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...

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 :

For a particle moving on a straight line it is observed that the distance 's' and time 't' is given by s = 6t -1/2 t^(3) . The maximum velocity during the motion is

The dimensions of a/b in the equation P=(a-t^(2))/(bx) where P is pressure, x is distance and t is time are

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 :

The normal magnetic flux passing through a coil changes with time according to the equation phi = 6t^2 - 5t + 1 . What is the magnitude of the induced current at t = 0.253 s and resistance 10 Omega ?

A resistor of 500 Omega , an inductance of 0.5 H are in series with an a.c. which is given by V = 100 sqrt2 sin (1000 t) . The power factor of the combination is