How do you solve log_3(a+3)+log_3(a-3)=log_3 16?

1 Answer
Mia
Nov 14, 2016

a = +5" " Or" " a=-5

Explanation:

Solving the given logarithmic equation is determined by applying the multiplication property of logarithm.
" "
color(blue)(log(axxb) = loga + logb)
" "
" "
log_3(a + 3) + log_3(a - 3) = log_3 16
" "
rArr color(blue)(log_3 (a + 3)(a - 3) = log_3 16
" "
rArr log_3 (a^2 - 3^2) = log_3 16
" "
rArr log_3 (a^2 - 9) = log_3 16
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rArr a^2- 9 = 16
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rArr a^2 = 16+9
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rArr a^2 = 25
" "
rArr a = +sqrt25" " Or " "a = -sqrt25
" "
Hence, a = +5" " Or" " a=-5

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