Discrete Math on Functions as bijection. Can Someone help me on how to Prove that f:Z times Z rightarrow Z times Z defined by f(a, b)=(-b, a) is a well-defined bijection.

excefebraxp

excefebraxp

Answered question

2022-09-05

Discrete Math on Functions as bijection
Can Someone help me on how to Prove that f : Z × Z Z × Z defined by f ( a , b ) = ( b , a ) is a well-defined bijection.

Answer & Explanation

Kimberly Evans

Kimberly Evans

Beginner2022-09-06Added 13 answers

Step 1
Each ( a , b ) Z × Z is unique. Hence, each ( b , a ) Z × Z is also unique. Use the definition of well-defined bijection:
Step 2
Each element of Z × Z must be paired with at least one element of Z × Z , no element of Z × Z may be paired with more than one element of Z × Z , each element of Z × Z must be paired with at least one element of Z × Z , and no element of Z × Z may be paired with more than one element of Z × Z . I can't tell any more, or else the answer is obvious.

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