Weighted Average Life (WAL)
On the other hand, if year two and year five payments were switched, the weighted average life would be much lower: Year 1 = 1 x $1,000 = $1,000 Year 2 = 2 x $10,000 = $20,000 Year 3 = 3 x $4,000 = $12,000 Year 4 = 4 x $6,000 = $24,000 Year 5 = 5 x $2,000 = $10,000 Weighted average life = $67,000 / $23,000 = 2.91 years WAL gives investors or analysts a rough idea of how quickly the bond in question pays out returns. In WAL, only the principal payments are considered and these payments tend to get larger over time, with early payments of a mortgage going mostly to interest, while payments made towards the end of the loan are applied mostly to the principal balance of the loan. The final step is to take the total weighted payments and divide this value by the total unweighted payments to get the WAL: Weighted average life = $91,000 / $23,000 = 3.96 years The weighted average life (WAL) is the average length of time that each dollar of unpaid principal on a loan, a mortgage, or an amortizing bond remains outstanding.
What Is Weighted Average Life (WAL)?
The weighted average life (WAL) is the average length of time that each dollar of unpaid principal on a loan, a mortgage, or an amortizing bond remains outstanding. Calculating WAL shows an investor, an analyst, or a portfolio manager how many years it will take to receive roughly half of the amount of the outstanding principal. The formula is useful in measuring the credit risk associated with fixed-income securities.
Understanding Weighted Average Life (WAL)
The time weightings used in weighted average life calculations are based on payments to the principal. In many loans, such as mortgages, each payment consists of payments to principal and payments to interest. In WAL, only the principal payments are considered and these payments tend to get larger over time, with early payments of a mortgage going mostly to interest, while payments made towards the end of the loan are applied mostly to the principal balance of the loan.
Time periods with higher dollar amounts have more weight in WAL. For example, if the majority of the repayment to principal is in 10 years, the weighted average life will be closer to 10 years.
Weighted Average Life Example
There are four steps involved in calculating an amortizing bond's WAL. Assume a bond makes one payment per year. Over the next five years, the bond's payments are $1,000, $2,000, $4,000, $6,000 and $10,000. Therefore, the total value of the (unweighted) payments before the WAL computation is $23,000.
The first step of the calculation is to take each of these payments and multiply them by the number of years until the payment occurs. In this example, these values would be:
The second step in the calculation is to add these weighted amounts together. In this example, the total weighted payments equal $91,000. Step three is to add up the bond's total unweighted payments. In this example, the total is $23,000. The final step is to take the total weighted payments and divide this value by the total unweighted payments to get the WAL:
Weighted average life = $91,000 / $23,000 = 3.96 years
In this example, WAL is roughly equal to 4.00 and, at the end of four years, $13,000 of the $23,000 of principal is paid (slightly more than half). The largest payment is the final payment, so the WAL is closer to the total five-year term of the bond. On the other hand, if year two and year five payments were switched, the weighted average life would be much lower:
Weighted average life = $67,000 / $23,000 = 2.91 years
WAL gives investors or analysts a rough idea of how quickly the bond in question pays out returns. Since rational investors want to receive returns earlier, if two bonds were compared, the investor would select the one with the shorter WAL. Stated differently, the most significant credit risk of a loan is the risk of loss of principal and a smaller WAL indicates a higher likelihood that the principal will be repaid in full.
Related terms:
Amortizable Bond Premium
A tax term, the amortizable bond premium refers to the excess price (the premium) paid for a bond, over and above its face value. read more
Amortization Schedule
An amortization schedule is a complete schedule of periodic blended loan payments, showing the amount of principal and the amount of interest. read more
Amortized Bond
An amortized bond is one that is treated as an asset, with the discount amount being amortized to interest expense over the life of the bond. read more
Adjustable-Rate Mortgage (ARM)
An adjustable-rate mortgage is a type of mortgage in which the interest rate paid on the outstanding balance varies according to a specific benchmark. read more
Average Life
Average life is the length of time the principal of a debt issue is expected to be outstanding. The average life is an average period before a debt is repaid through amortization or sinking fund payments. read more
Credit Risk
Credit risk is the possibility of loss due to a borrower's defaulting on a loan or not meeting contractual obligations. read more
Deferred Interest
Deferred interest loans postpone interest payments for a period of time and can either be extremely costly if not paid off or a way to save money. read more
Interest Rate , Formula, & Calculation
The interest rate is the amount lenders charge borrowers and is a percentage of the principal. It is also the amount earned from deposit accounts. read more
Mortgage
A mortgage is a loan typically used to buy a home or other piece of real estate for which that property then serves as collateral. read more
Mortgage Interest
Mortgage interest is an expense paid by homeowners in addition to the principal balance of a mortgage loan. read more