Let u(t) and v(t) be two solutions of the differential equation `dy/dt=e^(t^2)y(t)+sint" with "u(2) lt v(2)`
Statement 1: `u(t) lt v(t)` for all t
Statement: u-v is proportional ot a positive function of t.

Let u(t) and v(t) be two solutions of the differential equation ((dy)/(dt))=e^(t^2)y+sin t with u(2) lt v(2). Statement-1 : u(2) < v(2) for all t. Statement-1 : u-v is proportional to a positive function of t.

Let the function x(t) and y(t) satisfy the differential equations (dy)/(dt)+ax=0,(dy)/(dt)+by=0. If x(0)=2,y(0)=1 and (x(1))/(y(1))=(3)/(2), then x(t)=y(t) for t=

With the usual notations the following equation S_(t)=u+1/2a(2t-1) is

Let x=x(t) and y=y(t) be solutions of the differential equations (dx)/(dt)+ax=0 and (dy)/(dt)+by=0] , respectively, a,b in R .Given that x(0)=2,y(0)=1 and 3y(1)=2x(1) ,the value of "t" ,for which, [x(t)=y(t) ,is :

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) T^2-1/k (2) I-(k T^2)/2 (3) I-(k(T-t)^2)/2 (4) e^(-k T)

The figure shows the variation of V with i at temperatures T_(1) and T_(2) . Then T_(1)-T_(2) is proportional to

Let z=e^(xy^(2)),x=t cos t,y=t sint . Find (dz)/(dt) at t=pi/2

If v is the velocity and f is the acceleration of a particle, at time t, such that t=(v^(2))/(2) , then : -(df)/(dt)=

Check the correctness of the relation s_(t) = u+ (a)/(2) (2t-1) where u is initial velocity a is acceleration and s_(t) is the diplacement of the body in t^(th) second .