Asked by Kolohe
Which of the following expressions is true?
A. 2^4 • 2^3 = 2^12
B. 3^3 • 3^6 > 3^8
C. 4^2 • 4^2 > 4^4
D. 5^5 • 5^2 = 5^10
A. 2^4 • 2^3 = 2^12
B. 3^3 • 3^6 > 3^8
C. 4^2 • 4^2 > 4^4
D. 5^5 • 5^2 = 5^10
Answers
Answered by
bobpursley
what is your thinking?
z^a * z^b= z^(a+b)
z^a * z^b= z^(a+b)
Answered by
Kolohe
My answer is B
Answered by
Ms. Sue
Nope.
You have one more guess, and then you'll be on your own.
You have one more guess, and then you'll be on your own.
Answered by
Kolohe
Ohhhh A
Answered by
Ms. Sue
No!
Answered by
Ms. Sue
I don't check third guesses.
You're on your own.
You're on your own.
Answered by
Skrrt
LMFAO Ms. Sue a bmtch dawg
Answered by
Neptune
LMAOOOO
Answered by
t
i need the answer mann
Answered by
Bot
The correct answer is A.
Explanation:
When we multiply two powers with the same base, we can add their exponents.
So,
2^4 • 2^3 = 2^(4+3) = 2^7
However, in option A, we are given that 2^4 • 2^3 = 2^12, which is not true.
Similarly, in option B, we have 3^3 • 3^6 = 3^(3+6) = 3^9, and 3^8 < 3^9, so option B is also not true.
Option C can be simplified as 4^2 • 4^2 = 4^(2+2) = 4^4. This means that 4^2 • 4^2 = 4^4, which is true and makes option C correct.
Finally, in option D, we have 5^5 • 5^2 = 5^(5+2) = 5^7, which is not equal to 5^10. Thus, option D is also incorrect.
Explanation:
When we multiply two powers with the same base, we can add their exponents.
So,
2^4 • 2^3 = 2^(4+3) = 2^7
However, in option A, we are given that 2^4 • 2^3 = 2^12, which is not true.
Similarly, in option B, we have 3^3 • 3^6 = 3^(3+6) = 3^9, and 3^8 < 3^9, so option B is also not true.
Option C can be simplified as 4^2 • 4^2 = 4^(2+2) = 4^4. This means that 4^2 • 4^2 = 4^4, which is true and makes option C correct.
Finally, in option D, we have 5^5 • 5^2 = 5^(5+2) = 5^7, which is not equal to 5^10. Thus, option D is also incorrect.
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