Express the following set in set-builder notation. E is the set of odd integersi

Question

Express the following set in set-builder notation. E is the set of odd integersis the set of odd integers. Choose the correct answer below. A = x | x is an element of Upper N EndSet{x | xN} B. = x | x is an integer and x is odd EndSet{x | x is an integer and x is odd} C. = x | x is an element of Upper N and x is a multiple of 10 EndSet{x | xN and x is a multiple of 10} D. = x | x is an element of Upper N and x is even {x | xN and x is even} E. Eequals=StartSet x | x is an element of Upper N and x is odd EndSet{x | xN and x is odd} F. =empty set

Explanation / Answer

E is the set of odd integers. Integers are 0 or both positive and negative. The set of natural numbers is N = {1,2,3,….} . Sometimes0 is also included in N. The option B i.e. E = {x | x is an integer and x is odd } or, {x | x Z and x is odd } is the correct answer.

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