Algebra Practice Test 2025 – The Complete Guide to Mastering Your Exam Success!

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Question: 1 / 400

Which of the following is a factor of the polynomial x² - 5x + 6?

x - 2

To determine if a given expression is a factor of the polynomial $ x^2 - 5x + 6 $, we can use the factorization approach. This polynomial is a quadratic, and we are looking for two binomials that multiply to this expression.

The polynomial $ x^2 - 5x + 6 $ can be factored by finding two numbers that multiply to 6 (the constant term) and add up to -5 (the coefficient of the $ x $ term). The numbers -2 and -3 meet these criteria because:

- $(-2) \cdot (-3) = 6$

- $(-2) + (-3) = -5$

Thus, we can express the quadratic polynomial as:

\[ (x - 2)(x - 3) \]

From this factorization, we can see that $ x - 2 $ and $ x - 3 $ are the factors of the polynomial.

Now, when identifying if $ x - 2 $ is indeed a factor, we can see that it is present in the factorization. This confirms that it divides the polynomial evenly.

Although $ x - 3 $ is also a

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x - 3

x + 2

x + 3

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