Revision as of 18:51, 25 July 2024 by Admin (Created page with "Since policies are assumed to be written evenly throughout the year, the earned premium at current rates for policy year 1 equals the earned premium, $1,400,000, multiplied by (6/12)*1.03*1.05 + (6/12)*1.03 = 1.05575 or $1,478,050. The midpoint of the experience period is the end of calendar year 1 and the midpoint of the forecast period is the end of calendar year 3; hence the loss trend factor equals 1.03<sup>2</sup> = 1.0609 and the projection for the ultimate inf...")
Exercise
ABy Admin
Jul 25'24
Answer
Since policies are assumed to be written evenly throughout the year, the earned premium at current rates for policy year 1 equals the earned premium, $1,400,000, multiplied by
(6/12)*1.03*1.05 + (6/12)*1.03 = 1.05575
or $1,478,050. The midpoint of the experience period is the end of calendar year 1 and the midpoint of the forecast period is the end of calendar year 3; hence the loss trend factor equals 1.032 = 1.0609 and the projection for the ultimate inflation adjusted policy year 1 losses equals $1,326,125. According to the loss ratio method, the indicated change factor equals
[[math]]
ICF = \frac{(L + E_L)/P_C + E_F/P_C}{1 - V - Q_T} = \frac{L/P_C}{0.7}
[[/math]]
with [math]L/P_C [/math] equal to $1,326,125 divided by $1,478,050. Hence the indicated change factor equals 1.2817 and the rate change is +28.17%.