How do you solve $log_4 (x^2 + 3x) - log_4(x - 5) =1$ ?

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How do you solve $log_4 (x^2 + 3x) - log_4(x - 5) =1$ ?

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Answer 1 · 2016-07-28T17:42:11

$x=(1+sqrt(79)i)/2, (1-sqrt(79)i)/2$

Explanation:

$log_4(x^2+3x) - log_4(x-5) = 1$
Using the identity $log_ab -log_ac = log_a(b/c)$ , we can simplify the expression to
$log_4((x^2+3x)/(x-5)) = 1$
This yields to
$(x^2+3x)/(x-5) = 4^1$
This is because, if $log_ab = c$ , then $b=a^c$
Now the equation can be solved for values of $x$
$=>x^2+3x = 4^1(x-5)$
$=> x^2+3x = 4x -20$
$=> x^2 + 3x -4x +20 = 0$
$=> x^2-x+20=0$
The roots of this equation are imaginary.
They can be found using the formula $x = (-b +- sqrt(b^2-4ac))/(2a)$
Here, $a=1$ , $b=-1$ and $c=20$
Therefore, $x= (1+- sqrt((-1)^2-4*1*20))/(2*1)$
$=>x = (1+sqrt(79)i)/2, (1-sqrt(79)i)/2$

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How do you solve $log_4 (x^2 + 3x) - log_4(x - 5) =1$ ?

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How do you solve log_4 (x^2 + 3x) - log_4(x - 5) =1log_4 (x^2 + 3x) - log_4(x - 5) =1?

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How do you solve $log_4 (x^2 + 3x) - log_4(x - 5) =1$ ?