Let T be the set of all continuous functions from R to R. 1) Is T a commutative ring with identity? If so, prove so. If not, demonstrate that it is not. 2) Is T an integral domain? If so, prove so. If not, demonstrate that it is not.

Let T be the set of all continuous functions from R to R. 1) Is T a commutative ring with identity? If so, prove so. If not, demonstrate that it is not. 2) Is T an integral domain? If so, prove so. If not, demonstrate that it is not.

Elements Of Modern Algebra

8th Edition

ISBN:9781285463230

Author:Gilbert, Linda, Jimmie

Publisher:Gilbert, Linda, Jimmie

Chapter5: Rings, Integral Domains, And Fields

Section5.2: Integral Domains And Fields

Problem 16E: Prove that if a subring R of an integral domain D contains the unity element of D, then R is an...

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Let T be the set of all continuous functions from R to R.
1) Is T a commutative ring with identity? If so, prove so. If not, demonstrate that it is not.
2) Is T an integral domain? If so, prove so. If not, demonstrate that it is not.

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