Exercise
Suppose an insurer makes the following rate changes for annual policies during three calendar years:
| Effective Date | Rate Change |
|---|---|
| 09/01/CY1 | +5% |
| 10/01/CY2 | +5% |
| 06/01/CY3 | -1% |
Calendar year 3 earned premium totalled 5M. Using the parallelogram method, determine the the on-level earned premium for calendar year 3.
- 5,036,500
- 5,142,049
- 5,149,167
- 5,150,159
- 5,197,500
The diagram below describes the rate changes:
Using the parallelogram method, the on-level factor for calendar year 2 equals the cumulative rate index divided by the weighted average index. The cumulative rate index equals 1.05 *0.99 and the weighted average index equals
with [math]A_1 [/math] the area of region 2 intersected with rectangle CY3, [math]A_2 [/math] the area of region 3 intersected with rectangle CY3 and [math]A_3 [/math] the area of region 4 intersected with rectangle CY3. Elementary geometry implies that [math]A_1 [/math] equals
(9/12)2/2 = 0.28125
, [math]A_3[/math] equals
(7/12)2/2 = 0.3403
, and [math]A_2 [/math] equals
1 - 0.28125 - 0.3403 = 0.37845.
Hence the weighted average index equals
0.28125 + 1.05 * 0.3403 + 1.05 * 0.99 * 0.37845 = 1.032
, the on-level factor equals
1.05*0.99/1.032 = 1.0073
, and finally the on-level earned premium equals 5M multiplied by 1.0073 or 5.0365M.