Final answer:
If the second difference of a quadratic pattern is 8, the n squared sequence becomes 4n².
Step-by-step explanation:
The second difference of a quadratic pattern represents the difference between consecutive first differences. If the second difference is 8, it means that each first difference increases by 8. In a quadratic pattern, the nth term is represented by an equation of the form An² + Bn + C, where A, B, and C are constants. Since the second difference is constant and equal to 8, the coefficient A in the equation would be equal to half of the second difference, which is 4. Therefore, the n squared sequence becomes 4n².