Show that the unit sphere bundle of the $r$-fold direct sum of the tautological (universal) complex line bundle over the space $\mathbb{C}P^\infty$ is homotopically equivalent to $\mathbb CP^{r-1}$.
Show that the unit sphere bundle of the $r$-fold direct sum of the tautological (universal) complex line bundle over the space $\mathbb{C}P^\infty$ is homotopically equivalent to $\mathbb CP^{r-1}$.