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Latest revision as of 22:35, 8 March 2008
Numbers
Natural numbers
Include 0,1,2,3,4,5...
Integers
Include 0,-1,1,-2,2,-3,3,-4,4...
Rational numbers
We say that a number is a rational number if it can be written as n/m, where n,m are integers and m != 0. In this case n is called nominator and m denominator of the rational number.
eg. 1, −5, 3/5 , −9/4...
Alphabets
A finite collection of symbols. e.g. {1, 2, d, r, $}. An alphabet with two symbols is called a binary alphabet. e.g. {a, b}
A word(string) is a sequence of symbols from an alphabet (say Sigma represents an alphabet).
Theorems
A statement that, objects satisfy certain properties. It must be true.
Methods of Proof
Dirrect proof method
If H then C. Solve by logically expanding on definitions.
Proof by cases method
This method can be explained as follows. Given a theorem of the form “If H then C”, the proof by cases method uses the following pattern. Usually the hypothesis H can be subdivided into several cases, say into three cases call them H1, H2 and H3. Then one needs to prove that each of these cases implies the conclusion C.
Proof by contradiction method
We assume that H is true but C is false. Then, using a sequence of logical reasoning we derive a contradiction such as 0 = 1.