Find the solution of the exponential equation $$ 17 e^{x}-19=4 $$ in terms of logarithms, or correct to four decimal places. $$ x=\square $$

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Solve the equation $$ 17e^{x}-19=4 $$.
Solve the equation by following steps:
- step0: Solve for $$x$$:
  $$17e^{x}-19=4$$
- step1: Move the expression to the left side:
  $$17e^{x}-19-4=0$$
- step2: Subtract the numbers:
  $$17e^{x}-23=0$$
- step3: Rewrite the expression:
  $$17e^{x}=23$$
- step4: Divide both sides:
  $$\frac{17e^{x}}{17}=\frac{23}{17}$$
- step5: Divide the numbers:
  $$e^{x}=\frac{23}{17}$$
- step6: Take the logarithm of both sides:
  $$\ln{\left(e^{x}\right)}=\ln{\left(\frac{23}{17}\right)}$$
- step7: Evaluate the logarithm:
  $$x=\ln{\left(\frac{23}{17}\right)}$$
- step8: Transform the expression:
  $$x=\ln{\left(23\right)}-\ln{\left(17\right)}$$
The solution to the exponential equation $$17e^{x}-19=4$$ in terms of logarithms is $$x=\ln(23)-\ln(17)$$. Correct to four decimal places, the solution is approximately $$x\approx 0.3023$$.
$$ x \approx 0.3023 $$

Find the solution of the exponential equation \( 17 e^{x}-19=4 \) in terms of logarithms, or correct to four decimal places. \( x=\square \)

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