Final answer:
The quadratic expression 9x^2 − 120x − 400 is not a perfect square trinomial as it does not satisfy the conditions for being one. Thus, it cannot be factorized as a perfect square.
Step-by-step explanation:
The question asks us to determine whether the quadratic expression 9x^2 − 120x − 400 is a perfect square trinomial, and if so, to factorize it. A perfect square trinomial is an expression that can be written as the square of a binomial. For a trinomial ax2 + bx + c to be a perfect square, the second term b must be equal to 2 times the square root of ac, and c must be the square of half the coefficient of b.
Let's verify this for the given expression:
- First, check if the constant term c is the square of half the coefficient of b:
- For 9x2 − 120x − 400, b = − 120 and c = − 400.
- Half of − 120 is − 60, and squaring it gives us 3600, which does not equal − 400. Therefore, the expression is not a perfect square trinomial.
- Secondly, we see that b is not equal to two times the square root of ac, since 120 is not equal to 2 ∗ √(−9 ∗ −400), so the expression cannot be factorized as a perfect square.
Since both conditions for a perfect square trinomial are not met, 9x2 − 120x − 400 is not a perfect square trinomial and, therefore, cannot be factorized as such.