If log_b x = 2/3log_b 27 + 2 log_b 2 -log_b 3, what is x?

1 Answer
Alan P.
Sep 19, 2016

x=color(green)(12)

Explanation:

Things you need to know and remember:
color(white)("XXX")log_b (p^q) = q * log_b p
and
color(white)("XXX")log_b (p) + log_b (q) = log_b (pq)

color(red)(2/3log_b 27)
color(white)("XXX")=2/3 log_b 3^3 = 2/3 * 3 log_b 3 = color(red)(2 log_b 3)

color(blue)(2log_b 2)
color(white)("XXX")=log_b 2^2 = color(blue)(log_b 4)

color(red)(2/3 log_b 27) + color(blue)(2 log_b 4) - color(black)(log_b 3)
color(white)("XXX")=color(red)(2log_b 3) +color(blue)(log_b 4) -color(black)(log_b 3)

color(white)("XXX")=log_b 3 + log_b 4

color(white)("XXX")=log_b 12

Therefore
color(white)("XXX")log_b x = 2/3log_b 27 + 2 log_b 2 -log_b 3

color(white)("XXX")rArr log_b x = log_b 12

color(white)("XXX")rArr x =12

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