Here's how you approach these:
For the first, figure out how many times the innermost loop executes as function of
j. Call this number
f(i, j). Then we note that
sum(i = 1 to n) sum(j = 1 to i) f(i, j)
would be the desired answer. Then it's a matter of computing this sum. I'll give you a hint: the answer involves knowing how to sum consecutive squares and consecutive integers. (I am 100% certain that your professor went over this in class.)
For the second, approach it similarly. For this one you will need to know the sum of consecutive fourth powers and, again, the sum of consecutive squares.
I have the answer to both of these; if you want, post a solution and I'll check against mine and provide comments.