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SIMPLE INTEREST
Simple Interest is calculated only on the principal, or on that portion of the principal which remains unpaid.
The amount of simple interest is calculated according to the following formula:
Isimp = (r * B0) * n
where r is the period interest rate (I/n), B0 the initial balance and n the number of time periods elapsed.
To calculate the period interest rate r, one divides the interest rate I by the number of periods n.
For example, imagine that a credit card holder has an outstanding balance of $2000 and that the simple interest rate is 11.58% per annum. The interest added at the end of 3 months would be:
Isimp = ((0.1158/12)*$2000)*3 = $57.90
and he would have to pay $2057.90 to pay off the balance at this point.
If instead he makes interest-only payments for each of those 3 months at the period rate r, the amount of interest paid would be:
I = ((0.1158/12)*$2000)*3 = ($19.30/month)*3 = $57.90
His balance at the end of 3 months would still be $2000.
In this case, the time value of money is not factored in. The steady payments have an additional cost that needs to be considered when comparing loans. For example, given a $100 principal:
- Credit card debt where $1/day is charged: 1/100 = 1%/day = 7%/week = 365%/year.
- Corporate bond where the first $3 are due after six months, and the second $3 are due at the year's end: (3+3)/100 = 6%/year.
- Certificate of deposit (GIC) where $6 is paid at the year's end: 6/100 = 6%/year.
There are two complications involved when comparing different simple interest bearing offers.
- When rates are the same but the periods are different a direct comparison is inaccurate because of the time value of money. Paying $3 every six months costs more than $6 paid at year end so, the 6% bond cannot be 'equated' to the 6% GIC.
- When interest is due, but not paid, does it remain 'interest payable', like the bond's $3 payment after six months or, will it be added to the balance due? In the latter case it is no longer simple interest, but compound interest.
COMPOUND INTEREST
Compound interest is very similar to simple interest, however, as time goes on the difference becomes considerably larger. The conceptual difference is that unpaid interest is added to the balance due. Put another way, the borrower is charged interest on previous interest charges. Assuming that no part of the principal or subsequent interest has been paid, the debt is calculated by the following formulas:
Icomp = B0 * [(1 + r)n - 1]
Bn = B0 + Icomp
where Icomp is the compound interest, B0 the initial balance, Bn the balance after n periods (where n is not necessarily an integer) and r the period rate.
For example, if the credit card holder above chose not to make any payments, the interest would accumulate - Calculation for Compound Interest:
Icomp = $2000*[(1+0.1158/12)3-1] = $2000*(1.009653-1) = $58.46
Bn = $2000+$58.46 = $2058.46
So, at the end of 3 months the credit card holder's balance would be $2058.46 and he would now have to pay $58.46 to get it down to the initial balance. Simple interest is approximately the same as compound interest over short periods of time so, more frequent payments is the better payment strategy.
A problem with compound interest is that the resulting obligation can be difficult to interpret. To simplify this problem, a common convention in economics is to disclose the interest rate as though the term were one year, with annual compounding, yielding the effective interest rate. However, interest rates in lending are often quoted as nominal interest rates (i.e., compounding interest uncorrected for the frequency of compounding). The discussion at compound interest shows how to convert to and from the different measures of interest.
Loans often include various non-interest charges and fees. One example are points on a mortgage loan in the United States. When such fees are present, lenders are regularly required to provide information on the 'true' cost of finance, often expressed as an annual percentage rate (APR). The APR attempts to express the total cost of a loan as an interest rate after including the additional fees and expenses, although details may vary by jurisdiction.
In economics, continuous compounding is often used due to its particular mathematical properties.
FIXED AND FLOATING RATES
Commercial loans generally use simple interest, but they may not always have a single interest rate over the life of the loan. Loans for which the interest rate does not change are referred to as fixed rate loans. Loans may also have a changeable rate over the life of the loan based on some reference rate (such as LIBOR and EURIBOR), usually plus (or minus) a fixed margin. These are known as floating rate, variable rate or adjustable rate loans.
