Time Value of Money

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Future value factors formula

(1+i)^n

Present value factors formula

1/ [(1+i)^n]

FV of an ordinary annuity formula

FV of an ordinary annuity= payment x FV annuity factor

FV of an annuity formula

FV of annuity= payment x future value annuity factor

As the compounding frequency increases, what happened to the present value (opposite of FV)

It decreases due to more frequent compounding (more $ earned on interest=less upfront $

When there's a single payment

Lump sum

When interest is compounded in any way other than annually, you blank, to the interest rate and time period

Make adjustments

To find the future value of an annuity due by table factor

Multiply the ordinary annuity factor by (1+i)

To find the present value of an annuity due table facotr

Multiply the ordinary annuity factor by (1+i)

The FV and PV of annuities are blank

Not reciprocal and can't be used interchangeably

Need to know these 2 variables to determine the table factors

Number of periods (n) and interest rate (i)

Necessary adjustments to i and n

i/# of compounding periods per year n x #of compounds per year

Series of equal payments (paid or received) with same time interval between them

Annuity

Annuity with payments at the beginning of each period

Annuity due

Earns interest on both the principal as well as all previously earned interest

Compound interest

Time value of money=

Compound interest

The frequency with which interest is added to the principal

Compounding

Figuring out how much a future amount is worth today is called blank

Discounting

1. Future value of a lump sum 2. PV of a lump sum 3. FV of an annuity 4. PV of an annuity

Four time value of money cases

In the blank of a lump sum case, we know the value of some amount today and want to know the value at some point in the future

Future value

Wants to have=

Future value

Future value= PV x FV factor i,n

Future value of a lump sum formula

want to know the value of a series of equal cash flows at the beginning of a period in the future

Future value of an annuity due case

we want to know the value of a series of equal cash flows at the end of each period in the future

Future value of an ordinary annuity

As the compounding frequency increases, what happens to the future value

Increases because more frequent compounding= more interest earned on interest

Annuity with payments at the end of each period

Ordinary annuity

The blank in the FV of an annuity formula represents each individual payment

Payment

In the blank case, we know the value of some future amount and want to know today's value

Present value of a lump sum

How much is a series of future payments at the beginning of each period worth today

Present value of an annuity due

Want to know the value today of a series of equal payments to be made/received in the future

Present value of an annuity due case

Want to know the value today of a series of equal payments to be made/received in the future

Present value of an ordinary annuity case

Present value of an ordinary annuity formula

Present value of an ordinary annuity= payment x PV annuity factor

Present value of a lump sum formula

Present value= future value x present value factor

It's always easiest to compare different alternatives using

Present values (value of options in today's dollars)

The pv of a lump sum and the fv of a lump sum are blank

Reciprocals (opposites) and can be used interchangeably

PxRxT Earn interest on the principal invested

Simple interest

In each of the 4 time value of money cases, you will need to use the

Table of factors

When compounding frequency increases

The FV increases

Measurement and recording of liabilities are based on the concept of

Time value of money


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