To solve \( 45 \div 56 \), we can simplify it to a fraction:
\[ \frac{45}{56} \]
Now, let's check the options you've provided.
- 2524 - This does not correspond to \( \frac{45}{56} \).
- 25 over 24 - This is \( \frac{25}{24} \), which is not equivalent to \( \frac{45}{56} \).
- 2030 - This does not correspond to \( \frac{45}{56} \).
- 24 over 25 - This is \( \frac{24}{25} \), which is not equivalent to \( \frac{45}{56} \).
- 911 - This is not relevant to the division problem.
So, let's look at \( \frac{45}{56} \) and see if it simplifies. Both 45 and 56 have no common factors (other than 1), so \( \frac{45}{56} \) is already in its simplest form.
None of the options provided correctly represent \( \frac{45}{56} \).
The closest option is: None of the above.
If you were looking for a decimal representation, \( 45 \div 56 \approx 0.80357 \).