QUESTION IMAGE
Question
solve $(ln(x))^2 + 3ln(x) = -2$.
select one:
a. $x = e$ and $x = e^2$
b. $x = -1$ and $-2$
c. $x = e^{-1}$ and $x = e^{-2}$
d. $x = e^{-\frac{2}{5}}$
Step1: Substitute $u=\ln(x)$
Let $u = \ln(x)$. The equation becomes:
$$u^2 + 3u = -2$$
Step2: Rearrange to standard quadratic form
Rewrite into $ax^2+bx+c=0$:
$$u^2 + 3u + 2 = 0$$
Step3: Factor the quadratic equation
Factor the polynomial:
$$(u+1)(u+2) = 0$$
Step4: Solve for $u$
Set each factor equal to 0:
$u+1=0 \implies u=-1$; $u+2=0 \implies u=-2$
Step5: Substitute back $u=\ln(x)$
Solve for $x$ using $x=e^u$:
For $u=-1$: $x=e^{-1}$; For $u=-2$: $x=e^{-2}$
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C. $x = e^{-1}$ and $x = e^{-2}$