Consider the Equation $\log _{4} x+\log _{4}(x+6)=2$
(A) Solve the Equation Analytically

Consider the equation $\log _{4} x+\log _{4}(x+6)=2$ .
(a) Solve the equation analytically. If there is an extraneous value, what is it?
(b) To support the solution in part (a), we may graph $y_{1}=\log _{4} x+\log _{4}(x+6)-2$ and find the $x$ -intercept.
Write an expression for $y_{1}$ using the change-of-base rule with base 10 , and graph the function to support the solution from part (a).
(c) Use the graph to solve the inequality $\log _{4} x+\log _{4}(x+6)<2$ .

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(a) ; the ...

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