Given `s=t^(2)+5t+3`, find `(ds)/(dt)`

Find the first derivatives (i) If y=x^(-1//3)," find "(dy)/(dx) (ii) If x=t^(6)," find "(dx)/(dt) (iii) If z=u^(3)," find "(dz)/(du) (iv) If f=r^(2)+r^(1//3)," find "(df)/(dr) (v) If x=2t^(3)-3t^(2)+5t-6," find "(dx)/(dt) (vi) If y=3x^(2) (vii) If y=xlnx (viii) If y=xsinx (ix) If y=sinx cosx (x) If y=sin^(2)x+cos^(2)x (xi) If y=cos2x (xii) If v=(4)/(3)pir^(3)," find "(dv)/(dr) (xiii) If s=4pir^(2)," find "(ds)/(dr)

If 2t= v^(2) then (dv)/(dt) = …….

If x= 3 sin t- sin (3t), y= 3 cos t- cos 3t , then find ((dy)/(dx)) " at " t= (pi)/(3)

Velocity of a particle is given by v = (3t ^(2) +2t) m/s. Find its average velocity between t = 0 to t=3s and also find its acceleration at t = 3s. Motion of the particle is in one dimension.

If x=f(t)cost-f^(prime)(t)sint and y=f(t)sint+f^(prime)(t)cost , then ((dx)/(dt))^2+((dy)/(dt))^2= f(t)-f"(t) (b) {f(t)-f"(t)}^2 (c) {f(t)+f"(t)}^2 (d) none of these

The displacement of a point moving along a straight line is given by s= 4t^(2) + 5t-6 Here s is in cm and t is in seconds calculate (i) Initial speed of particle (ii) Speed at t = 4s

Find Order and Degree of given differential equation ((ds)/(dt))^(4) + 3s(d^(2)s)/(dt^(2)) = 0

The position of a particle moving along a straight line is given by x =2 - 5t + t ^(3). Find the acceleration of the particle at t =2 s. (x is metere).

If velocity (in ms^(-1) ) varies with time as V = 5t, find the distance travelled by the particle in time interval of t = 2s to t = 4 s.

A particle moves along a staight line such that its displacement at any time t is given by s=t^3-6t^2+3t+4m . Find the velocity when the acceleration is 0.