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28 votes
28 votes
Find the value of x in 81^x=1/3?​

User Hiroe
by
2.9k points

2 Answers

25 votes
25 votes

Answer:

x = -
(1)/(4)

Explanation:

Using the rules of exponents


(a^m)^(n) =
a^(mn) ,
a^(-m) =
(1)/(a^(m) )

Given


81^(x) =
(1)/(3) [ note that 81 =
3^(4) ] , then


(3^4)^(x) =
3^(-1) , that is


3^(4x) =
3^(-1)

Since the bases on both sides are equal, both 3, then equate exponents

4x = - 1 ( divide both sides by 4 )

x = -
(1)/(4)

User Per Salbark
by
2.7k points
13 votes
13 votes

Answer:

x = -1/4

Explanation:


81^(x) = 1/3


3^(4)^(x) =
3^(-1)

4x = -1

x = -1/4