Sure! Here’s the breakdown of the exponent rules used in each expression:
-
Expression: \( \frac{11^{80}}{11^{22}} = 11^{58} \)
- Exponent Rule: Quotient Rule
- Explanation: The quotient rule states that when you divide two powers with the same base, you subtract the exponents: \( a^m / a^n = a^{m-n} \).
-
Expression: \( 6^{-12}/9^{-15} - 9^{15}/6^{12} \)
- Exponent Rule: Negative Integer Exponent Rule (applied to convert negative exponents into positive)
- Explanation: The negative integer exponent rule states that \( a^{-n} = \frac{1}{a^n} \). This is used to rewrite the terms with negative exponents.
-
Expression: \( (16^3)^9 = 16^{27} \)
- Exponent Rule: Power Rule
- Explanation: The power rule states that when raising a power to a power, you multiply the exponents: \( (a^m)^n = a^{m \cdot n} \).
So the completed table would look like this:
| Expression | Exponent Rule | |---------------------------------------------------|-----------------------------------| | \( \frac{11^{80}}{11^{22}} = 11^{58} \) | Quotient Rule | | \( \frac{6^{-12}}{9^{-15}} - \frac{9^{15}}{6^{12}} \) | Negative Integer Exponent Rule | | \( (16^3)^9 = 16^{27} \) | Power Rule |
1 answer