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

Let the popution of rabbits surviving at a time t be governed by the differential equation (dp(t))/(dt)=1/2p(t)-200 . If p(0) = 100 , then p(t) equals :

Write the degree of the differential equation ((d^(2)s)/(d t^(2))) + ((d^(3)s)/(d t))^(3) + 4 = 0 .

Let I be the purchase value of an equipment and v (t) be the value after it has been used for t years. The value v (t) depriciates at a rate given by the differentail equation (dv(t))/(dt)=-k(T-t) , where k gt 0 is a constant and T is the total life in years of the equipment . Then the scrap value v (t) of the equipment 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...

If N is the population density at time t, mention the formula to show its density at timet + 1.

If f(x) is differentiable and int_0^(t^2) x f(x) dx = 2/5 t^5 , then f (4/25) equals :

The acceleration of a moving particle whose space time equation is given by s=3t^(2)+2t-5 is :

Write the dimensions of a and b in the relation P=(b-x^(2))/(at), where P is power, x is distance and t is the time :