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 (1) 2 ln 18 (2) ln 9 (3) `1/2` In 18 (4) ln 18

If s=2t^(3)+3t^(2)+2t+8 then find time at which acceleration is zero.

Let the population of rabbits surviving at a time t be governed by the differential equation d(p(t))/(dt)=1/2p(t)-200. If p(0)""=""100 , then p(t) equals (1) 400-300""e^(t//2) (2) 300-200""e^(-t//2) (3) 600-500""e^(t//2) (4) 400-300""e^(-t//2)

The population of a city increases at the rate 3% per year. If at time t the population of city is p, then find equation of p in time t.

The angular velocity of a particle is given by omega=1.5t-3t^(2)+2 , Find the time when its angular acceleration becomes zero.

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) depreciates at a rate given by differential equation (d V(t)/(dt)=-k(T-t) , where k"">""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 : (1) I-(k T^2)/2 (2) I-(k(T-t)^2)/2 (3) e^(-k T) (4) T^2-1/k

If t is a real number satisfying the equation 2t^3-9t^2+30-a=0, then find the values of the parameter a for which the equation x+1/x=t gives six real and distinct values of x .

Find the 13t^th term in the expansion of ( 9x-1/3sqrtx)^18 , x !=0.

Let y=f(x) satisfies the equation f(x) = (e^(-x)+e^(x))cosx-2x-int_(0)^(x)(x-t)f^(')(t)dt y satisfies the differential equation

If the roots of the quadratic equation (4p-p^2-5)x^2-(2p-1)x+3p=0 lie on either side of unity, then the number of integral values of p is