Negatively Amortizing Loan
What it is:
How it works (Example):
For example, let's assume that John Doe wants to borrow $100,000 from Bank XYZ to buy a house. The interest rate on the 30-year loan is 5%. Normally, this would that John Doe would need to make 360 monthly payments of $536.82 in order to pay the loan off in 30 years. Here is how the first 12 months of John Doe's amortization schedule would look under this arrangement:
However, Bank XYZ is year of the . John Doe obtains one of these mortgages and decides to pay $50 a month.a "pick your payment" promotion on its mortgages for a limited time. These mortgages allow borrowers to pay as much or as little as they want for the first
What John Doe doesn't know is that the mortgage accrues at least $410 a month in interest. Because he is only paying $50 each month, the Bank XYZ adds the unpaid interest, $360, to his loan balance every month. The increasing loan balance in turn accrues more interest. Thus, John Doe's loan balance actually goes up each month, and by the end of the first year, he actually owes $104,502 on his $100,000 mortgage.
Notice that John's $50 payments are applied toward the interest owed first; none of it is applied to thebalance until the interest portion of the payments is made.
Why it Matters:
Mortgages with "payment options" are often negatively amortizing loans. Rarely do their borrowers understand that paying less than the standard repayment amount will result in a higher loan balance later and more interest later. Nonetheless, they can be very attractive to borrowers who are struggling with payments or expect larger incomes later.
Often, student loans are negatively amortizing loans in the sense that students are not required to make payments while they are still in school but interest continues to accrue and become part of the loan balance. This in turn means that a student who obtains, say, $20,000 of student loans over four years will be surprised to learn on graduation day that his or her beginning loan balance is actually, say, $23,000 -- the extra $3,000 is interest that accrued while the student was still in school.