Question

Solve: check comments for equation.

Answer 1

\[Log _{x ^{256=-4/5}}\]

Answer 2

too small

Answer 3

omg so small lol >.<

Answer 4

yea i see that.

Answer 5

\[\Large{Log _{x ^{256=-4/5}}}\]

Answer 6

its log_x^256=-4 over 5

Answer 7

\[\Huge{\Large{Log _{x ^{256=-4/5}}}}\]

Answer 8

Hint:

\(x^{-\frac{4}{5}} = 256\)

Answer 9

change it into exponential form\[x^{-4/5}=256\]

Answer 10

so it would be 1 over 1024 or would it just be 1024?

Answer 11

How do u gt 1024 @laurenbae

Answer 12

Second Hint:
Another way to write it is

\(\frac{1}{x^{4/5}} = 256\)

Answer 13

And that becomes

\(\frac{1}{(\sqrt[5]{x})^4} = 256\)

Answer 14

A. 1024
B. 4
C. 1024 over 5
D. 1 over 1024
E. None of the above

Answer 15

Next do:

\(\large\frac{1}{256} = (\sqrt[5]{x})^4\)