To determine the range for \( \sqrt{10A} \), we need to know the value of \( A \). However, since \( A \) is not specified, we can explore the potential ranges of \( \sqrt{10A} \) for different values of \( A \).
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If \( A = 1 \): \[ \sqrt{10 \times 1} = \sqrt{10} \approx 3.16 \quad (between \ 3 \ and \ 3.5) \]
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If \( A = 2 \): \[ \sqrt{10 \times 2} = \sqrt{20} \approx 4.47 \quad (between \ 4 \ and \ 4.5) \]
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If \( A = 0.5 \): \[ \sqrt{10 \times 0.5} = \sqrt{5} \approx 2.24 \quad (between \ 2 \ and \ 2.5) \]
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If \( A = 0.25 \): \[ \sqrt{10 \times 0.25} = \sqrt{2.5} \approx 1.58 \quad (less \ than \ 2) \]
From these, we can see that the value of \( \sqrt{10A} \) can vary significantly depending on \( A \). However, without knowing the specific value of \( A \), we cannot definitively assign it to the ranges provided.
If you need a specific range, please provide the value of \( A \) or further context in order to narrow down the range of \( \sqrt{10A} \).