The area of blot of link is growing such that after t seconds, its area is given by A `=(3t^(2)+7) cm^(2)`. Calculate the rate of increases of area at t=5 second.

The area of a blot of ink is growing such that after t seconds, its area is given by A = (3t^(2) +7) cm^(2) . Calculate the rate of increase of area at t=5 second.

The area 'A' of a blot of ink is growing such that after 't' second. A=3t^(2)+(t)/(5)+7 Calculate the rate of increase of area after five seconds.

A metallic disc is being heated. Its area (in m^(2) ) at any time t (in sec) is given by A=5t^(2)+4t . Calculate the rate of increase in area at t=3sec .

The area of a circle is given by A=pir^(2) , where r is the radius . Calculate the rate of increases of area w.r.t. radius.

A metallic disc is being heated. Its area A(in m^2 ) at any time t(in second) is given by A=5t^2+4t+8 . Calculate the rate of increase in area at t=3s .

A metallic disc is being heated. Its area A ("in" m^2) at any time t ("in" sec) is given by A =5 t^2 +4 t+8 Calculate the rate of increase of area at t =3 s .

The area of a circle is given by A= pi r^(2) , where r is the radius. Calculate the rate of increase of area w.r.t radius.

Area A of a blot of increasing in such a way that, after t second , A=3t+t^(3) . Rate at which the blot is expanding after 2 seconds is

Area of circular blot of ink is increasing at the rate of 2cm^(2)//sec. When the area of the blot is 4cm^(2), its radius is increasing at the rate of

The angular displacement of particle (in radian) is given by theta=t^(2) + t . Calculate angular velocity at t=2 second.