Difference between revisions of "Logic"
Line 1: | Line 1: | ||
'''Logic''' is the systematic use of symbolic and mathematical techniques to determine the forms of valid deductive or inductive argument. | '''Logic''' is the systematic use of symbolic and mathematical techniques to determine the forms of valid deductive or inductive argument. | ||
− | ==Logical | + | ==Statements== |
+ | A statement is either true or false, but it will never be both or neither. An example of statement can be "A duck is a bird." which is true. Another example is "A pencil does not exist" which is false. | ||
+ | |||
+ | ==Logical Notations== | ||
{{main|Logical notation}} | {{main|Logical notation}} | ||
− | '''Logical notation''' is a special syntax that is shorthand for logical statements. | + | A '''Logical notation''' is a special syntax that is shorthand for logical statements. |
+ | |||
+ | ==Negations== | ||
+ | A negation is denoted by <math>\neg p</math>. <math>\neg p</math> is the statement that is true when <math>p</math> is false and the statement that is false when <math>p</math> is true. This means simply "the opposite of <math>p</math>" | ||
+ | |||
+ | ==Conjunction== | ||
+ | The conjunction of two statements basically means "<math>p</math> and <math>q</math>" | ||
+ | |||
+ | ==Disjunction== | ||
+ | The disjunction of two statements basically means "<math>p</math> or <math>q</math>" | ||
+ | |||
+ | ==Implication== | ||
+ | This operation is given by the statement "If <math>p</math>, then <math>q</math>". It is denoted by <math>p\Leftrightarrow q</math> | ||
+ | |||
+ | ==Converse== | ||
+ | The converse of the statement <math>p \Leftrightarrow q</math> is <math>q \Leftrightarrow p</math>. | ||
+ | |||
+ | ==Contrapositive== | ||
+ | The contrapositive of the statement <math>p \Leftrightarrow q</math> is <math>\neg p \Leftrightarrow \neg q</math> | ||
+ | |||
+ | ==Truth Tables== | ||
− | + | ==Quantifiers== | |
+ | There are two types of quantifiers: | ||
+ | <math>\dot</math> Universal Quantifier: "for all" | ||
+ | <math>\dot</math> Existential Quantifier: "there exists" | ||
==See Also== | ==See Also== | ||
*[[Dual]] | *[[Dual]] | ||
− | |||
[[Category:Definition]] | [[Category:Definition]] | ||
[[Category:Logic]] | [[Category:Logic]] |
Revision as of 23:59, 5 November 2011
Logic is the systematic use of symbolic and mathematical techniques to determine the forms of valid deductive or inductive argument.
Contents
Statements
A statement is either true or false, but it will never be both or neither. An example of statement can be "A duck is a bird." which is true. Another example is "A pencil does not exist" which is false.
Logical Notations
- Main article: Logical notation
A Logical notation is a special syntax that is shorthand for logical statements.
Negations
A negation is denoted by . is the statement that is true when is false and the statement that is false when is true. This means simply "the opposite of "
Conjunction
The conjunction of two statements basically means " and "
Disjunction
The disjunction of two statements basically means " or "
Implication
This operation is given by the statement "If , then ". It is denoted by
Converse
The converse of the statement is .
Contrapositive
The contrapositive of the statement is
Truth Tables
Quantifiers
There are two types of quantifiers: $\dot$ (Error compiling LaTeX. Unknown error_msg) Universal Quantifier: "for all" $\dot$ (Error compiling LaTeX. Unknown error_msg) Existential Quantifier: "there exists"