How do you solve 2log_5(x-2)=log_5 362log5(x2)=log536?

2 Answers
Douglas K.
Nov 3, 2016

Please see the explanation for steps leading to a solution.

Explanation:

Given:

2log_5(x - 2) = log_5(36)2log5(x2)=log5(36)

Divide both sides by 2:

log_5(x - 2) = (1/2)log_5(36)log5(x2)=(12)log5(36)

Use the property (c)log_b(a) = log_b(a^c)(c)logb(a)=logb(ac)

log_5(x - 2) = log_5(36^(1/2))log5(x2)=log5(3612)

Replace 36^(1/2)3612 with 6:*

log_5(x - 2) = log_5(6)log5(x2)=log5(6)

*Please notice that, technically, 36^(1/2) = +-63612=±6 but the negative value would violate the domain of the logarithm.

Make the logarithms disappear by writing both sides as exponents to base.

5^(log_5(x - 2)) = 5^(log_5(6))5log5(x2)=5log5(6)

x - 2 = 6x2=6

x = 8x=8

EZ as pi
Nov 3, 2016

x =8x=8

Explanation:

2log_5(x-2) = log_5 36" "larr2log5(x2)=log536 use the log power law

log_5 (x-2)^2 = log_5 36log5(x2)2=log536

Note: If log A = log B hArr A=BlogA=logBA=B

:.(x-2)^2 = 36" "larr find the square root

x-2 = sqrt36 = +-6" "larr reject -6

x-2 = 6

x =8

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