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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 thank you
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)
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wrong
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What is the exponent in an equivalent form of the expression (8^3)3 ?(1 point
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Applying the Power Rule of Exponents, what is the exponent in an equivalent form of ((1/6)^3)^3 ? Answer with a whole number for the exponent where the base is 16 .(1 point)
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Applying the Power Rule of Exponents, what is the exponent in an equivalent form of ((16)3)3 ? Answer with a whole number for the exponent where the base is 1/6 .(1 point)
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Applying the Power Rule of Exponents, what is the exponent in an equivalent form of ((1?6)^3)^3 ? Answer with a whole number for the exponent where the base is 1?6 .(1 point)
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Apply the Power Rule of Exponents to simplify (4^2)^2 as a whole number.(1 point)
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STUPID
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Apply the Power Rule of Exponents to simplify (4^^2)2 as a whole number.(1 point)
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GPT 3.5
The Power Rule of Exponents states that when we raise a power to another power, we multiply the exponents.
So, applying the Power Rule, we can simplify (7^2)^2 as 7^(2*2).
Therefore, the exponent of (7^2)^2 in exponential simplest form is 7^4.
So, applying the Power Rule, we can simplify (7^2)^2 as 7^(2*2).
Therefore, the exponent of (7^2)^2 in exponential simplest form is 7^4.
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GPT 3.5
I apologize for the incorrect response.
Using the Power Rule of Exponents, we multiply the exponents when we raise an exponent to another exponent.
Given (7^2)^2, we can simplify this as 7^(2*2) = 7^4.
Therefore, the exponent of (7^2)^2 in exponential simplest form is 4.
Using the Power Rule of Exponents, we multiply the exponents when we raise an exponent to another exponent.
Given (7^2)^2, we can simplify this as 7^(2*2) = 7^4.
Therefore, the exponent of (7^2)^2 in exponential simplest form is 4.
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GPT 3.5
Using the Power Rule of Exponents, we multiply the exponents when we raise an exponent to another exponent.
Given (8^3)^3, we can simplify this as 8^(3*3) = 8^9.
Therefore, the exponent in an equivalent form of the expression (8^3)^3 is 9.
Given (8^3)^3, we can simplify this as 8^(3*3) = 8^9.
Therefore, the exponent in an equivalent form of the expression (8^3)^3 is 9.
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GPT 3.5
Applying the Power Rule of Exponents, we multiply the exponents when we raise an exponent to another exponent.
Given ((1/6)^3)^3, we can simplify this as (1/6)^(3*3) = (1/6)^9.
To rewrite this with a base of 16, we need to find an equivalent expression for (1/6)^9 using the base of 16.
To find an equivalent expression, we simplify the fraction (1/6). Since 16 is a perfect square and 6 is a factor of 16, we can rewrite (1/6) as (1/16)^2.
Therefore, ((1/6)^3)^3 is equivalent to ((1/16)^2)^9.
By applying the Power Rule of Exponents, we multiply the exponents: (1/16)^(2*9) = (1/16)^18.
Therefore, the exponent in an equivalent form of the expression ((1/6)^3)^3, with the base of 16, is 18.
Given ((1/6)^3)^3, we can simplify this as (1/6)^(3*3) = (1/6)^9.
To rewrite this with a base of 16, we need to find an equivalent expression for (1/6)^9 using the base of 16.
To find an equivalent expression, we simplify the fraction (1/6). Since 16 is a perfect square and 6 is a factor of 16, we can rewrite (1/6) as (1/16)^2.
Therefore, ((1/6)^3)^3 is equivalent to ((1/16)^2)^9.
By applying the Power Rule of Exponents, we multiply the exponents: (1/16)^(2*9) = (1/16)^18.
Therefore, the exponent in an equivalent form of the expression ((1/6)^3)^3, with the base of 16, is 18.
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GPT 3.5
Applying the Power Rule of Exponents, we multiply the exponents when we raise an exponent to another exponent.
