To find the value of f(12) for the function f(x) = log₅(x + 1), we will substitute 12 into the function.
First, we will calculate x + 1 when x = 12:
12 + 1 = 13
Next, we need to find f(12) = log₅(13). This means we need the base 5 logarithm of 13.
The change of base formula for logarithms is:
logₐ(b) = log(c) / log(a)whereccould be any base, commonly base 10 or base e.
Using base 10 (common logarithm), we calculate:
f(12) = log₅(13) = log(13) / log(5)
If we calculate these values (using a calculator):
log(13) ≈ 1.113943log(5) ≈ 0.6990
Now, we can evaluate:
f(12) ≈ 1.113943 / 0.6990 ≈ 1.594534
Thus, the value of f(12) for the function f(x) = log₅(x + 1) is approximately 1.5945.