Revision as of 18:34, 25 July 2024 by Admin (Created page with "We recall the fundamental insurance equation equals <math display = "block"> P = L + E_V + E_F + Q\cdot P. </math> Dividing by the exposure, we obtain <math display = "block"> 750 = \overline{L} + 750V + 50 + 750Q . </math> The projected pure premium, <math>\overline{L}</math>, equals $550 multiplied by the trend factor. The forecast period is the next two calendar years, so the trend factor equals 1.04 and the projected pure premium equals $572. Similarly, the proje...")
Exercise
ABy Admin
Jul 25'24
Answer
We recall the fundamental insurance equation equals
[[math]]
P = L + E_V + E_F + Q\cdot P.
[[/math]]
Dividing by the exposure, we obtain
[[math]]
750 = \overline{L} + 750V + 50 + 750Q .
[[/math]]
The projected pure premium, [math]\overline{L}[/math], equals $550 multiplied by the trend factor. The forecast period is the next two calendar years, so the trend factor equals 1.04 and the projected pure premium equals $572. Similarly, the projected fixed expense per exposure unit equals $50 multiplied by the trend factor 1.02 or $51. According to the equation above, the condition [math]Q\gt 0.15 [/math] implies that
[[math]]
750Q = 125 - 750V \gt 112.5
[[/math]]
or [math]V [/math], the variable expense %, must be less than 1.66%.