Given ((16)^3)^3, we can simplify this as 16^(3*3) = 16^9.
To rewrite this with a base of 1/6, we need to find an equivalent expression for 16^9 using the base of 1/6.
To find an equivalent expression, we rewrite 16 as (1/6)^(-2).
Therefore, ((16)^3)^3 is equivalent to ((1/6)^(-2))^9.
By applying the Power Rule of Exponents, we multiply the exponents: (1/6)^((-2)*9) = (1/6)^(-18).
Therefore, the exponent in an equivalent form of the expression ((16)^3)^3, with the base of 1/6, is -18.
Given ((16)^3)^3, we can simplify this as 16^(3*3) = 16^9.
To rewrite this with a base of 1/6, we need to find an equivalent expression for 16^9 using the base of 1/6.
To find an equivalent expression, we rewrite 16 as (1/6)^(-2).
Therefore, ((16)^3)^3 is equivalent to ((1/6)^(-2))^9.
By applying the Power Rule of Exponents, we multiply the exponents: (1/6)^((-2)*9) = (1/6)^(-18).
Therefore, the exponent in an equivalent form of the expression ((16)^3)^3, with the base of 1/6, is -18.
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GPT 3.5
I'm sorry if my previous responses did not meet your expectations. If you have any specific questions or need clarification on a particular topic, please let me know and I'll be happy to assist you.
Answered by
GPT 3.5
I apologize for the confusion in my previous responses.
To find the exponent in an equivalent form of ((1/6)^3)^3 with the base of 1/6, we can use the Power Rule of Exponents.
The Power Rule states that when we raise a power to another power, we multiply the exponents.
In this case, we have ((1/6)^3)^3. To simplify this expression, we multiply the exponents as follows:
((1/6)^3)^3 = (1/6)^(3*3) = (1/6)^9.
Therefore, the exponent in an equivalent form of ((1/6)^3)^3 with the base of 1/6 is 9.
To find the exponent in an equivalent form of ((1/6)^3)^3 with the base of 1/6, we can use the Power Rule of Exponents.
The Power Rule states that when we raise a power to another power, we multiply the exponents.
In this case, we have ((1/6)^3)^3. To simplify this expression, we multiply the exponents as follows:
((1/6)^3)^3 = (1/6)^(3*3) = (1/6)^9.
Therefore, the exponent in an equivalent form of ((1/6)^3)^3 with the base of 1/6 is 9.
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GPT 3.5
To simplify (4^2)^2 using the Power Rule of Exponents, we multiply the exponents.
(4^2)^2 can be rewritten as 4^(2*2) = 4^4.
Therefore, we can simplify (4^2)^2 as the whole number 4^4.
(4^2)^2 can be rewritten as 4^(2*2) = 4^4.
Therefore, we can simplify (4^2)^2 as the whole number 4^4.
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GPT 3.5
I apologize for the incorrect response.
Using the Power Rule of Exponents, we multiply the exponents when we raise a power to another power.
Given (4^2)^2, we can simplify this as 4^(2*2) = 4^4.
Therefore, the exponent in the simplified form of (4^2)^2 is 4.
Using the Power Rule of Exponents, we multiply the exponents when we raise a power to another power.
Given (4^2)^2, we can simplify this as 4^(2*2) = 4^4.
Therefore, the exponent in the simplified form of (4^2)^2 is 4.
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GPT 3.5
I apologize if my previous responses have been unclear or incorrect. If you have any further questions or need assistance with a specific problem, please let me know and I'll do my best to help you.
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GPT 3.5
I apologize, but the expression you provided, (4^^2)2, is not clear to me. The notation you are using, "^", is commonly used to represent exponentiation. However, the symbol "^^" is not a standard notation in mathematics.
If you can provide the expression in a different format or clarify what the notation "^^" means, I would be happy to assist you in simplifying the expression using the Power Rule of Exponents.
If you can provide the expression in a different format or clarify what the notation "^^" means, I would be happy to assist you in simplifying the expression using the Power Rule of Exponents.