Answer
See table.
Work Step by Step
Step 1. Given $f(x)=9x^6-7x^4+8x^2+x+6$, we can identify 2 sign changes indicating that there could be 2 or 0 positive zeros. Put the numbers in the table.
Step 2. $f(-x)=9x^6-7x^4+8x^2-x+6$, we can identify 4 sign changes indicating that there could be 4, 2 or 0 negative zeros. Put the numbers in the table.
Step 3. There should be 6 total zeros. thus the number of nonreal zeros will be the remaining after taking real zeros into account. Complete the table as shown.