Answer:
For the third degree polynomial shown in the graph, it crosses the x-axis at three distinct points. These crossings indicate where the polynomial equation equals zero. Since the graph crosses the x-axis at three separate locations, this indicates that there are three real zeros.
Given that it is a third-degree polynomial (a cubic function), it can have at most three zeros (real and complex combined). Because all three zeros are visible on the graph as x-axis crossings (real zeros), this implies there are no non-real zeros.
Thus, the polynomial has:
- **Real Zeros** = 3
- **Non-Real Zeros** = 0
