Algebra Practice Test 2025 – Complete Exam Preparation

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Question: 1 / 400

What is the factorization of the polynomial x^3 - 27?

(x - 3)(x² + 3x + 9)

To understand how to factor the polynomial $x^3 - 27$, it is helpful to recognize that this expression is a difference of cubes. The general form for factoring a difference of cubes is:

a^3 - b^3 = (a - b)(a^2 + ab + b^2)

In this case, we can identify $a$ as $x$ and $b$ as $3$ because $27$ can be expressed as $3^3$. Therefore, we have:

x^3 - 3^3 = (x - 3)(x^2 + x \cdot 3 + 3^2)

Now, let's break it down:

1. The first term is $x - 3$.

2. Next, for the second term $x^2 + x \cdot 3 + 3^2$, we compute it:

- The middle term becomes $3x$.

- The last term is $9$.

As a result, we arrive at:

x^3 - 27 = (x - 3)(x^2 + 3x

Get further explanation with Examzify DeepDiveBeta

(x + 3)(x² - 3x + 9)

(x - 3)(x² - 3x - 9)

(x + 3)(x² + 3x + 9)

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Algebra Practice Test 2025 – Complete Exam Preparation

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