Revision as of 18:54, 25 July 2024 by Admin (Created page with "The exposure is split into three geographic regions: region A, region B and region C. The following accident year 2 data is available: {| class="table table-bordered" |- ! Region !! Current relativity !! Exposure !! Projected Ultimate loss |- | A || 1.1 || 2,500 || 450,000 |- | B || 1 || 5,000 || 850,000 |- | C || 1.2 || 2,000 || 400,000 |} The insurer is targeting an 8% overall increase in rates. Using the pure premium method, determine the rate change % for region A....")
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ABy Admin
Jul 25'24

Exercise

The exposure is split into three geographic regions: region A, region B and region C. The following accident year 2 data is available:

Region Current relativity Exposure Projected Ultimate loss
A 1.1 2,500 450,000
B 1 5,000 850,000
C 1.2 2,000 400,000

The insurer is targeting an 8% overall increase in rates. Using the pure premium method, determine the rate change % for region A.

  • +4.87%
  • +5.05%
  • +5.53%
  • +5.9%
  • +6.33%
ABy Admin
Jul 25'24

According to the pure premium method, the indicated rate differential for geographic region [math]i[/math] is the projected pure premium for region [math]i[/math] divided by the projected pure premium for the base region:

Region [math]i[/math] [math]R_{i,I} [/math]
A 18/17
B 1
C 20/17

Given a targeted overall change factor of 1.08, the indicated change factor for the base rate equals

[[math]] 1.08 \cdot \frac{\sum_{i} w_i R_{C,i}}{\sum_{i} w_i R_{I,i}} = 1.0962. [[/math]]

The change factor for region [math]i [/math] equals the change factor for the base level multiplied by the change factor of the indicated differential for region [math]i[/math]:

Region Change Factor Rate Change
A 1.0553 +5.53%
B 1.0962 +9.062%
C 1.0747 + 7.47%
00