A population `p(t)` of 1000 bacteria inroduced into nutrient medium grows according to the relation `p(t)=1000+(1000t)/(100+t^2)`. The maximum size of this bacterial population is

A population p(t) of 1000 bacteria introduced into nutrient medium grows according to the relation p(t)=1000+(1000t)/(100+t^2) . The maximum size of this bacterial population is equal to N then sum of the digits in N is

A population p(t) of 1000 bacteria introduced into nutrient medium grows according to the relation p(t)=1000+(1000t)/(100+t^(2)) The maximum size of this bacterial population is...

A population p(t) of 1000 bacteria introduced intonutrient medium grows according to the relation p(t)=1000+1000t/(100+t^2) . The maximum size of the this bacterial population is (a)1100 (b)1250 (c)1050 (d)5250

A population p(t) of 1000 bacteria introduced intonutrient medium grows according to the relation p(t)=1000+1000(t)/(100+t^(2)). The maximum size of the this bacterial population is

The population p(t) at a time t of a certain mouse species satisfies the differential equation (dp(t))/(dt)=0.5p(t)-450. If p(0)=850 . Then the time at which the population becomes zero is

The population p(t) at time t of a certain mouse species satisfies the differential equation (d p(t))/(dt)=0. 5 p(t)-450 . If p(0)""=""850 , then the time at which the population becomes zero is

The population p(t) at time t of a certain mouse species satisfies the differential equation (dp(t))/(dt)=0.5p(t)-450 . If p(0)=850 , then the time at which the population becomes zero is-