From 304 marbles, ignoring the constraint of having at least one bag with 11 marbles, what is the maximum number of bags that can be formed using only 9-marble bags?

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Multiple Choice

From 304 marbles, ignoring the constraint of having at least one bag with 11 marbles, what is the maximum number of bags that can be formed using only 9-marble bags?

The key idea is to maximize full 9-marrow bags from a total of 304 marbles, so you take as many complete groups of 9 as possible. Divide 304 by 9: 9 × 33 = 297, and 9 × 34 = 306 which is too many. That means you can form 33 bags using 297 marbles, leaving 7 marbles unused. You can’t reach 34 bags because you’d need 306 marbles. So the maximum number of bags is 33.

From 304 marbles, ignoring the constraint of having at least one bag with 11 marbles, what is the maximum number of bags that can be formed using only 9-marble bags?

Prepare for the Progressive Pre-Employment Assessment Test with targeted practice questions. Sharpen your skills with detailed explanations and hints. Ace your assessment!

From 304 marbles, ignoring the constraint of having at least one bag with 11 marbles, what is the maximum number of bags that can be formed using only 9-marble bags?

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