1 Answer

Haakym · Answer 1 · 2023-12-11T21:30:13+0000

To answer this question we will use the following property:

$\ln a=b\text{ if and only if }e^b=a.$

Substituting the second equation in the first one we get:

$23=15-\ln(x-4).$

Adding ln(x-4) to the above equation we get:

$\begin{gathered} 23+\ln(x-4)=15-\ln(x-4)+\ln(x-4), \\ 23+\ln(x-4)=15. \end{gathered}$

Subtracting 23 from the above equation we get:

$\begin{gathered} 23+\ln(x-4)-23=15-23, \\ \ln(x-4)=-8. \end{gathered}$

Therefore:

Adding 4 to the above equation we get:

$\begin{gathered} x-4+4=e^(-8)+4, \\ x=e^(-8)+4. \end{gathered}$

Since

we get that x>4, therefore

$\ln(x-4)$

is well defined for

Answer:

$x=e^(-8)+4,\text{ y=23.}$

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