Revision as of 18:30, 25 July 2024 by Admin (Created page with "According to the pure premium method, the indicated rate per exposure unit equals <math display = "block"> \overline{P_I} = \frac{\overline{L + E_L} + \overline{E_F}}{1 - V - Q_T} = \frac{\overline{L + E_L}}{0.55}. </math> The projection <math>\overline{L + E_L} </math> equals $500 multiplied by the trend factor. To derive the trend factor, note that the midpoint of the experience period is the end of calendar year 2019 and the midpoint of the forecasting period is t...")
(diff) ← Older revision | Latest revision (diff) | Newer revision → (diff)

Exercise


ABy Admin
Jul 25'24

Answer

According to the pure premium method, the indicated rate per exposure unit equals

[[math]] \overline{P_I} = \frac{\overline{L + E_L} + \overline{E_F}}{1 - V - Q_T} = \frac{\overline{L + E_L}}{0.55}. [[/math]]

The projection [math]\overline{L + E_L} [/math] equals $500 multiplied by the trend factor. To derive the trend factor, note that the midpoint of the experience period is the end of calendar year 2019 and the midpoint of the forecasting period is the end of calendar year 2022. Hence the trend factor equals 1.05 3 = 1.1576 and the indicated rate per exposure unit equals

500 * 1.1576/0.55 = 1,052.36.
00