Answer:
Change in sulfur oxide in the air = [tex]\frac{\textup{110010}}{\textup{S}}[/tex]
Step-by-step explanation:
Data provided in the question:
Relation between the amount of sulfur oxide in the air and the population as:
S² = 110P² + 20P + 600
Population growth rate, [tex]\frac{\textup{dP}}{\textup{dt}}[/tex] = 10 people per month
Now,
change in sulfur oxide with time i.e [tex]\frac{\textup{dS}}{\textup{dt}}[/tex]
differentiating the given relation with respect to time 't'
we have
[tex]2S\frac{\textup{dS}}{\textup{dt}}[/tex] = [tex]2\times110P\frac{\textup{dP}}{\textup{dt}}[/tex] + 20
at P = 100 and [tex]\frac{\textup{dP}}{\textup{dt}}[/tex] = 10 people per month
we have
[tex]2S\frac{\textup{dS}}{\textup{dt}}[/tex] = 2 × 110 × 100 × 10 + 20
or
[tex]2S\frac{\textup{dS}}{\textup{dt}}[/tex] = 220020
or
[tex]\frac{\textup{dS}}{\textup{dt}}[/tex] = [tex]\frac{\textup{220020}}{\textup{2S}}[/tex]
or
Change in sulfur oxide in the air = [tex]\frac{\textup{110010}}{\textup{S}}[/tex]
