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6-6939

Part II. Annual Percentage Yield Earned for Periodic Statements

The annual percentage yield earned for periodic statements under section 1030.6(a) is an annualized rate that reflects the relationship between the amount of interest actually earned on the consumer’s account during the statement period and the average daily balance in the account for the statement period. Pursuant to section 1030.6(b), however, if an institution uses the average daily balance method and calculates interest for a period other than the statement period, the annual percentage yield earned shall reflect the relationship between the amount of interest earned and the average daily balance in the account for that other period. The annual percentage yield earned shall be calculated by using the following formulas (“APY Earned” is used for convenience in the formulas):
A. General Formula
APY Earned = 100 [(1 + Interest earned/Balance)(365/Days in period) - 1]
“Balance” is the average daily balance in the account for the period.
“Interest earned” is the actual amount of interest earned on the account for the period.
“Days in period” is the actual number of days for the period.
Examples:
(1) Assume an institution calculates interest for the statement period (and uses either the daily balance or the average daily balance method), and the account has a balance of $1,500 for 15 days and a balance of $500 for the remaining 15 days of a 30-day statement period. The average daily balance for the period is $1,000. The interest earned (under either balance computation method) is $5.25 during the period. The annual percentage yield earned (using the formula above) is 6.58%:
APY Earned = 100 [(1 + 5.25/1,000)(365/30) - 1]
APY Earned = 6.58%
(2) Assume an institution calculates interest on the average daily balance for the calendar month and provides periodic statements that cover the period from the 16th of one month to the 15th of the next month. The account has a balance of $2,000 September 1 through September 15 and a balance of $1,000 for the remaining 15 days of September. The average daily balance for the month of September is $1,500, which results in $6.50 in interest earned for the month. The annual percentage yield earned for the month of September would be shown on the periodic statement covering September 16 through October 15. The annual percentage yield earned (using the formula above) is 5.40%:
APY Earned = 100 [(6.50/1,500)(365/30) - 1]
APY Earned = 5.40%
(3) Assume an institution calculates interest on the average daily balance for a quarter (for example, the calendar months of September through November), and provides monthly periodic statements covering calendar months. The account has a balance of $1,000 throughout the 30 days of September, a balance of $2,000 throughout the 31 days of October, and a balance of $3,000 throughout the 30 days of November. The average daily balance for the quarter is $2,000, which results in $21 in interest earned for the quarter. The annual percentage yield earned would be shown on the periodic statement for November. The annual percentage yield earned (using the formula above) is 4.28%:
APY Earned = 100 [(1 + 21/2,000)(365/91) - 1]
APY Earned = 4.28%
B. Special Formula for Use Where Periodic Statement Is Sent More Often Than the Period for Which Interest Is Compounded
Institutions that use the daily balance method to accrue interest and that issue periodic statements more often than the period for which interest is compounded shall use the following special formula:
Special Formula for Use Where Periodic Statement Is Sent More Often Than the Period for Which Interest Is Compounded
$$ \begin{align*} APY Earned = 100 \text{ } \Bigg\{\Bigg[ 1 + \frac{(\textit{Interest earned/Balance})}{\textit{Day in period}} (Compounding) \Bigg]^{(\text{365/Compounding})} - 1 \Bigg\} \end{align*} $$
The following definition applies for use in this formula (all other terms are defined under part II):
“Compounding” is the number of days in each compounding period.
Assume an institution calculates interest for the statement period using the daily balance method, pays a 5.00% interest rate, compounded annually, and provides periodic statements for each monthly cycle. The account has a daily balance of $1,000 for a 30-day statement period. The interest earned is $4.11 for the period, and the annual percentage yield earned (using the special formula above) is 5.00%:
Special Formula for Use Where Periodic Statement Is Sent More Often Than the Period for Which Interest Is Compounded
$$ \begin{align*} APY Earned = 100 \text{ } \Bigg\{\Bigg[ 1 + \frac{(4.11/1,000)}{30} (365) \Bigg]^{(\text{365/365})} - 1 \Bigg\} \end{align*} $$
APY Earned = 5.00%

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