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February 2, 2004
"I am trying to choose between a 3/1
ARM at 4.625% and a FRM at 5.875%, both 30 years. I don�t expect to be out of
my house within 3 years. What is the best way to make this decision?"
Whether the adjustable rate mortgage (ARM) or
fixed rate mortgage (FRM) turns out better depends on what happens to interest
rates in the future, which no one knows. Shoppers faced with this decision
should ask themselves "Is this a risk worth taking," and "can I
afford to take it?"
The best way I know to deal with these
questions is by determining what will happen to the rate and payment on the ARMif market interest rates change in ways that you specify. This "scenario
analysis" provides a measure of the risk if rates increase, and the benefit
if they don�t. It also allows you to determine the extent to which you can
reduce the risk on the ARM by making the larger payment that you would have made
had you selected the FRM.
A side benefit is that you can�t do
scenario analysis without knowing all the features of the ARM that affect future
rates and payments. The information you are forced to compile for this purpose
you should have anyway. Otherwise, you don�t know whether you have found the
best deal on your ARM.
For example, you told me that your 3/1 ARMhad a rate of 4.625%, but that rate holds for only 3 years, after which the rate
adjusts every year. You did not tell me what I needed to know to calculate the
rate and payment after the 3 years. I found out that your ARM rate was tied to
the one-year Treasury index, which had a recent value of 1.28%, and had a margin
of 2.75%. After 3 years, your rate would equal the index at that time plus
2.75%, subject to an adjustment cap of 2% (no rate change can exceed 2%) and a
maximum rate of 10.625%.
You need all that to do scenario analysis,
but you also want it for shopping. If you could find the same 3/1 ARM with a
2.5% margin, you should grab it.
The numbers cited below all assume loan
amounts of $100,000, and came from calculator 7b on my web site.
A stable-rate scenario provides the best
measure of the potential benefit of the ARM. The payment would be $514.14 for
the first 36 months, and $481.76 thereafter, as compared to $591.54 on the FRM.
If you made the $591.54 payment on the ARM, you would pay it off in 257 months.
I used 4 rising rate scenarios of gradually
increasing severity: 1. Small rate increase: after 2 years, the index
increases by .5 % /year for 3 years. 2. Moderate rate increase: after 1
year, the rate index increases by .75%/year for 4 years. 3. Larger rate
increase: starting immediately, the index increases by 1%/year for 5 years.
4. Worst case: the index rises to 100% in month 2.
With the small rate increase scenario, the
payment remains lower on the ARM than on the FRM over the entire 30 years. If
the borrower makes the FRM payment, he will pay off in 304 months. The borrower
thus benefits if rates are stable or decline, or have a delayed rise of 1.5%
over 3 years.
With the larger rate-increase scenarios, the
benefits of the ARM over the first 3 or 4 years are followed by losses. Skipping
to the worst case, the payment would rise from $514.14 to $630.64 in month 37,
to $754.44 in month 49, and to $883.74 in month 61 where it would remain until
payoff. It is useful to know whether you could deal with these increases, even
though the likelihood of their occurring is very low.
These payment increases could be reduced by
making the larger FRM payment in the first 3 years. If you paid $591.54 rather
than $514.14 for 36 months, you would reduce the worst case payment in months
61-360 from $883.74 to $856.01. The complete results for all the scenarios are
shown in the web version of this article.
Scenario analysis doesn�t provide
definitive answers to the questions posed at the beginning of this article.
However, it does allow you to make an informed judgment based on all available
information. In the face of an uncertain future, that�s the best anyone can
do.
ARM
Features
| Initial
Interest Rate on ARM |
4.625% |
|
Initial Rate Period |
3 Years |
|
Subsequent Adjustment Period |
1 Year |
|
Most Recent Index Value |
1.28% |
|
Margin |
2.75% |
|
First Rate Adjustment Cap |
2.000% |
|
Later Adjustment Caps |
2.000% |
|
Maximum Interest Rate |
10.625% |
|
Loan Term (in years) |
30 |
|
Rate on FRM Loan Used as
Comparison |
5.875% |
|
FRM Payment |
$591.54 |
Interest
Rates and Monthly Payments Under 5 Interest Rate Scenarios
|
|
SCENARIO
|
|
Months
|
No
Change
|
Small
Increase
|
Moderate
Increase
|
Large
Increase
|
Worst
Case
|
|
Rate
%
|
Pmt
$
|
Rate
%
|
Pmt
$
|
Rate
%
|
Pmt
$
|
Rate
%
|
Pmt
$
|
Rate
%
|
Pmt
$
|
|
1-36
|
4.625
|
514.14
|
4.625
|
514.14
|
4.625
|
514.14
|
4.625
|
514.14
|
4.625
|
514.14
|
|
37-48
|
4.03
|
481.76
|
4.53
|
508.90
|
5.5
3
|
565.46
|
6.625
|
630.64
|
6.625
|
630.64
|
|
49-60
|
4.03
|
481.76
|
5.03
|
536.01
|
6.28
|
608.58
|
8.03
|
716.66
|
8.625
|
754.44
|
|
61-360
|
4.03
|
481.76
|
5.53
|
563.01
|
7.03
|
651.97
|
9.03
|
779.13
|
10.625
|
883.74
|
|
|
|
Borrower
Makes the FRM Payment So Long As It Is Larger Than the ARM Payment
|
|
1-36
|
4.625
|
591.54
|
4.625
|
591.54
|
4.625
|
591.54
|
4.625
|
591.54
|
4.625
|
591.54
|
|
37-48
|
4.03
|
591.54
|
4.53
|
591.54
|
5.5
3
|
591.54
|
6.625
|
610.85
|
6.625
|
610.85
|
|
49-60
|
4.03
|
591.54
|
5.03
|
591.54
|
6.28
|
591.54
|
8.03
|
694.17
|
8.625
|
730.76
|
|
61-360
|
4.03
|
591.541
|
5.53
|
591.542
|
7.03
|
627.26
|
9.03
|
754.67
|
10.625
|
856.01
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
|
1Pays
off in 257 months 2Pays
off in 304 months
Copyright
Jack Guttentag 2004
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