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Consider the equation and solution steps shown here. If there is an error, identify the step in which the error occurs.problem: 5^x+3 = 212step A: In 5^x+3 = In 212step B: x + 3(In 5) = In 212step C: x = In 212 - 3(In 5)A) step AB) step BC) step CD) no error

Consider the equation and solution steps shown here. If there is an error, identify-example-1
User Rolebi
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1 Answer

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Solution:

Given the equation;


5^(x+3)=212

STEP A: Take the logarithm of both sides;


\begin{gathered} \ln (5^{x+3_{}})=\ln (212) \\ \end{gathered}

STEP B: Apply the logarithmic law;


\log _ba^c=c\log _ba


\begin{gathered} \ln (5^{x+3_{}})=\ln (212) \\ (x+3)\ln (5)=\ln 212 \end{gathered}

STEP C: Divide both sides by In(5);


\begin{gathered} (x+3)\ln (5)=\ln 212 \\ ((x+3)\ln (5))/(\ln (5))=(\ln 212)/(\ln (5)) \\ x+3=(\ln212)/(\ln(5)) \end{gathered}

Thus, there is an error in the solution.

CORRECT OPTION: B

User Lesyk
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