How to Calculate the Present Value of Fixed Principal Loan
Tutorial 21
Unlike "normal" loans that have a fixed payment, fixed principal loans are characterized by a declining payment amount.
With normal loans, the amount of each payment applied to principal increases as the interest decreases due to the balance decreasing. With fixed principal loans, the amount applied to principal does not vary (fixed principal amount). But because the balance is declining as payments are made, the interest due with each payment is declining. Thus, the fixed principal plus the declining interest amount results in a declining periodic payment.
Therefore, finding the present value of a fixed principal loan is normally tedious, given the ever changing payment amount. What one would usually have to do is enter each payment amount into a calculator. With the Ultimate Financial Calculator, entering individual payments is not necessary. This tutorial illustrates how to use the analytical calculations to discount any cash flow.
This example applies to our online Ultimate Financial Calculator. The CValue! program for Windows works in a similar way and has a few more features including the ability to save your work.
All users should work through the first tutorial to understand basic concepts about the calculator.
To calculate the present value of a fixed principal loan with two interest only payments, follow these steps:
 Set "Schedule Type" to "Loan"
 Or click the [Clear] button to clear any previous entries.
 The top two rows of the grid will not be empty
 Delete the 2nd row by selecting it and clicking on the [Delete] button
 Set "Rounding" to "Adjust last amount to reach "0" balance" by clicking on the {Settings} {Rounding Options}
 Set to "365 Days Per Year" by clicking on the {Settings} {360 / 365 Days}
 In the header section, make the following settings:
 For "Calculate Method" select "Normal".
 Set "Initial Compounding" to "Semiannually".
 Enter 8.25 for the "Initial Interest Rate".
 In row one of the cash flow input area, create a "Loan" series
 Set the "Date" to June 1, 2016
 Set the "Amount" to 800,000.00
 Set the "# Periods" to 1
 Note: Since the number of periods is 1, you will not be able to set a frequency. If a frequency is set, it will be cleared when you leave the row
 In row two, create a "Payment" series
 Set the "Date" to "December 1, 2016"
 Set the "# Periods" to 2
 Set the "Frequency" to "Semiannually"
 Click on the second row's "Cash Flow Options" and activate an "Interest Only" series
 Related interest only payment tutorial
 "# Periods" must be greater than "1" to see the "Cash Flow Options" link
 In row three, create a "Fixed Principal + Interest" "Payment" series

 Set the "Date" to "December 1, 2017"
 Set the "Amount" to "Unknown"
 Set the "# Periods" to 10
 Set the "Frequency" to "Semiannually"
 Click on "Cash Flow Options" and activate a "Fixed Principal + Interest" series
 "# Periods" must be greater than "1" to see the "Cash Flow Options" link
 Before calculating, your screen will look like this:
 Calculate the unknown. The result is $80,000
 In this case, the amount is the fixed principal amount. No interest is included.
 View the schedule to see the declining payment with interest
 Up until this point, we've been using the calculator to create a moderately complex fixed principal loan schedule. But if you are an investor investing in loans you need to know the present value of this cash flow as of your investment date. As mentioned, it is very easy. We start by entering your discount rate (the rate of return you want to earn on your investments).
 Select {Settings} {Analytics}
 Set "Discount Rate" to 6.5
 Set "As of Date" to "September 30, 2016"
 Select "Include present value (PV) on schedule..."
 Click [Save Changes] to close
 Click on [Schedule]
 As of September 30, 2016 assuming 6.5% return, the present value is $863,159.06
If an investor purchases the loan on September 30, 2016 for a price of $863,159 and holds the loan until the last payment is paid and the payments are paid on time, they will earn 6.5% per annum on the investment amount. The payments they receive will total $1,047,500.