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{{Redirect|APY|the Australian Aboriginal area|Anangu Pitjantjatjara Yankunytjatjara}}

'''Annual percentage yield''' ('''APY''') is a [[Normalization (statistics)|normalized]] representation of an [[interest rate]], based on a [[compound interest|compounding]] period of one year. APY figures allow for a reasonable, single-point comparison of different offerings with varying compounding schedules. However, it does not account for the possibility of account fees affecting the net gain. APY generally refers to the rate paid to a depositor by a financial institution, while the analogous [[annual percentage rate]] (APR) refers to the rate paid to a financial institution by a borrower.

To promote financial products that do not involve debt, banks and other firms will often quote the APY (as opposed to the APR because the APY represents the customer receiving a higher return at the end of the term). For example, a [[Certificate of deposit|CD]] that has a 4.65 percent APR, compounded monthly, for 8-months would instead be quoted as a 4.75 percent APY.<ref>http://pubs.cas.psu.edu/FreePubs/pdfs/ui392.pdf</ref>

==Equation==
One common{{Citation needed|date=April 2010}} mathematical definition of APY uses this [[effective interest rate]] formula, but the precise usage may depend on local laws.

:<math>APY = \left(1 + \frac {i_\text{nom}} {N} \right)^N -1</math>

where
:<math>i_{nom}</math> is the [[nominal interest rate]] and
:<math>N</math> is the number of compounding periods per year.

For large ''N'' we have, approximately,

:<math>APY \approx e^{i_\text{nom}} - 1,</math>

where ''e'' is the [[e (mathematical constant)|base of natural logarithms]] (the formula follows the definition of ''e'' as a limit). This is a reasonable approximation if the compounding is daily. Also, it is worth noting that a nominal interest rate and its corresponding APY are very nearly equal when they are small. For example (fixing some large ''N''), a nominal interest rate of 100% would have an APY of approximately 171%, whereas 5% corresponds to 5.12%, and 1% corresponds to 1.005%.

==United States==
For [[financial institution]]s in the [[United States]], the calculation of the APY and the related annual percentage yield earned are regulated by the [[Federal Deposit Insurance Corporation|FDIC]] [[Truth in Savings Act]] of 1991:

{{quote|ANNUAL PERCENTAGE YIELD.--The term "annual percentage yield" means the total amount of interest that would be received on a $100 deposit, based on the annual rate of simple interest and the frequency of compounding for a 365-day period, expressed as a percentage calculated by a method which shall be prescribed by the Board in regulations.<ref>http://www.fdic.gov/regulations/laws/rules/6500-3400.html</ref>}}

The calculation method is defined as:

:<math>APY = 100 \left [ \left(1 + \frac {Interest} {Principal} \right)^{365 / Days~in~term} - 1 \right ]</math><ref>http://www.fdic.gov/regulations/laws/rules/6500-3270.html#6500appendixatopart230</ref>

Algebraically, this is equivalent to:

:<math>Interest = Principal \left [ \left ( \frac {APY} {100} + 1 \right )^{Days~in~term/365} - 1 \right ]</math>

"Principal" is the amount of funds assumed to have been deposited at the beginning of the account.

"Interest" is the total dollar amount of interest earned on the Principal for the term of the account.

"Days in term" is the actual number of days in the term of the account.

==See also==
*[[Annual equivalent rate]]
*[[Compound interest]]
*[[Effective interest rate]]

==References==
{{reflist}}

[[Category:United States federal banking legislation]]
[[Category:1991 in law]]
[[Category:Interest rates]]

{{finance-stub}}

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