Final answer:
To factor the equation n³ - 9n = 0, we start by factoring out n and then use the difference of squares to factor further, giving us the solutions n = 0, n = 3, and n = -3.
Step-by-step explanation:
To solve and factor the quadratic equation n³ - 9n = 0, we start by factoring out the common factor of n, which gives us:
n(n² - 9) = 0.
Next, we recognize that n² - 9 is a difference of squares and can be factored further into:
n(n + 3)(n - 3) = 0.
Now we set each factor equal to zero:
- n = 0
- n + 3 = 0, which gives n = -3
- n - 3 = 0, which gives n = 3
Thus, the solutions to the equation are:
n = 0, n = 3, and n = -3.
These solutions correspond to the choices a, b, and c.