Using the Quotient Rule of Exponents, what is 7^7÷7^3 in exponential simplest form?(1 point) base=, exponent=
base=7, exponent=4
What is the exponent in an equivalent form to the expression 2^6÷2^1 when the base is 1?
The exponent in an equivalent form to the expression 2^6÷2^1 when the base is 1 is 5.
Applying the Quotient Rule of Exponents, what is the exponent in an equivalent form of (56)10÷(56)3 ? Answer with a whole number for the exponent.(1 point)
To apply the Quotient Rule of Exponents, we subtract the exponents when dividing.
In this case, the base (56) remains the same, and we subtract the exponent (3) from the exponent (10):
10 - 3 = 7
Therefore, the exponent in an equivalent form of (56)10÷(56)3 is 7.
Apply the Quotient Rule of Exponents to simplify 9896 as an equivalent expression.(1 point
To apply the Quotient Rule of Exponents to simplify the expression 9896, we need to express it in exponential form.
Since there is no specific base mentioned in the question, I will assume that the base is 10.
So, 9896 can be expressed as 10^9896.
Therefore, applying the Quotient Rule of Exponents, 9896 can be simplified as an equivalent expression of 10^9896.
Apply the Quotient Rule of Exponents to simplify 9^/89^/6 as an equivalent expression.(1 poin
To apply the Quotient Rule of Exponents to simplify the expression 9^/89^/6, we need to rewrite the expression using the rule.
The Quotient Rule of Exponents states that when dividing two exponential expressions with the same base, we can subtract the exponents:
a^m / a^n = a^(m-n)
In this case, the base is 9 and 89 respectively, and the exponents are 6 and 6.
Applying the Quotient Rule of Exponents, we have:
9^6 / 89^6 = (9/89)^6
Therefore, the equivalent expression for 9^/89^/6, after applying the Quotient Rule of Exponents, is (9/89)^6.
Applying the Quotient Rule of Exponents, what is an equivalent form of 69÷65 ? Answer with a whole number for the exponent.(1 point)
The Quotient Rule of Exponents is used when dividing two exponential expressions with the same base. However, in the given expression 69 ÷ 65, there are no exponential expressions. Rather, it is a simple division problem.
By dividing 69 by 65, we get the quotient 1.
Therefore, the equivalent form of 69 ÷ 65, after applying the Quotient Rule of Exponents, is the whole number 1.
Applying the Quotient Rule of Exponents, what is an equivalent form of 6^9÷6^5 ? Answer with a whole number for the exponent.(1 point)
To apply the Quotient Rule of Exponents, we subtract the exponents when dividing two exponential expressions with the same base.
In this case, the base is 6, and we want to find an equivalent form of 6^9 ÷ 6^5.
Using the Quotient Rule, we subtract the exponents:
6^9 ÷ 6^5 = 6^(9-5) = 6^4
Therefore, an equivalent form of 6^9 ÷ 6^5, after applying the Quotient Rule of Exponents, is 6^4.
Apply the Quotient Rule of Exponents to simplify 9^8/9^6 as an equivalent expression.(1 point)
To apply the Quotient Rule of Exponents, we subtract the exponents when dividing two exponential expressions with the same base.
In this case, the base is 9, and we want to simplify 9^8 ÷ 9^6.
Using the Quotient Rule, we subtract the exponents:
9^8 ÷ 9^6 = 9^(8-6) = 9^2
Therefore, an equivalent expression for 9^8 ÷ 9^6, after applying the Quotient Rule of Exponents, is 9^2.
Using the Quotient Rule of Exponents, what is an equivalent form of 8^6÷8^2 ?(
To apply the Quotient Rule of Exponents, we subtract the exponents when dividing two exponential expressions with the same base.
In this case, the base is 8, and we want to find an equivalent form of 8^6 ÷ 8^2.
Using the Quotient Rule, we subtract the exponents:
8^6 ÷ 8^2 = 8^(6-2) = 8^4
Therefore, an equivalent form of 8^6 ÷ 8^2, after applying the Quotient Rule of Exponents, is 8^4.
Using the Quotient Rule of Exponents, what is an equivalent form of 2^6÷2^3 ?(
To apply the Quotient Rule of Exponents, we subtract the exponents when dividing two exponential expressions with the same base.
In this case, the base is 2, and we want to find an equivalent form of 2^6 ÷ 2^3.
Using the Quotient Rule, we subtract the exponents:
2^6 ÷ 2^3 = 2^(6-3) = 2^3
Therefore, an equivalent form of 2^6 ÷ 2^3, after applying the Quotient Rule of Exponents, is 2^3.
Using the Quotient Rule of Exponents, what is an equivalent form of 5^8÷5^2 ?
To apply the Quotient Rule of Exponents, we subtract the exponents when dividing two exponential expressions with the same base.
In this case, the base is 5, and we want to find an equivalent form of 5^8 ÷ 5^2.
Using the Quotient Rule, we subtract the exponents:
5^8 ÷ 5^2 = 5^(8-2) = 5^6
Therefore, an equivalent form of 5^8 ÷ 5^2, after applying the Quotient Rule of Exponents, is 5^6.
Apply the Quotient Rule of Exponents to form an equivalent expression of 2^6/2^2
To apply the Quotient Rule of Exponents, we subtract the exponents when dividing exponential expressions with the same base.
In this case, the base is 2, and we want to find an equivalent expression for 2^6 ÷ 2^2.
Using the Quotient Rule, we subtract the exponents:
2^6 ÷ 2^2 = 2^(6-2) = 2^4
Therefore, an equivalent expression for 2^6 ÷ 2^2, after applying the Quotient Rule of Exponents, is 2^4.
What is the quotient of 2^3÷2^1 using the Quotient Rule of Exponents?(
To find the quotient of 2^3 ÷ 2^1 using the Quotient Rule of Exponents, we subtract the exponents:
2^3 ÷ 2^1 = 2^(3-1) = 2^2
Therefore, the quotient of 2^3 ÷ 2^1, using the Quotient Rule of Exponents, is 2^2.