We say that a Topological space $Y$ satisfies the Tietze extension propery, TE property,  if [in the formulation of Tietze extension theorem](https://en.m.wikipedia.org/wiki/Tietze_extension_theorem) "$\mathbb{R}$" can be replaced by $Y$.

Obvioysly the product of two  TE spaces is again a TE space. But what about a twist product? More precisely assume that the fiber and base space of a fiber bundle satisfy TE property. Is the total space necessaryly a  TE space?