Answer:
The expression equivalent to [tex]3^7*3^{-4}[/tex] is [tex]3^7*\frac{1}{3^4}[/tex]
Step-by-step explanation:
To answer this question, we notice that we have two factors multiplying each other. On one hand we have 3⁷, and on the other hand we have 3⁻⁴.
As the two factors are powers of the number 3, we have the following identities:
[tex]3^7*3^{-4}=3^{7-4}=3^3=27[/tex]
and
[tex]27\neq3^{-28}=4.37\times10^{-14}[/tex]
which discard that expression. We also know that if we multiply two factors with the same sign, we would get a positive number, so this discards the expression 3⁷x (-3⁴), as this resulting number will be negative (and 9 is positive).
Finally, we can write the following identity
[tex]3^7*\frac{1}{3^{-4}} =3^7*(3^{-4})^{-1}=3^7*3^4=3^{7+4}=3^11=177147\neq27[/tex]
Therefore the correct answer is [tex]3^7*\frac{1}{3^4}[/tex]
