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Chapter 1 SETS, FUNCTIONs, ELEMENTARY LOGIC & BOOLEAN ALGEBRAs BY: MISS FARAH ADIBAH ADNAN IMK.

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Presentation on theme: "Chapter 1 SETS, FUNCTIONs, ELEMENTARY LOGIC & BOOLEAN ALGEBRAs BY: MISS FARAH ADIBAH ADNAN IMK."— Presentation transcript:

1 Chapter 1 SETS, FUNCTIONs, ELEMENTARY LOGIC & BOOLEAN ALGEBRAs BY: MISS FARAH ADIBAH ADNAN IMK

2 CHAPTER OUTLINE: PART II
1.2 FUNCTIONS DEFINITION OF FUNCTION SPECIAL TYPES OF FUNCTION INVERSE FUNCTION COMPOSITION OF FUNCTION

3 1.2.1 Definition of Function:
Let and be sets. A function from to , we write as , is an assignment of all elements in set to exactly one element of Symbols for the function, . Sometimes write as Set is called domain, and set is called range / image. Image is often a subset of a larger set, called codomain. x y

4 Example 1.1 Find the domain, range and codomain of .

5 1.2.2 Special Types of Functions:
ONE TO ONE / INJECTIVE A function is said one to one, if and only if Have a distinct images, at a distinct elements of their domain. Eg:

6 2) ONTO / SURJECTIVE Let a function from A to B, it is called onto if and only if for every element , there is an element . Eg: refer textbook.

7 3) BIJECTION Have both one to one and onto. Eg:
Let be the function from with Is is a bijection?

8 Inverse Functions: Let be a function whose domain is the set , and the codomain is the set . Then the inverse function, has domain of the set Y and codomain of the set X, with the property: The inverse function exists if and only if is a bijection.

9 Example 1.2 1) Let be a function from {a,b,c} to {1,2,3} such that Is invertible? What is its inverse? 2) Let be the function from the set of integers such that . Is invertible? What is its inverse?

10 1.2.4 Composition of Functions:
Let be a function from the set A to the set B, and let be a function from the set B to the set C. The composition of the functions and , denoted by , is defined by: The composition of cannot be defined unless the range of is a subset of the domain

11 Example 1.3 Let be the function from the set {a,b,c} to itself such that Let be the function from the set {a,b,c} to the set {1,2,3} such that What is the composition of and , and what is the composition of and ?

12 Example 1.4 Let and be the function from the set of integers defined by . What is the composition of and , and and ?

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