The radius of a sphere (in cm) whose volume is 12`pi` `cm^3`, is

If the volume of a sphere increase at the rate of , 2pi cm^(3)//sec , then the rate of increase of its radius (in cm/sec), when the volume is 288pi cm^(3)" is :"

The radius of a sphere is 4 cm with a possible error of 0.01 cm . Then absolute error in volume is

Find the radius of the sphere whose surface area is 36pi cm^(2) .

The diameter of a sphere is 1 cm. Find its volume.

The volume of a sphere is 2.42cm^(3) . The volume of 12 such spheres taking into account the significant figures is

The radius of a sphere is 3 cm. Its total surface area will be : (1) 18pi cm^(2) (ii) 36 pi cm^(2) (iii) 72pi cm^(2) (iv) 108 pi cm^(2)

The radius of a sphere is 6.01 cm. Its volume to four significant figures is

The radius of a sphere is increasing at the rate of 0.2 cm/sec. The rate at which the volume of the sphere increases when radius is 15 cm, is

The radius of a sphere is measured to be (1.2 +- 0.2)cm . Calculate its volume with error limits.

The radius of a sphere is 8 cm and 0.02 cm is the error in its measurement. Find the approximate error in its volume.