)implify this expression using the Quotient Rule of Integer Exponents: 12^53÷7^53 .(1 point)

To simplify the expression \( \frac{12^{53}}{7^{53}} \) using the Quotient Rule of Integer Exponents, you can express it as:

\[ \frac{12^{53}}{7^{53}} = \left(\frac{12}{7}\right)^{53} \]

The options listed don't explicitly include this form, so let’s interpret each option:

1. 5106 - This doesn't represent the expression.
2. 553 - This incorrectly suggests \(5^{53}\).
3. 12106 - This incorrectly suggests \(12^{106}\), which is not relevant here.
4. 1253÷753 - This represents \( \frac{12^{53}}{7^{53}} \).

The most direct answer from the options would be:

1253÷753.

Hence, the simplified expression is \( \frac{12^{53}}{7^{53}} \) or \( \left(\frac{12}{7}\right)^{53} \).