2 Answers

Kris Van Der Mast · Answer 1 · 2020-06-18T11:05:10+0000

ANSWER

$\log_(4)(3x + 4) = 2$

EXPLANATION

Consider the equation:

$\log_(4)(3x + 4) = 2$

When we rewrite this logarithmic equation in the exponential form, we obtain:

$3x + 4= {4}^(2)$

Note that to write a logarithmic equation in exponential form, the base of the logarithm is still the base in the exponential form.

We now simplify the RHS.

3x + 4 = 16

Group like terms

3x = 16 - 4

This implies that

3x = 12

Divide both sides by 3

(3x)/(3) = (12)/(3)

Simplify to get;

x = 4

Hence the equation that has x=4 as a solution is

$\log_(4)(3x + 4) = 2$

Another way to do this is to substitute x=4 into each equation. The equation that is satisfied is the correct choice.

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