y = -4896ln(x) + 23976

To solve the equation y = -4896ln(x) + 23976, we can isolate the natural logarithm term by subtracting 23976 from both sides of the equation: y - 23976 = -4896ln(x) Next, we can divide both sides of the equation by -4896: (y - 23976) / (-4896) = ln(x) Using the definition of the natural logarithm, we can rewrite this as: ln(x) = (23976 - y) / 4896 Therefore, the solution to the equation y = -4896ln(x) + 23976 is: x = e^[(23976 - y) / 4896]