Find all real numbers $a$ such that equation
$${3^{(x^2+2ax+4a-3)}}-2=|{a-2 \over x+2}|$$
Has exactly two different roots $x_1,x_2 $ those belong to $[-4;0]$
Tried plenty different things to solve:
Analyzing the quadratic equation discriminant wasn't useful.
I think that we should consider different cases to open up the modulus, but parameter makes it difficult.
I come to conclusion that my knowledge is not enough to answer that question.
Thank for your help!
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