Use a calculator to find y to four decimal places, if possible. (If an answer is undefined, enter UNDEFINED.)

ln y = −0.35

Ln y = -0.35

Exponential form:
e^(-0.35) = Y
Y = 0.7047

To find the value of y, you need to use the inverse function of the natural logarithm (ln), which is the exponential function.

To solve the equation ln y = -0.35, you need to apply the exponential function to both sides of the equation. The exponential function cancels out the natural logarithm and leaves you with just y.

Here are the steps to solve the equation using a calculator:

1. First, rearrange the equation to isolate y: y = e^(-0.35), where e is the mathematical constant approximately equal to 2.71828.
2. Enter the value -0.35 into your calculator.
3. Use the "e^x" or "EXP" function on your calculator to raise e to the power of -0.35. Press the corresponding button on your calculator.
4. The result you get is the value of y, rounded to the desired decimal places.

Note: If your calculator doesn't have an "e^x" or "EXP" function, you can alternatively use the "^" or "x^y" function. In this case, you would enter e, "^" or "x^y", and then -0.35.

Remember to round your final answer to four decimal places, if possible.