To find the standard form of the number given in expanded form, we need to evaluate each term:
- \(3 \times 1,000 = 3,000\)
- \(4 \times 100 = 400\)
- \(6 \times 1 = 6\)
- \(8 \times 1,100 = 8,800\)
- \(7 \times 11,000 = 77,000\)
Now, we will add all these values together:
\[ 3,000 + 400 + 6 + 8,800 + 77,000 \]
Calculating step by step:
- Adding \(3,000 + 400 = 3,400\)
- Adding \(3,400 + 6 = 3,406\)
- Adding \(3,406 + 8,800 = 12,206\)
- Adding \(12,206 + 77,000 = 89,206\)
Now, converting this number into standard form:
The number \(89,206\) as a standard number is simply \(89,206\).
Therefore, it seems like there might be a mistake with the picked values or the intent behind the expanded form, as none of the options match this calculation. If the last two values in the original problem might have been something different (like decimal points), please verify, because the direct addition gives \(89,206\).