8. Solve the following equation: log4 (2x - 3) = log4 (5x + 1)

Question

asked Jul 2, 2023 166k views

1 Answer

Yvon · Answer 1 · 2023-07-08T23:11:21+0000

Given the logarithm equation as shown below

$\log _4(2x-3)=\log _4(5x+1)$

To solve the equation above, we will divide both sides by the log to the base of 4 and solve the resulting algebraic equation

$(\log_4(2x-3))/(\log_4)=(\log _4(5x+1))/(\log _4)$
$\begin{gathered} 2x-3=5x+1 \\ \text{Collect like terms} \\ 2x-5x=1+3 \\ -3x=4 \end{gathered}$

Divide both sides by -3

$\begin{gathered} (-3x)/(-3)=(4)/(-3) \\ x=-(4)/(3) \end{gathered}$

Hence, the solution of the equation is x= -4/3