$\"\"$

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Let n is the positive odd integers.

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Let two consecutive positive odd integers $\"\"$ .

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The word $\"\"$ sum of two consecutive positive odd integers $\"\"$ $\"\"$ represents $\"\"$ .

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The word $\"\"$ two consecutive positive odd integers $\"\"$ with a sum that is at least 8 and less than 24 $\"\"$ represents $\"\"$ . $\"\"$

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The inequality is $\"\"$ .

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Subtract 2 from each side.

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$\"\"$

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$\"\"$

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Divide each side by 2.

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$\"\"$

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$\"\"$ . $\"\"$

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The n values set is $\"\"$ .

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If $\"\"$ the remaining positive odd integer value $\"\"$ and the solution set is $\"\"$ .

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If $\"\"$ the remaining positive odd integer value $\"\"$ and the solution set is $\"\"$ .

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If $\"\"$ the remaining positive odd integer value $\"\"$ and the solution set is $\"\"$ .

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If $\"\"$ the remaining positive odd integer value $\"\"$ and the solution set is $\"\"$ .

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If $\"\"$ the remaining positive odd integer value $\"\"$ and the solution set is $\"\"$ . $\"\"$

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The all solution sets are $\"\"$ .