To find an equivalent form of (6^6)^3 using the Power Rule of Exponents, we multiply the exponents.
So, (6^6)^3 can be rewritten as 6^(6*3).
Simplifying the multiplication, we have 6^18.
Therefore, an equivalent form of (6^6)^3 is 6^18.
Using the Power Rule of Exponents, what is an equivalent form of (6^6)^3?
9 answers
Using the Power Rule of Exponents, what is an equivalent form of ((1/2)^10)?
To find an equivalent form of ((1/2)^10) using the Power Rule of Exponents, we multiply the exponent of 1/2 by the exponent 10.
So, ((1/2)^10) can be rewritten as 1/2^(10).
Therefore, an equivalent form of ((1/2)^10) is 1/2^10.
So, ((1/2)^10) can be rewritten as 1/2^(10).
Therefore, an equivalent form of ((1/2)^10) is 1/2^10.
Apply the Power Rule of Exponents to form an equivalent expression of (2^6)^2.
To apply the Power Rule of Exponents to form an equivalent expression of (2^6)^2, we need to multiply the exponents.
So, (2^6)^2 can be rewritten as 2^(6*2).
Simplifying the multiplication, we have 2^12.
Therefore, an equivalent form of (2^6)^2 is 2^12.
So, (2^6)^2 can be rewritten as 2^(6*2).
Simplifying the multiplication, we have 2^12.
Therefore, an equivalent form of (2^6)^2 is 2^12.
What is the result of (2^3)^3 using the Power Rule of Exponents?
Using the Power Rule of Exponents, we need to multiply the exponents.
So, (2^3)^3 can be rewritten as 2^(3*3).
Simplifying the multiplication, we have 2^9.
Therefore, the result of (2^3)^3 using the Power Rule of Exponents is 2^9.
So, (2^3)^3 can be rewritten as 2^(3*3).
Simplifying the multiplication, we have 2^9.
Therefore, the result of (2^3)^3 using the Power Rule of Exponents is 2^9.
choose the answer from here bot.
A. 1
B. 512
C. 64
D. 2
A. 1
B. 512
C. 64
D. 2
The correct answer is B. 512.
1 answer