(X, T) is neither Hausdorff nor connected (X,T) is Hausdorff and connected Let f be a mapping from ]0,2[ to [1,+[ defined by f(x) = 1/x. Then* %3D f is a homeomorphism None of the choices O fis not...

(X, T) is neither Hausdorff nor connected<br>(X,T) is Hausdorff and connected<br>Let f be a mapping from ]0,2[ to [1,+[ defined by f(x) = 1/x. Then*<br>%3D<br>f is a homeomorphism<br>None of the choices<br>O fis not continuous<br>f is continuous but not a homeomorphism<br>R is not connected if T is<br>the finite closed topology<br>e to search<br>

Extracted text: (X, T) is neither Hausdorff nor connected (X,T) is Hausdorff and connected Let f be a mapping from ]0,2[ to [1,+[ defined by f(x) = 1/x. Then* %3D f is a homeomorphism None of the choices O fis not continuous f is continuous but not a homeomorphism R is not connected if T is the finite closed topology e to search

Jun 05, 2022

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(X, T) is neither Hausdorff nor connected (X,T) is Hausdorff and connected Let f be a mapping from ]0,2[ to [1,+[ defined by f(x) = 1/x. Then* %3D f is a homeomorphism None of the choices O fis not...

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