Returns a Double specifying the interest payment for a given period of an annuity based on periodic, fixed payments and a fixed interest rate.
IPmt(rate, per, nper, pv, [ fv, [ type ]])
The IPmt function has these named arguments:
|rate||Required. Double specifying interest rate per period. For example, if you get a car loan at an annual percentage rate (APR) of 10 percent and make monthly payments, the rate per period is 0.1/12, or 0.0083.|
|per||Required. Double specifying payment period in the range 1 through nper.|
|nper||Required. Double specifying total number of payment periods in the annuity. For example, if you make monthly payments on a four-year car loan, your loan has a total of 4 * 12 (or 48) payment periods.|
|pv||Required. Double specifying present value, or value today, of a series of future payments or receipts. For example, when you borrow money to buy a car, the loan amount is the present value to the lender of the monthly car payments you'll make.|
|fv||Optional. Variant specifying future value or cash balance you want after you've made the final payment. For example, the future value of a loan is $0 because that's its value after the final payment. However, if you want to save $50,000 over 18 years for your child's education, $50,000 is the future value. If omitted, 0 is assumed.|
|type||Optional. Variant specifying when payments are due. Use 0 if payments are due at the end of the payment period, or use 1 if payments are due at the beginning of the period. If omitted, 0 is assumed.|
An annuity is a series of fixed cash payments made over a period of time. An annuity can be a loan (such as a home mortgage) or an investment (such as a monthly savings plan).
The rate and nper arguments must be calculated by using payment periods expressed in the same units. For example, if rate is calculated by using months, nper must also be calculated by using months.
For all arguments, cash paid out (such as deposits to savings) is represented by negative numbers; cash received (such as dividend checks) is represented by positive numbers.
This example uses the IPmt function to calculate how much of a payment is interest when all the payments are of equal value. Given are the interest percentage rate per period (
APR / 12), the payment period for which the interest portion is desired (
Period), the total number of payments (
TotPmts), the present value or principal of the loan (
PVal), the future value of the loan (
FVal), and a number that indicates whether the payment is due at the beginning or end of the payment period (
Dim FVal, Fmt, PVal, APR, TotPmts, PayType, Period, IntPmt, TotInt, Msg Const ENDPERIOD = 0, BEGINPERIOD = 1 ' When payments are made. FVal = 0 ' Usually 0 for a loan. Fmt = "###,###,##0.00" ' Define money format. PVal = InputBox("How much do you want to borrow?") APR = InputBox("What is the annual percentage rate of your loan?") If APR > 1 Then APR = APR / 100 ' Ensure proper form. TotPmts = InputBox("How many monthly payments?") PayType = MsgBox("Do you make payments at end of the month?", vbYesNo) If PayType = vbNo Then PayType = BEGINPERIOD Else PayType = ENDPERIOD For Period = 1 To TotPmts ' Total all interest. IntPmt = IPmt(APR / 12, Period, TotPmts, -PVal, FVal, PayType) TotInt = TotInt + IntPmt Next Period Msg = "You'll pay a total of " & Format(TotInt, Fmt) Msg = Msg & " in interest for this loan." MsgBox Msg ' Display results.