}. Cf. platonic solid. Related article: Platonic Solids cub set Closed, unbounded set. See closed set. D-system Set Theory: A family A of sets is called a D-system (also called a quasi-disjoint family) if and only if there is a fixed set r, called the root of the D-system, such that for any two elements x and y of A, x y = r. It is a theorem that every uncountable family of finite sets has a sub-family which forms a D-system. Cf. almost disjoint. Dedekind cut A partition of the set of rational numbers into two subsets A and B, such that every element of A is less than every element of B. The set of real numbers can be formally defined as the set of all Dedekind cuts; e.g., we can take the real number “square root of 2” to be the cut Arithmetic on real numbers is then defined in terms of operations on cuts. For example, if (A₁, B₁) and (A₂, B₂) are Dedekind cuts defining real numbers x and y, then we define the inequality x < y to mean that there is an element of A₂ that is not an element of A₁, and we define x + y to be the real number corresponding to the Dedekind cut (A, B) where the elements of A are all those rational numbers obtained by adding an element of A₁ to an element of A₂. The set of irrational numbers can then be defined as the set of all real numbers that cannot be represented as a ratio of integers. degree Geometry: A unit of measure of angles, denoted by “ ° ”. A complete circle contains 360°, a straight line 180°, and a right angle 90°. Compare radians. Algebra: The degree of a polynomial is the highest sum of exponents appearing in any term with a non-zero coefficient. Graph Theory: The degree of a vertex is the number of edges incident on that vertex, counting loops twice. The degree of an edge is an unordered pair of the degrees of its two ends. dense Given a space X and a subset A of X, we say that A is dense in X if the intersection of every open set of X with A is non-empty. E.g., the rational numbers are dense in the real numbers. dense linear order A set X is said to be a dense linear order if it is a linear order under a relation “ < ” and such that for all distinct x and z with x < z, there is a y in X such that x < y and y < z. The canonical example of a dense linear order is the set Q of rational numbers. Related MiniText: Number -- What Is How Many? denumerable A set is denumerable if it is infinite and countable. difference The difference of two numbers m and n, with n > m, is the number which when added to m yields n. For example, the difference of 3 and 5 is 2. Set Theory: The difference of two sets A and B, denoted either as AB or as A - B, is the set of elements of A that are not in B. discrete General: So-called “Discrete Mathematics” consists of those branches of mathematics which are concerned with the relations among fixed rather than continuously varying quantities, e.g., combinatorics and probability. Topology: A topology on a set X is discrete if every subset of X is open, or equivalently if every one-point set of X is open. disjoint Two sets are disjoint if they have empty intersection. disjoint union A union of sets which are disjoint.	$Fibonacci Board Game banner$ $Graph Paper Download banner$ $Greek Alphabet Poster banner$ $Die-Cast Polyhedra banner$ $Hex Game Download banner$ $Erdos Quote Mug Banner$ $Polyhedra Model Paper Banner$
	contrapositive – disjoint union

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