Difference between revisions of "Manuals/calci/PV"

Revision as of 03:11, 31 March 2014

PV(r,np,pmt,fv,ty)

$r$ is the interest rate.
$np$ is the total number of payment periods.
$pmt$ is the amount of the payment made each period.
$fv$ is the future value.
$ty$ is the type.

Description

This function gives the present value for an investment.
It is based on an interest rate and a constant payment schedule.
This function calculates the present value of an investment, which is the total amount that a series of future payments is worth presently.
In $PV(r,np,pmt,fv,ty)$ , $r$ is the rate of interest for the period.
Suppose we are taking a loan for 8 percent annual interest rate and paying the amount in monthly, then the $r$ value is 8%/12.
So we have to enter the $r$ value as 8%/12 or 0.6667% or 0.006667 in to the formula as the rate.
$np<math>isthetotalnumberofpaymentperiodsinanannuity.*<math>pmt$ is the payment made each period in the annuity.
Normally, the payment is set over the life of the annuity and includes principal plus interest without any other fees.
$fv$ is the future value of an investment or loan (the value you want to achieve at the end of all periods) when we are omitting the value of $fv$ ,then it is assumed to be 0.
$ty$ is the number 0 or 1 which is specifies the time to make a payment during the period.
when we are not giving the value of $ty$ , then it is assumed to be 0.

ty value	Explanation
0	Payments are due at the end of the period
1	Payments are due at the beginning of the period

The present value can be calculated using the following formula:

$PV={\frac {FV*1}{(1+r)^{n}}}$

where $FV$ is the future value, $r$ is the rate of interest, $n$ is the number of periods.
Also the result is coming in a negative sign ,it is indicating the money that we would pay, an outgoing cash flow.
The interest rate is dividing by 12 to get a monthly rate.
The years the money is paid out is multiplied by 12 to get the number of payments.

Examples

=PV(9.2%/12,15*12,10000,0) =-974470.2640587
=PV(5%/12,25*12,25000,0) = -4276501.176022
=PV(5%/12,25*12,25000,1) = -4276501.46327

where  ,, ,  , and

PV(Rate, NoPaymentPeriods, Payments, FutureValue, Type)

where,

Rate - is the interest rate per period.

NoPaymentPeriods - is the total number of payment periods

Payments - the payment made each period, it not change over the life of the annnuity.Payment contains principal and interest but except other fees and taxes.If omitted, include PresentValue parameters.

FutureValue - the future value.If omitted assumed to be 0 and include Payments parameters.

Type - is indicates payments due by number 0 or 1

TYPE Payments due

0 At the end of the period

1 At the beginning of the period

Returns the present vlaue of an investment.

If Type other than 0 or 1, PV returns the #ERROR.

PV

Lets see an example in (Column1, Row6)

?UNIQ581acce90e066248-nowiki-00000004-QINU?

PV returns -1245262.336586.

Consider an another example(Column1, Row2)

?UNIQ581acce90e066248-nowiki-00000005-QINU?

PV returns #ERROR(Type other than 0 or 1).

Syntax

Remarks

Examples

Description

	Column1	File:Copy-cube.gif Column2	Column3	Column4
Row1	8000
Row2	2%
Row3	15
Row4	8
Row5	1
Row6	-1245262.336586

File:Calci1.gif

@@ Line 1: / Line 1: @@
+<div style="font-size:30px">'''PV(r,np,pmt,fv,ty)'''</div><br/>
+*<math>r</math>  is the interest rate.
+*<math>np</math> is the total number of payment periods.
+*<math>pmt</math> is the amount of the payment made each period.
+*<math>fv</math> is the future value.
+*<math>ty</math> is the type.
+==Description==
+*This function gives the present value for an investment.
+*It is  based on an interest rate and a constant payment schedule.
+*This function calculates the present value of an investment, which is the total amount that a series of future payments is worth presently.
+*In <math>PV(r,np,pmt,fv,ty)</math>,<math>r</math> is the rate of interest for the period.
+*Suppose we are taking  a loan for 8 percent annual interest rate and paying the amount in monthly, then the <math>r</math> value is 8%/12.
+*So we have to enter the <math>r</math> value as  8%/12 or 0.6667% or 0.006667 in to the formula as the rate.
+*<math>np<math> is the total number of payment periods in an annuity.
+*<math>pmt</math>  is the payment made each period in the annuity.
+*Normally, the payment is set over the life of the annuity and includes principal plus interest without any other fees.
+*<math>fv</math> is the future value of an investment or loan (the value you want to achieve at the end of all periods) when we are omitting the value of <math>fv</math> ,then it is assumed to be 0.
+*<math>ty</math> is the number 0 or 1 which is specifies the time to make a payment during the period.
+*when we are not giving the value of <math>ty</math>, then it is assumed to be 0.
+{| class="wikitable"
+|-
+! ty value
+! Explanation
+|-
+| 0
+| Payments are due at the end of the period
+|-
+| 1
+|Payments are due at the beginning of the period
+|}
+* The present value can be calculated using the following formula:
+<math>PV=\frac{FV*1}{(1+r)^n}</math>
+*where <math>FV</math> is the future value, <math>r</math> is the rate of interest, <math>n</math> is the number of periods.
+*Also the result is coming in a negative sign ,it is indicating the money that we would pay, an outgoing cash flow.
+*The interest rate is dividing by 12 to get a monthly rate.
+*The years the money is paid out is multiplied by 12 to get the number of payments.
+==Examples==
+#=PV(9.2%/12,15*12,10000,0) =-974470.2640587
+#=PV(5%/12,25*12,25000,0) = -4276501.176022
+#=PV(5%/12,25*12,25000,1) = -4276501.46327
+ where  ,, ,  , and
 <div id="6SpaceContent" class="zcontent" align="left">
@@ Line 41: / Line 93: @@
 Lets see an example in (Column1, Row6)
-<nowiki>=PV(0.02/12,12*R3C1,R1C1,R4C1,R5C1)</nowiki>
+UNIQ581acce90e066248-nowiki-00000004-QINU
 PV returns -1245262.336586.
@@ Line 47: / Line 99: @@
 Consider an another example(Column1, Row2)
-<nowiki>=PV(0.02/12,12*5,4500,0,3)</nowiki>
+UNIQ581acce90e066248-nowiki-00000005-QINU
 PV returns #ERROR(Type other than 0 or 1).

Difference between revisions of "Manuals/calci/PV"

Revision as of 03:11, 31 March 2014

Description

Examples

Navigation menu

Search