Question

Plz help me!! 2 questions!!!

1.) The Zero Divisor Theorem. If {\displaystyle M\\eq 0}{\displaystyle M\\eq 0} has finite projective dimension and {\displaystyle r\in R}r\in R is not a zero divisor on {\displaystyle M}M, then {\displaystyle r}r is not a zero divisor on {\displaystyle R}R.


2.)Bass's Question. If {\displaystyle M\\eq 0}{\displaystyle M\\eq 0} has a finite injective resolution then {\displaystyle R}R is a Cohen–Macaulay ring.


I can't
figure this out!!!?

Answer 1

for sure 15 i think lol

Answer 2

Answer: 15 is the answer i got this right on my work

Explanation: