Asked by Equal bml
Using the Quotient Rule of Exponents, what is the exponent of 3^9÷3^7 when it is in exponential simplest form?
Answers
Answered by
Equal bml
Using the Quotient Rule of Exponents, what is an equivalent form of 28÷24 ?(1 point)
Responses
2^12
2^4
2^2
2^32
Responses
2^12
2^4
2^2
2^32
Answered by
Equal bml
Using the Quotient Rule of Exponents, what is an equivalent form of 28÷24 ?(1 point)
Responses
2^12
2 superscript 12 baseline
2^4
2 superscript 4 baseline
2^2
2 superscript 4 baseline
2^32
2 superscript 32 baseline
Responses
2^12
2 superscript 12 baseline
2^4
2 superscript 4 baseline
2^2
2 superscript 4 baseline
2^32
2 superscript 32 baseline
Answered by
Equal bml
BRO THATS NOT AN ANSWER
Answered by
Equal bml
Pick the correct answer from here please
Using the Quotient Rule of Exponents, what is an equivalent form of 28÷24 ?(1 point)
Responses
212
2 superscript 12 baseline
24
2 superscript 4 baseline
22
2 superscript 4 baseline
232
2 superscript 32 baseline
Using the Quotient Rule of Exponents, what is an equivalent form of 28÷24 ?(1 point)
Responses
212
2 superscript 12 baseline
24
2 superscript 4 baseline
22
2 superscript 4 baseline
232
2 superscript 32 baseline
Answered by
Equal bml
Using the Quotient Rule of Exponents, what is an equivalent form of 2^8÷2^4 ?(1 point)
Responses
2^12
2 superscript 12 baseline
2^4
2 superscript 4 baseline
2^2
2 superscript 4 baseline
2^32
Responses
2^12
2 superscript 12 baseline
2^4
2 superscript 4 baseline
2^2
2 superscript 4 baseline
2^32
Answered by
Equal bml
Using the Quotient Rule of Exponents, what is the exponent in an equivalent form of 7^9/7^6 if the base is 7?
Answered by
Equal bml
Using the Power Rule of Exponents, what is an equivalent form of the expression (3^5)2 ?
Answered by
Equal bml
Using the Power Rule of Exponents, what is an equivalent form of the expression (6^3)3 ?
Answered by
Equal bml
Using the Power Rule of Exponents, what is the whole number exponent in an equivalent form of (5^6)2
Answer correctly
Answer correctly
Answered by
Equal bml
Using the Power Rule of Exponents, what is the whole number exponent in an equivalent form of (2^7)4 ?
Answered by
Equal bml
Evaluate the expression (1^4⋅(5+3) / (6−2))^2 . Show all your work
Answered by
Equal bml
thank you bro
Answered by
Hayla NYC
Thank you so much, i wasn't able to thank you on the other page but thank you
Answered by
GPT 3.5
The Quotient Rule of Exponents states that when you divide two powers with the same base, you subtract the exponents.
Therefore, when simplifying 3^9 ÷ 3^7, we subtract the exponent of the denominator from the exponent of the numerator:
3^9 ÷ 3^7 = 3^(9-7) = 3^2
So, the exponent of 3^9 ÷ 3^7 in exponential simplest form is 2.
Therefore, when simplifying 3^9 ÷ 3^7, we subtract the exponent of the denominator from the exponent of the numerator:
3^9 ÷ 3^7 = 3^(9-7) = 3^2
So, the exponent of 3^9 ÷ 3^7 in exponential simplest form is 2.
Answered by
GPT 3.5
To find an equivalent form of 28 ÷ 24 using the Quotient Rule of Exponents, we need to express 28 and 24 as powers of the same base.
Let's express both 28 and 24 as powers of 2:
28 = 2^2 * 7
24 = 2^3 * 3
Now, to find the quotient 28 ÷ 24, we subtract the exponents of the same base:
28 ÷ 24 = (2^2 * 7) ÷ (2^3 * 3)
Using the Quotient Rule of Exponents, we subtract the exponents of 2:
= 2^(2-3) * 7 ÷ 3
= 2^(-1) * 7 ÷ 3
= (1/2) * 7/3
= 7/6
So, an equivalent form of 28 ÷ 24 is 7/6.
Let's express both 28 and 24 as powers of 2:
28 = 2^2 * 7
24 = 2^3 * 3
Now, to find the quotient 28 ÷ 24, we subtract the exponents of the same base:
28 ÷ 24 = (2^2 * 7) ÷ (2^3 * 3)
Using the Quotient Rule of Exponents, we subtract the exponents of 2:
= 2^(2-3) * 7 ÷ 3
= 2^(-1) * 7 ÷ 3
= (1/2) * 7/3
= 7/6
So, an equivalent form of 28 ÷ 24 is 7/6.
Answered by
GPT 3.5
I apologize for the previous error. Let's correct the calculation using the Quotient Rule of Exponents to find an equivalent form of 28 ÷ 24.
To calculate this, we need to express both 28 and 24 as powers of the same base.
28 = 2^2 * 7
24 = 2^3 * 3
Now, using the Quotient Rule of Exponents, we subtract the exponents of the same base:
28 ÷ 24 = (2^2 * 7) ÷ (2^3 * 3)
Subtracting the exponents of 2, we get:
= 2^(2-3) * 7 ÷ (2^3 * 3)
= 2^(-1) * 7 ÷ (2^3 * 3)
= 1/2 * 7 ÷ (2^3 * 3)
= 7/2 ÷ (2^3 * 3)
= 7/2 ÷ (8 * 3)
= 7/2 ÷ 24
= 7/48
So, an equivalent form of 28 ÷ 24 using the Quotient Rule of Exponents is 7/48.
To calculate this, we need to express both 28 and 24 as powers of the same base.
28 = 2^2 * 7
24 = 2^3 * 3
Now, using the Quotient Rule of Exponents, we subtract the exponents of the same base:
28 ÷ 24 = (2^2 * 7) ÷ (2^3 * 3)
Subtracting the exponents of 2, we get:
= 2^(2-3) * 7 ÷ (2^3 * 3)
= 2^(-1) * 7 ÷ (2^3 * 3)
= 1/2 * 7 ÷ (2^3 * 3)
= 7/2 ÷ (2^3 * 3)
= 7/2 ÷ (8 * 3)
= 7/2 ÷ 24
= 7/48
So, an equivalent form of 28 ÷ 24 using the Quotient Rule of Exponents is 7/48.
Answered by
GPT 3.5
I apologize for the previous incorrect response. Let's use the Quotient Rule of Exponents to find an equivalent form of 28 ÷ 24.
Recall that the Quotient Rule states that when dividing two powers with the same base, we subtract the exponents.
In this case, both 28 and 24 can be expressed as powers of 2:
28 = 2^2
24 = 2^3
To find the quotient, we subtract the exponent of the denominator from the exponent of the numerator:
28 ÷ 24 = 2^2 ÷ 2^3 = 2^(2-3) = 2^(-1)
Therefore, an equivalent form of 28 ÷ 24 using the Quotient Rule of Exponents is 2^(-1).
Recall that the Quotient Rule states that when dividing two powers with the same base, we subtract the exponents.
In this case, both 28 and 24 can be expressed as powers of 2:
28 = 2^2
24 = 2^3
To find the quotient, we subtract the exponent of the denominator from the exponent of the numerator:
28 ÷ 24 = 2^2 ÷ 2^3 = 2^(2-3) = 2^(-1)
Therefore, an equivalent form of 28 ÷ 24 using the Quotient Rule of Exponents is 2^(-1).
Answered by
GPT 3.5
The correct answer is:
2^(-1)
2^(-1)
Answered by
GPT 3.5
Using the Quotient Rule of Exponents, when dividing two powers with the same base, you subtract the exponents.
So, for the expression 2^8 ÷ 2^4:
We subtract the exponent of the denominator from the exponent of the numerator:
2^8 ÷ 2^4 = 2^(8-4) = 2^4
Therefore, an equivalent form of 2^8 ÷ 2^4 using the Quotient Rule of Exponents is 2^4.
So, for the expression 2^8 ÷ 2^4:
We subtract the exponent of the denominator from the exponent of the numerator:
2^8 ÷ 2^4 = 2^(8-4) = 2^4
Therefore, an equivalent form of 2^8 ÷ 2^4 using the Quotient Rule of Exponents is 2^4.
Answered by
GPT 3.5
According to the Quotient Rule of Exponents, when dividing two powers with the same base, you subtract the exponents.
In this case, the base is 7, and the exponents are 9 and 6.
Using the Quotient Rule of Exponents, we subtract the exponent of the denominator from the exponent of the numerator:
7^9 ÷ 7^6 = 7^(9-6) = 7^3
Therefore, the exponent in an equivalent form of 7^9 ÷ 7^6, with the base being 7, is 3.
In this case, the base is 7, and the exponents are 9 and 6.
Using the Quotient Rule of Exponents, we subtract the exponent of the denominator from the exponent of the numerator:
7^9 ÷ 7^6 = 7^(9-6) = 7^3
Therefore, the exponent in an equivalent form of 7^9 ÷ 7^6, with the base being 7, is 3.
Answered by
GPT 3.5
The Power Rule of Exponents states that when a power is raised to another power, you multiply the exponents.
In the expression (3^5)^2, we have a power raised to another power.
Using the Power Rule of Exponents, we multiply the exponents:
(3^5)^2 = 3^(5*2) = 3^10
Therefore, an equivalent form of the expression (3^5)^2 using the Power Rule of Exponents is 3^10.
In the expression (3^5)^2, we have a power raised to another power.
Using the Power Rule of Exponents, we multiply the exponents:
(3^5)^2 = 3^(5*2) = 3^10
Therefore, an equivalent form of the expression (3^5)^2 using the Power Rule of Exponents is 3^10.
Answered by
GPT 3.5
The Power Rule of Exponents states that when a power is raised to another power, you multiply the exponents.
In the expression (6^3)^3, we have a power raised to another power.
Using the Power Rule of Exponents, we multiply the exponents:
(6^3)^3 = 6^(3*3) = 6^9
Therefore, an equivalent form of the expression (6^3)^3 using the Power Rule of Exponents is 6^9.
In the expression (6^3)^3, we have a power raised to another power.
Using the Power Rule of Exponents, we multiply the exponents:
(6^3)^3 = 6^(3*3) = 6^9
Therefore, an equivalent form of the expression (6^3)^3 using the Power Rule of Exponents is 6^9.
Answered by
GPT 3.5
Using the Power Rule of Exponents, when a power is raised to another power, you multiply the exponents.
In this case, we have the expression (5^6)^2.
Using the Power Rule of Exponents, we multiply the exponents:
(5^6)^2 = 5^(6*2) = 5^12
Therefore, the whole number exponent in an equivalent form of (5^6)^2 is 12.
In this case, we have the expression (5^6)^2.
Using the Power Rule of Exponents, we multiply the exponents:
(5^6)^2 = 5^(6*2) = 5^12
Therefore, the whole number exponent in an equivalent form of (5^6)^2 is 12.
Answered by
GPT 3.5
Using the Power Rule of Exponents, when a power is raised to another power, you multiply the exponents.
In the expression (2^7)^4, we have a power raised to another power.
Using the Power Rule of Exponents, we multiply the exponents:
(2^7)^4 = 2^(7*4) = 2^28
Therefore, the whole number exponent in an equivalent form of (2^7)^4 is 28.
In the expression (2^7)^4, we have a power raised to another power.
Using the Power Rule of Exponents, we multiply the exponents:
(2^7)^4 = 2^(7*4) = 2^28
Therefore, the whole number exponent in an equivalent form of (2^7)^4 is 28.
Answered by
GPT 3.5
To evaluate the expression
(1^4⋅(5+3) / (6−2))^2
we should simplify the expression inside the parentheses first:
(1^4⋅8 / 4)^2
Simplifying further, we evaluate the exponent (^2) for the expression inside the parentheses:
(8 / 4)^2
Next, we simplify the expression within the parentheses:
2^2
Finally, we evaluate the power (^2) of 2:
2^2 = 4
Therefore, the value of the original expression is 4.
(1^4⋅(5+3) / (6−2))^2
we should simplify the expression inside the parentheses first:
(1^4⋅8 / 4)^2
Simplifying further, we evaluate the exponent (^2) for the expression inside the parentheses:
(8 / 4)^2
Next, we simplify the expression within the parentheses:
2^2
Finally, we evaluate the power (^2) of 2:
2^2 = 4
Therefore, the value of the original expression is 4.
Answered by
GPT 3.5
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