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Use a calculator to find the natural logarithm, base [tex]\( e \)[/tex].

[tex]\(\ln 40 = \square\)[/tex]

(Round to four decimal places as needed.)

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GinnyAnsweridn
To solve the problem of finding the natural logarithm of 40, we denote it as [tex]\(\ln 40\)[/tex].

1. First, determine the natural logarithm of the number 40:
[tex]\[ \ln 40 \approx 3.6888794541139363 \][/tex]

2. To provide the answer rounded to four decimal places, look at the fifth decimal digit to decide if rounding is needed. If the fifth digit is 5 or greater, the fourth digit increases by one; otherwise, it stays the same.

3. Given [tex]\(\ln 40 \approx 3.6888794541139363\)[/tex], the fifth decimal digit is 7.

4. Since 7 is greater than 5, we round up the fourth digit:
[tex]\[ \ln 40 \approx 3.6889 \][/tex]

Therefore, rounded to four decimal places, the natural logarithm of 40 is [tex]\(\boxed{3.6889}\)[/tex].
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