Let's actually prove a stronger result: for any constants r0 and r1 where 1 ≤ r0 < r1, it is true that r0n = O(r1n) and it is false that r1n = r0n. This proves your result as a special case, since 1 < 3/2 < 2.
To prove the first part, we'll show that r0n = O(r1n). To do this, we'll use the definition of big-O and find values of n0 and c such that for any n > n0, we have that
r0n ≤ c r1n
We can choose n = n0 and can choose c = 1. The above inequality then holds, so by definition we have that r0n = O(r1n).
To prove the second part, we'll show that r1n ≠ O(r0n). To do this, we'll proceed by contradiction. Assume for the sake of contradiction that there exists a choice of c and n0 such that for any n > n0, we have that
r1n ≤ c r0n
Take the log of both sides to get
n log r1 ≤ log (c r0n)
n log r1 ≤ log c + n log r0
n (log r1 - log r0) ≤ log c
n log(r1 / r0) ≤ log c
n ≤ log c / (log(r1 / r0))
But now we're in trouble, since this statement should hold for any choice of n. However, if we pick any choice of n greater than log c / (log(r1 / r0)), the statement becomes false.
We have reached a contradiction, so our assumption must have been wrong. Thus if 1 < r0 < r1, we have that r1n ≠ O(r0n).
Hope this helps!