Combinations of fixed-rate and floating-rate loans are possible and frequently used. Less frequently, loans may have different interest rates applied over the life of the loan, where the changes to the interest rate are governed by specific criteria other than an underlying interest rate. An example would be a loan that uses specific periods of time to dictate specific changes in the rate, such as a rate of 5% in the first year, 6% in the second, and 7% in the third.
COMPOSITION OF INTEREST RATES
In economics, interest is considered the price of money, therefore, it is also subject to distortions due to inflation. The nominal interest rate, which refers to the price before adjustment to inflation, is the one visible to the consumer (i.e., the interest tagged in a loan contract, credit card statement, etc). Nominal interest is composed by the real interest rate plus inflation, among other factors. A simple formula for the nominal interest is:
i = r + π
Where i is the nominal interest, r is the real interest and π is inflation.
This formula attempts to measure the value of the interest in units of stable purchasing power. However, if this statement was true, it would imply at least two misconceptions. First, that all interest rates within an area that shares the same inflation (i.e. the same country) should be the same. Second, that the lender knows the inflation for the period of time that he/she is going to lend the money.
One reason behind the difference between the interest that yields a Treasury bond and the interest that yields a Mortgage loan is the risk that the lender takes from lending money to an economic agent. In this particular case, a government is more likely to pay than a private citizen. Therefore, the interest rate charged to a private citizen is larger than the rate charged to the government.
To take into account the information asymmetry aforementioned, both the value of inflation and the real price of money is changed to their expected values resulting in the following equation:
it = r(t + 1) + π(t> + 1) + σ
Where it is the nominal interest at the time of the loan, r(t + 1) is the real interest expected over the period of the loan, π(t + 1) is the inflation expected over the period of the loan and σ is the representative value for the risk engaged in the operation.
CUMULATIVE INTEREST OR RETURN
Cumulative interest/return: This calculation is (FV / PV) - 1. It ignores the 'per year' convention and assumes compounding at every payment date. It is usually used to compare two long term opportunities.
OTHER CONVENTIONS AND USES
Other exceptions:
- US and Canadian T-Bills (short term Government debt) have a different convention. Their interest is calculated as (100-P)/P where 'P' is the price paid. Instead of normalizing it to a year, the interest is prorated by the number of days 't': (365/t)*100. (See also: Day count convention). The total calculation is ((100-P)/P)*((365/t)*100). This is equivalent to calculating the price by a process called discounting at a simple interest rate.
- Corporate Bonds are most frequently payable twice yearly. The amount of interest paid is the simple interest disclosed divided by two (multiplied by the face value of debt).
Flat Rate Loans and the Rule of 78s. Some consumer loans have been structured as flat rate loans, with the loan outstanding determined by allocating the total interest across the term of the loan by using the "Rule of 78s" or "Sum of digits" method. Seventy-eight is the sum of the numbers 1 through 12, inclusive. The practice enabled quick calculations of interest in the pre-computer days. In a loan with interest calculated per the Rule of 78s, the total interest over the life of the loan is calculated as either simple or compound interest and amounts to the same as either of the above methods. Payments remain constant over the life of the loan; however, payments are allocated to interest in progressively smaller amounts. In a one-year loan, in the first month, 12/78 of all interest owed over the life of the loan is due; in the second month, 11/78; progressing to the twelfth month where only 1/78 of all interest is due. The practical effect of the Rule of 78s is to make early pay-offs of term loans more expensive. For a one year loan, approximately 3/4 of all interest due is collected by the sixth month, and pay-off of the principal then will cause the effective interest rate to be much higher than the APY used to calculate the payments.
In 1992, the United States outlawed the use of "Rule of 78s" interest in connection with mortgage refinancing and other consumer loans over five years in term. Certain other jurisdictions have outlawed application of the Rule of 78s in certain types of loans, particularly consumer loans.
Rule of 72. The "Rule of 72" is a "quick and dirty" method for finding out how fast money doubles for a given interest rate. For example, if you have an interest rate of 6%, it will take 72/6 or 12 years for your money to double, compounding at 6%. This is an approximation that starts to break down above 10%. |
