This can be simplified as follows:
(2^2)^4 = 2^(2*4)
= 2^8
= 256
Therefore, (2^2)^4 is equal to 256.
(2^2)^4
9 answers
(3^5)-2
Calculating this expression:
(3^5) - 2
= 243 - 2
= 241
Therefore, (3^5) - 2 is equal to 241.
(3^5) - 2
= 243 - 2
= 241
Therefore, (3^5) - 2 is equal to 241.
(5^-3)^6
To simplify this expression, first evaluate the exponent of the base:
(5^-3)^6
= (1/5^3)^6
= 1/(5^18)
= 1/3814697265625
≈ 2.62 x 10^(-13)
So, (5^-3)^6 is approximately 2.62 x 10^(-13).
(5^-3)^6
= (1/5^3)^6
= 1/(5^18)
= 1/3814697265625
≈ 2.62 x 10^(-13)
So, (5^-3)^6 is approximately 2.62 x 10^(-13).
(8^3)^2
To simplify this expression, we first calculate the exponent:
(8^3)^2
= 8^(3*2)
= 8^6
= 262144
Therefore, (8^3)^2 is equal to 262144.
(8^3)^2
= 8^(3*2)
= 8^6
= 262144
Therefore, (8^3)^2 is equal to 262144.
Which of these equations is correct?
You didn't mention the equations to choose from. Please provide the options so that I can determine which one is correct.