How do you solve log_4 7 + 2 log_4 x = log_4 2?

1 Answer
Alan P.
Dec 14, 2015

x=sqrt(2/7)

Explanation:

Given:
color(white)("XXX")log_4(7)+2log_4(x)=log_4(2)

Remember
color(white)("XXX")log multiplication rule: log_b(p*q) =log_b(p)+log_b(q)
color(white)("XXX")log power rule: log_b(s^t) = t*log_b(s)

Therefore the given equation can be rewritten as
color(white)("XXX")log_4(7x^2)=log_4(2)

from which it follows that
color(white)("XXX")7x^2=2

color(white)("XXX")x^2=2/7

color(white)("XXX")x=sqrt(2/7)
color(white)("XXXXXX")we can ignore the negative root as extraneous since sqrt(x) requires x>=0 for Real solutions

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