If $\mathbb{P}(A)=\mathbb{P}(B)=1$, then $\mathbb{P}(A\cap B)=1$?
We can use this:
$\mathbb{P}(A\cap B) = \mathbb{P}(A|B)\mathbb{P}( B)=\mathbb{P}(A|B)$
Then, we have to find counter examples for dependent events $A, B$ such that $\mathbb{P}(A|B)<1$. Are there any examples?
From $$\mathbb{P} (A\cup B) = \mathbb{P} (A)+\mathbb{P} (B)-\mathbb{P} (A\cap B)$$ and $1=\mathbb{P} (A)\leq \mathbb{P} (A\cup B)\leq 1$, we get $$ 1 = 2 - \mathbb{P} (A\cap B)$$ so $\mathbb{P} (A\cap B)=1$.
$P(A\cap B)\ge P(A)+P(B)-1=1$ since $P(A)=P(B)=1$. Hence $P(A\cap B)=1$ since $P(A\cap B )\le1$