Asked by i love miners

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 \( A \).

1. **If \( A = 1 \):**
\[
\sqrt{10 \times 1} = \sqrt{10} \approx 3.16 \quad (between \ 3 \ and \ 3.5)
\]

2. **If \( A = 2 \):**
\[
\sqrt{10 \times 2} = \sqrt{20} \approx 4.47 \quad (between \ 4 \ and \ 4.5)
\]

3. **If \( A = 0.5 \):**
\[
\sqrt{10 \times 0.5} = \sqrt{5} \approx 2.24 \quad (between \ 2 \ and \ 2.5)
\]

4. **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 \( \sqrt{10A} \).

To find the value of \( \sqrt{10} \), we can calculate it approximately:

\[
\sqrt{10} \approx 3.162
\]

Now let's determine in which range this value falls:

- **Between 2 and 2.5:** No, \( \sqrt{10} \) is greater than 2.5.
- **Between 2.5 and 3:** No, \( \sqrt{10} \) is greater than 3.
- **Between 3 and 3.5:** Yes, \( \sqrt{10} \) is approximately 3.162, which falls within this range.
- **Between 3.5 and 4:** No, \( \sqrt{10} \) is less than 3.5.

Thus, the correct choice is:

**C. between 3 and 3.5.**

To write the number 6,739 in expanded form, you break it down into its place values.

Here's the expanded form for 6,739:

\[
6,739 = 6,000 + 700 + 30 + 9
\]

So, in expanded form, it's:

**6,000 + 700 + 30 + 9.**

To express \( \frac{8}{11} \) as a repeating decimal, divide 8 by 11.

When you perform the division, you find:

\[
8 \div 11 = 0.727272\ldots
\]

The digits "72" repeat indefinitely.

So, the decimal representation of \( \frac{8}{11} \) can be written as:

\[
0.\overline{72}
\]

The bar over "72" indicates that these two digits repeat.

The answer for \( \frac{8}{11} \) expressed as a repeating decimal is:

\[
0.\overline{72}
\]

This means that "72" repeats indefinitely.

I apologize for any confusion.

The correct representation of \( \frac{8}{11} \) as a decimal is:

\[
0.\overline{72}
\]

This means it is \( 0.727272... \), where the digits "72" are repeating indefinitely. It is not simply \( 0.72 \), as \( 0.72 \) would not indicate a repeating decimal.

So the correct repeating decimal for \( \frac{8}{11} \) is indeed \( 0.\overline{72} \).