Final answer:
The polynomial equation 5x⁴(x-7)(x²+8)²=0 has five real roots, with four being at x=0 and one at x=7. The correct answer is option C, which represents 5 roots.
Step-by-step explanation:
The question asks to determine the number of roots of the polynomial equation 5x⁴(x-7)(x²+8)²=0.
To find the number of roots, we look at the given factors of the polynomial:
- The term 5x⁴ suggests that there are four roots at x=0 (also called the zero of the polynomial).
- The linear term (x-7) indicates one root at x=7.
- The term (x²+8)² is a perfect square, indicating that the quadratic equation has a double root. Since x²+8 cannot be zero for any real number x (as the smallest value x² can have is zero, making the smallest value of x²+8 equal to 8), it contributes no real roots.
Thus, the polynomial has a total of five real roots: four at x=0 and one at x=7. The correct answer is therefore option C (5 roots).
When solving polynomial equations, such as ax²+bx+c=0, the quadratic formula can be used to find the solutions.
However, in this case, the factors provided allow us to determine the roots directly without resorting to the formula.