Revision as of 18:46, 25 July 2024 by Admin (Created page with "Since the last rate change was at the start of calendar year 1 and the policies are annual, the accident year 2 earned premium at current rates is the same as accident year 2 earned premium or $1,700,000. The midpoint of the experience period is 07/01/CY2 and the midpoint of the forecasting period is the end of calendar year 3; hence the trend factor equals 1.04 <sup>1.5 </sup> = 1.0606 and the inflation adjusted projected ultimate losses for accident year 2 equal $1,590...")
Exercise
ABy Admin
Jul 25'24
Answer
Since the last rate change was at the start of calendar year 1 and the policies are annual, the accident year 2 earned premium at current rates is the same as accident year 2 earned premium or $1,700,000. The midpoint of the experience period is 07/01/CY2 and the midpoint of the forecasting period is the end of calendar year 3; hence the trend factor equals 1.04 1.5 = 1.0606 and the inflation adjusted projected ultimate losses for accident year 2 equal $1,590,894. 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}{0.75}
[[/math]]
with [math]L/P_C [/math] equal to $1,590,894 divided by $1,700,000. Hence the indicated change factor equals 1.2478 and the rate should be increased by 24.78%.