| T.R | Title | User | Personal
Name | Date | Lines |
|---|
| 899.1 | a house divided profit | VINO::JMUNZER | | Thu Jul 07 1988 12:50 | 31 |
| You could use present values and assign the profit proportionately.
== == == ==
The first person paid a down payment (D) x months ago, worth
D * (1 + i) ^ x [P1]
today, where i is the monthly rate of interest (e.g. 1%).
The second person paid monthly payments (M) for x months, worth
M * (1 + i) ^ x + M * (1 + i) ^ (x-1) + M * (1 + i) ^ (x-2)
+ ... + M * (1 + i) ^ 2 + M * (1 + i)
today, which is equal to
(1 + i) ^ x - 1
M * (1 + i) * --------------- [P2]
i
E.g. for i = 1%, D = $30,000, M = $1000, and x = 60 months:
P1 = $54,501
P2 = $82,486
== == == ==
You could split the new selling price in the ratio P1:P2.
John
|
| 899.2 | | KIRKWD::FRIEDMAN | | Thu Jul 07 1988 13:20 | 3 |
| What is a fair way to determine i?
|
| 899.3 | re .2 | VINO::JMUNZER | | Thu Jul 07 1988 13:38 | 3 |
| (1 + i) ^ 12 = 1 + annual interest rate
John
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| 899.4 | | KIRKWD::FRIEDMAN | | Thu Jul 07 1988 15:19 | 7 |
| I am sorry. What I really meant is, Whose interest rate? Treasury
bonds? Prime rate?
Also, if one person lives in the house, and the other person does
not live in the house, then the M needs to be adjusted downward
to reflect the fact that he is living rent-free. The person paying
the downpayment doesn't have the privilege of living in the house.
|
| 899.5 | Legal problem? | HPSTEK::XIA | | Thu Jul 07 1988 17:26 | 4 |
| Well, the fairest way is to follow the contract the two sides both
signed :-). T'is definitely not a math problem.
Eugene
|
| 899.6 | | KIRKWD::FRIEDMAN | | Fri Jul 08 1988 14:49 | 3 |
| The contract does not exist yet. I am referring to a proposed future
arrangement.
|
| 899.7 | That is tough | HPSTEK::XIA | | Fri Jul 08 1988 18:47 | 10 |
| re .6
Oh boy! This is tough. There are so many variables involved.
To start with, there is the renting income, the potential damage to
the hourse, the future inflation rage vs. interest rate, the tax benifit,
depreciation of the hourse and on and on and on. Personally,
I do not feel that mathematics is of much help beyoun arithmetics.
One way to do it is perhapsto find some lawyer/real estate agent to
figure it out. That cost money, but you can avoid potential legal
problem.
Eugene
|
| 899.8 | a difficult problem | ZFC::DERAMO | For all you do, disk bugs for you. | Fri Jul 08 1988 20:10 | 16 |
| When calculating the present values of the amounts paid
by both parties, how do you take the following into account:
The person making the down payment paid for and
got a percentage of the value of the house.
The person making the monthly payments has paid
mostly interest, and has not much increased the
combined share in the house.
Perhaps consider many ways of dividing the profits, until
finding one that both sides can agree to. Or the standard,
one person selects the method and the other selects whether
to make the down payment or the make the monthly payments.
Dan
|
| 899.9 | the final authority? | ZFC::DERAMO | For all you do, disk bugs for you. | Fri Jul 08 1988 20:14 | 3 |
| Another idea: see if the IRS has regulations for something
like this. How would they decide how much income accrues
to each partner?
|
| 899.10 | Split the second person into two | PRCSWS::EDDIELEUNG | NO Artificial Intelligence Added | Mon Jul 11 1988 00:30 | 36 |
| I also think that checking existing regulations is a wise thing
to do. Afterall, the most satisfactory mathematical solution can
be rendered unlawful if it contradicts any relevant regulations
or polices.
However, just for fun, let us consider the problem this way -- That
it is just coincidence that the person who pays the monthly mortgage
also lives in the house. For our present purposes, we just consider
A pays the down-payment, B pays the monthly mortgages and C rents
the house. C has no claim whatsoever on the profit/loss from
selling the house and has to pay a monthly rent. A, B and C agree
on the rent of the house.
ACP = A's contribution in present value
= present value of down-payment
BCP = B's contribution in present value
= SUM ( present value of payment i )
i
INCOME from the house =
Selling Price + SUM( rent for month i ) - unpaid mortgage
i
A should get ACP/(ACP + BCP) portion of INCOME
B should get BCP/(ACP + BCP) portion of INCOME
After putting down this lines, I suddenly realize that the BUYING
PRICE didn't come into play. Have I got something wrong ? Anyway,
I still think that separating the person who pays the mortgage and
the person who rents the house is a reasonable approach.
Eddie Leung.
|
| 899.11 | | ZFC::DERAMO | For all you do, disk bugs for you. | Mon Jul 11 1988 10:14 | 4 |
| The unpaid mortgage reflects what's left of the buying
price after the down payment and monthly payments so
far have been made. I suppose points fit in there
somewhere, too.
|
| 899.12 | | BEING::POSTPISCHIL | Always mount a scratch monkey. | Mon Jul 11 1988 11:15 | 17 |
| Here's a method I would agree to:
Call the interest rate i. Make a list of the dates and amounts each
person paid, whether down payments, mortgage payments, maintenance, or
whatever. Include each month's rental on the house as a negative
payment for the person(s) living in it. The amount of this negative
payment should be fair market value of the rental at the time (the same
amount other house's of similar characteristics were renting for).
Giving this list, figure how much money would have accumulated had it
been put in a bank account with interest rate i. Adjust i up or down
until the total accumulation for all people is equal to the amount
obtained by selling the house. Then each person receives the amount
they would have accumulated.
-- edp
|
| 899.13 | The math is simple, the legalities are not | CHALK::HALLYB | The smart money was on Goliath | Mon Jul 11 1988 12:53 | 16 |
| I have in the past participated in similar profit-sharing arrangements.
It may be too simple, but consider this: divide up the eventual profit
or loss pro-rata according to the out-of-pocket dollars actually spent
by each party. (Net after deducting taxes paid and deductions received).
It is true that one person pays mostly principal and the other interest,
but on the other hand it's that interest payment that allows the leverage
that will presumably benefit both partners -- and the monthly-payer is
obligated to make further payments, while the down-payer is not.
I also suggest appropriate escape clauses to provide for death,
insolvency, or one party's desire to pull out. For example, have
the house appraised and settle at appraised value, if that is what
seems to be appropriate.
John
|
| 899.14 | PV(Rent)? | ATLAST::FRAZER | J2n F4r | Mon Jul 11 1988 17:14 | 4 |
| re .10
Don't you need to Present_Value the rent, too?
John F.
|
| 899.15 | How much is "at risk" for each | AISVAX::GWHITTEN | Flash Gordon here! | Fri Jul 15 1988 12:23 | 8 |
| The important point, it seems to me, is how was the money for purchase
really acquired. Ownership is determined by resources and risk.
If "renter" obtained the Mortgage, then he/she is "at risk" for
the mortgage. So the correct way to divide the gain is based on
the amount "at risk" for each purchaser at the front end, whether
or not the resources are cash or credit. The renter is simply paying
his/her credit liability, not changing the amount "at risk"./
Perhaps this is simple-minded...but I am using it.
|