Answer:
I=2 thousand foot-candles
Step-by-step explanation:
P is maximum in one of its critical points, to find the critical points of a function you have to find the first derivative and equal it to zero:
[tex]P=\frac{120I}{I^2+I+4}[/tex]
[tex]P'=\frac{(I^2+I+4)(120I)'-(120I)(I^2+I+4)'}{(I^2+I+4)^2}\\P'=\frac{(I^2+I+4)120-(120I)(2I+1)}{(I^2+I+4)^2}\\P'=\frac{120I^2+120I+480-240I^2-120I}{(I^2+I+4)^2}\\P'=\frac{-120I^2+480}{(I^2+I+4)^2}[/tex]
[tex]P'=\frac{-120I^2+480}{(I^2+I+4)^2}=0\\\frac{-120I^2+480}{(I^2+I+4)^2}=0\\-120I^2+480=0\\-120(I^2-4)=0\\(I+2)(I-2)=0\\\therefore I_1=-2 , I_2=2[/tex]
The critical points are [tex]I_1=-2 , I_2=2[/tex], now evaluate this values in the function:
[tex]P(-2)=\frac{120(-2)}{(-2)^2+(-2)+4}=\frac{-240}{4-2+4} =\frac{-240}{6}=-40[/tex]
[tex]]P(2)=\frac{120(2)}{(2)^2+(2)+4}=\frac{240}{4+2+4} =\frac{240}{10}=24[/tex]
Therefore the rate P is at the maximum when I=2 thousand foot-candles
