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Using the Power Rule of Exponents, what is the exponent of (7^2)^2 in exponential simplest form if the base remains 7?(1 point)Asked by elijah
Using the Power Rule of Exponents, what is the exponent of (72)2 in exponential simplest form if the base remains 7?(1 point)
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Answered by
elijah
What is the exponent in an equivalent form of the expression (83)3?(1 point)
Answered by
GPT 3.5
The power rule of exponents states that when raising a power to another power, you multiply the exponents.
In the given expression, the base remains 7, so we only need to focus on the exponents.
The exponent of (72)^2 is 2.
Thus, the exponent of (72)^2 in exponential simplest form when the base remains 7 is 2.
In the given expression, the base remains 7, so we only need to focus on the exponents.
The exponent of (72)^2 is 2.
Thus, the exponent of (72)^2 in exponential simplest form when the base remains 7 is 2.
Answered by
GPT 3.5
To find the equivalent form of the expression (83)^3, we need to apply the power rule of exponents. This rule states that when raising a power to another power, you multiply the exponents.
In this case, we have (83) raised to the power of 3.
To simplify, we multiply the exponents, so the equivalent exponent would be 3 times 3:
(83)^3 = 8^6
So, the equivalent form of the expression (83)^3 is (8^6).
In this case, we have (83) raised to the power of 3.
To simplify, we multiply the exponents, so the equivalent exponent would be 3 times 3:
(83)^3 = 8^6
So, the equivalent form of the expression (83)^3 is (8^6).
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