Explanation Consider the statement, “The field of quotients Q of an integral domain D contains a subring D ' = { [ x , e ] | x ∈ D , and e is the unity in D } .” For arbitrary [ x , e ] and [ y , e ] in D ' , [ x , e ] + [ y , e ] = [ x ⋅ e + y ⋅ e , e ⋅ e ] Since e is the unity in D , = [ x + y , e ] Therefore, D ' is closed under addition. As [ x , e ] + [ 0 , e ] = [ x ⋅ e + 0 ⋅ e , e ⋅ e ] = [ x , e ] and [ 0 , e ] + [ x , e ] = [ 0 ⋅ e + x ⋅ e , e ⋅ e ] = [ x , e ] and the element [ 0 , e ] ∈ D ' , D ' contains the zero element of Q . As [ x , e ] + [ − x , e ] = [ x ⋅ e + ( − x ) ⋅ e , e ⋅ e ] = [ 0 , e ] and [ − x , e ] + [ x , e ] = [ − x ⋅ e + x ⋅ e , e ⋅ e ] = [ 0 , e ] and [ − x , e ] ∈ D ' , the additive inverse of [ x , e ] is [ − x , e ] . Now for [ x , e ] ∈ D ' and [ y , e ] ∈ D ' , [ x , e ] ⋅ [ y , e ] = [ x y , e ] ∈ D ' shows that D ' is closed under multiplication

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Chapter 5.3, Problem 4TFE

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Whether the statement, “The field of quotients Q of an integral domain D contains a subring D'={ [x, e] | x∈D, and e is the unity in D}” is true or false.

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Chapter 5.3, Problem 3TFE

Chapter 5.3, Problem 5TFE

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Whether the statement, “The field of quotients Q of an integral domain D contains a subring D ' = { [ x , e ] | x ∈ D , and e is the unity in D } ” is true or false.

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Whether the statement, “The field of quotients Q of an integral domain D contains a subring D'={ [x, e] | x∈D, and e is the unity in D}” is true or false.

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