How To Use The Rule Of 78 Interest
When lenders use the Rule of 78's, they distribute the total finance charge over all payments, but
charge more interest early in the loan period and less later, compared to other methods. The Rule
of 78's is also called the "sum of digits" because it gets its name from summing the digits 1
through 12 - the number of months in a one year loan. Yes, this is 78.
Here is how the Rule of 78's is applied to a Amortized loan. Interest is calculated as described
in the topic Amortized Loan - Normal. (The formulas are repeated below but you will have to refer
to the aforementioned topic for details.)
Payment Amount
Collect! uses the following formula to calculate Payment amount. The Operator enters the information
listed above and Collect! performs the necessary calculations.
Payment Amount
Full formula:
The Above formula appear complicated due to the fact that we are dividing the Annual Interest Rate
in Collect! by 100 to get a decimal. By doing that first, the formula appears more simplified:
Total Plan Payments
Total Plan Payments amount is calculated as follows:
Total Interest
To calculate the Total Interest, the following is used:
When you know the Total Interest through the calculations above, you can calculate interest rebate
using Rule of 78's.
Interest Payments
First, you need the Sum of the number of payments.
For instance, if the Term is 12 monthly payments, the summation of 12 payments is
1 + 2 + 3 + 4 + 5 + 6 + 7 + 8 + 9 + 10 + 11 + 12 = 78
The amount of interest to be paid per payment is calculated as follows.
12/78 x Total Interest = First Payment
11/78 x Total Interest = Second Payment
- and so on until...1/78 x Total Interest = Final Payment
This rule applies to long term loans the same way.
For example, a 24-month loan - where the sum of the digits 1 through 24 is 300 - would have a first
month's interest payment that is 24/300 of the total interest. The second month would be 23/300 and
so on.
A three year loan, 36 months - where the sum of the digits 1 through 36 is 666 - would have a first
month's interest payment that is 36/666 of the total interest, second month would be 35/666 and so on.
The above fractions are applied to the Total Interest amount. The remainder of the Payment
amount would be applied to outstanding principal. As the months go by, the interest portion
decreases and the principal is paid off faster. However, the interest portion is a fixed
amount determined by the Rule of 78's. It is not recalculated each time from outstanding
principal.
The amount applied to Principal is
Payment Amount - Interest for Payment = Applied to Principal.
Early Payout Amount
If the loan is paid off before the full Term has expired, there is usually an interest rebate. The
borrower did not have the money as long as originally planned and did not accumulate as much interest
on the loan. However, the lender depends on the interest as payment for lending money. This is the
financial charge of the loan. If a loan is paid off early, the portion of interest that is left is
less with Rule of 78's and this benefits the lender.
For instance, if a 12-month loan is paid in 10 months,
2/78 of the Total Interest - the 11th payment and 1/78 of the Total Interest - the 12th and final
payment
is all the remaining financial charge left unpaid. So 75/78 of the Total Interest has already been
paid. Only 3/78 of the Total Interest is saved by paying the loan early.
To calculate the Early Payout Amount, first determine the number of payments remaining. Then calculate
the Interest amount saved as shown above.
It is very straightforward:
- Each payment is numbered from 1 to the total number in the Term. (12 or 24 or 36 or
whatever)
- The bottom part of the fraction is figured by "summing the digits." (78 or 300 or 666 or
whatever)
- Interest left to pay is calculated as described above.
If a 36-month loan is paid in 30 months, for instance, the amount of interest left to be refunded
or deducted from the total outstanding debt is the following.
1/666 of the Total Interest +
2/666 of the Total Interest +
3/666 of the Total Interest +
4/666 of the Total Interest +
5/666 of the Total Interest +
6/666 of the Total Interest = 21/666 of the Total Interest that must be rebated to the borrower.
This is the Interest Amount Saved and is used to calculate Early Payout Amount.
Early Payout Amount = OP + TI - IAS - PP - IP
OP = Original Principal
TI = Total Interest
IAS = Interest Amount Saved
PP = Principal Paid
IP = Interest Paid
Another formula which gives the Interest Amount Saved is the following.
(No. of months remaining + 1) x (No. of months remaining)
divided by (No. of months in Term + 1) x (No. of months in Term)
This gives the same result as above.
Early Payoff Penalty
When a loan is paid off a great deal sooner than expected, the borrower can actually experience a
penalty. This is because Rule of 78's calculates higher interest percentages in earlier months than
other types of calculating. This interest is still due according to the agreement made, even though
the actual calculation of interest would not be as high.
For instance, borrowing $10,000 for two years at 12% would amount to $1297.65 in Total Interest
(using a 365 day year.)
If this loan is paid after only four months, the actual interest on the amount and the length of
time would be $377.61.
Using Rule of 78's, the interest charge for the first four months amounts to $389.30. (Using the
formulas given above.)
This is an additional 3% interest.
As a rule:
- The higher the interest rate, the greater the penalty amount.
- The earlier the prepayment in relation to the term, the greater the penalty amount.
So, if you are a lender, you benefit from Rule of 78's. If you are a borrower, you should try to
avoid it.
WARNING: Some states have usury and other laws that may limit the use of the Rule of 78's.
Rate Basis
For "Rule of 78" accounts, the Rate Basis is only a factor if the first payment is deferred. A
deferred payment is a payment where the First Payment Date is more than one Period away from the
Calculate Interest From Date. Interest is calculated on this difference and the current Rate Basis
is a factor in this calculation.
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