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4 votes
Solve the following equations.
log6(x) = 1

1 Answer

3 votes

Answer:

x = 6

Explanation:

Given:

log₆(x) = 1

Now,

From the properties of log

logₓ (z)=
(\log(z))/(\log(x)) (where the base of the log is equal for both numerator and the denominator)

also,

log(xⁿ) = n × log(x)

thus,

using the above properties, we can deduce the results as:

logₓ(y) = n is equivalent to y = xⁿ

therefore,

the given equation can be deduced as:

log₆(x) = 1

into,

x = 6¹

or

x = 6

User Simbro
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