8.3. Calculations

Determining loan amortization schedules, periodic payment amounts, total payment value, or interest rates can be somewhat complex. To help facilitate these kinds of calculations, GnuCash has a built-in Loan Repayment Calculator. To access the calculator, go to ToolsLoan Repayment Calculator .

Loan Repayment Calculator

The GnuCash Loan Repayment Calculator.

The Loan Repayment Calculator can be used to calculate any one of the parameters: Payment Periods, Interest Rate, Present Value, Periodic Payment, or Future Value given that the other 4 have been defined. You will also need to specify the compounding and payment methods.

8.3.1. Example: Monthly Payments

What is your monthly payment on a $100000 30 year loan at a fixed rate of 4% compounded monthly?

This scenario is shown in the example image above. To perform this calculation, set Payment Periods to 360 (12 months x 30 years), Interest Rate to 4, Present Value to 100000, leave Periodic Payment empty and set Future Value to 0 (you do not want to owe anything at the end of the loan). Compounding is Monthly, Payments are Monthly, assume End of Period Payments, and Discrete Compounding. Now, click on the Calculate button next to the Periodic Payment area. You should see $-477.42.

Answer: You must make monthly payments of 477.42.

8.3.2. Example: Length of Loan

How long will you be paying back a $20000 loan at 10% fixed rate interest compounded monthly if you pay $500 per month?

To perform this calculation, leave Payment Periods empty, set Interest Rate to 10, Present Value to 20000, Periodic Payment is -500, and Future Value is 0 (you do not want to owe anything at the end of the loan). Compounding is Monthly, Payments are Monthly, assume End of Period payments, and Discrete Compounding. Now, click on the Calculate. You should see 49 in the Payment Periods field.

Answer: You will pay off the loan in 4 years and 1 month (49 months).

8.3.3. Advanced: Calculation Details

In order to discuss the mathematical formulas used by the Loan Repayment Calculator, we first must define some variables.

 n   == number of payment periods
 %i  == nominal interest rate, NAR, charged
 PV  == Present Value
 PMT == Periodic Payment
 FV  == Future Value
 CF  == Compounding Frequency per year
 PF  == Payment Frequency per year

Normal values for CF and PF are:
   1  == annual
   2  == semi-annual
   3  == tri-annual
   4  == quaterly
   6  == bi-monthly
  12  == monthly
  24  == semi-monthly
  26  == bi-weekly
  52  == weekly
 360  == daily
 365  == daily

8.3.3.1. Converting between nominal and effective interest rate

When a solution for n, PV, PMT or FV is required, the nominal interest rate (i) must first be converted to the effective interest rate per payment period (ieff). This rate, ieff, is then used to compute the selected variable. When a solution for i is required, the computation produces the effective interest rate (ieff). Thus, we need functions which convert from i to ieff, and from ieff to i.

To convert from i to ieff, the following expressions are used:
Discrete Interest:   ieff = (1 + i/CF)^(CF/PF) - 1
Continuous Interest: ieff = e^(i/PF) - 1 = exp(i/PF) - 1

To convert from ieff to i, the following expressions are used:
Discrete Interst:    i = CF*[(1+ieff)^(PF/CF) - 1]
Continuous Interest: i = ln[(1+ieff)^PF]
Примечание

In the equations below for the financial transaction, all interest rates are the effective interest rate, «ieff». For the sake of brevity, the symbol will be shortened to just «i».

8.3.3.2. The basic financial equation

One equation fundamentally links all the 5 variables. This is known as the fundamental financial equation:

PV*(1 + i)^n + PMT*(1 + iX)*[(1+i)^n - 1]/i + FV = 0

  Where: X = 0 for end of period payments, and
         X = 1 for beginning of period payments

From this equation, functions which solve for the individual variables can be derived. For a detailed explanation of the derivation of this equation, see the comments in the file src/calculation/fin.c from the GnuCash source code. The A, B, and C variables are defined first, to make the later equations simpler to read.

A = (1 + i)^n - 1
B = (1 + iX)/i
C = PMT*B

n = ln[(C - FV)/(C + PV)]/ln((1 + i)
PV = -[FV + A*C]/(A + 1)
PMT = -[FV + PV*(A + 1)]/[A*B]
FV = -[PV + A*(PV + C)] 

The solution for interest is broken into two cases.
The simple case for when  PMT == 0 gives the solution:
i = [FV/PV]^(1/n) - 1

The case where PMT != 0 is fairly complex and will not be presented here. Rather than involving an exactly solvable function, determining the interest rate when PMT !=0 involves an iterative process. Please see the src/calculation/fin.c source file for a detailed explanation.

8.3.3.3. Example: Monthly Payments

Let’s recalculate Раздел 8.3.1, «Example: Monthly Payments», this time using the mathematical formulas rather than the Loan Repayment Calculator. What is your monthly payment on a $100000 30 year loan at a fixed rate of 4% compounded monthly?

First, let’s define the variables: n = (30*12) = 360, PV = 100000, PMT = unknown, FV = 0, i = 4%=4/100=0.04, CF = PF = 12, X = 0 (end of payment periods).

The second step is to convert the nominal interest rate (i) to the effective interest rate (ieff). Since the interest rate is compounded monthly, it is discrete, and we use: ieff = (1 + i/CF)^(CF/PF) - 1, which gives ieff = (1 + 0.04/12)^(12/12) - 1, thus ieff = 1/300 = 0.0033333.

Now we can calculate A and B. A = (1 + i)^n - 1 = (1 + 1/300)^360 - 1 = 2.313498. B = (1 + iX)/i = (1 + (1/300)*0)/(1/300) = 300.

With A and B, we can calculate PMT. PMT = -[FV + PV*(A + 1)]/[A*B] = -[0 + 100000*(2.313498 + 1)] / [2.313498 * 300] = -331349.8 / 694.0494 = -477.415296 = -477.42.

Answer: You must make monthly payments of 477.42.