+875 Last digit of $196^{213}:$
We only need to care about the last digit. That is $6.$
We notice a repetition in the last digit of every $6^{n}$: it is $6.$
Now, last digit of $213^{196}:$
Similarily, we notice a repetition between $3^{1,2,3,4}:$ it is $3, 9, 7, 1.$
$196$ is a multiple of $4$ so the last digit is $1.$
$6 \cdot 1 = \boxed{6}.$
