Find the greatest common factor of 12x^3 and 18x^2.

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Study for the 8th Grade Mathematics Test. Prepare with multiple choice questions, each with hints and explanations. Get ready for your exam!

Multiple Choice

Find the greatest common factor of 12x^3 and 18x^2.

Explanation:
The greatest common factor is the largest expression that divides both terms. Start by factoring each term: 12x^3 has numeric factors 2^2 and 3, and x^3; 18x^2 has numeric factors 2 and 3^2, and x^2. For the common part, take the smallest powers: 2^1, 3^1, and x^2. Multiply these together to get 2 * 3 * x^2 = 6x^2. This factor divides both original expressions (12x^3 ÷ 6x^2 = 2x and 18x^2 ÷ 6x^2 = 3), and you can’t go any larger because extending any part would fail to divide one of the terms. So the greatest common factor is 6x^2.

The greatest common factor is the largest expression that divides both terms. Start by factoring each term: 12x^3 has numeric factors 2^2 and 3, and x^3; 18x^2 has numeric factors 2 and 3^2, and x^2. For the common part, take the smallest powers: 2^1, 3^1, and x^2. Multiply these together to get 2 * 3 * x^2 = 6x^2. This factor divides both original expressions (12x^3 ÷ 6x^2 = 2x and 18x^2 ÷ 6x^2 = 3), and you can’t go any larger because extending any part would fail to divide one of the terms. So the greatest common factor is 6x^2.

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