Rwith the Euclidean topology and R with the finite closed topology are not homeomorphic Let f be a mapping from [1,+[ to [1,+0[, defined by f(x)=x+1/x. Then * O None of the choices O fis continuous...

Rwith the Euclidean topology and R with the finite closed topology are not<br>homeomorphic<br>Let f be a mapping from [1,+[ to [1,+0[, defined by f(x)=x+1/x. Then *<br>O None of the choices<br>O fis continuous but it is not a homeomorphism<br>O fis a homeomorphism<br>fis not continuous<br>Let X = {a, b, c, d,e) and let T ={X, Ø, {a}, {a,d}, (a,e}}, then *<br>

Extracted text: Rwith the Euclidean topology and R with the finite closed topology are not homeomorphic Let f be a mapping from [1,+[ to [1,+0[, defined by f(x)=x+1/x. Then * O None of the choices O fis continuous but it is not a homeomorphism O fis a homeomorphism fis not continuous Let X = {a, b, c, d,e) and let T ={X, Ø, {a}, {a,d}, (a,e}}, then *

Jun 05, 2022

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Rwith the Euclidean topology and R with the finite closed topology are not homeomorphic Let f be a mapping from [1,+[ to [1,+0[, defined by f(x)=x+1/x. Then * O None of the choices O fis continuous...

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