The effective annual rate (r') is ...
r' = (1 + r/12)¹² -1 = (1 +.0725/12)¹² -1 ≈ 1.0749583 -1
r' ≈ 7.496% . . . . . matches selection b.
Answer:
The correct Option is B. 7.496%
Step-by-step explanation:
Nominal interest rate (r) = 7.250%
The effective annual rate Sarah is actually paying (R) :
[tex]R = (1 + \frac{r}{12})^{12}-1 = (1 +\frac{0.0725}{12})^{12} -1\\\\\implies R= 1.0749583 -1\approx 0.07496[/tex]
So, actual rate which Sarah is paying = 0.07496 × 100
= 7.496%
Hence, The correct Option is B. 7.496%
