Exercise
Suppose an insurer makes the following rate changes for annual policies during three calendar years:
| Effective Date | Rate Change |
|---|---|
| 09/01/CY1 | +3% |
| 05/01/CY2 | +7% |
Calendar year 2 earned premium totaled 10M. Using the parallelogram method, determine the the on-level earned premium for calendar year 2.
- 10,250,000
- 10,509,200
- 10,556,176
- 10,591,769
- 11,021,000
The diagram below describes the rate changes:
Using the parallelogram method, the on-level factor for calendar year 2 equals 1.03*1.07, the cumulative rate index, divided by the weighted average index. The weighted average index equals
with [math]A_1 [/math] the area of region 1 intersected with rectangle CY2, [math]A_2 [/math] the area of region 2 intersected with rectangle CY2 and [math]A_3 [/math] the area of region 3 intersected with rectangle CY3. Elementary geometry implies that [math]A_1 [/math] and [math]A_3[/math] equals
(8/12)2/2 = 0.4444
and [math]A_2 [/math] equals
1-2*0.4444 = 0.1122.
Hence the weighted average index equals
0.4444 + 1.03 * 0.1122 + 1.03 * 1.07 * 0.4444 = 1.0487
, the on-level factor equals
1.03*1.07/1.0487 = 1.05092
, and finally the on-level earned premium equals 10M multiplied by 1.05092 or 10,509,200.