Some terms in logic are:
axiom - something that is self-evident.
deductive reasoning - the truth of the premises assures the truth of the conclusion, and the falsity of it is impossible.
inductive reasoning - the premises support the conclusion, but do not necessitate it.
fallacy - an argument that is based on an invialid or false inference.
symbolic logic - representing expressions through the use of symbols and variable, rather than in ordinary language.
contingency - a statement that might be true or false
In Nested Logic a Logic is contained within a Logic. If the Outer Logic is TRUE then the internal Logic is executed. Nested IF, Nested For, Nested While, e.t.c are some examples of Nested Logic in Modern Computer Languages.
Some examples of logic questions in philosophy include: "What is the nature of truth?" "How do we know what we know?" "Are all beliefs based on evidence?" "Can a statement be both true and false at the same time?" "What is the relationship between language and reality?"
Some examples of logic philosophy questions include: "What is the nature of truth?" "How do we determine what is morally right or wrong?" "Can we truly know anything for certain?" "What is the relationship between language and reality?" "How do we distinguish between valid and invalid arguments?"
Some examples are Union Bank of Blair. Blair, Wisconsin.
Examples: NaCl, H2, =, +, ----------------->, ↔, (s), etc.
Here are some examples in no particular order:ArcturusAldebaranAntaresAlcorAltairAlnitakAlphardAnkaAlzir
Some examples of malicious code would be Computer Viruses, logic bombs, spyware, and adware.
The control unit of every computer is sequential logic. Input/Output channel controllers used in some computers are also sequential logic. There are many other examples.
point, line, and plane.
thinking about someone or something based on logic & reality rather than our personal feelings & preferences
Examples of logical connectives include "and" (conjunction), "or" (disjunction), "not" (negation), "if...then" (implication), and "if and only if" (biconditional). These connectives are used in logic to combine or modify statements.
example:rich-poorcheap-expensivefat-thin