Revision as of 18:19, 25 July 2024 by Admin (Created page with "The diagram below describes the rate changes: <div style = "text-align:center;"> {{#invoke_html:actuarial_science/pgram | html | 700 | 300 | 75 | 4 | 9/1/1 | 10/1/2 | 6/1/3 | 5 | 5 | -1 }} </div> 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 <math display = "block"> A_1 + 1.05\cdot A_2 +...")
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Exercise

ABy Admin
Jul 25'24

Answer

The diagram below describes the rate changes:

% of policyearned100%50%0%CY1CY2CY3CY49/1/CY1 5 110/1/CY2 5 26/1/CY3 -1 3 4

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

[[math]] A_1 + 1.05\cdot A_2 + 1.05 \cdot 0.99 \cdot A_3 [[/math]]

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.

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