Question

What is the simplified expression forhttps://cv-kettle-falls.brainhoney.com/Resource/30603643,0/Assets/75122_53df8565/01_08_21.gif

Answer 1

@Hero

Answer 2

@Loser66

Answer 3

can you help me plz?

Answer 4

When powers with the same base are multiplied, the base is unchanged and the exponents are added together. Example\[5^3 \times 5^2 = 5^{3+2} = 5^5\]When powers with the same base are divided, the base is unchanged and the exponents are subtracted. Example\[\frac{ 7^4 }{ 7^2 } = 7^{4-2} = 7^2\]

Answer 5

https://cv-kettle-falls.brainhoney.com/Resource/30603643,0/Assets/75122_53df8565/01_08_22b.gif so is this the answer to my question?

Answer 6

No.

Answer 7

so would it be this ? https://cv-kettle-falls.brainhoney.com/Resource/30603643,0/Assets/75122_53df8565/01_08_22d.gif

Answer 8

There's no need to guess. I've given you all the information required for you to solve the problem. Try it.

Answer 9

im asking you the ones i think it is are they any of the ones that i asked u?

Answer 10

Please show me how you got your answers. I'm here to help.

Answer 11

@KAKES1967 @Luigi0210 @Nnesha @iGreen

Answer 12

@i

Answer 13

@icecreamman

Answer 14

what would say.... \(\bf \large 4^4\cdot 4^3\) be?

Answer 15

4^7

Answer 16

yeap, thus
\(\bf \cfrac{4^4\cdot 4^3}{4^5}\implies \cfrac{4^7}{4^5}
\\ \quad \\
a^{-{\color{red} n}} \implies \cfrac{1}{a^{\color{red} n}}\qquad \qquad

\cfrac{1}{a^{\color{red} n}}\implies a^{-{\color{red} n}}\qquad thus
\\ \quad \\
\cfrac{4^7}{4^5}\implies \cfrac{4^7}{1}\cdot \cfrac{1}{4^5}\implies 4^7\cdot 4^{{\color{red}{ -5}}}\implies 4^{7-5}\implies 4^2\)