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37 votes
Use the equation, (1/27)^x=3^(-4x+6), to complete the following problems.

Rewrite the equation using the same base.
Solve for x. Write your answer as a fraction in simplest form.
Please show all work, and refrain from posting links, thank you!

User Newton
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1 Answer

28 votes
28 votes

Answer:

Given equation:


\left((1)/(27)\right)^x=3^((-4x+6))

27 can be written as
3^3

Also
(1)/(a^b) can be written as
a^(-b)


\implies (1)/(27)=(1)/(3^3)=3^(-3)

Therefore, we can rewrite the given equation with base 3:


\implies (3^(-3))^x=3^((-4x+6))

To solve, apply the exponent rule
(a^b)^c=a^(bc)


\implies 3^(-3 \cdot x)=3^((-4x+6))


\implies 3^((-3x))=3^((-4x+6))


\textsf{If }a^(f(x))=a^(g(x)), \textsf{ then } f(x)=g(x)


\implies -3x=-4x+6

Add
4x to both sides:


\implies x=6

User Patashu
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3.1k points