Continuity in mathematics is the first derivative equal to zero or the Boundary condition.
This normally refers to continuity as a property of certain functions (mappings). They are called continuous if the output depends in a certain way on the input in that a small alteration in the input only leads to a small alteration in the output. Continuous functions can intuitively be drawn with a pencil without ever stopping and beginning again. More formally, a map between two topological spaces is continuous if the preimage of every open set in the codomain is an open set in the domain.
The great grandfather of mathematics is Aristotle.
MATHEMATICS
It depends on who "he" is (or was).
No, but you can major in mathematics
Proofs. Axiomatisable structures. Functions (maps). Continuity. Sets. But that's highly subjective, as any answer on your question has to be.
John Emery Murdoch has written: 'Geometry and the continuum in the fourteenth century' -- subject(s): Continuity, Geometry, Mathematics, Philosophy
Continuity
What is the difference between absolute continuity and differential continuity? Do an individual's experiences affect differential continuity? Provide specific examples
What is the difference between absolute continuity and differential continuity? Do an individual's experiences affect differential continuity? Provide specific examples
Tangent continuity: No sharp angles. Curvature continuity: No sharp radius changes.
What does continuity mean?
Continuity working groups
A continuity tester.
Continuity Comics was created in 1984.
Continuity Associates was created in 1971.
The verb for continuity is continue. As in "to continue with something".