If ln11≈2.398 and ln5≈1.609 , what is ln55 ? Use the Product Rule of Logarithms to solve.(1 point)
Responses
0.789
0.789
4.007
4.007
1.490
1.490
3.858
To solve for ln55 using the product rule of logarithms, we can rewrite ln55 as ln(11 * 5).
Using the property ln(a * b) = ln(a) + ln(b), we can rewrite ln(11 * 5) as ln11 + ln5.
Given that ln11 ≈ 2.398 and ln5 ≈ 1.609, we can substitute those values in and solve:
ln55 = ln11 + ln5
= 2.398 + 1.609
= 3.858
Therefore, ln55 is approximately 3.858.