Change the logarithmic statement to an equivalent statement involving an exponent. \[ \ln 7=x \] The equivalent exponential statement is (Type an equation.)

Step 1 ：Change the logarithmic statement to an equivalent statement involving an exponent.

Step 2 ：The logarithmic statement is \(\ln 7=x\).

Step 3 ：The logarithm base e of a number is the exponent to which e must be raised to equal that number.

Step 4 ：Therefore, the equivalent exponential statement of \(\ln 7 = x\) is \(e^x = 7\).

Step 5 ：Calculate the value of x, which is approximately 1.9459101490553132.

Step 6 ：Substitute x into the exponential statement, the result is approximately 6.999999999999999, which is very close to 7 due to the precision limit of floating point numbers.

Step 7 ：\(\boxed{\text{Final Answer: The equivalent exponential statement of } \ln 7 = x \text{ is } e^x = 7}\)