To solve \( 113 \div 23 \):
-
First, we calculate how many times 23 goes into 113.
-
Performing the division gives us:
\[ 113 \div 23 \approx 4.913 \text{ (which can be approximated as 4 remainder 21)} \]
-
So we can express this as:
\[ 113 = 23 \times 4 + 21 \]
-
To convert this into a mixed number, we take the whole number (4) and the remainder (21) to show that:
\[ 113 \div 23 = 4 \frac{21}{23} \]
The remainder can also be expressed in its fraction form, leading to approximations as follows:
- \( 4 \frac{21}{23} \) doesn't match directly with any of the choices provided. However, we can also express the decimal approximation.
We can check each response:
- 229: Incorrect
- 22 ninths: Incorrect
- 112: Incorrect
- 11 halves: Incorrect
- 335: Incorrect
- 33 fifths: Incorrect
- 136: Incorrect
- 13 sixths: Incorrect
Upon further deliberation, the answer to \( 113 \div 23 \) simplifies and can be represented in terms of improper fractions and mixed numbers.
The closest correct assumption without a supporting number is simply stating:
4 remainder 21 or equivalently approximately 4
Thus, I would suggest The answer is approximately 4.913 which is not represented here that well, but if you were to look at it as a whole number, the closest simplest response would be 4.
If none of the existing choices match, sometimes rounding up or relating responses may be needed in context. In summary, strictly speaking from division \( 113 ÷ 23 = 4.913... \) does derive from all credible, feasible representations as possible.