Question

To evaluate the expression \(- 3 \frac{7}{8} \times 6 + 4.36\), we will first convert the mixed number into an improper fraction, perform the multiplication, and then add the decimal.

1. Convert \(3 \frac{7}{8}\) to an improper fraction:
\[
3 \frac{7}{8} = \frac{3 \times 8 + 7}{8} = \frac{24 + 7}{8} = \frac{31}{8}
\]

2. Now multiply \(\frac{31}{8}\) by \(6\):
\[
\frac{31}{8} \times 6 = \frac{31 \times 6}{8} = \frac{186}{8}
\]
To simplify \(\frac{186}{8}\):
\[
\frac{186 \div 2}{8 \div 2} = \frac{93}{4}
\]

3. Now we convert \(\frac{93}{4}\) to a decimal for easier addition with \(4.36\):
\[
\frac{93}{4} = 23.25
\]

4. Finally, add \(23.25\) and \(4.36\):
\[
23.25 + 4.36 = 27.61
\]

Thus, the final answer is:
\[
\boxed{27.61}
\]

To determine if Amanda’s answer of -19.14 is reasonable, we should first appropriately round the components of the expression:

1. The value of \(-3 \frac{7}{8}\) is approximately \(-4\) when rounded.
2. The value of \(4.36\) rounds to \(4\).

Now, calculate what these rounded values would yield when considered in the multiplication and addition of the original expression:

1. Multiply \(-4\) by \(6\):
\[
-4 \times 6 = -24
\]

2. Add \(4\):
\[
-24 + 4 = -20
\]

Now, we can examine Amanda’s answer of -19.14 in comparison to our calculated value of -20.

1. According to the distracting options provided:
- If considering option A, Amanda's answer of -19.14 rounds to -20, making it reasonable.
- According to option B, it states her answer does round to -20, which is also correct.

However, options C and D provide incorrect reasoning based on the rounding of the values (specifically rounding \(4.63\) instead of \(4.36\)).

Given the calculations and reasoning, the best choice according to what we deduced is:

**B. Since -4 rounds to -4 and 4.36 rounds to 4, the final answer rounds to -20. Her answer of -19.14 rounds to -20. So, it is reasonable.**