Let $M$ be the Moebius vector bundle over $S^1$.
Is it possible to embedd the total space of $M\oplus (S^1\times \mathbb{R^1})$ over $S^1$ into $\mathbb{R}^3$?
I suppose this isn't possible but I don't know an argument.
Let $M$ be the Moebius vector bundle over $S^1$.
Is it possible to embedd the total space of $M\oplus (S^1\times \mathbb{R^1})$ over $S^1$ into $\mathbb{R}^3$?
I suppose this isn't possible but I don't know an argument.
It's not possible, since the Whitney sum would be a nonorientable $3$-manifold, which cannot be embedded in $\mathbb R^3$.