Simplify the expression (3x^2 - 6x) / (9x).

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Study for the 8th Grade FAST Mathematics Pre-Algebra Test. Enhance your skills with interactive flashcards and multiple choice questions, each containing hints and explanations to boost your comprehension and readiness for the exam. Get ready to ace your test!

Multiple Choice

Simplify the expression (3x^2 - 6x) / (9x).

Simplifying a rational expression by factoring and canceling common factors is the key idea here, with attention to not cancel anything that would make the denominator zero.

Factor the numerator: 3x^2 - 6x = 3x(x - 2). The denominator is 9x. So you have [3x(x - 2)] / [9x].

Cancel the common factor 3x from top and bottom. Since you’re canceling, you must have x ≠ 0. After canceling, you’re left with (x - 2) / 3.

So the simplified expression is (x - 2)/3, which is the result you get when you factor and reduce correctly.

Note that leaving it as (3x^2 - 6x)/(9x) and factoring gives the same result, but some other forms like (3x - 6)/(9x) would simplify to (x - 2)/(3x), which still has x in the denominator and isn’t fully simplified.

Simplify the expression (3x^2 - 6x) / (9x).

Study for the 8th Grade FAST Mathematics Pre-Algebra Test. Enhance your skills with interactive flashcards and multiple choice questions, each containing hints and explanations to boost your comprehension and readiness for the exam. Get ready to ace your test!

Simplify the expression (3x^2 - 6x) / (9x).

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