Prove the existence of infinite number of infinite cardinals
1) $\alpha$, such that $\alpha<\alpha^\aleph$
2) $\beta$, such that $\beta=\beta^\aleph$
Prove the existence of infinite number of infinite cardinals
1) $\alpha$, such that $\alpha<\alpha^\aleph$
2) $\beta$, such that $\beta=\beta^\aleph$