Let (X,T) and (Y,T1) be two topological spaces and let f be a continuous mapping of X into Y. * If f is onto and (Y,T1) is a T1-space, then (X,T) is a T1-space O None of the choices If f is one to one...

Topology

Let (X,T) and (Y,T1) be two topological<br>spaces and let f be a continuous<br>mapping of X into Y. *<br>If f is onto and (Y,T1) is a T1-space,<br>then (X,T) is a T1-space<br>O None of the choices<br>If f is one to one and (Y,T1) is a T1-<br>space, then (X,T) is a T1-space<br>If (Y,T1) is a Hausdorff space, then<br>(X,T) is a Hausdorff space<br>

Extracted text: Let (X,T) and (Y,T1) be two topological spaces and let f be a continuous mapping of X into Y. * If f is onto and (Y,T1) is a T1-space, then (X,T) is a T1-space O None of the choices If f is one to one and (Y,T1) is a T1- space, then (X,T) is a T1-space If (Y,T1) is a Hausdorff space, then (X,T) is a Hausdorff space

Jun 05, 2022

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Let (X,T) and (Y,T1) be two topological spaces and let f be a continuous mapping of X into Y. * If f is onto and (Y,T1) is a T1-space, then (X,T) is a T1-space O None of the choices If f is one to one...

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