Math  /  Algebra

QuestionSolve the equation e5x=3e^{5x} = 3 and express the solution using natural logarithms.

Studdy Solution
Finally, we solve for xx by dividing both sides of the equation by5.
x=ln(3)5x = \frac{\ln(3)}{5}So, the solution to the exponential equation e5x=3e^{5x} =3 is x=ln(3)5x = \frac{\ln(3)}{5}.

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