To find between which whole numbers and rational numbers to the nearest half \( \sqrt{105} \) falls, we first need to calculate \( \sqrt{105} \).
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Estimate \( \sqrt{105} \):
- We know that \( 10^2 = 100 \) and \( 11^2 = 121 \).
- Thus, \( \sqrt{105} \) is between \( 10 \) and \( 11 \).
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To find a more precise approximation:
- \( 10.2^2 = 104.04 \)
- \( 10.3^2 = 106.09 \)
- Thus, \( \sqrt{105} \) is between \( 10.2 \) and \( 10.3 \).
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To express \( \sqrt{105} \) to the nearest half:
- Between \( 10 \) and \( 10.5 \), since \( 10.2 \) and \( 10.3 \) round to \( 10 \).
Overall, \( \sqrt{105} \) is approximately \( 10.246 \), which would round to \( 10.5 \) to the nearest half.
Thus, \( \sqrt{105} \) is between 10 and 10.5.
The correct choice is: between 10 and 10.5.
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