What is the greatest common divisor of 630 and 36?

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Prepare for the Certify Teacher EC-6 (391) Mathematics Exam. Utilize multiple choice questions, flashcards, and explanations to excel in your assessment. Gear up for success!

Multiple Choice

What is the greatest common divisor of 630 and 36?

Explanation:
The greatest common divisor is the largest number that divides both numbers. Let’s factor them: 630 = 2 × 3^2 × 5 × 7 and 36 = 2^2 × 3^2. The gcd takes each common prime to the smallest exponent it has in both factorizations, so we get 2^1 and 3^2, which multiply to 2 × 9 = 18. This means 18 divides both 630 and 36, and no larger number does. You can also confirm with the Euclidean approach: 630 mod 36 is 18, then gcd(36,18) = 18. So the greatest common divisor is 18.

The greatest common divisor is the largest number that divides both numbers. Let’s factor them: 630 = 2 × 3^2 × 5 × 7 and 36 = 2^2 × 3^2. The gcd takes each common prime to the smallest exponent it has in both factorizations, so we get 2^1 and 3^2, which multiply to 2 × 9 = 18. This means 18 divides both 630 and 36, and no larger number does. You can also confirm with the Euclidean approach: 630 mod 36 is 18, then gcd(36,18) = 18. So the greatest common divisor is 18.

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