Respuesta :
Answer:
The effective annual rate equals the annual percentage rate when interest is compounded annually.
Explanation:
Let's use an example to find out the correct option
Suppose an investor deposits $1000 at the rate of 10% per annum
the amount the investor would have in a year :
with annual compounding = 1000(1.1) =$1100
with monthly compounding = 1000 (1.008333)^12 = $1,104.71
investors would prefer monthly compounding because it yields the higher interest rate
The effective annual rate- (1 + periodic interest rate)^m :
with annual compounding = 1.1
with quarterly compounding = 1.025^4 = 1.104
Savers would prefer monthly compounding over annual compounding given the same annual percentage rate because it yields higher amounts of money while borrowers would prefer annual compounding.
effective annual rate increases with the number of compounding per year
with monthly compounding = (1.008333)^12 = 1.105
Effective annual rate is higher with monthly compounding
